1

MIME-Version: 1.0 Content-Type: multipart/related; boundary="----=_NextPart_01C9A253.E0445650" This document is a Single File Web Page, also known as a Web Archive file. If you are seeing this message, your browser or editor doesn't support Web Archive files. Please download a browser that supports Web Archive, such as Microsoft Internet Explorer. ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest.htm Content-Transfer-Encoding: quoted-printable Content-Type: text/html; charset="us-ascii" 1

<= /b>

1.      Jim wants to buy a $16.00 DVD plus 6% sales tax. How much will the sales tax be?

<= /b>

A. $= 6.00        &= nbsp;       B. $0.61      &n= bsp;            = ;   C. $1.00      &n= bsp;            = ;          &= nbsp;   D. $0.96

2.      Change to a number without exponents.

A. 12            =             &nb= sp; B. 81       = ;            &n= bsp;       C. 18       = ;               &= nbsp;           &nbs= p;   D. 64

3.      A scalene triangle

A.       has three e= qual sides.      &= nbsp;           &nbs= p;            &= nbsp;     C.        has one right angle.

B.  &n= bsp;     is always acute.     =             &nb= sp;            =             &nb= sp;    D.        has no equal sides

4.      Jessica got a job at Taco King’s for $5.85 per hour. She work= ed 30 hours the first week. Which operation should she use to find out how much she earned?=

A. addition      = ;            &n= bsp;     B. subtraction     &n= bsp;       C. multiplication     = ;            &n= bsp;   D. division

5.      If Steven earned $958.45 this month and must make a monthly payment= on his car note $245.00 this week, which operation should he use to find out h= ow much money he has left after paying his care note?

<= /b>

A. a= ddition        &= nbsp;           &nbs= p;   B. subtraction     &n= bsp;       C. multiplication     = ;            &n= bsp;   D. division

6.      The number 30024-4328   is m= ost likely a

A. date            =            B. phone number     &= nbsp;           &nbs= p; C. social security number    &n= bsp; D. zip code

<= /b>

7.      Three friends Jim, Kelly, and Josh ordered pizza. The bill for pizza came to $34.30.= If they want to share the bill evenly, what operation should they use to deter= mine how much each person owes?

A. addition      = ;            &n= bsp;     B. subtraction     &n= bsp;       C. multiplication     = ;            &n= bsp;   D. division

<= /b>

8.      Jessica used the ATM = twice today. She needs to figure out how much she has left in her bank account. What would be the most appropriate method for her to use?

<= /b>

A. estimation        &= nbsp;           B. calculator     &nb= sp;          C. paper and pencil    &nb= sp;            D. mental computation

9.      Kevin is the principal= of a school and is investigating size of each class. 12% of students are Freshman, 28% = are Sophomores, 25% are Juniors, and 35% are seniors. What kind of graph would = best to show the school’s students?

A. line graph     &nb= sp;         B. pictograph     &nb= sp;        C. bar graph     &nbs= p;          D. circle graph

10. If 4 people worked one= day, they could build 60 computers. If only 3 people worked one day, how many computers could they be expected to make?

A.  &n= bsp;     20        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;         C.        40

B.  &n= bsp;     45        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;         D.        80

11.

*

Which number is represented by point G on the number line?

A.     &= nbsp;           &nbs= p;            &= nbsp;      B.     &= nbsp;           &nbs= p;        C.     &= nbsp;           &nbs= p;            &= nbsp;          D. =

12. The distance from Folkston, GA to <= st1:place w:st=3D"on">Snellville, GA is 306 miles. Nick drove roun= d trip 2 times last month. Estimate the total number of miles he drove.=

A. 1= 200 miles      &n= bsp;            = ; B. 600 miles     &nbs= p;          C. 1800 miles     &nb= sp;               &= nbsp;   D. 1500 miles

13. Choose the situation f= rom the list below where approximate numbers would be expected.

A.     Pauline is filling out= time sheet that provides her employer with the number of hours she worked.<= /o:p>

B.     Matt is a sales person= for a copier company and must keep his receipts while he is on the road to make an expense report to his employer.

C.     Jill is preparing for a party and is purchasing napkins, cups, and paper plates.<= /b>

D.     Paige manages a gas st= ation and she is writing checks to her employees for payroll.

14. There are 14 boys and = 16 girls in a 4^th grade classroom.= The teacher sends a student to the office to pick up copies. What are the chances that the teac= her sent a boy to the office?

A.     &= nbsp;           &nbs= p;        B.     &= nbsp;           &nbs= p;          C.     &= nbsp;           &nbs= p;            &= nbsp;        D.

15. Ngoc rolls two standar= d 6 sided dice. What are the chan= ces she ends up rolling a “1” on both dice?

=

A.     &= nbsp;           &nbs= p;            &= nbsp; B.     &= nbsp;           &nbs= p;           C.     &= nbsp;           &nbs= p;            &= nbsp;        D.

16. Mark wants to buy a di= gital camera that normally sells for $210.00.&nb= sp; This weekend it is on sale for 40% off. How much could Mark save if he bou= ght it this week?

A. $126.00        &= nbsp;         B. $52.50      &= nbsp;           &nbs= p; C. $40.00      &= nbsp;           &nbs= p;        &= nbsp;   D. $84.00

17. A ma= nager that owns 8 local area Car Maintenance Garages was researching certificatio= ns of mechanics that worked for her company.&= nbsp; <= /b>

How many mechanics are certified by ASE to do Tune-Ups?

A. 9            =          B. 13        &= nbsp;           &nbs= p; C. 18=             &nb= sp; D. 22

18. In the following chart= , how many roller coaster have a top speed greater than 50 mph?=

Roller Coaster

Top Sp= eed

Deja Vu

Mind Bender

Mine Train

Batman=

Wile E= . Coyote

Scream= Machine

Nija

65 mph=

50 mph=

29 mph=

50 mph=

30 mph=

57 mph=

52 mph=

A. 2=         &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p; B. 3       =             &nb= sp;         C. 5             &= nbsp;           &nbs= p; D. 7

19. Nancy bough Comp – Tek stock in 1995. What year was it worth the most?

=

A. 1995        &= nbsp;           &nbs= p;            &= nbsp; B. 1998      &nb= sp;            =             &nb= sp;   C. 2001      &nb= sp;           &= nbsp;           &nbs= p;   D. 2003

20. What percent of the bu= siness budget is not used for Gasoline?

=

A. 20 %            &= nbsp;        B. 45%

C. 80%            &n= bsp;        D. 90%

        &= nbsp;

21. In the following picto= graph, what is the median contribution value?

Dol= lar Value Pledged by Country for Tsunami Relief

Great Britain

Australia

United States

Germany

Canada

Italy

=3D $100,000,000<= /p>

   &= nbsp;

               A. $100,000,000            =      B. $391,666,667        C. $350,000,000        D. $800,000,000<= /b>

22. What is the mode life expectancy of= animals in captivity? (Refer to the table below)

   A. 11.8            &= nbsp;       B. 12=             &nb= sp;            = C. 15=             &nb= sp;            = D. 17

Life Expectancy of Animals

In the wild

Life Expectancy

In cap= tivity

Life Expectancy

Lion

15

   &n= bsp;        Cat

12

Deer

8

   &n= bsp;        Cow

15

Elephant

38

   &n= bsp;        Dog

12

Fox

7

   &n= bsp;        Lion

17

Mouse

3

       &nbs= p;    Mouse

3

23. What is the range of a= ll the animal life expectancies? (Refer to the table above.)=

A. 3        &= nbsp;           &nbs= p;             = B. 13       = ;            &n= bsp;       C. 35=             &nb= sp; D. 38

24. The approximate height= of an average classroom would be about:

A.     3 centimeters

B.     3 meters

C.     3 Decameters

D.     3 kilometers

25. What would be the best metric unit = to use to measure the length of a building?

A. centimeters    &= nbsp;            B. millimeters            =             C. meters      &= nbsp;           &nbs= p; D. kilometers

26. Paulina is buying carp= et for her bedroom. The carpet costs= $3.00 per square foot installed. Th= e bedroom is 10 feet by 18 feet. Approximately how much should the carpet cost?=

A. $60            &n= bsp;            = ;           B. $540            &= nbsp;         C. $84            &n= bsp;           D. $1680

27. What is the volume of a cube that h= as an edge of 9 cm?

A. 729 cm³        &= nbsp;        B. 486 cm³        &= nbsp;        C. 81 cm³    &n= bsp;            = ;   D. 36 cm³

28.&= nbsp; Jan needs to tell a ci= ty clerk the area of the parking= lot surrounding her art-supply store. C= an you find the area of the parking lot?

A. 3,600 ft²     = ;            &n= bsp;     B. 4,400 ft²        &= nbsp;        C. 6,000 ft²    = ;            &n= bsp; D. 340 ft²

29. What would a good estimate be for t= he temperature in degrees Celsius of a hot, summer day in Georgia?

A. 37° C       =         B. 84 ° C            =         C. 70° C            =          D. 100° C

30. This is an example of = a(n)         &= nbsp;           &nbs= p;            &= nbsp;   angle.

A. obtuse        &= nbsp;    B. supplementary            =       C. acute      &n= bsp;            = ;    D. isosceles

31. If it took a train 14.5 hours to travel 1032 miles, which proportion below could help you determine= how long it would take to go 1456 miles?

A.     ₌               &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p; C.

B.  &n= bsp;         &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;        D.

32. Tatjana borrowed $950 to buy a refrigerator. Using the formu= la I =3D P R T, figure o= ut how much interest Tatjana paid if she borrowed $950 at 11% interest, and made payments for two years.

A.  &n= bsp;     $104.50        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;            C.        $10, 450.00

B.  &n= bsp;     $209.00        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;            D.        $20, 900.00

=

33. Which point on the coordinate plane has the coordinates (–3, 4)?

A.     E

B.     F

C.     G

D.     H

34. Mark’s bedroom i= s in the shape of a rectangle.   The perimeter is 54 feet. One side is 13 feet long. How long is the other side?

A. 4.15 ft       = ;       B. 14 ft            =             &nb= sp;          C. 27= ft        &= nbsp;           &nbs= p; D. 41 ft

35. Using 3.14 for , figure the volume of the can of bean soup.

A. 87.92 in³        &= nbsp;           &nbs= p; B. 175.84 in³        &= nbsp;     C. 351.68 in³   &nbs= p;           D. 113.04 in³

36. Tabitha wants to put a weather stripping around the outside edge of an outdoor circular Jacuzzi hot tub. She needs to figure the __________________ to determine how much weather stripping she will need to buy.

A.        volume        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp; C. perimeter

B.        circumference        &= nbsp;           &nbs= p;            &= nbsp;   D. area

        &= nbsp;           &nbs= p;

37. Victor notices that a bathtub holds= 34 gallons and takes 8 minutes to fill. How many gallons will be in the bathtub after 5 minutes?<= /span>

        &= nbsp;   A.       = 8.4 gallons      =             &nb= sp;            =             C= .   21.25 gallons                &= nbsp;

  &n= bsp;         B.        17 gallons      =             &nb= sp;            =              D.   24.75 gallons

38. If two triangles have = the same angles but have sides that are different lengths=

A.        the triangles are congruent to each other.

B.        the triangle’s sides are proportional.

C.        the triangles have the same perimeter.

D. &n= bsp;     the triangles have the same area .

39. On the map, how could = Main Street = and Sycamore Street be described?

A. parallel           &nb= sp;            =             &nb= sp;     C. skew

B. perpendicular            =             &nb= sp;       D. collinear

40. Which object is most l= ike a sphere?

A. baseball           &nb= sp;            =             &nb= sp;            =     C. box of crackers<= /b>

B.   football            =             &nb= sp;            =             &nb= sp;   D. ring

41. Using the formula , find the volume of a pyramid that has a b= ase measuring 5 meters wide, 6 meters long, and 15 meters high.=

A.        80 m³        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;    C.        450 m³

B.   = ;     45 m³        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;    D.        150 m³        &= nbsp;           &nbs= p;

42. Erica is planning a ga= rden in the corner of an atrium. She = wants to create the garden using a quarter of a circle. She wants to figure the area so she knows how much mulch to buy. = Using , figure the area of her garden.=

=

A.        28.28 sq. ft.      =             &nb= sp;            =             &nb= sp;         C.        254.57 sq. ft=

B.        113.14 sq. ft.           &nbs= p;            &= nbsp;           &nbs= p;             = D. &n= bsp;     1018.28 sq. ft.

43. Given Rectangle ACBD f= ind the length of the diagonal from A to B.

  &nbs= p;         A.        20        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;         C.        28

         &= nbsp; B.        18        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;         D.        19

44. Chung is building a chair in her industrial arts class. She is creating an isosceles trapezoid for the backing. Given find .

A.        70º        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;        C.        130º

B.        110º        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;      D.        290º

45. If and = are supplementary, then

A.  &n= bsp;             &= nbsp;           &nbs= p;            &= nbsp;     C.        they have the same measure.

B. &= nbsp;          &= nbsp;           &nbs= p;            &= nbsp;          D.        they are interior angl= es.

46. The = distance from the earth to the sun approximately averages 491,040,000,000 feet. How do you write this number in scientific notation?

A. B.     &= nbsp;      C.     &= nbsp;     D.

47. Solve:

A.  &n= bsp;     51        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;         C.        35

B.  &n= bsp;     36        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;         D.        15

48. Solve:

A.  &n= bsp;     − 8       =             &nb= sp;            =             &nb= sp;            =           C.        −38

B.  &n= bsp;     −26        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;       D.        447

49. Simplify:

A.  &n= bsp;         &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;    C.

B.  &n= bsp;             &= nbsp;           &nbs= p;            &= nbsp;               =             D= . &n= bsp;

50. Brian drives a taxi cab. His company charges $2.50 and 28¢ per mile driven.= A passenger wants to know how many= miles Brian will drive him if he has $10.00.&nbs= p; Which algebraic expression can help Brian determine how far he can d= rive the customer for $10.00.

A. &n= bsp;         &= nbsp;           &nbs= p;            &= nbsp;     C.

B.  &n= bsp;         &= nbsp;           &nbs= p;            &= nbsp;   D.

51. Find the numerical val= ue of when .

A.  &n= bsp;     2        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;           C.=         12

B.  &n= bsp;     −22        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;       D.        36

52. John is reading a blue= print diagram. A room on the diagram measures 5.5 inches wide by 4.5 inches long. If the scale of his sketch is inch =3D 1 = foot, how long is the room?

A. 11.25 feet            = B. 16 feet           &nbs= p;       C. 18 feet           &nbs= p;       D. 22 feet

53. When someone rounds off numbers to come up with an estimated answer, the estimated answer is

A.     always lower than the = actual answer.

B.     never lower than the a= ctual answer.

C.     always the same as the actual answer.

D.&n= bsp;   sometimes lower than the actual answer.

54. STU is similar to MNO. Find t= he length of .

A. 2.6        &= nbsp;           &nbs= p;          B. 3.2            &n= bsp;            C. 5&= nbsp;           &nbs= p;            &= nbsp; D. 20

55. Which of the following algebraic expressions corresponds to “to the third power multiplied by the difference between 6n and 7?”

A.     &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;     C.

B.     &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;       D.

  &nbs= p;

56. Find the value of x= , given 7x − 2 =3D= 47 ?

A.  &n= bsp;     6.43        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;      C. &n= bsp;     8.71

B.  &n= bsp;     7        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;           D.=         10

57. Which operation will s= olve the equation ?=

A.   &= nbsp;    addition        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;             = C. &n= bsp;     multiplication

B.  &n= bsp;     subtraction        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;        D.        division

58. A market research comp= any found that 2 out of 15 parent= s of new born babies use Snuggies Diapers. If&n= bsp; 840 babies were born in a large city one month, how many of those ba= bies could we expect to use Snuggies Diapers?

A.  &n= bsp;     28        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;         C.        112

B.  &n= bsp;     56        &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;         D.        340

59. The gas to oil mixture= for a particular two stroke engine is 3 quarts oil to 18 quarts of gasoline. What is the ratio of gas to oil? <= o:p>

A.  &n= bsp;         &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;           C.

B. &= nbsp;          &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p;            &= nbsp;           &nbs= p; D.

60. The graph shown at the= right is the graph of which of the following equations?

A.           &= nbsp;           &nbs= p;            &= nbsp; C.

B.           &= nbsp;           &nbs= p;          D.



61. Given the equation 2x = + 3y − 6 =3D 0, find the x and y intercepts

A.  &n= bsp;     ( 0 , 2) (3 , 0)        &= nbsp;           &nbs= p;            &= nbsp;    C.        ( 0 , −2) (−3 , 0)        &= nbsp;

B. &= nbsp;      ( 2 , 0) (0 , 3)        &= nbsp;           &nbs= p;            &= nbsp;    D.        ( −2 , 0) (0 , −3)

62. Which of the following= could be the correct next step for solving the following system using elimination= ?

A.            &= nbsp;           &nbs= p;            C.

^{( + )=}

B.            &= nbsp;           &nbs= p;                 &= nbsp;   D.

1.

GHSGT             &= nbsp;   Diagnostic Test #1

D
2.      B

3.      D

4.      C

5.      B

6.      D

7.      D

8.      B

9.      D

10. B

11. B

12. A

13. C

14. D

15. C

16. D

17. C

18. B

19. B

20. C

21. C

22. B

23. C

24. B

25. C

26. B

27. A

28. A

29. A

30. C

31. D

32. B

33. A

34. B

35. A

36. B

37. C

38. B

39. B

40. A

41. D

42. C

43. A

44. B

45. A

46. C

47. A

48. A

49. A

50. D

51. C

52. C

53. D

54. B

55. A

56. B

57. C

58. C

59. C

60. B

61. A

62. C

<= /b>

            &n= bsp;

------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image001.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC+29B3Qfx3mvPRNv7CSOfV1lh76mLJGURJEUKTaxV7AAYC8gCTaAvYANJEiADSDB AoAFLGDvVZQoihKp3qstO5Jsy4plKa6JYyd2ru0k7tfny31+7y5MJ8JM7ORaJ/d8ls6PuzPzvLOz s7OzMy9m9//GK58+7Ow/b//rvw9M8O5PnXvXPbXOvdt9zSIT9C7/J+6P2b73jxSjvT//I9nE0tK9 c/49/lqq+Hd7797D9lfEvPzKF7LYdhyLI7tf/tEfW0n+9V//1d2Ypfhf2+2Havmuz0J293/qcvx7 3WD/fjfUf8Dl+g+j61ye/zj6BGpumuCvdxP9DW6SvxG1dIW+FbrZTfatURvTFDTV3+qmoemoiLRi NAPNJG2mb4vaofaog5vlO6JOqLNpnu9qKvG5puU+35X5caZKX+A2+AmoEE11Vb4IzURz0DzS55tq /ErTTr/KVO/L3S5f4XZn2uNXu72mtW6fX4cq0QZU7Rr8ZrQV1ZK+zXSAfemI3+WOoRN+LzqAjqAT xJ1xR/2d7rC/2x3y96BL7qDpXuzupaYvk/d95Hkf+d1HGe7PdIVyXaV8VynnA6YdaDvx2+G2YbuN /Or8RVfr70J3cl7n0Fm3lWNu8afdZn8KnXSbKEe1P46OuY3/RkdNGyjrBn840yHq6ZBb7w+6dX6/ W+P3udWc02q/x1VwflKZ30ndb0N1bpmvcYuplxK/0c2nruZSb7Opv5momLotoq6n+xVc91Ku/1La xGLaSQntZaEbz3UZzzUa56e5sX6iG+PHutF+uBvp89xwP8QNQ3l+EO2uP+2vlxvg73B9aRM9aSN3 0H4602460sY60tY60uY6+BauPWpHG2xLW2zjP4Wud7fSPlujW/xH0YfdTaiV/6Br4d9nusG/x9TK v9t0G/sdaPcdaPcdUSfUGXVBXdEd/s9cN6R7Q9Ld5H79X+Pd9Ee/vvt0jzXefe+y7Y+4v3TX/4zb +h/dJ5p9Irm9+aSk6weWJJ2uK006NStLbr++PHE5nRPXf2DSvNeypFn3rUnzzpuTW9tWJm5R38Qt HJS4+YsSN+9Y4ubcn7hBexK3n7gDaP8cdDhxDZ9N3MaXE3eKuLPowrjE3VXF9lLizn0lcSeJOz0k cefziZtLWi26N5nc7tZk4KcmJf2bLU06NV+V3P6p8uT2G8qTwf1vS3r0G5j06bMkad53W3Jd99qk tcqzuHfSYmFOcvMCyjP/aFqegbsTd3Bg4g5xjIOU5+ARyvS5xG2iPGdzOB66pwBVJ+4i/IW3KAvs ucGUgfJcnIe2ofuSrZ1uStZ36JaU3lCaTLxpddKtzfrk9hYVybq+rZOyfr2TFX1Lkon965IWfXck bSnPkoWdk4UL+iYzFyxOpsznuDMvJp/styMZeLx3MvbowKTw8Nxk3KFjSf/9LyVuK+W53C/pdKVf MuiBwqTPg7VJt6uPJB+59xuUgzJepEz35SXuSgnalbj7H0oe7P6x5P5uLZJLnQuS021WJktbVyQ5 1M99A5on9wzsnNzdf25ytuf6pLRzVTKkVUVycX6L5PzCbsnZhXOSw7N3JaVjGpJh3bckp0+2To4f 65McPjInOXDkeLJpz1PJsDWPJRue75psfb53su2F4qT2hYZk07MvJPMf/ttk2KN9knFPDEhmPzs8 mftcWTLzuaPJ1KdfSL7Z2yXf7PWh5Os98pIvdV2eXGhdliy7sSz5+mCXfHVIq+Rrg8YlX+y3Njnd oSJZ2GJl8s2FLvlaSbvkrxdOS16fV5dcHL09Keu2IfnakQ8kbx7tkvzV0eLk9SMHkqfqLidbF5xJ vvgFl3z+852SV16dkbz8ykH0+eToXV9Mzr1xW3Lnm12Te/56bHLpqxuSu9+6Nzn1+leSf+jrku/1 c8n3B/RO/iFnYvKFniXJpXZlyfcGEjfIJf9ryKDkB/nzktcHlCZ3dihPfjjVJT+c/oHkR8V5yT/P WJ18a3JdcrbvhuTH213yk/obkp/uHom2JD+oO5s8suBo8stnXPLL51okv3xxQvKLF7cnP3/uqeQv jz+T/NM/uOSfvv+B5J9/MDb58T/VJT//6bMJ916i++uGFi2Tm9velnS4o3vSc8CgZNCwkcmYSVOS KTPnJvOXrEhWrq1KNtZsT3bvO5ScPH0+uefS/cnjTzydfPZzryRf/vJXkr/7u+8m//zP/2L56Q7u zH39LrZd/s19fe0Z+ke/3n7A6Vn6bp6lg+gzcqzf+BNTjlfcv+c7Gv8xd709V3N5xubyrNUzV8/e ofRbQ3kWD/F/Tp/4Z1ke7yX8PtI/gM2H0UddPjb52OaTR77/JHHXm3Itz39/zOvsmH/qPknffL09 y/PM5pPsK+7admKwvG3tGV9In6znfqG/ycYBk+iPNS6YSF88gWMX+PQYkwgX0k8Xkj6Z/nsyNlOw nWLjhFsJtzUVWp6hY2r8cCvPmlsZQ9zKfhueN2143rRhjNGWZ05b8lI+t5qmmFoT35r01rC3YHML treQR2vGGNrewlb7oWN2sbHITMYlM3kWaZyi8coMfxtqi9rYeKbY8rgVtUXtUHvUgWfj7agT6mzb Wb6LaablGbounXm2dmHs0yUbD3ViX3HadmKr/ZDtHTZmmgsz17iuSHGp5lpayLarWwRTYmx6/BKv OG27sNV+yDbPxmgLYRYal4sUl2qhpYXulaFuBcxyY4ealnvFhfh8t9IPY1ySl3F5hBUXKtt4GzOu gFlh3DikuFQrLC10LI01x5vKGK9IlTb+DPEFjLEmMAYdz5gqtd3gFffv+bbGf8QtgJlnWs/YtZLx USVj2UrGtJWMbassrwKT8t1I3EbSNsJs8LPQHDSf9MZ8QnUwnzHjAsaL145X4xWn7Ty22g/ZrrIx 9FaYrcatRIpLtdXSQvVR9uuxd40vM+00hepDY/E1Jo3NJY3TNWbX2L0xrx2Wx0riVpG2CqbctMdU gX2qhmC51jIW15h/dcatsfD+YD+w3cb/exj772FOsJcx8F7mCHuZKzQwDm5g7tCAfYPlsQ5Vog2o mmNsRltRLenbUB122017LM9QvW9j3rCdeYPYOtMBr7g0Pk0L2dbYPOVgxu9nf79P47RN90O2tcxh 6pjj6Hg1piNecdrWsNV+yHY3c6Ddxhw2bpc77tO4NH53xHaXO0n6CWPrTSe84rRt3A9dn4s23zrI vOugP8/+Gcp6gmMdIZ8DlGGvleO45bHXnSLuJGknYY7DHmM+dQTbw+RxmPnaoWyb7oeOeR9t7zLt 7jLX5jLX9V50iet8ifq9h3pTeS7aHDDVvdk88DK6D0bzwPux1fwvnQ8qvzTP0DE1L7zKnDDVDuaH O1E9eewy3fdrKd89pO2B281ccheq9w/CP4jdg9g/wJxS2wfZaj90T57lfj9nc07NPeuopzrOTXNS zU01R92RzVe3sb+NuDrS6jjnWs6/BpsabLeSx1auzdbgcY7ZnHUTc1fNYSXNZzWv1fxW81zNd2st D+V1lvgzpJ+GPYXtSfrFEzbX3UAeG4N1eMjmvhtNRzKlc+Nq07FMyiPVBstTOkpfeyTTYdtqDi2l +YWOWW9zac2rNb9e4xvQfreWdriOubfm31WWTzo3r0SKV3o6J2/Afo8rJ49y2nGFrzettjxDfdxu nlf1pgqzUVgK8TtdKXP9FeS50qe2y73iQvdrnfkFVpiNuG2ozvwE0gpLC9VHBeOmCsZN8h2sdXP8 esYbG90C8y1sdUvoO5ZZPtvtGEsJL/JbGENUM56pgl/HuGgNeayxPIpsu4at9kPtayHj0QWohDHp IsakSxknljI+XMH4cCV25eShcimPCsaVq4gvYwy5HG4Z/BKzKzBfxkI3LnicwW6YH+yGM+YZ4Ye7 UX6MG+MnurF+GjYzzQ+iPAosj3lolqWJGc34YpQfgZ18IkMZyw8lr/C4KZfj5Hkdb6gpzw9tYrx/ bfzcifFuR8aqXRijdmNs2ouxWl/f0w30/Zhf5Fh++ZbHIOYY/Zlr9Hb9GQ/2YezbgzHvHYx3OzPO VR632/ZWttoPlfFm0m7muK1N2k8V4luZf6eT2YhrZeoY5G80P1DK3MS2pWvvFReqA/mGPuluQfIT 3crcRH4j+Y/kR7oNpfatUEvC/9a/dCtqjc0tpubu5mz/ZtsPlfEj2HzUfFKtjfsoUlyI/5C7yX8o Yxp9WIoL8R92LUlvZcxHTK284kL8B92NzB1bmE1qe6NXXOg+/3Pzm7WEaWnc+5DiUrW0tJDt+9yn YG4w9v2mG7zitH0/W+2HbN9tfrr0eOLeg9I4bdP9kO17qIc/4fz+BObdplZecWl8mhayTcwveFPG t2Rf59cq26b7obr9Y9rPe8yn2CrjbvOKC/Hvoc3+Cenvpp2ltrebQvyfwfypcSn7p+jPIvn/OffF n2dMyircMXh/pH7OHv69pu6w3VBX1AV1Rp3M/s9MnVBn1AV1RXdg2+3X+hPLS9t0/98e0/87X8o1 D+qHPvLRX3tQk7f9teIpK+lUN8rl0LMOZJY1gFnWAGZHA/0k4ibTa02lNyuiB5vlhtLD5tHj59Hb 59GT59KjD6VnH0JvP4jtQHr+/jwF+vjF9IYLKeUCSlvC2SzlrMo4u9WcZSXahLaiGtNKRtjLGCkv QsyJ3BzCM1CR2+KmuU1uitvgCt06N8nNZA45m2fCJne7G+ne75qx7U64J/E3kP5JuGbwH8fuY9hf Rz4fJb+Pku915H8dx7mO413HcT+GmqHrUUvrUTvTK3ehd+7KbL8b6u47cB5tOZ9bOK+bOb+bOM+b Od/WnHcbzv826qEj6op6ENeHNPX+A+EGUX9DsMmlPvPQMPZHEDcqU+OV+rfe7fQaXfOR/TbX8e0t daTrybF6cczeXNN8Zrx5XnHhmXkPP5p0MePhJ8ArLsRPIG08GmfKz2zCfCH5TkJixpK3+MJIeaZQ dknMuIxXOFyeYX465yomLcswU7g8w30x11U24hSWQvxUN5LRRj+zEaewFOKLGXnMoc3MZEQgTmEp xM9lxLKANjLHjjHKzyasuBBfQtoi+HkcQ9xCVBLhl5G2FL7EpP0xflmEX8noaRl5L4YXtwIpLsSv 4RxL4XUMceWcw5pI/VRyTRt5cWupU8WF+CruHbFLuG/EVXKvKS7Er+c6LeEeXML9KK6SYykuXP4e sIM516HGraUdrYm051X0zovIfyn5iyunv1BciC+lb1lAORZbP3mHV1gK8TM5vtqPbMQt4Qkxs4n2 3/iUnc3TaAblEFNq+XfxipOKsJ8ROZcFPFXn8kQTu4RzX8Y9obgQv5ieRxKzGL4UfrH1Sk3zKxjx LUdilPdKyqi4EF/B6FASU2bXoZeFw22pja/MbMRW0WdURvjNpG/KbKpsv6ffHOmLtjJSlarhxdUg hcNeGz3TUputGZ/GaZvuh2eZK2nrUifjFJbC98WyTCm3OwuH+ZJMy2BL0SILh8szn2fvPGPEKiyF +Vmwc9D8jJ1jcSF+F8/oKtI30AOK203PqbgQX8+ToYq7YwMtXlw9PbPiQvx2N5H2McOOIW4nPb/i QnyNfNTwG+DF1bkCiwvxm9xY+hrxM43bTFhx4bY6mr6m2GzEVRFWXKgtTYaZQbnXYiNuthtmcVIh /85o4twbbYtcP1IHG8ssm6s3xOKkqW6ApYU9nrdyvFuNne+GMybrZnHa7mXMpf3wXy/egz6KfWoz 1sLvse1IxvTaD9l+FJvr0Vj2xF2HveK0fS/H1X7IdgDn04fyXp/ZdKHcipP686/SQra9qI2BHFXs 7dRTJ+pLcVIONTgwck2bc11u5PqI7c71uZ5w8yauaSP/F+T1Ka5cS2zENSP8F5H8P0IbbE77ugEb cdfRzhQXnpEWMg6eRTlmGPch2rHiQvz/oDU0z3hx/4PzUFyIf7+Ve7aVSdz7aSWKC/Hvow9ozv2t Y4h7H1vFhfn5sNIc4xR+X6TPaU7Lbk7/1Jx+KmUXWVw4/2WkLzPmfaZlpnD+KzOl3Pt5+jdvok9u bEvX0cc3p+8W8370PvYVp+372F4XedZ8jGeGdJ2pJ/s9LRzim5H+CZ5LH8v4ZplC/PW2qqeN2TSz cva0cNiD1Ma3ymzEtuD52irCt+GZfSsSI7Y1ahN51t/OmKADEnMLbDvGB7dHxhJ3uA7My24zpi1s B8YfdzThobp2X3f33RnXiFHe7eEVJ/VmXNS9Ce9Ao203xl+9OGexbZkTtmWMpzipJ+P6XpF6bkve nRm7iW3P2E3htpHx3k3k3YGxoWzE3cwYTnFhT10v5p5DqIdBxrVgfHdjZH50PeVox9i2PWNccZ+i HhQX5oda/u3JX1xzyqW4cHmGw+ZgM8A4rYK4MTKfasX8QGxb8hbXgjlAq8j8qDXzj0Ze3C3MMVpH 5i+3kdYBvh28uHZmH+Y7kdYR/jaT9sf4ThG+O2ldyPt2eHF3oO4Rvjdl7sbcrjO8uF6Ee0fOtz/1 oTZ2B8cQ149w/8h8Koc67M017cExxCmcE6n/vtwLkmxyshWDCof4AbQZSYw85LnMsQdE2tsg7o0c JEae9zxbjRi+X3Jpv0OQGOWdD58bmbMMh8sjPdek/PP98Ej+oyiHfBtihlje+X5UpPwjOMcxnOso K3+e5T+iCX/CnxufWP4jTMOwiXHX/D+NPqCYF+83fUJvXyn1B//dfzf/3e++tm0kd6w0nBKO4shj OLLCIX4MvcJoJGY07FikuLBnry9MX2PGZPy4CF9AmpTaiR1k4RA/kXJIqY3YwRYO80N8Ieea2ogd Ygp76obSggdmNrIdagp76nJp7TnYDPCpba4p7KnL9zMp93SzyfUKSyF+Dnf3XMotG3HMyPyciKdx Ab3rAvg5pmE+DQ+PeFeGcfcNNhtxi03DIp6lYdydg/0iJK40U9izJ8/bILMRV8Y5rIx43sqp8+XU zTJsxK2ijsoj16sCVryOIa6CbcXberrfzF89zkBsUq6c61YeGZmsNA/VADuGOIVXRjx7pfT4S2hr pda79cGupy+NPCkW03MsNO9hP+MUXhwZic3hCTTXess+xi2g95nTxJOrcVQ5h15qNpyYEjuW+M6m WezPjhxrPr3cPDTHvImp/fyIN2kRo9tFjD7FqDdfAr8o8vewUkbJ0iLzBHajru6wcPjadfDlmY3Y CspfHuHXufZeEiN2PVoX+XvbRnrzjZmN2DTcJeLZa++ljaYu7HexcHjNRUeeYqmN2K0ojdM23Q8d q46WWG3qaJzCdRFPXbVbipaZTcous7iwZ6nEJEZsXRYOl2ce6fOMqTPNM4X52bCzzSZlZ5tCfC09 ZbV5rWZnbLHFhT1p0+CL4GcaV0tYcWEv62Su93Rsio3byihAceH6meiq4GQjbhOjh00Rz94GN8Gt 5+mwwUYkEy0shdc0jndryDe1mUDbHW9xobY0zY2l5AVmI24GYzLFpSqwtJBtsRtITQ02dhZPbJ4V FpfG51hayHYTc50qJHa2G0q4k8VpW+M62H7INt+9F31A3mbjRlr4vbYd7v7M9kO2jL4YqXWC/YBx H8Necdp+mONqP2Tbk/PpTnmbZTZdKXdPGwUOdj04X6WFbHtQj72oJ7GdUVf97ZK4ND5NC3tyxjOz nWxsN66Pws2buKbXvCsT3P/k+n8KG3EKN4u0metog3/BVZSNuI/RzhQXXmuike502GnGfYTjfDji zf4Q3Me50n+BjTiFPxS5pz4I+zHuv4/TgsQp/MHIPfsBWtDHTDMydrbFhfl5sPPM5gOmeaawd6sk U8p9MAuHy7+M9GXGfNC0zBTOf2WmpRmbhkNt6SP08R+j7xbzQVNHrzhtP8j2I5FnzUd5ZkgfMXVh v4uFQ/zHSf+LzEbsxzOF+E/CSR83dWG/q4VDfAueqVprldp1Zb+rbxF5Ft9C2i223quDsfI43RLh 21En7RgXiBErb1i7yPOxI2OO21E783518+0Zf3RsYqzSeC262IytizG3mTesu1ec1NVmdF2Ctp0Y f3VhPNTFjtMVdfOKkzozhusS8SS0s2P1MbYDtu3svLpF6q0nM8d+ZiNO4Vsi48mWcK3Nq9fPuFaE W0bGqzcytr2ZsW1rtuJuNA/ZgAg/iHylgcbdgO2NTbwbda2d5Bp/c8bdyBi9RWR+dBPzg9YZL64V c4CbIvOj1swpbmVucYt5JvPZDvOtI/ORtsxv2sHLRlxbU3h+1IG0DrBtTdpPFeK7kB/PCbMRp3CX SHm6U+Y7KHsneHEKd4+cb2/qpCd1IxtxCveO1Gc/5qS9uU4854xTuF9kPtuP69/PvIADjRtgHor+ EU9dPy+JETuI8xgQmY/nMG+XxIgdzHnkROb7Q0gbnNmIHYqGRPg80oaiIaaUz4vwwyhHPsrL+Fw0 LFL+YZzjCM5VjNh8zmFYE/PTRg/cCLhhJtnFOHl7rum38dT9Z1dtNR7zUxz1U4xMPomas/+7eAf/ q8e+wY1G3Rkfdbe/YL6Tx27BWKwFx73BNOodPXZLxostGRHeaBr7Wx/7d1tfOZWeZzq9STGagWaZ 12g4s/kRzORHMuMebeusytxYZsZjmfGO9VVoI3Gb3ChmpyPYDvPV9L5V9AJrzLsy0K+i5VfQmtfx pNjoejNz7e238yTbjRrQPlOV28e8ZD8jnP3M8fe7JYRL0Hy319ZdzHY7mXdsY9S3lJKWcgV2Uxsa m97MdjDhocTfRvqtcDfDt8KuJfYtyKcF+bXAqgX5t+A4LTie/vbXEt1s/tdejAR600P29r0oZ1/7 G0V/NJBeTb3mUPO/dub8OnGenTnfrpx3N86/J+qLBqIhxOVTTyOor1FwY6i/cdgUZGv9JqHJtjYv 1e9zfeUUyi3f+iR6m+LsSwxTIk9dZmd+Gj2+mBnZWwrFkfVrs2BnkF5sGpfZ5ETWDw6iPeUYU5Tx cyPlkXdxPulzzYuZvkmhuHB5xvsSeksxaVnGm8LlmeAXc11L7O8O473CUrg8E2n/uWYjTuEFTbwx fc1LV+hX2N8xco1b7Cb5xU287XxtDdpk7pV8vxwbcaWEFRf2Yk7xq80zmm9cOWHFhdcbTuEezIfJ N24dWh/hqynDetg1SNwGjlEdKX8N56h1jzqGuC2cb02kfrbTvlJ+mHF11KniQvwO7hexa7mvxO3g PtsRGVVt4zqJXce9Km475doWGcXU0C7Xct+uJ19xtbS7mkh73kT/sJr8xYvbTHhTZNRTSb+yivJr Lam4KsKVkVH2Uo6/wrzZw4zTes+lTdwvjTOMUlsfmmNMFf1Xpa177GFaZN7inMha0W4cq7uxa219 6WC/KjLDWMMsZA0zLDFruH8q4RUX9mx1oUxdjKmEr4bfEJlZyru5BYkRW8M5bY3w211nL4kRuwNt j6xl2ENd7M5sxO4mvCdSPw1wkmzE7UMNTeTfeC2O2zMttWnI+DRO23Q/dKzjPJt2mHoZp7AUvi9W ozVmk7JrLC7Mr8y02tjjXP0dEa/wcVrWTiRG7HG33OLC/GL4JWZz3LTE4kL8MZ7RO9wi+KXGHXcL LS7EH+XZvoNn+k5YcUfpyY9GPECHeLJtJ08dQ9wRN9PiQvw+N834nfDiDrjpFhdeTzqFviblxe0h vDu63rOQvmYB2xLjdrjJFhdqS/NgllDuWrMppEbHW5w0l6fekibOvdF2kculhkYaW07ZVjNqVpy0 wOVbWsh2n+vE8ToZu9JNYEzW3+K0PcmYa1/Ee6rVfBMZo2/PbIos/EHbTnHvt/2QbQts2qIi7MW1 wF5x2v4Fx9V+yHYk/+dT3raZzQDKPTL7fwQpSgvZ5lKPoyid2D7UUz/qS3HSaOp5VOSatuEatqdG c23lwHiOX2hxYY/FFNeONnM7NuJuJnxTJP8baYNtuBK3YSOuBWVTXNiLPNN4HUPc9bYecmaQ/5+0 JPFt4cV9kvNQXIj/BFwb7r+2tGFxn6AlKS7spV4Cv9SOIa4ZtooL88thS9ES45qxr7hw/a/MlHLN 6KfaRPq0ZvR7bUwr2V9pYSmcfxWqRKuN+4SFqyJtOMe3sXWFVcY2Y19x2jYzL1VOxBvX2UstTDns 51g4/MZtjr/l1zY55gW7OZJ/4zq/W2wNn8o5KLrur6N5PLsYI1br+TpGnsXdSOuW2Wi9YFee390i fB/GEb0ZF4jpAtuD8UGfyHsqOYxT+jPuENMdvjd8ztveNvzN+3qgH8y4RkwP+9LcUJ9ra2YG+jzG RYMjfwkfZOuwBhnb3fVF/f0gWyemN6+HWlrYS9eHcg4ztjfXXeHukfFeZ/OgjTQbcZ1tLV54PKl1 jz0Ze/ax+Wh/6jrH1kKGr3u+8b04hjittWwb8Rq2NXYUGmFcG8bQbSPvV7Vn/C62p3lHR6Oxvn1k PtWJ+YHYHtSPuA7MARQXXlc7GV6ezjzjujDHuCMyP+rJnKU3fA/zlk5mO8X3jMx3+pHW1+oo37i+ qF+EH0yeA2D7IHE5hAdHypNHedUW+sOLUzgvMp8aQX3ozfwcW9tX6IcTHhGZT42mDvO4pkOwEafw 6Ej9D8+8kLIRN4458PDI/HqkrfoaZMxYV+AL4EdG2tsY2uPozEbsBObkYyL9UoGtDcwxpgB2IiqI +B8K4bSGsMA0zvIvjOQ/lXLItyFmPG1TNlMj5Z/MOU7nXMWMt/zHe8WFvHRTM3+LmKlR7pr/Z+rb 5q//+fWVf/Df/ffw3/3u6yuncMdKhZRwKiWbztGnRP4+M52zmYbETIMtoqTTI56NYtKk6aYR7I+w cPjNzlw/09YZDrW8i+3N4nB5ZlNuKbUZwXakhcP8KFplfmYjdpQp/ubxsMxmlJ/LFYq9ebyAK7nI 1jAO86ntWFPYUzfOL6Xcqc1Yr/DiJr730sgv5+5eQbllI44ZmV/exB1/zbtSwF00Cmakcasyhb0r Bdx9o8xmle2nCnuWxvv15L3a3mgu8ApXRjyf1ZS50jxjI43bSLg6cr6bqe8qe/t5pHGbqNPNkZHA FthGXtwWtlsinrrN9rb0MGxGGLeF67w50n6qeWrJMyleXDXttDqy3rPSPHu5doxqe9t6kK+MPCnW 2PrOIdjkGbfG3gAfEGkPA2kP6VpScavofZY38eRqHFUuN89cf2Mq2JYzslxu6z4V39fSwm2pl72d vNy8ian9qog3abXr6SUxWre61ryWPSN11cNLYtaal7KfhcPXrruXxIjdQvk3NzEav7amr7uvy2zE bkN1EX4X6fWZzTbb7+t3Rf42u4eZgSQbcXvRniY8mY3X4gDn2ZDZ7IFtQGmctul+6FgHqK3dpp7G KSyFPUWrM6XcgSwc+Z5XptXGHrC3p8tcuDyl2RvTZcYqfCDiqTtAz7fbVJqxi01hfgGsvFZLMnah xYX4/fTcuzIbcfvdPIsLe1n1BvQ8sxHXwJOiIfJm9m5GCzvsGPON20NYceHvnRUxApnDdq5xCu+M vMldy5O2hjJsN5si2u50iwu1pYU8yRfD1Zi3bjq1VGhxqaZbWsh2MePxRYyxxZYyElrOiEhxafwI Swu/zX8H9XCHsaWMuxmZWZy2+5iHaj/sqfsoaiZvs3FTLPxR2xa6D9t+yJbRFyM1vVPczLiW2CtO 209xXO2HbIdyPoMp782ZzUDKrbhUIywtZKt3xHM5qtgB1NNA6ktxafx0Swt7cqYzs51t7GDz0k03 hb0rRa41178dNuIUvjnSZlrQrm6mfd2KjbiWhFtE2uSnbKQ732zE3UA7/lTEm30990cr7o+b2Iq7 HrvrI+sZm9OiWnL/yUZcc7bNI5665rSilrTclva28kILN4/0Cc1pcS1NizO21BT2bq1EZWaTsist Lpz/atJXG5O+4bzaFM6/MtPqjE3DobZ0A318S/puMc1NPb3imtubx31tP+yV7ealG0x92e9r4fAb pX39TTyXUru+vlWmEH8rrCQbcbeaukfWnXW3NYmpXV/fHnWI8Ol6xB7GiJXHKbYOsSd10iNbqyi2 u71l3DP6Bmcfxh1iupt3a0CTb3Be+zqCZmx9jOmVrScbYGvE+jM762tpIdt+jL8GZHwvyqbfk1Bc Gp9jaaFy9oDtbWvW9P3Dfr6HrX0bEKm3Qcwc88xGXBfy7xLxJNxus0959XKN62hvRQ+NeNLy4UZg k29cB/OQ5Uf4kcZrLaC49vam88hIO9GbwbJJufaM0TtE3zweR1lGcs2HG9eRcKfIfKErc4puWZnE dSHcNTIf6cGcpQdzlzuwEdfdwgURj3GBvXHcw6T9At8nwg8gT71xLBtxA0zjI569cT6HsuuNZnEK D46cbx5zxqH2NvMI4xTOi8w3h1Pfefb9zuHGDadOh0fmU8PtzeF8sxE3ivMYHmkPI+1LannGjLTv kY60cNhTl+tHIzFix5nnIzfyvuZQPxaJGQs/Hn5cpD1PIK0AjTONYH+EnxDhJ5HvRCRmvPEj/aRI eSZxjpMpuxixEwlPasKf0OiBm2JsnjFTotxw/5t6J9ZXtqO22rn+jDWkCe/oOsPb3GQ0gPGRNPkd PXYHxmIdGMndZip8R499O1f6dpdDPypN+T2tr1zsJvil9Dypt2i8L8u8QBXEr3GT/HpX6De6ycyK pzDbnep3ot3s7yVuH2n73US2BcxMxzKzHe23c2fU2tqpPPhc+KHMYIf4g26wP4ZOo3M8bc6bat15 t8nd6arQWlROuAwtd2fdUneaEd8J5hhHGPXpO1fV3FOnqY1FjI+6sZ1AeBLxfUnvSWw3+K7YdcG+ M/l0Ir9O5NuZ/DtznM4crzPHTZ+U+hudVngP9kMo3zDKOYryjrHeZlj29ePR9Jxj/SDOL4fzHMT5 DuG8GcnDT4WfSs8xhTt7Mnd6oZ9GfRVTbzPhZ6O52a9NpV971rq+VL/P9ZXMyjjWSI45ims6zX4F S3HhN1eH+yVIzHL7CrV+NWt45JcUhsMNN0ZfrZZNWYQvJ99VSMwy46f58kh5VpvHcKQxpRm/OjJq KHPTbS3davNi6kvZ003h8hT5Sq6rbMSV2xe3iyJetxl+A0/CSvs2Y1H2te8ZEU/VTL+JNiMbcQpX NvErK9c8VbO5V8aZjbhqN8srLvL2qd9Gm9qCjbhaVBfh60nbCV9n0v5sXx/hGzh+PXlvhxe3h3BD E79M8xvrmLjvx9kxxO3nHBQXXlc1BX6s8eIOU6fHIn/PPM69I3YH9424Y9xnxyOjqqO2/nICmmTc Mcp2NDKKOUS73MG9vZN7WNxh2tGhSHveR/+wjfx3Ug5x+xnN7IuMYnbRt9RQ/u3WT+Z5hXdFvMIb bB3mWLMRp3WAG5po/40zjGpG+fJqi9ll+cvrnGNab17l4ZG1pf1pQwOM1brVeu6JmoiXdzuzEEnM dvhd8Nsjb5jIc7kbiVHeDZRxT2RmeYCZlLTHPKS6DiMsHG5LffyxzEbscXQswp8h/TSzODHHbX+E PxPpi87BSqeQuPPoXGSmeNmeaanNuYxP47RN90PHusyz6bhpkHEKS+H7YlOmlLuchcN8ZaZNxl62 NZlhr/BlnpsnbB1mpbEKS2FeazDL0dqMLbe4EH+vrddcyTEqjLvsVlhciL9k6zXL4MuNu8Rz/lJk rdbdbgHtY4WtDRV3D0/GuyNe4fOMI45Z/quMu+DmWVyIP+1m09eIX2ncGTfH4sJtdRZ9zXKzEXec 8LEmvMiNbanCvgW6xB3mHMRVu+kWJ5Xbt0eXBG3XM3da7SYaW8t5bGPkqjhpjRtvaSFb2i/H623s VlfEmCzP4rS9n1Gw9sNrQpuhW7BPbZZZuJltF9m7y81c+E3UPCzyYG8xrjMhxWnbmuNqP/y9zomM j8dApjZjiVGcNJ3zVVrItpB6LKaexI4kNJqjF5qPfImbQamLI99b7MV16cf1ETuBI/Um3Cvyl4E7 yKsP138A7UBcN9rBHZH8O1KWXrSvvtiI60w76xjxqranvD1pv73hxXWgHbePfM+xHfdQL+NXGNeO 82gX+bJGW7hetL5e5C+uLeehuLBXW2yFnYO4Nrb+sTzCr4Vda8doY1prCtd/FapEazK2yuLC+W8i fZMx6drJTaZw/rWZUq5tFg7/Yt4I34u+W4zYNvZdwhG2PrGNre8YEfHe9fZSZ9OIzHPWO7KecYTv /mubEb5bpvDbtn3sm3Xd4LtZOUdYOMQPJG1gZiO2PxoY4XOzt1UH2vrCEcyTRvrcyLNeX+EaYW+e 6m3YkT6f8UHs6136NtsYxh0j7Q1X/TrNaPteW/i+1tqYHGPyyV8eqkL7Xr3WygyxtJBtAeOvQs5B bB5zQn2Dr8DWZo31kxjXF0bqOY+8xzB2KzAPmt7YHWIKrxvNt3Vxssmzt47zfE7Eiybv3zDGniMZ g4rrz/iuX2R+1Jvxbz5jW63TE9eHeugd8Rr2Ju9hjJ2Hk7+4XubJLIyUp8jYYZRfXG9bn1gUaVcz jZWHUVx/5gADI/OjIcwpUn6ccYMJD4nMR4YxZxkBnw8vLp/wsMh8ZzRpo+CHmbQ/24+O8BPIcyx5 j4QXNx5NiJRnMmXWur4xtlZvFm1npp8cOd/pzBnVxmQjbhrh6ZH55gzqcDLXVL9kLU7hGZH610qu qeaZHG3cbObAUyOrnIpsJddIY2bBzmWOXRRpbzO5N2YgMXNg5zGHnxm5X+bSfmcjMcp7PvzcyJxl oa0dHG7MXFjlvzD6VbiR5ttYaMeZajaLI+Uv4RyXcq6LrfzKf5ovacKf0OilE1dimo5NjLvm/1n8 tvWv//n1lX/w3/338N/97usrF9kvkYyx319bbL8DN9HC4TcvR/slmc0Se+tXV350xLOnXyoZbcxS 4yf60kj+K7JfK0ntxE60cPh7gmO9lNqInWThMF/oyznX1EZsoSnsqZtMCx6f2ch2sinsqdObwwWZ jWynmMKeuml+A+VeZzZTfCWtQXHhN2un+82Ue4O9UTzNMyPzmyKexhrSauA3mbSfKuxdmc7dN8ls amw/VdizNI27c5LfhsTtMk2LePamkj7RbMTtJay48DqpQnqKCb4eG3H7qNP9ket1AHY3daljiDvA 9kBkpf9+63EKsEm5/Vy3/ZH200CvXA+z29ixlGm0b4g8uXbRA+ywY4w3bjfhXZEnkd7ErrW3ssca p/D2yEhsE0+UzdZbjjKuht5nUxNPomvfm9MbxvnG1NmxxA8xbWS/OnKsrfR4W+jpNpk3cZjZb414 k7YxupXE1MLuMK9lTqSuBnppm3kC86irXAuHr91Avz+zEXsA7Y/wRxiFS2LEHqW3PhJZy3CS9JOZ zVHbTxX27A3w0knTUPaHWjh0LS5QL+cyG7HnUBqnbbofOtYFnkKnTIOMU/hCxFN3iudeqpS7kIXD nqVKk5gLpjQcLs8a0tcYc8G0xhTmV8GWm03KlltciL+TJ8Mp81ql3AXCd0Zm/efdMvjl8CuNu5Pw +ci3584xhjlpNiuMU/hcZG3XacaAx3kanuQJJ+40o4fTkbVjJ9wCd9RGIsuMU/hExBN42M1zB8k3 tVlA251ncaG2tNbNodbnu0PYHLZf/JlpcanmW1rItpK55no30diNSN/iVFwaP8HSQranmXsdR2Kr mWecdoMsTtvzzLNOR361Jf2dkBbYDzZuUfa7IYtsdd0nbT/8vblBjNQGw7Ywrgv2itP2do6r/ZDt JM5ngn1DMrUZR7kVJyllQuRbnxM5WiF1JHYM/+prn4pL49O0sCdnHjPbxcYW6DfCzLMW9qR147r3 4Pr3wUacwt0ibaYzbfAO2pdsxHWhFjtHvs94O/l2pf12ox2L60j49kib70DeXbk/dAxxCneI3FPt Ybtw/3XlPhTX3jx84Xv2Nu7tLqYy427jPr8t4qm7jX6ji6ncOIVvi/Q5XWilqVKufRYOl7+a9Gpj 2puqTeH8a1GN2aRsrcWF2lJH+vguNpOoNba9rX8bam+gtmfbMfKs6WS/XDHAfvVCXCfTgMi6M62z S2062X6q8HrGAV7qahrK/lALh3/xQt+3G+hTO30TL9feMAuvI9ObxwN9aqffWM61cIjPZ0wgiRmU ecPyI2MJfYt/pH1PLsfY4faLEYODz+KxNmMbYsyw7NciFDfWfkkz19JCtqMZf43N+OGwOpbiRtta sTQtfF461ihjR2Cbb7+ekR+ptxHMHMeaTb69LTvCFF7fN5rZZurpGmze01F+QGS+1g92EGNb2Yjr Zx6y8RF+IvlKBcb1xbZf5E3c/vYm8ESbDfczb2Ch7x+ZT+Uw5h9i/ATjBhLOicwXhjD/GMrcQscQ N5g5xpDI/CWPtHx42YjLyxR+83g6dT8JZpJxIzKF+LGk8ZwwG3FjM4U9e1P9eHtDeZJxEyj/hMj5 TmbOOIm6lI04hSdH5pvTzMsw3k/ERpzC0yL1r99pl2Qjrsg8FOMinrqxvij7fXexMzmPosh8agbz dkmM2Fmcx4zIfH82bXJWZiOWp6+fHWnP8+DmkD7blPLzou9HjvHzkZjZ9tUzfcksxk/yJZzrAvvF 14nYTvILmnhTv9EDV5K9b5naxTh5e67pnVhf2ccVozz6/jzGG8Xv6DrDvm4Wymd8lG9/wXwnj92f sVh/N4zjSzPf0WMPYLw4wA2nH5Xm/J7WV1a7GX6zK2b2XsTMvYiZezGz7BnMsmcye57l97rZzIrn eGYO/jg6jc65ucwq5/i7Sbsb7m5sLtAjnaPXOMWdfczWQhX4E7T+07ToO7kDLnGXXUEPo8fQ46YG 97irR9vQVrQJVbnHmFc8ypzjYbfaPcDo7T5Ge/vtTbvZ7iE30m3Qt4XZlhBeRPxY0kfCDYfPwy4X +6Hko2/mDyXfofqqHccZyvGGctxcpL+3jUYT0BTKV0w5Z9u3FQvoCeRjVW+mHnM6vWgxmukLOd/J nPc0zr+YepiN5qNFxC0lbTn1VQZXTv2txmYN9bnO1vMV+yriqjP9PtdXbjQPYCHHnOy3uvm+lvJt jHwfZAs9UzXpYhr5LZGndB1p+u7gFtN89uf7ugi/w7x/k4zZQt7id0TKU0/ZJTGNfH3Eq1fnFvjd nKuYtCwLTOHylJi3UDbitruFXnFhz9Mi2r+8kVOMU1gKewEX+0O0mf3mzVyE3WKvuPD6vqXcK0XY TDPuIGHFhddJLeW+KvJHOIa445lC/FnSTsMfN2l/qT8b4e9yS0ifzn1cZNydSHHhdU+LuO+n2zHE XeQcLkXq536uqfI/Ay/uMvWvuBB/hXvntGmGcVe4165E1m/ex3U6zT14mvtR3BWOdV9k1HOJdnmK +/YM+Yq7TDu6FGnPdzHaOUn+Z8hf3N30F3dFRsHn6FuOUo5T2Ig7Rz9zLjJq2GfrNqfTJoqNO8Wo fF8T7b9xhnHQjSR9ojHnyP8s+StO2ov9vsi5HGX2cdgNN/YU537G1piGZySnmFWcRGLEn4M/FZmR nGfWcw6JOQt7F2U8H1mLeg+zHEnMBdh70T2RN1iukHZ/ZnMJ9ip9xpUI/zDpD5F+xTTJP5wpxD/G bPVRJBtxj5mGBq/F8/ZMG2qM2MdRGqdtuh861vP0HFdNo41TWArxV+kpU6Xc81k4zNdlqofdhbZZ OMS/wHPzKk8HMWIVlsJ8NewmtDVjN1lc+HzXw25Em4173lVaXIh/lmf7FZ78V41d755zaywuxD/l VsJX2THEPcP44KnIG7OPM464P+PFPeFWWFy4LS2jrxG/wbhHCD8c8XhdcUvoayrtGOKuEr4SWSO5 E6aBct+LzRX7csACi5N2uApLC9nuYW5Wz0hZrL47eoJx0h77xqbiiywtZEv75XhDjT3qFhIusDht X2SUpf2Q7TrXCnXCPrXZYuFWtt3gWth++M32AjcabcFe3FD7v8D+7WNvt4c9rys4n2WUd3RmM5dy Ky5VkaWFbJdQjyshxM6inmZTX4pL4yssLexJWuLGc33Elmh+yN6oyJrfYeQ1husv/7k4hYdF8h9C qUZRc/o1eXG5tLMhES/pQNr4KNqvjiFuEKUfGPGS9uceauTFDeA8+ke8pP2s3NXU8wbj+nMf9ot4 SfvRB4zSd3A4hrh+2PaLrGfsR78xyrTJOIX7RfqcUfRLo+ifRtFqUnabxYXz30V6vTH9TPUWF157 1WAalXH9eDqPbqJPvtaGJ/lRNq9ogJVGm/eon3nLUk9S2Nuk7yIOte8jiss1L9LQyDqySeZRTO0m 2Zq4YZH8x5inMtdsxMmLFHtbNX2TNLURW8DzdWKEn2Zf4cozRmy6XiUvsg5Lv86Zb0wh7HTGBzMj Y4kFtv5qmDEpO8UvaMK7ee2+npC9Z6a1XpP9DHjFLbFVKWMsLWS7wNZKTTJ2unm5CrzipEW2PmtS pB7k7Sk2doZ9lWyMnxYZ78lDN4OxoWym2drN8ea1C79FXMj5zOb8ZxpXwPhuXGR+NJpyFDG2ncEY V9xY6mF0xMs4GraY/IvJX9xoyqW4cHkWws5AKTeGMbriwu1qMWwR9TLduALmABMj86MpzD/ET4MX N5k5xpTI/KWYtBlZ/uKmm/3SiNdwKfP4IjtGse2nCq/vW+rnkfcsW5u4lPn/Ur8wwi+hzGoLc+DF Kbwkcr7LqQ+1MdmIU3h5ZD61ijpcyjVdxPxR3ErmqKsi9a/fR5CWcAxxFcyBSyNe3hX2ewzp7yqI XcMce0V0VZRWTk0yRuw62kN55H5ZQ/utQGLWZvyayJylCm4d6WtM4uf7qkj++k2FDaSLWU3eOkbs 9xiqOMdN2W82rMn4qib8CY1eOnFVpgXYxLhr/p/qt62X/Y+9eS+/8oU/ePP+H/bm/barLjfaqr9p HGW630gJNlGCjdFVf1MpxVRjxG6293unRlZqTaV1TDVG/Ba0NcLXklaDxGw2dqavjfDbKIdUa8eZ ie0sC8feF97BuYoRW/cfvC+8g6uziysgm9R2jinsv5vr93CV6s1GtnNNIX4v9/s+yi0bcQpLIf4g 9/whyi0bcQofjPgfj9HnHoOXjbijFl4Y8bks9Cdhj5m0v9CfivDnyPMMrGzEnSV8LlKeC9YDyF82 y7g7OYcLEX/cRer8PHVzFl7c3dTRxcj1ugh7zjTTuIu2Db8vcLf1PMUZPwMV+bsj45UL3NVnYXQM cXcRvhDx953jOXCKtnbWejn5sCaZwiv9Cuy97tPYpLYF/mRkfHaQ59Jh6zWn+JPZ+90Hm3ieNY41 D5m/rsAYvQ9+HF5x0gGzjb9LfgSJPYb9CdjYu+QnGY9KYo7TK6bnMipSV3qfeKQxYs+b/3JE5FqP 8BfNZoSxFyn/xQh/nxvupdRuHPvjLBziH+Q8H8xsxKbh8F+QH4GTHjSNZX+shUPX4gnO89HMRuyj KI3TNt0PHesJnkYPmUYZp/ATEf/dQ24nqjeblK23uDBfl2mnsU9k4RD/JHPih0x1xioshflq2Gqz SdlqU/h8K2GrzEbcE+w/EfEFPM6T/EGe5A/xvBen8OORdycfdRWMFtbBp+xjjAYUF66fVe6qHWOd cQ8TfiiyavSqK3P3M/p8AJvUtswUfn9c73RXmI04hS838T74ta9LLuNZonfGK4xrsC+GLsu0wtJC tg3MYva4WcbqC6MH2VdcGj/D0kK2D7lhlG+YsQfcHMKjLU7bx9wI2w+/l90a3SYftHEbLNzatlXu FtsP/17EaH2hC/Y243KxV5y2gzhu7tt+efI3f29nFqO/YuxTm3mUW3GpZlhayLaEelxCPYnV7/rM p74Ul8anaWH/0XI3husjdiHXZ7R9P3R5xH9Xxsh0jdmIG054WKTN5NKuhtG+ZCNO4dxImxxMG8+n /Q63Ue8qN4TjDI74uHPg8rg/ZCNuEOGcyD2Vw1XM4wrlcYVyjK20uLA/sZpyVMNXGafwwEifMJB+ I9dUnbFbTOH6qcu0JWPTcDj/etLrjRloqjeFfWoNptyMy8nCobakd7Fy6bvFDDSNsveztB1oq+TC zxp9lU4abNKX7dKv24VX9431+ZnNENtPFW6rw72UbxrrR/L8GxXJX1+Ak8SIHW8aEVktNpLZUGoz 3n4TQr/bMDKymmuUL7L3NEcaO53xQVHk+ZiuzhptzDTzeU1ocnXWtW816P22scYUsz/TVmcVZBpn aSHbOYy/5ma8ftOy2GaBhT6Nn2Rp4fdbC8xXOMdWqI2z85oeGYMVkt80xoaymW4r5yb5wsh4coLN QovNRpzCEyLj1fGMbQsZ205hK248Y9zxkfdnx9nMdqYdQ9w4bMdF3uctYPw+2WxSTu8LF0TmRxOZ H0y294RnGDeBOcDEyPxoMnOKqfA6Rmq7wBSu/4W0kVmc7yzjphGeHpnvzCRtJux0k/ZThVf9LeD6 zzJ/qLi5hOdFylNCmRdQ9jnw4hQuiZzvUuqEZ5bZiFtC/SyN1Ody8zYUm424UsLLI/PZUq5/qb0D XGxcGderNDI/KrNvjk0zRuwq82pMi/gT5RecaozYCs5jVWS+X0FaRWYjdjWqiPBrSVuT2Yhfg9ZG +PWUQxKz2tiZFg6/NTnbV3GuYpT3Os6hson5aaNfLvW1TDNmQ5Qr9r+pd2LV5Rha3xju0FGmknd0 9eE4WvI4eqsxpqXv6LHHMxYbz3HHmha/o8eewHhR732PNy37Pa26PO5KmVUvs9VYZ9A59u8k7i63 nJnwCn/ZlfkrbpV/yJX7x9BT6FnCz7uV/kXSPg33IjbPuyXEL2K2uYAZ6zw0B34W/EzSZviX0Cu0 1tfQX6Evm866L7sT7g13BB1ADYR3o53udbfdvcbI6vOuxv2l28psZ6O7Qh/yGv3yMXvTaDqxZa6W +CXsLYSbBz8Hu/S3inbTIzegA+wfQSfQWVTMk7yYHlQ9XTG90Qx6jBl2N1dR3o2UewPlX895VHA+ qzivMs5vBedZxvmu4rwrOP+11EMV2oRqCG8nrZ762g23l/rbh80B6lOr6A6zf5S445l+n6suj9HT H6Xsh3minHYV/izlOxZ5SsjvfoJ0MWcy/nTE63beuNRfr/xlcz6af4W/QLqYk5Z3hSnsuVlI20u9 f+LOudX+YuQpet6t8ZdciTFnMl5x4dlziZfugRd3wa21cHgl2Dra/2JjLsBfJKy4sCep0j9Im7kf G3GX3XqvuLAnqYp7Zal/ABtxDxBWXNh7scE/Dv8wEveohTcE+adhnoR9DIl7ivDTkfxfoAxPU5Yn 4MU9j16IlP+znOMz8E/Bi/sM5/vZSP28Qht4OuPFfY46VVyIf5X7ReyTbMW9wv33anYPNcW/zHV6 knvwSe7HV81mqX85cn0/Szt+kvv2KfIV9zna3mcj7f8FnsyPk794cZ+mv3gh4nV+hHtf0jHEPUM/ o3B4VepCawtixD5JH3V/E+2/cYZxlZH1fdwrYp7J8lecdC/790XuzYcZyTzIiEPsk/R1T5PHw5ER 0BNuMuc+2Zgnqatn4J+I/MX2OWYuzyIxyvsF9FzkL56fYRbyGdLFiP0s1+IzkRnMq6S/YjaTjH01 U4h/De6LSDbivkTdvBbJ/69I/yvSXzNpP1XoWnzDnmmTzEbcl1Eap226Hz6Xs5mKjftGFg7zJzKd 5bjn0EkLh/hv8Ax81XTCWIWlMH8A9oDZpOwBU5jfA9tgNinbYHEh/uuuHnYPz/d9xn3d7bK4EP9V nvSvwrzq9hr3dZ7zX418S+Att4W+Zjf57zXurxkjvBXxAH3ZVcPvgt9j3FfcJosLt6UNjEtUnt3G fYmw4sL9XqV7iXK/jI24Vwm/Evldk7tg7mM88zlsxF11qy1O0rcR7mvCO9Voey8j1bvdCmMfpWyP u5UWJ11kBH13xOP7ZebVryCxDzNHeoMRleK0/RZjri9H3rM/xKjlkBuIfWpz2nW1OG2PuU62H7Kd aZ5WfRl0oHGzsFfcLHvnfbrth2x3cT7bKe+izKaacitOqud8tzfxvnijbR3/76aexFZSTxuwrsv+ 30M9745c0xIslnIEsVu5PosIl0T+8jCXvBZzpFJsxM2zbz2F859BG0x/rWuXcfq26YzIqkX92tVC Sr0IXlwR7Vhx4S+c6TfsU17cVM5DceEVULvg96Jdxk1hnD0lsmpxMn3AQvsd0T3GTWY7OfKXqMn0 GyWmBuMUnhzpc0rse1mHzSZlj1hcmD+R6Yixk+kHSyJ95mT61hLTCfZPWHhyE31yY1uaZR6ZYl+S cfJ8zTJPUzGab/thr+R85iV6t3SScbMzhXi9wzkPzTbNZ3++vdcZPvcFzHcmGTPXyrnAFPYGFfrl sIvsHdAFfhlaHnl2V9h3pwqNEbvSVnQVRrwjk5ljTTZG7BpUGRlLbLHvSE01ZjXsOsYfW5rwvly7 r+f5rYxrtpj3ZSHztRKvOGmbrR4pihxrSfb21jyOJc/THL8l8ubRRsZqkph1XOsKWymzLLKSbQ7c CmPkSZI3bEXE07aUsqxlvFnJuFPcMvPkha/dIsa84nUMcYs590WRlYGLjC1Dy40rYdysuHB51sCW coylxi1iXL40MudawZxA7BrqR9wyxv2KC6/cqzJ+Nby4lcwryiNzlrWkrc/yF7fG7KsiX47fwBx/ Keew1LgqC2+ItIcq2t5S6n+pcQpvieS/jTKrLWyEF1dH+bdFzree+qhlvrgZG3E7CddH5lDbuJ7b GK/XYCNuD3W6LTLH2ceceCf3gJg9zHcb4BUXXqm0gHzTtxHFHWBevSvS3g6Svoc+Rcx+eIUPRub4 B2i/DfB7bJVShT9E+zkQmXMdMW6eMQeyvI9E+sYTlEP+DDH7Le8KfyJS/qPUxynOVcy+jD/aRHtu 9Mwdt9VSC4w5HuWu+XyOv23O+h978PYfO/EHD97/wx6833al5Qnu4+PoGCU9SSlOUYoTkZXZpzmr k6SLEXuGEp+OrMw+C3eG9NMm8Sv82Uj+Z0k/T7qY0+R91vgV0Td1L6DURrZl0Td1L3AFLmZv856D v5Pwhcjz5hK1L92Njbi7uVqXIs/XS1zR+yh3aiO23BT2uaz2VylHalPuFb4/0j8+xD3/MOcoG3EP En4o8vx7jLTH4R8yrfGPZQq/MbiGu64Mpsy4pzKF/Syr/TOURT4vcc+ZwuV/kf7tOfhn4MUp/GKk v36JOn+eunkWG3GfoU5filyvz8I+z12iY4h7ia3iwvkvgU15cS9x3V6KtJ8XacfPWo+13LhPE34x 0v6foyd42o6xzDiFn4s8Dx6Dedz8YUuMe5Le5LFI/g/xnHmY56WYp4yd7R+K+Ikeopd60M015nG2 jxs/y/QA+w9G/kr7KD3eI/R2Yh/D/gnYRyN+pSfNt1dkjI71NL3jk5Gx73NuupfEPAX7POV5LvJX 3ZdIeymzEfuSaXrEzzWLp8g0n9rN9gq/Gvkq+GuwkmzEvWaaFvHZzeLplNq8ZvupQtfiTXuKTTMb cV9GaZy26X7oWF+ip0xVbNybWTjMn8h0luOec28x//xSZP75Fk+915EYsQq/FZnfvsWT8nXTkYw9 YArze2EbzCZlGywuxL/JyPBLPJVfzziF34zM/7/Ck/xLjG5lk7I7LC7sg6vjeu+E32XcG4S/HFmF 9Tqjhi/YKGOnca8zgng98pbmFxjJv8ro+YuUQ9wXCX8h4hN82W1ynyNf2YhT+OUm/C/X/G4b3X1u M6OdOuOuMMtVXKrNlhayvd+VZr/ss9E9gB6yVaGlpvtshWfYZ/e6m0L5phj7gFtFuNjitH2DUdbr TfyedqPtUdcD9cU+tTlh4R62Pea62354dVOxW4BOYC9uDvZz7HdgpjBqm277IdttnE8t5V2Q2Wyh 3IqT6jjf2ibeeL82t9/MVd9o7CbqaQv7ikvj07TwV+43MdqsM7aG66Pw4ohPbT65l3CkpViIW0B4 fqTNzCHX+fq2Czbi5tDO5kR8cDPlqaD9LrBfqa9hdFtncWGf4A43l/tDNuJmYKe48FuI8h3uQfXG KVwcuWeLuLfnoLncs+KKuM+LIj67Ilvbe8BsikwHTGEf6BHTnIwrysJh/kSmI8YW0w/OjfSZxfSt c00nrGUqXBz12c2yN17nZlyx+exm2VukxWxnRZ5Ns0mbzXNjlkn7qcIrvqbZryTMNmkV1ywLh312 s+xtytRuli/J9B+tyFpkv8Qwi/34iqxy+1XH1KbUVmTNtnCIX5e9dyZG7FrzYxVF/GIzbIXSOvs1 yDm+kvHHxibeuGm8FptJ32QzuBnM3uYyO5vnFZdqtqWF365cCDPfWK2gkn11ZN1AJWO1KiSmys5l nq+MjPHK7Y3TJcastTdJF5jCPq9FpC/LfFILmHku8isi+ZfCrmI8W2Ez1UVcjyW+NDLHKWWsXG4q NW4ZtqWROdpyxuziVxm/Aq30igv/BkEFZVlhZRJXRnhlZI5QwZxjNfMJHUNcOfOKisicZa35EMuw WWHc2kxhn90arlMZTJlxVWhDhN9MGs8GsxG3OVP47cLVvoayyEacwrWROdQO5onbqJut2IhTeEdk jrmDayTxbDNuF3W6I3J993J9djHfFSN2D+G9kTnXHtrLblSPjbh9lGtPZA61n3R95UtMA+es8P5I +zlgXx9LvyAm7iDncSDSng/bF8QWGXPA+BX+cMTncJRyHCFdzAHyPgR/NFL+o5RZXxETk+Zd5hUX 9sUtMTa1K/u/6rP7r670W8zdoL99LkQlb3tr4ve7ynCJ/T7iXI4/134r8Z089jJ64WU8FRebKt/R Y5fSo5QyQltq2vB7Wl35jNvCzHizf8Ft8i+iz7D/WfSXxL/qavwXXK1/3dX5r7ht/qtuu/8m+lv2 /46475L2924r283+O67a/42r8l936/1b9E5v0eN8lV7km/QMf8fd/j1a9I/Qj7kTfoZ+YXrE/cJd Rfeii+hOdNb93J12P2UU9WPa+j9zH/3AZpn7mTnXELfcPW1fpVnu7iJ8kfjdpO+Aq4OvwW4r9lvI Zwv5bYHYQv5b7Atdj6AV1iMyMqcnKrOe5TDlO045T1Pes5T7DOU/yXkc4XwOcl4HOL/9nOcBzvcQ 532E8z9OPZxG59m/m7h7Sbuf+uIo/kH4h9Gj1Ofj6An2nyL+mUy/z9WVT7t1HGs9x6zkmu7wn6aM T0f+UvOCW+ufJV3MixmvuPAKqLVwa41R/rL5TITXCjpJzPPkLT62+u5lyv6X2Qq9tPw7/MuRv0x9 nvN8FYlR3i+5nf7zkdWAn3P1/otc18/bSsCdXmEp7A3aTfvfYDbiXiGsuLA3aI9/w230X8JG3BcJ Ky7Ev+H2cq9U+y9jI+7LhBUXXmXU4L9Gm3oTG3F/TVhxIf5bpH0T/qsm7Tf4b0X475Dnt8j76/Di vk34O5HyfN/t4r6vtmOI+3vOQXEh/ofcL428uH+kThUX4n/EvSP2G9w34n7Ifaa4EP8DrpPYb3Av ivshx/pB5C+h36NdfoN7+5vcw+L+kXb0vUh7/g4jx6/Df4tyiPsu/cV3IqPONynDW0g24v6GfubN SPlfo92rLYgR+w36p9eauF8aZyR/xUjkNforMX9DWf6GPkxx0hfp116LjCjfZHTyBiMIsd/g3L/F ub8Z+Sv81xmdfA2JEf833ENfj4yAvs1I6W+RmG/Bfof8vx0ZYX2fc/gHRmNixCr8/Uhf8UNX4iXZ iPsn9MPIX5l/QvqPM5sfsf+TTCH+Z3CSbMT9nOv9sybyb7wW3uuZltr8DP4XKI3TNt0PHcv7R2jr 0grjFJbC/FXYq2aTsldN4fvo3kxXMzYNh/O/6P7J3W2M95ctLIX58/B3oosZe6fFhXjH0/NHTjZ3 Ged56iouxP8rz/Yf8UzXMcQ5f8LiQvyvGN//0Pjzxv1/jBEUF+J/zjiikRf3S3fQ4kL8j90++hrx 54z7CWHFhdvqXtr3GTuGuH8i/MMmPNmNbekvYV6j3P9oNnu5z3dYXKqjlhay/QKjxVcYBYn9KmX7 GnNHxaXx1ZYWsv0543vuD2PfcvWEV1uctu9inv3zJn4J59r3MHPRBOxTmxcsnGvbp91g2w/ZbsGm Hr2A/eP2lnOJxW2x+cZy2w/ZXuF87qW89ZnNOfYUd8X+pl9taSHbe6jHq9STWP2q1xnqS3HSA9Tz 1cg13cl12YOF2Lu4PvWEd0b+OlFLXvVc/73YiKsjXBvJfxNtcCdnsxsbcVuY4you7IHQOPi8HUPc RtrxhojnstKdIP+UF1fFeVRGPJfr4XZy/+1kK2494+z1kb8mrTP2gp2DOIWlMH8R9qIdI2UvmsL1 f2+mu41b7y5bOMxfzXSvseuzcPh8HyH9EWPWmx4xhdvwOr+T/ntnxq1nX3Harme7JfKsqeGZsdVW DJYYtxXVRJ5ldaRrtVRqt9YrXBfJfxdcva3KKjFOK7h2RfLfS/o++357ibF7M4VXQC0278g++477 OuZJ6y0c/laTVpKkHpWDsMcYH5yKrsgo9ecYd5wyD0kltlX+QhNv2Vy7r9fa+iIxx8j/OLzipEuM q+6K/LX/AuMvWpOxR2GP2htiGyOrUTZ7ScwJxmtHsDkbGeMdYJzGLNUY5a/VXAcinrw9Vj+1ZiOu gXLtia7Wq4avoyxbjdvFuSsuzNdRPzXwW4zbSbkUFy5PPexmbDYZt4t53Z7IHGo/cwKxx8hb3F7G /fsjc6LDzCPEH4UXd5Dw4cgc5DjzlJNZ/uKOET4emeOcIe00/HGT9hv8mQh/gTzPkfcpeHF3Er4Q Kc8lyqy2cBYbcfcQvhQ53/uZJ15kvngnNuIUvj8yx3yAOrzENb0bG3EKPxCpf721dxnJRtzDzHtj b/zR0/kr2VuBD8E+yrz6aqS9Pcj9Lol5BPYx9GCkr3iU9vswEqO8H6f9PBqZcz0J9zjpj5rE7/BP RvJ/lnLInyHmEfJWeZ6NlP8p6uR5zvVZK3/KP9VEfTZ65p6Be8pU75+Jctd8Po1+nz948P7/48H7 bVdXPst9/wx6mpI+RymepxTPRp43L3DfP4/EiH2RM3shsjr806S9iF4wbTX+0xH+JfKVUjuxNRYO +9Sq/ed+bSO2xn8u8rx5mRqVxHzG2FoLh/lt/vNcgdRGbJ1/OeIz+jxX9TWuUmoj2+2m8KqnHf6v OM8vms12r7AU9tnt9G9SbtmIU1gK++zquZNquQNrjEvD4f76m6R9E/6rJu2nCvtZdnLn1vhvwIv7 W8LfjpTnu5T525RdNuK+Q/i7kfP9HvX9d9TN38KL+wfq9HuR8cH3YcV/G17c99l+/23932/mXw27 GZutxn2P6/y9SPv5Lnf138KIF/f3tNPvRnx836Yn+FZ2DHHfNj/U+sj1qvJfNX9YtXHfoDf5aiT/ N3guvQkn5pvGVvg3mnieNY5Nv0JP9Qa9lJivwX8NXnFpfLmlhY711/R2b9Hbif0q9l+H/esm/lp4 7a3XFV4So2N9C/4bkb+ifptx8bfNH7iCc1lNHVdYOHyty7kGpcaIVfj7kb8y/wj2h0g24n5kCr8t /2PSf+yWGfMj208V9tkt89KPTeX+59TTz5r4K3bjtfiVPcVSm5/B/gKlcdqm+2Ef0yM85aQVxin8 K/dIxCd1Ffaq2aTsVVOI/ylPvVRXMzYNh/O/SPpFY37F/FbhX0Xmz7/i6fpT08WMvdMU4v83T+Sf MJf/KSPilD1rcSH+lzzJf8Jo+6fY/G9jT1lciP+FO8b1PmU24n7BaEBx4fo5wuhCo4zTxv2UEcRP I/6Of2Fm8SN3gu0p4xT+l4hP8AfuoPtf5nc8YdwPCf+gCf/LNb/bPp4lh8xG3OvMohWX6qClhWy/ xLjmNcY+Yt9gRMSzwuLS+DQtZPsTt5R6WGrsG4yrfurKLE7bXzDK+snbvkl0zfZJNwKNxT61edbC I2z7tBtu+yHbWmy2o2exF1eLfa29L7PUbbYVkmURv1uNjeu2ZzYXKLfiUqVjvpDtRerxXupJ7Hl0 gfpSXBp/0NLCc92DjDaPG3s312cX4fqIT20b130n138PNuK2Y7ct0mZqaIPbaF+yEVdDO1NceBXQ cUa9jENpx+K20I43R/zamzIvZR1bcZuwU1x41Zl8h+fgzxincHXknt3IfV1r7++fM07hjZE+YSM1 WWu6M2MvmsI+0HszpVw1/VRtpE+rpd9Lda+x1Vk4fL6PkP6IMdWmR0xhn90qX2srpB7JWPnsVnlt q9luiaxA28ozY6u9VbvMuK2mZRGfnVZkpTZiFa6LPMvqeeZJ22xVVjn75RYO/55iud+X2YhtyBT2 syz3kmzEHeL5fTjyrD9hb32tMEbsccYHJyLPx7OMU84w7hBzDPYU44+zTawQa7wWd5J+3nxnK5m9 rWZ2ttYr7k77ClKFpYW/v72e9JQ/BXuS7bnIGO8UY7XTSMxpOxfZVUXqar35l8SIVfhwJP/9jEkP M95MfVLrmXlW+f2ROVcD49lDjGePsBXXgF1DZE60lzG1eB1D3F7GzYoLv2G7DXYrNinXwLh8X2QO dZBx/hE7xhbjDhA+GJkjHGEecRRexxBHr+mPROYgx82HWGs24hQ+HpnjnCHtNPxxk/br/ZkIfyd5 8mwwG3EK3xkpz0XKfDdlP4eNOIUvRs73MvPES9TNXdiIU/hyZI55hfq+zLXi2WbcFer0SmQOdYVr KslG3AOcx5VIe3iAufcDtBkxYh/mPB6IzNkfIu0hs9G2xj+CHorw+orXI0iM2Mc470cj7fnx7Ktf j5q2sr81+hWwp8j3SSTmMWNr/FOR8jzFOT7DuT5lNjXY1nrFhX1x1aRX+9Su9v+qz+6/utJvH3fz PreWf6W97+gqwwP0VPvdOvofaf87euyDnPVBV8lRpX3v6LEPceaHXBX/Sgd+x9WV3qX/NR7tT9n+ kjIo/vpmH3M3Zil/7MrZtnpXD8aa+83TeZFj3WPj1CP0IUfdffSE9/NkvWI6iU4xapFOc09LZ9yD 6CHTWXTOPcyo9xF6uEfRY4zVHjfdxRj8bnSRe+MedInx+72058voPsbo96Mr7nn0IvoMcZ8hLdW9 7iXTJfdZ9DnspZfJ71XyfZVjf8F0zH3RpPUHeuvvsM1pvmRznQPm4W3aM/rHv6NntHFEkJb+EuXY x7ke4KwuW5y2T3NG2g9d4dexUS2IeeO3uMLvsiv6fwBDycqzbhMBAB== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image002.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlh4gJiAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIAAQDe AlwAggAAAAAAAB8aFxIUFZadn8zN0P///wECAwP/CLrc/jDKN8a8OOvNu/9gKI5kaZ5oqq5s675w LDuDUVlzru987//AoHBILBpDNYOycmw6n9CodEqtWq0V5dKGu3q/4LB4TC6bN8llmntuu9/wuHxO X69t3C59z+/7/4CBGHZ3hIKHiImKi4xBdlpqkFpMjZWWl5iZlYSSd5I2mqGio6SlUzeRkFmfSgUF k6axsrO0tSWonaxarrxqtr/AwcKmq6msvMgFNTfDzc7P0HuonpDJrsVs0drb3N1PFrif1tdJBAST et7q6+ztJzg3d+Or5vXnee75+vv8DfH/u5LRs1cPD7N+CBMqFFYsCUADvAYSNIeN0sKLGDNeKhQv /xWuifVWibSosaTJk3PSPFoWDiRFhw9JopxJs6YVXf+ySCQ4MqeadDaDCh3qY8ukTjDLhUyaE5dM olCjSkVhFA/SaSp7Nu2YbarXr2A1VOV0teHWs77Cql2rtqougeSYno3Jtq7dqG6PzouIdW44oHcD C9Y4Vi+ypgYIaN2adrDjxwsLbzlM7aVcs5Aza+YnGc/hxC4HKGYZE/Dm06ihda7x2aXi0Xm4Pk1N u/av1RCvKQGZUwDipraDCzeFO+Jue9QM+AYo4JPp4dCjHypODnTIn6iWZ9E+Urr374GoK6uBHHvH 5Ta4iwTPvr0c8VnKx2aeXr1O9/jzk4FP/vp85v8C2HeffgQWSAV/1ilmXm8CDmjggxAWgaB8fvkF SoQYZtjDhP5VONeFKwQg4ogLkDiEiReMqKILJq7YAIoaxngGhxQt6OE0LKi4Iow6oMhjBDqK6MGP D/go5ItHyqhkGTQq+N+NDqbQYpI/EKmBlRhgycCUVOq45JdjNHkZlMvkeCSJXCa5o5BBBqCAlyW6 CECQc54ppwMwwlmnkXe+2eafbYIp6Bdi2ggliChwueeeXv7J6JpwBkpnmkTmOemlffoJqJ5aDurp EYU+eehzIiiKpp1umoqqqm4u6uqiiuKp5qqoagrBpnTG2eqnvEIRKpk+kRoCq3Xq6uqpreaKrK3/ ry776pazJhtprRLweSuVvWYroVXcslYdhcB2JOwHxBILK63SpkqttbEiuSul6TJbbbRFYqvtvUH8 Gi6OUtbKI6S2whvwj+xS666xj9rbqbX17orvwz/ou2+Z/cbLp7MYT6vunQU7fO27uHZp78Hykgzx yTxIvC+iJZgrqb/olqyxsZ02G6imBrsbssM1o+yzCiqHyzIJ5cJscczPMipvxh4vPTLOJeu6s8k/ V/1C0MAOPULRR3eNs9FK27xx1E6ni2y8Ok8NbdNWt01Vt4aNl+CYoyYKtstsIs102ceOzLCyOTeM sKxsu204CViTqfWwd4N9rtmOt7s34QgDjvbH/4NTfvjmJiRe9wk3nw1po+i6ePOjj2da9ugXF86w 4JzHLoLnNy5OruVfl9435FKLnDfIVv5rup5ha5702rInDwLtHtruQ8/KR08L8xU6P8Pp0mc/DPUW jhtDrtqHf9tRhfE1t6G1ey/++kG5wv2H6rMvP0ruwz3Ztx1OTPH8/BMF0ftoiV//BriQ8agkbvHJ 38SsR8AGFvAvCOxPjUSVPgda8CR8gaD5wLVAAV7wg+r4TENyIzcOrsyDIEzhNsgHkA0q8IQhAl8P npYltoksAzScl+qAVLiW9bB3OSzVDzsAMhWEzARDVCEJDEi+SJhQaChMEaCeF8R51StzVuSAo/9w mETG6RB7oOsiF8m2tSMSTYxKBIFxjJHACepvfz70GPSO4Dc0IomIcqxiscykQ6oh0Y4T0GMYjQjI NHaAhB96YtaiyEPMeaGOt9Ni03omyEhey5GD9GEOKrkBThryA4jMigSd9EYGXqmHlqpUn34nNT+5 EoiBtCHPZmknVxLvilRb5cYUprpbPo2GRhIbwab0SmitLZV5O2YeUVdDHg6TY8PbYRMmmS2BYCUX FGweI40nRV+C75uhA54M7ygrYwKxdFoK4uk2pUxsrdN1grScDLfIy3PSao+5E+c4cdkwaHIqmtI0 gjvxRULdMCab1dsmOZsZp8zRy5zMyhmWcAX/Ud/JLIe35Nuz2oVPSzWUn91E3uAsis+PpvKje/To RZP4y1mi1GYvnWOV5rSlh1XDgOJCnzY1mTZpLdSdRYRoRMe2UMJt8ZVA9alInQlNkSa1mMUE6kuF mruY1rOkfSvnMFFay4rmkaWy/CktuTpWKaSqpr1Lqz95xp55GKWUCp1qwvJJTHJK1a6TzKhcS9pV c161hnUFKVLzCtXBXrKne60qVlNKWMRGVal+bWwWeyqnjPrOk0BIVoli+tjNvsmk7WnFZ7ilig85 54xZZOdi+1pYxtoTlWE1aWP/ykXIlhOvt71qSyfLy3DmVrJT7Oxqbdva21IWmTdsJxU0+9lb/zX3 uTSNrmfzY80noc9GqG3kYqk6q6JmNWnAjK1hnSpZ78pWu5EVq3oFu14ssva7lbtrR4nbXfMal6p9 TKxMZ9rcr54Jrf3dZ1tfEcoKyA2hjYnjYYUXtfcy2LX2LW5yH0zbpUbWpcNt8OXGCzvjyle2y8yw iOer4dZWsY4hlm99EyvQmmI4umz1bCHBMw5lYKcsS6iYzi7q0KAKta5PPWxRVwxfFj8Ypibe8EOF i0moFTbIfDXY8ExWX5WOGL0WXnIwNRoFtr7rRdCN8YzbIxDnMMETce3nOMGIvd6earCkw7JVYfne 7dLVv1v2qjeJh9HgTvVldIZcMhOmrvieE++/J4Ynn9uMzuW6eLotAjCMgzrm4FT3JwAAB2YIuUO9 6vJjhZ7vlNkb5R3XWZ16Ld6VVX3MCDsW0dNq9WVDPVdRY/XTrmYxM5VpvFRPE0+yDrOkK4uh/xX4 FRSYDRgqLANmf/LZh7SGAfpA0h1UG9rY9kBulPCHo1objNkONyl8fb2Aivvc6E63utfN7na7+93w VvfO5k3vetv73vjOt773ze9++/vfAA+4wAdO8IIb/OAIT7jCF87whjv84RCPuMQnTvGKW/ziGM+4 xjfO8Y57/OMgD7nIR07ykpv85ChPucpXzvKWu/zlMI+5zHGVAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image003.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjA4wMjAxMwJYl2KZWQAMphPAtlMDDJgWVYg5mSCsZgYGaEsRqb///+D WXqMElAxbrg6HiYGpgOMQkCWGhs/gxTDf5BiBgGQbUDWdiBuABq0HYi5oWp4GHwTSzJCKgtSGRgM wHb/ZlL4D3HhBJClDCxMDAIhmbmpxQp+qeUKQfm5iXkMKkyM9bpArHCBuR6kjwWoTheomgNIG3F9 YfjLANJqUgkxr+EfeeYxgukPcHMXMOqBzTWu5IK6ngvsQ7CxULcLMLCDeXvAYcLIxKQUXFlckpoL 4nExKDJ0QRSDzP0sxKD2j6Ee5naIXYwMzGBZAMxb+bOoAQAA ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image004.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhEwAVAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAwAM AA4AgAAAAAAAAAIchI+BC6F8nHFythsnXc8m/kFaJ2IlCaEgQ6lGAQA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image005.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC61WTWgTQRT+3my2STeJCcvGtiASCyIeFOvFSA8GL+2heNCIxlBpD4HK0Ao2IJ7M TUHbhqotiAfvvagHCVbRVsnNSwPacw/qpepJQYX4ZjYJbmv6E3bg7Xsz39vv/fBmk4/vKw+hV1ei TE8CytozQOgEjNO8C+GURhVgUAgm67BQJ8qKiDJ1JRR2lLqxj/VvEUdQv/FSe5EQveduTBby42BP 4K5j49p65djql1WKCBXV5T5CrhZEdZ5Uzc2rRDp+Gnbmynh+Mnkmfz159ur46AQ2LpeHdGadKrqI 8uO4VVZ5aBToSTynZDUHg+39XB3wSyhUrWKdQegK/gj3rMFraN3BqOpIyjTg8EkAw5jCojOFV840 XjszeOOUWGZZ7vN+js/nGZ9nv3nkMIcsHuAi7rHMspR4P83nU5pHyQTewWJsAiPaXnBGEEvMsnZt Nwtq5lir1Zo5BpoVeXtiav2dc1f6ENVq3vqt/9ZPHo4O7X3QEPgEyfLWw61i7y7GRtabQqIodsqq MtwbyNGy+QH9pndy7rQ5OaI5OcX65KRp1FST089Rls0cnaj2t5yyND3y+Carl3bUieCmTnQHJHoC rToRbJP1qSnxzPSbNROUOB/0m3U9JPE15DfrLUvituU364GIZPGb9UVUYjHqN+twTOJyzG/WH3GJ n3G/WWdsiZK9U1b3ezBGg5E1LIUb34NW93qIPocVuhRew2BkjFJb3Osh6o3869v+vT7sSJbdVlSx 15C2t68obys0zd4Ve4xOblnRY4/v5orc2AVasb6hz9oudpYuWArtY+8Vq0AD1UzL2Fla8Piq3+JG 7Mb/AEP38S8c0kf5mggAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image006.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhsAEjAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAEACACv ARMAgAAAAAAAgAL/hA8RyO0Po5y02ouz3rz7D4biSCmTYjoLaaysS8KjLNKh/eE5e+id/+MlIChc MdUAcpQbpsaZgWKkF2rFehUOX0JsiXhEHMfksvmMTqvX7Lb7DY/L5/S6/Y7P64uJvf8PGCg4SFho eIjI1xem0uXI43XyyEVZaTkDOZk0tonyECkBGiFKpImZeVmjRfqJmtqj+InEwNroGmOqeqv7epML UpsE5hSsZXyMnKy8zNzsHPocLT1NXW19jZ2tvTS77f0NHi4+vrNFfr6Jri5WvO4u9m5sUrvSHv9o f4+ef19P36JPXL2ABJ8U5DWD38FyChdqa/jOH6uBDh92q4jRXEaDGwCBddxoDSLIke5cBLtIshnK lCxbshPpMiaCAgA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image007.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBIYHrAzMgJYk2IZ2QAMpj3AtnMDKJgWVYg5mQCsViAmImRESzCyPT/ /380OT1GCbCIIRMjVB83E8wEHqAdCUx8QJYaGz+DEMN/kHYGDiD/wP+t/xWYpjJzQ+V4GHwTSzJC KgtSgXIg1zD8ApoiAHEqgxLYJl1GiKkiTH8ZDRhBLGEgS4IJ4R6Q238zNfyD6JrACKaYGARCMnNT ixX8UssVgvJzE/OgLtdlBPubwYgrgcmEAaTYHGq3EVc2oxcjSMQQLtLJ7AIWMQKKcEFdzQX2EcQa AbDdAgzsYN4esHsYmZiUgiuLS1JzYTYygekPQJOYweoA2LbZdZABAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image008.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhGQApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIABAAU ACEAgAAAAAAAAAI7hI8JoY0BnTRsumoVzo9rn2yg6G3QSVLREoKdy8IxnFq1HaL6696TLwuqgC3K iNcLEj802bKYPDx1lQIAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image009.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBIYHrAzMgJYk2IZ2QAMpj3AtnMDKJgWVYg5mQCsViAmImRESzCyPT/ /380OT1GCbCIIRMjVB83E8wEHqAdCUx8QJYaGz+DEMN/kHYGDiD/wP+t/xWYpjJzQ+V4GHwTSzJC KgtSgXIg1zD8ApoiAHEqgxLYJl1GiKkiTH8ZDRhBLGEgS4IJ4R6Q238zNfyD6JrACKaYGARCMnNT ixX8UssVgvJzE/OgLtdlBPubwYgrgcmEAaTYHGq3EVc2YwAjSMQYLtLJ7AIWMQGKcEFdzQX2EcQa AbDdAgzsYN4esHsYmZiUgiuLS1JzYTYygekPQJOYweoAa3sdxJABAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image010.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhGQApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIABAAU ACEAgAAAAAAAAAI/hI8YG+kKnzxtymodzmrx+2lhsoUYw2ipUZbmSMGxDLicfZPoHsF49qMJRTKP r1ZEjipB0iz3BO6aD2pViCkAADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image011.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBQYGxgZOYEsTbFMTIAGcxTgGwmBlGwLCsQczKBWCwgUUZGsAgj0/// /9Hk9BglwCKGTIxQfdxMMBN4mBoYFRj5gCw1Nn4GIYb/IO0MHED+gf8P/j9gSGDkhsrxMPgmlmSE VBakAl2GZAPINb+ZGv5B3DyBEUwxMQiEZOamFiv4pZYrBOXnJuZB3aILlAd5yYjLgVGDAaTYguEA AxfUDi6w/RAjBMDmCjCwg3l7wHYxMjEpBVcWl6TmwkxjBNMfgFqYweoAm/3lFD4BAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image012.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhDAAQAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAgAG AAsAgAAAAAAAAAIQRB4Ga8nHlHPtrUTryxiBAgA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image013.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBIYHrAzMgJYk2IZ2QAMpj3AtnMDKJgWVYg5mQCsViAmImRESzCyPT/ /380OT1GCbCIIRMjVB83E8wEHqAdCUx8QJYaGz+DEMN/kHYGDiD/wP+t/xWYpjJzQ+V4GHwTSzJC KgtSgXIg1zD8ApoiAHEqgxLYJl1GiKkiTH8ZDRhBLGEgS4IJ4R6Q238zNfyD6JrACKaYGARCMnNT ixX8UssVgvJzE/OgLtdlBPubwYgrgcmEAaTYHGq3EVc2oxcjSMQQLtLJ7AIWMQGKcEFdzQX2EcQa AbDdAgzsYN4esHsYmZiUgiuLS1JzYTYygekPQJOYweoAxciAFZABAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image014.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhGQApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIABAAU ACEAgAAAAAAAAAI9hI8JoY0BnTRsumoVzo9rn2yg6G3QSVLREoKdy8IxnFq1HaL6696TLwu2aMBP sXU8VJKzpKmkYyqD0qmhAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image015.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBghgesDMyAlifIhnZAAymHcD2cwMMmBJViDmZIKxmBgZoSxGpv///4NZ eowSUDFuuDoeoJkMTEJAlhobP4MUw3+QYgYBIP8AkLUDiA8ADZrBDNQDVcPD4JtYkhFSWZAKVMPA ART9xQTRAQIsQKzLCDFbhImByQHMEgay9jGC3PmbqeEfROUERrB6JgaBkMzc1GIFv9RyhaD83MQ8 hhvzP5c/BGIFha/lJ6XTjkLMZATbZcTVw2zAAHK+oQmEn8c4n4ERzOeCupAL7Auw8QwQOwUY2MG8 PWB/MzIxKQVXFpek5jIwgMxnAOpQZOgCawDp3PNZCOoPJjD9AWg3M1g/AFE6/cmMAQAA ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image016.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhFQApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABAAP ACIAgAAAAAAAAAI5hG+Be+EMgYpr0naRzft2+kUh44zZiabqSpbu+7DyTGOQVd7dp+ykVAkCNcSE cGgsSmDKY/LXiAkLADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image017.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBoYHzAzMgJYhXEMDIAGcy7gWxmBhmwLCsQczLBWEyMjFAWI9P////B LD1GCagYN1wdD9MD5gZGISBLjY2fQYrhP0gxgwCQfwDI2gHEDkCDZjAD9UDV8DD4JpZkhFQWpALV MHAARX8xQXSAAAsQ6zJCzBZhYmByALOEgSwNRpA7fzM1/IOonMAIVs/EIBCSmZtarOCXWq4QlJ+b mMdwY/7n8odArKDwtXyDdJoaxExGsF1GXD3MIQwgrRaVEH4eI4RvXskFdSEX2Bdg4xkgdgowsIN5 e8D+ZmRiUgquLC5JzWVgAJnPANShyNAF1gDSueezENQfTGD6A9BuZrB+AKolUpSMAQAA ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image018.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhEAApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABAAJ ACIAgAAAAAAAAAIpBIJpYc0NHzzT1XXl1DFf+oXiSGbJyZXqeijWC2LyDKZI9Wg6HO+OWwAAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image019.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBQYHrAzMQJYl2OZ2QAMph3A9nMDDJgWVYg5mSCsZgYGaEsRqb///+D WXqMElAxbrg6HqCZCkxCQJYaGz+DFMN/kGIGASD/AJC1A4gfAA2awQzUA1XDw+CbWJIRUlmQClTD wAEU/cUE0QECLECsywgxW4SJgckBzBIGsu4wgtz5m6nhH0TlBEaweiYGgZDM3NRiBb/UcoWg/NzE PIYb8z+XPwRiBYWv5e3SaTUQMxnBdhlx9TD7MYCcb2wA4ecxrmMAGWVowAV1IRfYF2DjGSB2CjCw g3l7wP5mZGJSCq4sLknNZWAAmc8A1KHI0AXWANK557MQ1B9MYPoD0G5msH4ACYFaRowBAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image020.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhFwApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABAAR ACIAgAAAAAAAAAI9hG+Bu+EMj4pw0naZzYmjzYGZSDmkh6bqypbmC7/tTNeNeWPSDpx9x9P9gsQN CAdM6oyRCbOiJD2NyM+mAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image021.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBghgesDMyAlifIhnZAAymHcD2cwMMmBJViDmZIKxmBgZoSxGpv///4NZ eowSUDFuuDoeoJkMTEJAlhobP4MUw3+QYgYBIP8AkLUDiA8ADZrBDNQDVcPD4JtYkhFSWZAKVMPA ART9xQTRAQIsQKzLCDFbhImByQHMEgaydjCC3PmbqeEfROUERrB6JgaBkMzc1GIFv9RyhaD83MQ8 hhvzP5c/BGIFha/lEdJpehAzGcF2GXH1MBswgJxvaArh5zHOYQAZZW7KBXUhF9gXYOMZIHYKMLCD eXvA/mZkYlIKriwuSc1lYACZzwDUocjQBdYA0rnnsxDUH0xg+gPQbmawfgDgR7BIjAEAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image022.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhFQApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABAAP ACIAgAAAAAAAAAI3hBGpx9jR4oHy1Ujv1JubzIGXOHrmiaZqqLRussbyTLYfzJCfJYE2jwEGO71c iTjcFSc4xMJQAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image023.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC42XeXRVRbbGq2rvOgEJiIRBhCBDZBACGCASQUAkNK0YkUkWijLKICFINA4QBBk0 wCNC0jIsQhhCRIYwyxCgZTABDCI2gwjBgAuUURoZknOq9n5109326/dXn7W+9d1de9c+v3Pvrbp1 Tx8tWCzE7zTRL/GS1K8g3EV9pagoBDQLE0KLxio0pp0qqST1O4Vehavw0hthLi2MkuIfFzpFu8DN FL4Sf1wN/5mR5Y6y8j8rdHmWmf+oUOIfHcV/dIRy99z8R1wmCirJOboPt/GG22beK7aCZhujO1Kc jqXO+gn6k25OCboJ9dcNaZCuRyN0HUrUD9MkXZ3SdARlOs/StWiljqTP9WO0WrekXP0ULdfdaZHu Q+n6dZqm36QUnUIj9RQaoD+hHjrd9c+gFjqTGjivrT+lanoWVdEfOb1PVXWii0dSDT3E5QZSpO5L DXUCNdE93JyuFOILcfqwiEphJd2FPLoNO+gm7KPGeJya41FqhUeoLRZSHB6kTriPnsW91AN30wu4 i17FbTQat9I7TpNxB81wuTQsoFn4nfNzNB2vUCrep2REHoUP8StYl1/AJtwJW3MrfJLrY0eOwKe5 ghNDHJdCG74Dzfk2NHBeg+9DOPsALueTh7epsutXHUsoEn8o5wtx/gpFdBFO0Vn4iU7Ar1QEt+gA 3KedQLQBkNNhOpfAer4MuXwDlrm+i9lAJiOmczjO4uo4kyPxI26BkzkOJ3E3THWMU7mvGx+Ac3kg LnSe4+JN3BP/ys9iEbfHM9wcL7l5t7gKljG5b+dvgOIieOI0aPEtSFEIhg/AHd4PV52f50L4no9C AZ+CneU8Ia42UCZWwDdiERSIDNgj5sFm56vEAlgosmG2WA2pYgu8Jb6CEa7nQFEML4nr8JwIIF5U wG4iwqku9hCNMEE0xf6iGQ52PtbF77vxmaIaZoowXCZ8WOfmbXfzv3J9Ch3bYbHP3TcfisQ2OCo2 Oq11ynVxiCfEFQGT5KO6pQjXt9nT91jogH0kvoNK3EQtfsEK4gJWEj9iZfENPiT2YoTYgtXEGnxQ 5GBFsczVZWMpL8cbnIslnIcneCcW8kHM5+9xI5fg5/wbLmV2728Vncl1dAY3dt5KL+B2Oovj9Cp+ Sudxe73Lxfs4Rh/iaH2Mm+pT3FCfd/WXuLq+xiG+EOdzOkKE1l8f3Yx76tYcr2O5k+7AsfoZbqm7 u97PcaRO4Br6Jfc8/bgM+/NN7MeXsDf/hD35LHbjH7EDn8NWfAEb8RWsyb/jA46PKFz/TnX0FXpc X3Dr7Ue37k5RP32SBjsfrc9Qkv6JkvUv9La+RRO0ofFacaIO4zG6Mr+hI3iors1uzfMAHVXOF+L8 144S2mf+taPgH/vNf/q/d5pZMrTTHBBLsIFJgwnBBNgfvA+FwRQoCmbC8WAOnA7mQXHwGfwcLIYr wVK4FeQAB7kQbnKgtsmGKLMAWpo50M5MhqdMInQ0r0AH0wPam1iIMY/B46YG1DceVDe+8szfVWlw TV0Jrqpzzo8Ff1cHgzK1K0DYElSDvKARrAuinZ6E9UFX2BD0hE1Bf9gavA47gtGwp5wvxNkWOgZ7 RLLZKyabL2R1+5vcYX6VW8xFmWfOyS/MKZljjsulpkguNIfkfHNQzjZ7ZarZI5OcD3PxAJdLMKfl n8wl2dXck11MBdXF1FHdTLR6znRSvU2CetW8qkaZUeod85aabt5VGeZ9tcz5ejNB7TBj1H7zmjps eqlvTRf1nYl1aq6OmQbqqKmpjphwVWiUOmBK5V4T4gtxnlAnbFuYYlvARBsFKbYujLc1YIytAsNs BRhkAfpZUgm2VHW2d9UT9p6Ksr562Cp40IZDmH0ElH0chO0I0iYA2sHwgJ0AEfYjiLTzoJldCrF2 NcTbPOhrN8FQuxHG2XXwgc2B6XYxzLZz4FM7CTJsstMYmG+HwDw7ANLtizDHdoc0+zTMKOcLcVYH 6+4X2PpQZhtDqWO+Z2Pgrm3v1Bnu2HinF5z6ufg1l3vD1YwD36aAsanAdgYA5egfzQpdaELfr8k4 waThuyYDU00WTjO5OMtswPnmS1xs9uBKcwDXmSOYb4rwsNNJU4gXzFd4zWzD2+ZzvG8WoG9mYJlJ xntmCN4yvfAX0xmLTWs8bqLwoHkEt5kIzDUP4UKn2aYmfmgiMcU0xXGmHY428TjS9HTq4zQQR5mh bmw0vmnGY6J5F5PK+UKc/+3aKRChtTNEzJMfiwUyXWTJz0SOzBJr5UqxRX4h8mWeOCA3i2/kl+Kc 3C2uyz3Cl/nCU1+KqipP1FIrRB2VKeqq6e4Xf4KooQa788aLQqlO4q5sJS7LBuKUrCm+dieJrbKC WCXD3H0qitmyipjqxj9w+Xdc3duys3hXviRS5XAxQ6aU8/SSex3dSW4h0mm/GEeFIpmKxHv0vUil H8RUKhYz6GeRRlfFHLrlaqTMpKryM6rnvLlMp7ZyJnWUE6mLTKRn5CDqLJ+nOBlHT8gm1FjWotoy jCrJMhuIm/aquGTPiBJ7RJy3u51vFJdtrhtfKsrsYhFGi0QtWiwa0hLRkpaJOFol4mmt6EWbxSu0 U4wo5wtxDhJt7QQRZb9VufSd2kR/U/l0Wn1NZ9UxKlE/0C/qAt1QV+muuk3D1VjZVyXL0HOGnve/ /cwal5+sHpK75TZ7X31IADOdMgkhizzIpYqwgSrDdqoGe6kWFFCkOw1EwfcUA8XUEm7SEjVXnlEL ZCpcoylwjubCaVoExykHjtB62E/b3GknH9bTV7DCnRo+o4OQ9n/0Sbm+hvfobzCeGnj1bYxX03bx Gtk3vO422ettE71hdqKOFu/pJ0WSflo0hQ2yNeyVcfCt7ArFsifckC+DlcOgskqCemoStFQfQweV Ad1VNvRS62CA2gmvqwIYrk7AKHUR3lTXYKy6A4nKOoVhoqqKY9Uj+KZqhKNVNI5UT+MwlYCD1GvY XyXhi2oKdlfzsKNagTFqKzZWBVhbncZK6gpaGeANWVkXy3q6SLbWu2RXvVr20X+Rw/VUmaLHyo/1 y3Kh7ipX6xZyp64hD2sSF/UZUaa3iqreXNHYGyk6eJ3Fi14tMdT7jZO9Qp7mZfN8L4WzvQRe4zXh rR7Tbu8M7fc2U4H3P3TY60NHvIfpkFds93vL7S5vhN3gNbPLvJsm3dtqPvAmmqHes6a7V8U09c4G 2lsTlOjUYLvuE8zSLYIPdaPgbV0nGK0jgkG6UvCShiBeGz9O3/Wj9U0/Ul/2K+vzvsVT/nU85p/F Q/5h3O/vwN1+Lm73M3CzPwXz/ERc4w/EXL87rvRjcLlfD7P9ipjl34El/k9Oh522OC2BLH8mZPtJ sNx/GXL8zvC53wTW+g/CRv+e2uYXq3z/gNrnf6EO+enqO3+oOu8/qW744cr4P8vwIF/WDTJkdJAo OwU9ZK8gSg4LlEwJSkRa8FeRFSwTm4KpoiAYLs4GPcStIFp4JkLUNQHHmJ/5z+Yov262c4pZyXPN p7zKTOY9JpFPmEF83SQw2mc40rbldrYZv2Af5TdsHU6yD/N7tgZPsdU4zT7AKyxyvmU6aQO6aUsp jO5Tfac4KqXeFNBbJPhTCuM8qspFVJPPUyTfosdYcTRHcCw34i7chp/nZ7k/9+ahPJiTeBxP4ok8 mz/hxZzJa3gZ7+K1XMRfchNR3zYTNWyMqGKHiOtmvLhgpohrJrRG3W+1/YtYZWaJpeYTMc9MEyPM VNHbZIg/m8cBgvZg/HjQwRGdbU7qXHNabzHn9WVTokvNMa3sfOhI06AbvQNP0XiIpTHQhobDE/Qa tKIBEE29oQU9D80p3qmLUwcXx7rxGGhJ0a6mqauNcnMehXZU1fUCaEshphDb/99zyv9Siv8FRGYE EWgOAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image024.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhLQAtAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAAAAAAt ACwAgAAAAAAAAALthI+pGr0P42o0yItNrbnPvXkiAILjZR0ld04aqa4t41iOJs8kZ1Ox2TLVXj/f 6LbrwXBFZMaYtO1iCNYTGeqVihhhVmusWR8r73LKHCfKWzEuBQtVxWxe8u2T46N1cHnP1ccjFUUk 9yWodAPlh+fHxoQGNEjZV8iH+HjnGNbJQveoxNkEZ5WSJzTHWLp6GjoIeOfJivq39YYZ2zmqN3vo KZn5c+kIKGqGCzRqTOtkydka3ZbYXEy6KD0mvGYKhSkdq6oJ/WdN05yTrvfhq929zt6OTn71CUnv MXlbLrKf7X1CGTknOr7xK3guR4QCADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image025.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACCz2PMUsDQRCF38xqTM6AR7QIYnGKpIvEVCn9A1ro9SHFgRYXhQQk1aUWC0sRf0hA i1TpAunS+hMO7BRymZ3dZGHge7tv3swu57MPuMM/hioW8i5BwHwJG5zo465UhTfERJ6Ii6JQuqC6 v9vf+qqSCa4JNUoHOEZhzQhFT4UmUlMJejfS4z1VXPeG9/HoKREPynL7x67Dnh2pJrnsIwZfKR0K Tcju+c/jlXO+kfoZYfyQJoPoJnmObh/TXh/nTFlTKlqYDGj5TNJZ7eDVtGDXv+w43adPkOrAbxjo LzQebmaIPVXf+m9iPrsbDYZJalWAU7yo2XblvzU0VsjcTNbZucw22r8G/63pTowBAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image026.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhFQApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABAAP ACIAgAAAAAAAAAI6hA+Be+EMU2RqomoNztv2+UUh9WTmiaYq6rTuO67yrHZuU2rX3vB6D/wBbSTK okIMSpSbpm+ZyEVLBQA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image027.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBIYHzAzMgJYk2IYWQAMpi3ANnMDKJgWVYg5mQCsViAmImRESzCyPT/ /380OT1GCbCIIRMjVB83E8wEHqYHzAmMfECWGhs/gxDDf5B2Bg4g/8D/rf8VGKcyc0PleBh8E0sy QioLUoFyINcw/AKaIgBxKoMS2CZdRoipIkx/GR3ALGEgS4YR4R6Q238zNfyD6JrACKaYGARCMnNT ixX8UssVgvJzE/OgLtdlBPubwYgrmzGEAaTYEGq3EVcnM0TEDCjCBXUjF9j9EEMFwDYJMLCDeXvA tjMyMSkFVxaXpObCzGcC0x+A9jCD1QEAzVLMOH4BAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image028.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhDwApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABAAJ ACEAgAAAAAAAAAIohB13warpUJQTRuvwm0CjxoXiSGbMeZaqmm4X53WdBmL24sr47oFAAQA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image029.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBQYHrAzMQJYl2OZ2QAMph3A9nMDDJgWVYg5mSCsZgYGaEsRqb///+D WXqMElAxbrg6HqCZCkxCQJYaGz+DFMN/kGIGASD/AJC1A4gfAA2awQzUA1XDw+CbWJIRUlmQClTD wAEU/cUE0QECLECsywgxW4SJgckBzBIGsu4wgtz5m6nhH0TlBEaweiYGgZDM3NRiBb/UcoWg/NzE PAYVJsZ6XSBWuMBcz8BgADWTEWyXEVcPsx8DyPnGZhB+HuM6BpBRhmZcUBdygX0BNp4BYqcAAzuY twfsb0YmJqXgyuKS1FwQj4tBkaELrBik68NnIQa1fwz1EDuZwHZ/ANrNDNYPAM4zSpKMAQAA ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image030.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhFwApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABAAR ACIAgAAAAAAAAAI+hG+Bu+EMj4pw0naZzYmjzYGZSDmkh6bqypbmC7/tTNeNqT2d9I38tTntOrqb RSecBCPKXmUIIC2jH9wNUQAAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image031.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACCz2PsUoDQRCG/5k1as5AjmghkuIUSRdJ8gS+gBaaXlIcxOKSQAKS6qzFImVI42sE lJDKLpDONo9wYKeQc3Z248LA9+/+88/s1+pzBnd4Y6hoIXsgCJh3YYOqPhakirwjJvJEnOe50hWd +rujf19JMsEVodp+GWfIrRmh6KXQXGopQVMjPd5Twk1n1G2PB7F4cCi3P+w67NmTqpPLPmHwtdKx 0ILsnr/8vHXOCamfEbYfk3gY3cZP0V0/6fRwyZTWpaK1SYGGzySd1QpeTQN2/WbL6R69gVQHfsNA f6HxcDNDHKj60H8T88X9eDiKE6sCnONFzbYr+66gtkXqZrLOzmS20f4/46AhUIwBAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image032.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhFQApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABAAP ACIAgAAAAAAAAAI3hG+Be+EMgYpr0naRzft2+kUh44zZiabqSpbu+7DyTGNanOCSze+9uQFqRBXI 52gsJn8NHAxQAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image033.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlh5ADCAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALBEAAQDG ALwAgQAAAAAAAP///wECAwL/hI+py+0Po5wr2Ivzpbz7D4Zip5HZiKbqyiZY+7byTMNWjWz4Dmr+ yTvcgq4A8ajQCJbMppNZkumQRSMVh3lqt9zYaHhtgMOpC/eM3k5N5Mi47bGk53Tn2w2f3PMOc/3/ tyZmxSdBWMggB7i4uGfgiDgYWcRYyXh3OKmnCRBg+XlpBcnZl9mmCJoaaEpKwYqEqio7J9jqejqb Swtl+/GK5akrrGb32ysGO6z8FMx8zGHM0ry8PO38vLljTS28fY2NV+PNPTv+Df4QHWJOnsp+jo4M 0678rqUej+/K7QcVe1lJX4VRVwRCsAcqg79+jT4ZFGKEIJWHifgFU4QRITGH/9AISTxCMQm9Jf8E lKSjEY1BMB9BrhtJctvJNClp6vEYEosvmCTvBcwlcEhLl3F4lpypUtdKLyJMbYgIJBEJniZ9NuzW UUUmnI+EpNtntYkZT0pQQjnbs07NQK5yJumUIy5cQ2CZ2fGXtiqtLDEZ0qxmaOjBuRBddB3shti0 xXlRKjT52CzgUm4reC0C8SM+c2SL3dVrlFzlOEzliqKbbiNovH3XynLdiOjlQ6dv9enC165e2Anp jbY92+Ph4X1uh03LeHXodr8D44zYSWjUrxVVI292UexI3gHjFa+gBtVYyBcjM4fZvBAr7lS7GPUu VWT7cpZ4p+ezdT7QgNzvw//Jr99rofQHn2U5BKiKfUjZhMJT0GRGmDyXdYJgggAtyOA6hVFnWISS yEUhecr91deIurlzFYYqNdXhdy2iNmFnMZH4GUIqSqYWa91pmIhwXkAl1IaPQGeacvZ4sxZ7aK1i Xmw9xAfkcEEOeVhtmFDIGXbkackXdovJ2BsgPnD05EBTRlhblToIZxiYNYoIGkasZbebko01omRl WxFHGG3EpSnlW26K5YeWaCXX5ZIOOZQni4HO5WOVpkka3VZ0HvrZapfulqmdJr63zhvSiUJqDGvS RmQOhsaJ3Fl0ItoqnIsi6B8ZsfiVUXmt5TojXp56mlCBlFSIIq3CqkpssQH/1hrGjcmeASyZx0b3 7KzLTjtktfVVyGxB0S7LLbbUaguQsW1N18OobZFb7rW2Acojnwch2aR78327IwnSgBiYdUfiG0i4 cahKJVxj7OFnVwezNE5ySd0rsL4gRgmpvAmvSem4J3Kq66Edl6hUxA9O/GhpaMZYMEThFSonq4a+ 2o3IwJU8m6qAsokmTv421s+tLNcjczbBpWrlWzEW3WfD2rHqsqI67uduR5YafMOpPR4cHYQK78z0 y7FuSp9jP/yAUi/qRHTPYz2PJUdGCwG9sl975WaH2YMBDDGhzjK5mC21dIh3e2TtndDf+QjBbij3 ditb4NvJvV2lBXqU+F5O/6NH8OGIVx7expEnwbgULnB+3NKgDvQMgKT3ap1vHJLi1OqQ0Si2tB9y sh7pGtVUb9kwTpJ74oTv/jRbNwEvBruuLQ9bSKEPXF219q2S78h5GOP4T9rP3XyZ/6WWbJ5Miumo rQeFb6FaSX5hfmK0Cqi+8ewXZMj7YXd+Z4bzy+a+4DHHvb4VPM9AevDf/4AiuiBQJHutg1o5ZjBA edVvO/x4IA0GqCffnCdBOrngSzbIDMhdJVgdTOAHqfEOwkGLhNowYVNQSJNoEcgXgqmVfxz3LweS jzSGI2CDpAE3leBreTRMWTj2J8ADClGJ+kuX9bw3Dx1CC2+7K8NDRoPB+//FsB4p1Ar02KAN+Fmu Gl3QivO+yAM78Y6BSBIgFI9IBPFxT4Vi6psXJfi6dESwR9sj1+AEaLLfSchW7VLeDdEltB6pR0yc gxd+BomflDCwPqiKxHr2WJRd+FGRj8xcKzA0STzpsZOC+c8KpXcTTF7NOzMJpWN4CJIeps4arozh F0opNX7BRzzcsqEsz7UecdHNKLiUGiJtdkxdTkuEXFSlmXyAxmVmBoXFPIYzxQE6OsZNXJAUFvbG hJsocNNF0jSmOMVRTWwKExy/bB+2runET3ITnkWU5zqtGchOvnOWRkQEPV34Sa4g755mE6gl58nP fuqznPjMmib+CQN2prP/hAwdZ7MQalF3VjSjsMAoRyfi0Y/y71gQzWhJ3SjSjoY0pRTdpz+zSbV8 qnSl35tYmk6Kx8m9NGEZU49JfTq1SV2PozjtE+gyU9Si7ut6+URaTS2K0z2dzENPhWpVIcUmntLv oyWdgoNOJVMFplSp6CArQFl6R5GaFRtrjShaUcrStvrtrVSlazTHis5UwchBeUzrWxln0G5WbF5n RSuzpErOCQnyh3ZVbBluByQfYcyIVXNrY3PqCyhJLmlSQhqplnpZx5avCjcVqprOZMPQKjNePTVq zV6LMr+qtq7ey2qgnDpYK010tao9ZFCtVimwUlavrJ0tb0Mr14saV7TLscXsX5srWLomd6F2na5P G2vdl0oXujNTK3ezkkjTVFa2bsiuPeEI292O9rsS+4pTPARR8yYUGe+NBpFY4tCURQp17GUsAS9G GUlN9jTq8mF/b/lMALvIVEcr7VEPDFo+2VaXOKPZYKkq33dW+MKuJRlWKeVghUJYGj8ar9ZsJiSo IPMpVcswUZ93RRePVb0GHoSMpUvjIX3zxr3N8SpH7Ld2OofHI/4BZZIJZG+ObbkFAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image034.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC9VYz28bRRT+Zr1b/yCtUrmgSPyyqkg9VThOcRpZigTpAS7IUkmBkgDBTlu3aQyp L0aiCiEC5RJx7gmBhHKhXJB8SCQOCFQOuXDhxB8AldqIcECAZOa93XnrdXebH2RXqqX1zH77dr5v 3nszszO/bP14C/z7Sd3HO1x77YJCFkgdHwByeJExW18plYGjy8csQqg2YN3X71EtK5iyut0u29vq KJeWspDS5TN8d0p1u2F3/rt+e7tbpPX1hH0PdxTdZfT1twX50funlWv1r8bpXYMqrxXTnhLGXt30 5pP27/he99KJaN8KbT8V0ltiNZp8Tl9HsDdhrdpcbut2XC0O6zAeN+1vqwd7ckyXwykHY6jgtqKr o+sdvo/ym+nfw3pk76FHG5ptTDMRfsL6wquFZYoblby2ua1c6zXPOq9rBmsL1hasLlhdsKpgVcEq gpEPDtJDPwMfjJnxpApExZGo+BrC+13xdOatTk/NVzwmDFZIrLY5S807T+naP9afXdfuM2Wi+8Ji Y3Ye0T+j2dXawSiCOiiCoxIng60JtiZYW7C2YHXB6oJVBasKVhGsIpjviY7Ec6MHM3YbmBFsRrBl wZYFWxdsXbAtwbYE2xFsR7Ahic+QaJkQbEKwmmA1wVYFWxWsN/L9eenGcpCzDdjk4CvLOnm+faM1 d10jd/PIlB+HOx9giep+LI+E5rWzj/z+zZsBw8bLYbT/HTqqjFJs7W/iW27fnVNVINPT3tix+8bW Ut+cC8nqmYjR25QcuyiZ9bLk05RkUUNy56ZkTEPyZFZygpjMKkB6/NHeO8/4SjPSE7NCLvWtbb0r wQxaeBfEcROvc9k6kP8h7P0rAPEH/e/2i/wUtT4t4yo+BVm08CGXVxNSRTGLUrWOKXwNsngbX3I5 lZAqyp8oVVs4h59BFq/gDpfnElJFuRylagdV/AWyuIh7XFYTUkXjKkrVkKrjaUUWC8hzWU9IFY3x KFUTqo1JRRYfY5zLdmK+qkWqqmnfXFFksYC3uEzKVzT3RalaVdNYU2RxCStcTseuKq72/896t5f2 zfeo+93wh/cNuGnt7xvQDuiJvt+bfnsf+k9iUeVwAbvvLRXvUEu5Y3oNO6Vrb8zNLs63C5PzzRuN hcuF6mKjNldoXipMNq+/d7rw6ty1wvlWs3ZN72yzehUlpbT+5/RF9/Sf5X96kvHqDltkMeDVM2Lr cC0Ti18ettNNpn3nUPJzN57eWOY4lt/gWf4GGy6mtf0AY7cwxKcIw6Ui0vDxTwx+Joi/b/ByEJ82 +FmDH2X8JRxnFcMjxWI68GRUnpTkSRJ+SdLv/l5xJbWS8vaKg3udJ7Kep37Fc4yMjI+fCXrK7ICz h8Y0ZZiej5vpA8NUjpvpc8M0FjfTD4bpbNxMdw3TeNxMg/zlUCoWi3EzlQ3TSNxMbxqmUtxMHxmm 0biZvjJMkXPEoz67hp+nZr3+ZfrOHXCAk2j/VCDqvNb345HQc/TgOe3+LID/ADABFvs4GAAA ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image035.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhyAHuAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAUABQC9 AeQAhAAAAAAAAAAAgE1NTXx8fGhoaJqamoyMjKenp7Kysr29vdnZ2dDQ0MfHx+np6eHh4fDw8P// /wECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwX/YCCOZGmeaKqubOu+ cCzPdG3feK7vfL9GwKBwSCwaj8ikcslsOp/QqHRKrVqv2Kx2axRxv+CweEwum8/o9NOrbrvf8Lh8 Ttey6/i8fs/v+4d3f4KDhIWGh0SBiIuMjY6PdgGQk5SVlpOKl5qbnJ1tmZ6hoqOka5KlqKmqqKCr rq+wiK2UDgEEQgQBDlazRAgDtgtBvUfESyUGxadcDMC3Q7/BaShIxNEDCUEPB1LGld6OCQENQA0B 2bzLSbkkwhHgXybJ0+pB7CPuZtTKSAgl6PAA1fMUkNGAAUAOCmFQIECBfA4OiCCw652uAQUsRmgI IQIEh0MU2OpoAKRGIAsa/z4M4oDdgYpsRKS0VTFCA4y1BrJ5EPNixjvNAiBYqDLfkJkrLY4QIpIA SZMRkOYToQCnuAIwxx1kwEQRQ4dTTxEYUBOIiF0LAiAsgbLoQmBDzYolS3CgJgZC/XFFWeIBkHsm SSTzojcC3rj2dAGBcMDvybTtgDQc8awniWeQ1WbaaTnA4FOZAyjgS8KxkNABhLFNXJGxY9TuStzL qBTfMXWoHXvJZToIMHJC2MImTVVuBN6hCjKSGIBbYr8857HsObSjF7zJSu4dZvdkrqH+KgfoGPyU CG6Q/56L4E9nibgiqnsP8KAWbeTRiXxnb8u4QCP7hSdXAx+Nk5Nc4PWnRP8g+Hkml3ZFtCcCOicd JxR/z/Bm34MBbNeJcovkVJYJCAHxQALsyEWeRh8hBEwi3fXEHRDi2DKafyKQ11NHBcI4AmI5zlgh dySUWJ6Qm8W4jIwn7ehRZ0UEQqJcIvQmRAKTrVfhHUyWV6UoIC6iyAlA4JXAgUOykQtezwjRUGuN 4XhKj0AocEBDznXpJJ1Hwthnkqv1SWcmby4W50mDmqeoik8qCoqUJsiFJxIOmLOof4nCOGly3Wmi CHJDAONAemmecpWWV44UQUm0qXmhgP81uaRY67Xn563+5bJALSWCCuCrCmYijlOrmhRgsJf2lMyw t+FCn58SWRkBMMKgecf/sRmmxqtx0XJKiiKoOZfli6USZ5RvJcQGWl/qjZDnpSeJJMJkuPbpX2hx hUtEbv6Fmi5xX8oqZ2QL4lbCuxHw5BxT7yUkQjL8RkUCfJIo7O0omTTQ0ACIOYBnLUNBSuQR7REQ VhBSBQFBSc1l1e8dN2GVZJTqAAWXEBqrhdhRbvULzURGpSynnM0M4GE19eTMsZDdhgTM0igB45zQ Zd7sX9OchBmLfg7ScZbERq6i9dZyjE22ekfDwdyPsJh9thtub61zHixD/Urcb9OT9958910G3n4H LjjfgA9u+OGuFI744ozX1fjjkO+teOSUV17I5JZnrnkemG/u+eefdAr6/+ik89F56ainno7qrLce x+muxy57rLPXbnsWsN+ue+m57+67573/LnzlwQ9vfOPFH6+84ckv73zfzT8v/dnRT2/93aJfr33m 1W/vPZjZfy/+4t4sFZxANXc//vr6hC/J+0KaNYz89LNvPyXGwD9/jPWHf///gsjfOxLRhf4B8ICM KN+YojS/+qHPfwiM4BnAoT8HNnCAFqSS+iTIQXsVY4A1I+AFRbfBDnZQgBXE4AUNyA8TulBvBatH +synlCSU8IUIpGAYbohDAPKQhz283w8hGMQiQmGIRkxiJMpGRCU6sYVwAGLeBPDEPiDReALIYhX3 cEXhZfGLW+RcE8Egxf+tffGMYaxDF3d3xjamcQ5rvF0b5/jG140xHnck3RzdWEe4+Y+GFgQkIGnG xj0akop9RAMKVSilBi4JaXJ0Ix8jsMdE/s19KgTh+ej3SCjGbpJAACMRKmlJMmJSJ5vEYCe7kEfK gVIIiDwCKUuJuz8ucIQs9FErH/dKKRiSlqs7RiZDyMkVEskHyEymMlHQRh8YcgUCWKY0p0nNakYq CoskJgtXScjS0XEMs4SlFoFZrwKmUJvmMSbtPvfNM8yyl8BUoAzR5yUb7tJv8ETDIdFIzvjZcIf3 3Fs+3bDPWJIzjoMzqDhFqYd99nNIflwcQ0PJzz788qEIxSca2/mHQ/b/M6N8K6ghJDlRS4J0ihdF xEQrmsiTnk2ki1AoJVn6Rpe+NKWVGKgSbWpGnF5Cp+w0XUCvUMaGghGok0Cq5UrqtaEGU6AVZWon aMpOqjKxG5CaoT2hylSZisKqS+UoHPMIv3QWM4MejIVSS7HWw3lUjWQdpiPVmdZXgLWnUm0cTMeK TbmeNZPlXMVd39bWmxZ0nE3FqlZz+UBYFFatgyWbQ8PJ126ocq5otaZmZdDMzXoWmZ0lQTQ/60zO HvIEoUUmVvuqv05yM7BfjazhWJrXkSJWlg5NQm2jGNfWYhaw64ztbvV6VNn6oZd7bYJXK3vErNYT kqQwLnF9WohK5tZT/7t0KkQ5Id3IvdW2h8WYdqlQ1C88drrUPe51vzXeKZR3CjI9L+S+W930Xoy3 SUWsfF1pXz7QtxQ8FQRJb/vJjQ53DgY+cNbau1pH/Hd2DN0vGSap4AVftREPrl18u1sG5LaNwdgE sTvXezwJa4HDABaxKWKaXOeheAsvTvGFB3HYCv8uxlUwMfhm7F+c6hjCOIbCj3dsxz1kmKLLtd6Q kRDkVIRJkM6FLjiZ0N8hJFl7S7ayjckGorJuk67+BENtq/zCLGeZvaxNJS49aV7akrmITUYygRHX ZblyCcw+40KN51zHIMf5w4pFEmO9tMzDkvbQiE50DVLbgjMq+tFPzv/uZf9ql0DBmMQPnWlXR/ln ufV20qAmoYo1LdZMB4HC+u00lz9t1lBLuc1ndmKCtahq6rUSyotls55rHcYWa05r2u3dljN9ZMsF 2ApXNrWWi025Yyt7xJTdnLOfbYZoS3vUTXgvtYeNPGx3xdvU9qXqph3uHIK7YOV2IrnT/b91s9t+ 7n73+iKNypG9Wt4vrPM5VylqfAdR37h6bXD9fcJPn4/f9yY4B+l98DXrUuH5lrRZEa5LSFv84hjP uMY3Pshss1qDre43xE0I8HkOeuAjPyDDAfFcXafch5Im6rlfLrt40/x5Nr/58nKu8+PxvOfD+znQ fyf0oe+u6Ea/HdL/k167pTO95jNP+NO1t3IqtZyVUx9fyb+M1jBn/XoAZyAjpf516YVdhAKva9nN fuvNOLyxa6e6xFl+8tpw/O54z7ve9x6DBq9BkytMu9fj7rytBxLP2yX8zts+Kxp2HOWK93nMnxr5 wkfd5ZUP+uWxnnnL87jzxnM66H+9+W6OPvSlh+3pdSf61Tc79ZB3fdNhr3bZz/7ztrdd63PPOMDh equ8Z32wAS/4PAcf6lg4J+K1fXzxJt+vwK1988c9XseDme/Yz772t4/xENvB1RXnvvjHT/7y48D7 RCX+8sGdu96139vvJ0P8xzD/Fafft103PhfqD1D6w///8geA/jeA/81VS7nGeWLAf6ZEgP2XgOwn gA7IgE5QOGT1gBK4gBGYgQ2ogRjIgXiEftP3RMwXgtRHgiJIeyaodCiYgrfHgkYERCLWeCDmKDN4 Se+DOWQSCZZmCIK0f17weN9XgGqQAlvQatHnXg7EYED4fHVHXm9XBZUmC4IWhGNngNfkcRGVf04I fenHhV24hFtYhbizSdUndla4g1DIckr4hE9VgfgVg8o3hl7IC/Qkh2LIhH9FhyJEhWSkeki4h0vk hkVmSkaYfFdohw54g3AYE0V4iHwYD4CIh1pIeVjogkU0gpb4OeqTg42IhungiZ9IAj4IilDoiKEI hu5liqeIg6pYiv+kiHn0x4Zp2ISWRYu1eId6iIu5WHxHZIaSiHi9GIm5qGbDCIx+mIBkWITJiIiF OIzNGIagJonPeIvEWIyT+HfCOIt094vXGHvI+FvS2I3ZtozMKI5dQY7heIR9lY3QaIwT6ItduI3x WI3AN4Tms4jTSF73iEeM2In5qI/9eIas+IqKJYqjaJA6iJCVmIk4hIkMSXp+RJAFiYohJpEVqZCG aJHNpZEex5ET2IoAiZEZKZKreEfdQ3F2yIvBqIvaqJLYyJJh6JLjyI5/KI/WqI7U6I4zaZPoNoTo OI//uJLRCJTmKEzgSJQ4+ZL02I5FuSDweJPtFYUf+Qk/6YxN+U/4R2mVSamUQSmUXbmTS1mTYbmO PKmNYymUOjl4NviVG8mWHxmQCXmVMeSWb0mXt+GRHUmSrqiXe0mRbemX3viQMCeYEUeYNZSWHXmW G6mYi4mYd8mY0meCsyKX1TCFeAiX8YiZLWmXJ7kPAgmY38aJI4mX9iSaMmea7ZhC8wh4v6iaxeia qbmVgblDfyN/tRmLtkmbs6mU+ieWvembiQecBbFB58Z+t/mNuNmHZWmWlPlBy8mUa/icCGiYEuSQ 1Ak51nmd3aad1bmC3KmJ3vmd1yaeKhee5Gls5nmer6eeQpSe7Pk42fme0OOe8kk+5nef+Jmf+jl+ IQAAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image036.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC+WYeWxUVRTGv/c6U6YV1AQxJhhtTIFSqECxKlqXsi8NqA0oRJSpDNLajZk2TZGg BlNRwhIWwQbFGkQgCggqLoiIIAQRJSC477YJ/GH/MSTVZPy9OzNdpjN0GgFDmMnX9959957zfeec uUtPfv5pncznKqtJM8zdqimWUqSkOv6kqtm0uUCS5ZGb62W20+LcdbebGOfcpbS0WXYwGDT9XVYP c7UtW0lcrzNP/axgMNZT69hWe5336Aaudv2pnpbz5AHNtlo+zvgsK9TrH9qdsZFWK2wlYs9q8diW tzOyt+u0LkelO459O6b9pBhqHa8RTq0+W3m0VxOx/l/tnYpib7Vj7zLXpjhRUvit1SEyM7mmJw3W H1oF1uh31ek3vQjW6Ve9ol/0qn7Wa/pJm/WjXtcP2qrvtB3s0Dd6R19rp07ofR3Xhzqm3Tqqj/Wl 9uqI9uuwDuiQDvL9jLvD2kfrXt7uoddueu9i1HuM3omVt7G2Xd/qTSxv0ffG2yawAc/rYVAPk5dg tBa8ALvVYCVsa/W04d5sdDxu2paBpWARbxaCWrAAPAnm0z4XVIMqbPjBHGyWYr8YzMaXD5+F+Pai djpcpsFrKvymwLMAvvfpK02Cfz46JqBnLLpGo28kOoejNg+1d6E/F7W3E49hqL0FtTcTp5tQOxS1 2cRvsLZpkN7QjcQ1Sxs1kFgPQG2mXlZ/ctAftRnkJAO1/bRCfVHWV0vAIrAQ1IIF4AkwH8ylXzWo YowflGOjFBRjcxa2ffgoxNcMfE7H/zTwAFwmw6sA3AvHiboVZcM0Hu5jdYdGoWUkmvI0wtzdqTG8 GU+PCfScyIhJyiEmQ7GSTYyGEKtBetB4yCKGA6ixTDxnEtsMlcCuFMyBbSWoUh/VgHlKR0G6ngIL QC14DiwCS8FysJJ+q4GTcyfPt5mc9zZtddhaC9Zhux6sx9cGlG/C72Y4bEH5Vvhsh9db8NsJz3fh +wG8d6H8I3TsIUufoGsflg+g/CBaD+luMptnfDp+8o3PdNN2hGh8QXyOEqdjROQ4b08QkZO6h2op oJIng/upomlU03Sq6mGqq5Aq81Fxs6i8YvAYSsqpTD8IqIH8NZDHBiLSSF4biUYjvhvJd6OepX0x WAaWm7p3eDlcEpllWueKzmeta8Hf9l/B0Byzq2W2zPMXeUsU/xOZz0LjrzRWI+Mt276hoCZQ6SsN 9c3xFJ05frqnnJcZ2b3ajHdHzYvRz+11Rt7Hn1U71309GUwl152vghbVJGWn9uC3fg13431+f02/ QFq+t7osbYTX70sbXjXzUV9lMpad+TqZVbObQTIenDsPd+5wW+TrOi9Kz7bKnm/77StoWWS5Skus gpKj4hHvOTH+yV3gv1EVzLVTOmS9u8n688yXjuWcnD5k0cnoheLVPm8XPi77Wc22sUrFjssOZlnH cvbgSy0uS9gd1LB2xI7LPKLmWB5yydXLQ6yv49izxY5LPnscE5f/uV7On/3Yp4xu4Z24K7xPj7eL 7/qpJrLvb39maquyKew9otKxFWLpNmMia11WSz9XXB6ttt0J9QnFZjG7mQp2XnHWhgR3F56oWvEk tGr3MnVXwRrPgVijSitKymt8vkAw2azHtqnC0Dd2JXS1ohQnlh1Zdozl2fuEvE7lFJJLPEOxPBMV SzutoNRbUpI2urysMnCWWKZExTIlTtxyOYc4cRtXFqjye8se8QVts7tx8yt2h78XR9ye0Sn23Wvi 1lK0/iuM/mLOa47lSZWzff4iD6pDlXJxaN7NOaSe00OimnsazfWcQZ35YYw3UF5SVObzhH8fdvjX ci61D7SieyWi7lz876ltD+lfz2HmYUoTAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image037.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhEwHvAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAUABQAI AeUAhAAAAAAAAE1NTWhoaHx8fJqamoyMjL29vaenp7KystDQ0NnZ2cfHx+np6eHh4fDw8P///wEC AwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwX/YCCOZGmeaKqubOu+ cCzPdG2zUK7vfO//wKBwSCwaj8ikcslsAkXOqHRKrVqvWCU0y+16v+DwcSsum8/otJCsbrvf8Cg7 Tq/b6/O7fs/35vuAgYJJf4OGh4gQhYmMjXaLd5BFkpJMBwMiBQ1MJAIKQ5U6DgaDoXGmQZQBWAoB BRALAQOcq4oCoLVEqG67vLUImTkiBASKAcQEAZsNxwakC8kBBps6cw2YnhACCBCtDBAItyIJAdk6 yQs71+Wfw8XgwTtQD9LGwqvr5PgGAcC/wSQE9WoDBVgDZqREOLi3sFUCCOQ+5RAQ4AGzd/d4DNhU DoKBWcmKDUgYYAGzW9Vy/+XYaMvYQngH66UUMeCBPXv8HDiAUiCAg1irDCK8GWigGigmiJIRMGsA yhzRDHyTpxLCgwTRIBwoOSLWwy1s5lzNSiZpSgjMZoFdtfYm0hJEARlN85ZH2VxbW3Hb4SABplln d2DauQpogFYivrU9V1Kwz7oZfbSdXAsy5MBFq+qhSK9YTwZD7+qgJ8ImY45P4xpjtop0sWgLF+dg 4AqWLBGsiX4eerazNmVAIfRcELynA9qrdtebe4a5GAWYCFDzR0qpSmDVR/c8Ru1eQL1bKH5DHHmO gqgNwLO9LiK7d1mbFFDUhxYT/XxbqOeQH2BqH+eD5ORIFQJ8Qw9gAwIol/8sEg04xQKYcOegahNW aGEYCl6o4YapaMbhhyBq4WGIJJb4xIgmpphihiq2eAiLLsa4oIw0hghjjTiegmKOPL64Y49r3ACk HD8O+Z6CcBk5RpE4moXFeiMoGaSSSYKhWZVSRtbjjUYUGWWWXDISZpddMunimKWgSeaSRqrJx5dv mGmXm2meKSeGTdA5o4p3itGnZH9aqCccgxJCBZx8Burjm1co2kihaEC6hKMdJgoipX5ygWmdG0qa ZxeeNrcpHqNm6kepeoSahaqf4vkhq1agWoasuHAI66GPNtcprWbc6gSvumjoa6uOAKuLsaLm6iCy wU44LCHMukqQs9E2Kij/octWW4W20vKSILdSgGslHeLGWi4nndo1rZjnamGruusi8uwa7855F1vC GAMXnKJNueh/r/YAliLy5FsVvgRXRvDC9Boy7w/tjjtnvm4ZPNPCCL8HCsOZARzwxBwjLLLFCZO8 Mcd7RhKxxFQZfC/GUSps3Y4qrYzEwwWTaLNkAgu0M886PwJxx0IHTe4TRB9d4s/VNPwm002bCDWT UENcddV+YDvJ06e0+POdWIMcJ5++GJoq02GDGq/Zj3x95lG/quzt22NQlUtZqcgh99orsklxyYAP HW7bfPe99d1NK4yirFjfmnbWN0cNM8o540quzY+rHfnfB6sG7NUrZ655/92cFywz5ZbHGbHoo6/J cM0Y/70qoe2y3vrWF0s+MORl6yojt9qifa7tmrL8xdfD11ituMj7/jvvph5VLvHFV99r79E/Pztd BDHfpPWRdj/r90/OTRe41IOfeuF+op8jr1NL3y2NtDZ+/vzahxv26sC/v77SyToej0olutoFb4CD Y1QAb0c/vcllgeprILE8NqtopQ96bHtgryy4pQkWZYMYlKC7XgRCBuZvcySsYAhP6LoUtm+FMfoT pfglu+29MIIixN2konY6E2qKWRfEYd7QZTd8vSxwO7yhDcmnwyQmrjyvo1AGjwfEDjbRiSRD3L6m gL4qIrBZcTNd6TqXQP8reZEWiHKa1tQYxthFUYtcVKK12ki6rrGRSHfLWGV250AzCrGOLhvY7r6E OH3lzpBEHKKw5BgrPNZFcYp74xNNpsdECq5eVPxjC91YyUoCbl8BkSIge3YpDCFrU2SMpMUKObLK wQuLLbORKZdoSU5WzJNRpGQuR/hKWfqxfI5spRFlhqiaHRGRsEQdJk9FSx8CDX9B9OAPm6lJVxpP mR/LJDD9JznDaXOO3MSmL5m5TfJlzpiykeEvwfm9c8KOh+JE2jcb6b9z7pJiGRvlqowVzUbZLo+i UVTw+DlAnJGylwnr00CpSTcnrdGVrbziPhnqNaul0XmFzKI+n0TQcHb/KJTZKyZmJMpRilb0ZiBV FjnZqbxfYUkg66SnR/V30UjEdFtW3GdKHwqqjs70VDt13kplysRIBVWAN/1fDn1xVKL21KRk28NL 45hUqn5xQU1F4VBxmlMf1RSMW+XqTxPhUEWGVaksrNBUu/lUqHrzUknqYjXfuiJIuamfTo1qVdEa w7ROc65S8+tEAQvUPaaTpYFlZF6FGjKTiVWve+Xr/FIZz2QuTYXONONaAurWRWKWsEhl63oWO85Z ZnZ8EHWjZJcZ2dXyDpefJG02TXtaoB7ydfA7qWIR21e6ttaqLfXtPEE7W6N9trbGXZKj8gnDs5az t3UU6PUgiNzSnoyH/8ckZEKP2ccSXpNuJIWjLo04ycqS9LePhS4YCcle3ZVMi1nV6nGbm9grwvZ0 5BWva9v6Xd3qkJidfGKAa2hZ2vZXuEEyJswAukrsjgpz3luqZ++HWsE6S3wVVu+FdhYqvHZ3w9jL nn+vFWIRIzhBqgufhi+cYhWPmMUlNvFlQUw7uIEXxjGWcXLxeEi87Xe3Oi6lVQfMXDq22MYn/pR4 i1zLI3MPsrhiJZObnOPp1tdyGXXZh2tsvhmnLssR5SWpeGrdCYJZtWK+nB297FL2vlOU53Vyl4Us L64BkM4O+4/9dgxTO9+ZtR/Us03xHGhBD7q4CkxZ0QAtVZ8lesIUVPD0oWkcaUlPWq2G5lSll/Vo TW+6WI0mK/U8/MxF/ytpnDb1qfuc6j+vmtWg1tG3yNrqObPr1ipln6hjTWsMUwvFvX6yoEitpTy7 eNiYdiGQZ63WC04PrpD+9GBfRexSd5q4uBbWPw+sbWiH+q9Lq7a/Ln0ocZfpyq4mUgzNXSs8bIvd KPXavB5s0PnWdWx5gjctlIe5SdWbwvyuHUr1rT8gfbWzxaYSwdt8cOACauHvzlIsn6uvf+9N4jO5 EZQsnmmMCwwFxyqrx080cuWqoOT+RrnK5bfyltvb5TAvacxnrtMb2PzmOM+5znfO857PIAQAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image038.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC42cBXRWx/a3Z2bPHJziBJcmEAheoLhLgkPQBA8a3N2hSIBQvEix4rRQoFiD0+BF ikODW6EtWgpFvufNhf//W+vr4rvtenjznjOz956992/mnHBvzx+Pnaf4J4H63UvgWhrfz0sba5VI KUlZgD/UXPFdc5DUKPe75/spiUnAn9Z3Xev4T6uTxX96778bbeLnaPOOf3xXCmg/lZDPV8Z3/T// +K7n1z7vSr3G94645/9zVasqfPpLdlXYZlJ/Smb1t16qkqjijG8IJUwh5ScRqrhUNjvtLPPU3jKX bFUZabtKjC1mn9ggd8ZGuS52lLsqWbwj0sabI5FemIR6Ij96V8xF7xtz2uto6ntFzX1X3mTx0plA L04n8xapk/bzeL8+PkTHQv4nOhP/+Ygo/eKjTKxSE5WnwnRC1Uu3VPf0eOPJCWPkH3dM/e12xN/3 8cHa/50B/d6aUSnirXkqLSPT28LqJTNnm9XG9z3t/zX732P5MHu9CtE7TQWzzm1UgbZa/HcfH2av PbHzI76z6xCdzXZWkW6L2mlSGN93H/8W+f/6ThM/OyHZ6qGrK5GV5rxN6Snzjzuqlpvnxnf9P/zH yvgdS/4lhg9WAlQZs8wkstarrY1XWH9t9tEBYnzXfXw8lkLaZ2W2Kq2jdHmoBNWgBtTWk3R9aKgn 6mYQDq30BB0BHSBSj9fdoJf+QveFwXqcHqXH8tNoPYWfpusReq4erhfqoXqZHqJX6oF6ne6vNzD6 B91bb9M9dAwWdmNpv+6kD+m2+qhuoX/WTfQJ3YDPWnyvxvUK3C/DuJKML868z5hfBDsFsZcfu0HY z4Of3PgLwK8//nMSR3aiyEpcWfCYmTgz4S0T3jISf0bWkZH1ZGBdGVhfBtbpx3r9WLcf6/fDsx/5 8CMvfro0fA5FoSDkg0AIgByQlfkZIR2k5qdPICkkwp8Dg/93KrP+R2XRf6us+jn8Sf/cVzn1LeWv 41SAvqhy6zMqjz6hgvQRqhSrCup9qojepT7TO1DzVlVS/6DK0J8V9DpVTa9RtfRq1YDPJnxvwfW2 3O/EuEjGd2NeD+b3xk5f7PXH7kDsD8HPUPwNx+8I/I8ijtHEM5a4xhLfOOIcR7xfEPcXxD+edYxn PRNY1wTWN4FVTWS9E1n3RNY/iTxMIh9R5CWK/ESRpyhd+j3/psL/7eEL8T0cqarQITXokHrQGMKh jR6kO0JXuqY3DODfobofFfX1Wh989tLRuqeeQRfN1d31fN1FL6K2S+mkFdR3Ld30vW6pN+swvRWr 26ntDmq7XQfzvTLXy3G/FOOKM74I8wozvyB28mMvH3bzYt+3tlz4C8CvP/4/JYqcxJODuLITXzbi zEa82fCQlfizso6sugqUgxJQGPJxPwCyQyb+TMf8FNhJgj0Pu5q7r1UuKhCon6q8+pHKpx+QqXt0 wC1VWF+nCy7TAedUKX1alaOSlfVxFQy1oT7fG3M9jPstGdeW8R2Y14n5kdjpgr3u2O2B/Z746YW/ Pvjti/9+xDGAeAYS10AiG0Qkg4h3CHEPIf4hrGOI9tXHx8f3kkPxe8kNFSbTdFvoDD0lWg+A4TBO purJMBPmyWS9FFZLlN4AW2Si3gn7ZYI+IuP1SRmnz8tYfUXG6JsyWt+XkfpPGaGfy3D9jwylhYZo zw7SSewAndL24wRA4Za62J46l+2ug2xXXdBG6qK2oy5p2+uyNkJXtG10VdtSh9gWurYN0/VsU93Q NtJNbKgOs/V0S1tHt7G1dDtbQ3e2VXR3W173sqV0P1tMD7AF9SCbRw+x/pAV/PieiuvJuJ+AcZrx r1Vn+0K1s09UG/unaml/V2H2N9XE3lUN7W1Vz95Ute01FWKvqqr2iqpoL6my9oIqac+povYXVdCe VkH2pMplf1Y57DGV2R5R6e0hldIeVEnsT8qz+0n6XvWP7FHPZRcn/U51X2LUTflRXZHt6rxsUydl qzoiW9R+2ax2whbZqDbAavleLYV5skHNhMmyXo2T79RwGAA9oTO0hTAIhZpQBcpAMSgAuZmXnfkZ IBX2koDF/huzUf1lNqtH8JvZom6arepXs02dN9vVKfOjOmJi1E9mp9ptdqntZo/aZPaq78x+tcr8 pJaZg+prc0jNNUfUTHNMRZuf1SRzUo0zp9VI84saas6pAeaC6mMuqR7miupqrqpO5pqKMDdVa3Nb tTB3VZghz+Z31dD8qeqbJ6qmeaGqm9eqstG6gkmgy5pkuoxJpUsb9nKTFfz5nofrBblfTFc2pXR1 U17XNFV0fVNDNzS1dBNTR4eZerqFCdWtTSMdYZrqTiZMdzUtdA/TUvcxbfQAE6GHmvZ6pOmox5lI Pcl01dGmu55peuq5pjencV+9zPTTq8wA/Z0ZpDeZIXq7Gap3m+H6JzNCHzEj9SkzWp83Y/SvZqy+ acbp38x4/chM0H+ZifoNWPSRBFKhlwyQHf3khgJQDF2VgSpQE72FQth7Pr73ropX62nVVXrqXtID lfbQw2AMTJDuOhpmwjxYLN30clgjXVBrF9QaqX+EPdJZx0onfVQ6otgO+qy015eknb4qbfUtuC+t 9R/wRFrqF9IC5YYTQJi2KC+hbaKT2saot5FOgwL9bH2dCRVmQ4U5UWEAKsxjQ3Q+W10XsZV1CdRY 1pbWlWwJXc1+pmugyNo2CBXn0vVtTh2KKhvaDLqRTcvnJ3xPwnWP+5pxb1QN+1JVs89UJfsI1T1U Jew9VQRV5rPXVR4UGWB/VTntZZXNXlSZUKUfqkxjz6K+X1RSlJkQZVqUqexxFHhUvZAj6okcVn/I IVQYq27JT+qqHFCXZL86K/tQ4l51FKXGym61B7X+CFtQ6wZYg2KXw2LZgSJ3oMgdKhoFT0DBY2AY DIBe0BXaQytoBqFQG6ozviLzykBxKIS9vBCA/eyQEX9pIQX+ExOHIx5FXP+guufmgHqM8h6aWHUP 5d00h1Uc6rtkjqpz5jiK/VkdR4GHUWAsCtxnzvJ8e07tQIVbzEW10VxW682vah1KXG2uq6WocKG5 h4IfouBHKPiZijIv1QTzRn2BAscaT482SfQo8wmkhQx8z8p1ntJMLj3BBOkolBhtPkM5JVBOab0Q NS41lfVqU12vMzyVo8qNqHILqtyBKnea+nofyoxFmYdNY33cNEFJTfU5FHrJhOs4VHoTld4zrfVD eGza6ufwj2mnFX3q6NfE9G0K+jctfZyRfs4OAfR3XihEvxeHMvR/RagOtSEUfTSDVtAefPrx8W9P 6/97Nk6LV1ss1QzjTAzT/WAwjICxwtM1TJWmegbMkSZ6ASyWxnoFrJFGej1skoZ6G8RIKMproA9I fX1Y6unjUlefkjqor7a+CFekpr4uNVBgiL4nwfqhVOfsrKafShVUWEW/kYpabDkUWFonR02pOd/8 bBHOzwKcn0Ha3wbqQM65vDYH6sui86OqgqiqkE2pC9vkfCbmu+O65v5blde+4t3pL+Vvn3JuPeLc eoh67qvUqCu5vYFyrirhvHsjF1HNefVUznJ2nVEP5Rd1jx3olpxU1+UEZ9jP6qIcRz3H1CkUdhyF HUZhB1DYHoiRg2obbEJp62ENalsBi1HcAjp7DsyAqXT6RBgLI2Aw9IOe0BU6QBtoDo2hPtSCYKjM /HJQEopitxD2gyA3/nJCVvxngLTEkwKSEl9C4hTifcfZ9Rr1/I16npkTnIUnUdhpdR8F3TZn1A1U dNWcV5dR0QVUdAYVneI8O4aKYs0NtRcVxZj7ahsq+gEVfW+eckb+pdaaV6jsrVqJklYYp5ebxJAc UvI9rV6JmlabLHqtycEZ46+/N4H6BxS1zRTQMaaI3sv5FouqjqGqU6acPoOyLpiK+rKppK9y3t2A 26aavo/SHppgzp4Q/Qy1/W1q6temtn4HQn8lpM+S0m8p6Lu09F8G+jAr/ZgTctOfQVCIfi0KJenf clCZfg6GWvR3fWhMvzeHNtABur7nw9tsKrVRf2OKyht3R/HAoxeYaZJende+6z4+jCuuFvHWO9Ym 977Tib1p5CKPLai6Gd91Hx//3cEHK+/0Nbp3MefMAjHuhjmDCn4xX8Vf9/Hx3yF8sFKSHfRns1it 41kxzp4yobayVOf51HfdxwcrHb6+85FYWrEHt7VtdQebUfbZo2aJrUTV1sRf9/HxZ+/s8fvLVHbi omY5rIJ1sB42mc/MFthhipidsAcOmMLmIByB46aQOQVnTEFzHn41BcxNk8/cN0HmT5PXPDOB5qXJ bd6ZAGPF3ySUHCapZDMpJItJI5mMn/iZzJLOZJU0JqekMrkkmckrCUw+MSa/vNH55AU76hOdSx7S K/fomds6s9zQfnJNp5E4+ukKfXWR/rrAs845+u2MfmlO04Mn9Z/mBH15nJ38GM9HR3lOOkL/HqaP D7HjH+L56ZA+aA7qA7AHdsIOE8spEcuzViynRiynRyzPX7H0SCwnSizPZLF6HsyBGTANJsNEGMf8 UTAcBsMA7PeCLvhtj/9WxNGUeEKJqw7xBRNnZeItb87pUuaCLm4u6sLmis5v4nRec03nMjf0p+a2 zmHu6czmoc5gnuh05gW8AWMymAQms0lmcphU5lOTxuQy6ci4n8lvMlGZLKa4yWZKcbe88TeVyX8w dahDPUIZ1ZT6tKJO7alXF+rWixoOYNZgGA6jqPM4mAiTqf80mEE/zIF58DUsfc9/956+wJQwS8zn ZiWsI7aNsA12mmJmHxzE0jG8nMLjOSK4RERx8d2U39wl0gdE/IfJY56wiues5iWremOyG6GTPMlg Eklak0RS0l3J+EzAd+H6W3afVzwJ/0VXPOUMf6yfmD/1H+YP/cD8ru+aB3THfc77e5z7dzn/79Ad t9ntbtEZN3lGuEFX3GA3vM7zw3W64To75nW9BBbALJgGk2AcjIDBjO8HPZnfBTvtsdcGu82x3xQ/ DfFXD7+18B9MHFWIpyJxlSO+EsT5mXmlC5q3dIGw4gSQDFKShbTUKQMZykIms5tyrL8ieahCPoLJ Sy1G1SNPDRnZlLw1J39tyGN78tmFWT3Jbz/yPBhGkPdxMAmmUY9Z4KuPj48/i8TEV7M5T2+5zQbY DNvovBjYQzQH4BCRHYMTdOUvJifVzEk1c5hr9OMdk5VKZmJv8DNPWdELk9q8MinMa1b5xiQ2b1nx G1ZOBFx/rV+Yl/opWfnTPKNij/UdsnWNzF0ig+fMb+y49/UJOAaHyO4BsryHbMfANtgMG2AdrIJv YBHMhzkwg/HTmDeZ+RNgLIzC7nDsD0ZzA/DVD3rjtyv+OxFHBPG0Jq4WxBdOnGHEG0bc4ayhNeuJ YF2dWF9X1tmb9faDAax9MFUbTh5GkQ+eXs0E8jOZPE2DGeRtDswnj4vgG/K6Cta950PeG+v2uplu p1tCG+gAkTpCd9dtdS/oB4O4M1S31iNhrG6lJ+oWepoO17N0Uz1PN9YLdahequvrb3RtvVLX0Kt0 db1aV+GzIt/Lcr0U90swrhjjizCvIPMLYCcIe3mwG4j9QPzkwl8u/AbgP4A4/InHH+/+xOdPnP54 88eTP578dTBUhQpQhvEloRjzi0AB7AVBIPZ5etQ5+Ob73Vdm7qTDf0pGJWN0YuJKQHwecTridcTt sYbEeEnGulLiMR3rzMx6s+rm2GkRH00geQgiHwWgCBEWI08loQxUIH9VyWMw1Ib64Muzj48/C5yM r0oH1cD9phq7+yocWkN76Ozuqe7uruoDA3giGeJuq5Ew1t1UEyDK3VDR7pqa7q6qObDAXVFL3UW1 0p1Va91p9Z37WX3vjqqNjqdWd4DP3Xz/ketbub+ZcRsY/y3z1jB/FXZWYG85dr/B/jL8LMHfEvwu xv9i4viaeL4mroXEt5A4FxLvQuJeSPwLVS2oDpWgHJSEYowvBPmYnxs+xV42yIx9P/ykxV9K/CbH fxK3WiUgFuvWKkNcb+wG9dJuVs/tVvXM/qie2N1wAA7y/SjXf+b+acadZfxF5l1i/hXs/Iq9q9i9 iv1r+LmBv5v4vYn/28TBezf5LERei0FJ8lyOfFeC6lALfPXw8fFnsA3x1WusmuKpuYsjI3EqAjpC F6LoQTS9oT8McpfVMCIcSaRjYZI7T7bPqplU6it3kir8rJb4/g7G/URldvO5ne+buf49979j3DrG r2HeKuavwM5y7C3H7jfY/wY/y/C3DL9L8b+UOJYSz1LiWkp8S1Uo1IWaEAxVoALjy0JJ5heDItgr AEHYD3QrVQC+ckJ2/GbEfzriSEU8nxBXYuJLRJyJifcT4k5F/OlYR0bWk5115XTnmH8eOxewdxG7 F7F/CT+X8XcFv1fwf4U4fiWeOOKKI7444oyLz6eP/047n9qZvAHOVPmgsJ2hikMpKG+nq8oQDLXs NFXPRquGdqpqaqeo5nayam2jVISdpDraiaqb/UL1sWPUQDtSDbXD1Ag7SI22/dQY21uNtd35jOR7 B6635X4rxoUzvinzGjE/FDv1sVcPu3WxXwc/tfFXC7818V+TOGoQTwhxhRBfCHEGE28wcQcTf7DK Cn6QBj7hfmLwQDPvjdRUf8MzqcWba23eXOvw5lqXN9d6vLnWV3ESqi5JQ3VeGqkz0oS316bqmISr Q9JK/SRt1X5ytJfnp73SHXrzvR/XB3F/GONGMn4M88Yx/wvsTMDeROxOwn4Ufibjbwp+p+I/mjim Ec904ppOfNOJcwbxziDuGcQ/k3XMjK+Hj/9OO/5kPhDyQUE7Tn0Gn0MpO1aVoyKVoKodrUKgph2l 6lKhRnaECrfDyfgQ1c4OpAL9VRfbV/WkUr1tJ9XLtufnNqq7bcn15txvyrjGjG/IvAbMr4edOtir jd1a2K+Jn5r4q4HfGvgPIY4Q4gkhrhDiCyHOEJUNMkF6SAMpIAnjE4JlvoY3VOkVVXpBlR5ToYfS QN2hOtdZaxyVucwZfEFaqnPSRp2V9tCJn7tzvS/3+zNuIOOHMG8480dgZyT2RmF3NPZH42cM/sbg dyz+xxHHOOIZR1xfEN8X8fn08fG/vx0Yn/1SKsAOVkH0eiEoDqXJZgU7gIz0JzP9VB2yWh8NNLQ9 VROyG2a7qRa2s2pJhluggzCy28SGcb8p4xozvhHzQpnfADv1sVcPu/WwXxc/dfFXlyjrqgyQhuuf QGLGOcYr5r2hh1+Sqedk6omEqUdk6yF9/JBMPZTOfO/G9e7c78m43ozvy7x+zO+PnQHYG4jdQdgf hJ9B8evz8WG9ddxxdphj7C7H2BmPqbbsXB3cERXpDqtu7pDqxVnZlx1tAOflYLePHXYvO+1ONcrt 4PMHvm/k+gbuf8e4bxm/jnlrmL8aO6uwtwq7K7G/Ej8r8bdShUAVKAeluF8MCjO+APPyMj83dvyx lxO72bGfBT+Z8ZcFv9nxn5M4/IknN3HlJb4CxFmYeIsRdyniL8c6qkAI+Nbn4+Pv653is1FE1ZUk OhSaQJgk1q2grSTUHaCzJNBdxdO9RHQ/0XqAvFED5ZUaIC9UP3mmeslj1VX+VJ3lD9VBfldt5aFq BWHyQDWBUKgLNaAaVIRy3C8FnzP+M+YVZn4QdnJjLwC7/tgPwE9u/AXhtzD+PyOOz4mnFJQjvopQ jXhrQN33dI3//cNm9c6w04jVjjEJJRnv9Z/wfp9Kp5M0OpOk1TkkvfYXP50bgiSDLiAZ8ZFRF5NM ugSUkcy6AlSBYKglWXQ9PkOhCYRDK8a1hQ7Mi4Se2OqP3aHYH42f8fiLwu9U/E8njjnE85W8U3Pk pZrOOqey3ijWPZ48jJbf1FC5p/rLHdVTbqtIuUUub5LLm+TyhgqHJhAK9aAWhEBVqATloARji0AQ c3NhI4fcVZnlvkrEtaTc/wRSyTWVDjLKVZVF4hgTx9g4lUeuqPxQWC6r4lAKykElqA61oD40huaM aw3tIVJ4tmF+HxiIzaHYHoWfcTARv5OJYxpxzGBtc4hlHutcyHqXyiO1Up6qNdT6W2q9Xt6qDdR5 PXX+llytkeR6JflbSi4XUp955HcOOZ8hWfU0yaYnS3Y9UXLqcTBK/Ml5gB4ouXQfya17SCD1yKPb Q2vJq5tLkG4M9aEWVJd8uhKfZeBzKAL5GRfI+E8hG/MzYicd9lJiNxn2E+HHgcHvW5NN/2Oy8j6Z WT8zGfVjk0E/NGn1PZNK3zLJ9Q2TmPdKDwTeqpvmlbptnqvfzGP1h/lDPTe/qb/NfVR5lz69oyw5 Sk9eUpGXZGghEbnxyI2iT3x97OPDb+d8Y331zMCnr7bp0FJi5vqu+/jw+/0x7rhMcMdkCnwJc2C+ OyqLYTmsge/cEdkEW91h2Ql73UGJhSMuVk7AL+6AnHf75bLbJ9fcXrnl9sg9eOh2ySN46mLkb/jH 7ZB3bruIt1U8SOz9IMm9zZLG+14yet9Jdm+tBHirJK+3XAp6S+Qzb6GU8OZLaW+2lPOmSwVvqlT2 oqSKN16qeWOkujcChsAAvvfhenfuRzKuA+PbMq8V88Ox0wR7odith/3a+AnBXzX8VsY/u4NXnnjK EVcZ4itNnCWJtwRxf078n7OOYqynKOsqwvqKsM7CrLcQ6y7I+guShwLkIz95yUd+8pGnIPIVRN7y kr+85DEv+cxDXvOQ3zzkOQ/5zkPe88gYGA6DoA90h87QDloxLxwaQX3s1YJg7FeG8vgrhd/i+C8M +YknkLj8iS87ZCZeP+JOQ/wpICnrSci6HOvTroy8teXklS0vL2xFeWYrySNbWX63VeU3W01u2RCJ s7Xloq0nZ2yonLRN5LgNl8O2lcTatrLfdpC9NlJ22+6yy/aBATAERsAYro/nfhTjpjJ+OvNmM38+ dhZibwl2l2N/FX7W4u87/K7H//fEsYl4NhPXD8S3lTi3Eu924t5B/DGsI4b17GJdu1jfHta5h/Xu Zd37WP9+8nCAfMSSl1jyc5A8HSRfh8nbYfJ3hDweIZ9HyetR8nuUPB8l38fI+zHyf4w6HBOfHnx8 OA1Hjhz5kd+B77IV4lcd4r6VJ24lnTgYyst/rleQj5+p/6vBafRCND0RTW9E0yPR9Eq0LIHlbqqs hfVuimyGbW4yPTaZXoui5ybJUTjhJsoZN0EuuPFyxY2T63DLjZX7bgy9O1oeu1Hy3I2Ul264vHbD RHlDxaKbBESbxBuIBgaghb6SyeuFNrpJLjQU5HWUQl6EFPVaS0mvhZTxmkl5r6FUQkNV0FBVNFTd qyrBXgUJ8cryWYLvRblekPv5GBfIeH/mZWd+Fuz4YS8tdlNiPzl+kuAvIX4d/oU4NPG8M9Z7a5T3 xrx2/5iX7pV57l6ax+5v89D9Ze7DLffMXHdPzRX3xFyAM+6ROQFH3Z8mFva6381O2Aab3UOzHtbC cvfALIH5MAe+hCkwAcbAcBgEfaA7dIZ20ArCmd8I6kMt7AZDZSiPv1JQHP+FIT/xBII/8WUnzszE 6wdpiD8F60jKehKyLufeGO3emrf2nXllNT0v9L5FAw4teGgiIdpIgkaSo5WUaCYt2vFDQ1nQUnY0 5Y+2AtFYPrRWkE4rCiWg7PvOq8r1EO7XZlw9xjdkXjPmt8BOa+xFYLcj9nl6sN3w1wu/vfHflzj6 E88ANDgQDQ5Gg0PQ4FA0OAwNDkeDI9HgKDQ4Gg2OQYNj0eA4NDgODY5HgxPQ4EQ0OAkNTkKDUWhw MhqcjAanoMEpaHAqGpyKBqPRYDQajEaD0WgwGg1Gi08PPj7+O/568epZoca63qinl0yGaTAT5sIC WOJ6oqCesgrWuR6ywXVHRd1RUXeJcd1kDxyAg64LSuoiP7tIOe06y1nXCTV1RE0d5arrILddO5QU gcbbcDK0kjeuuRgvjI5tIkm9RpLCa0An1xM/lJHJqyE5vCqcNOUkN6oI9IpAQX4OovMDuR7A/WyM y8h4njO9NMxPiZ3k2EuK3cTYT4AfD3+CX43/d+YqHXOFzrngXpuzdNFpuulnuuooHKTDDsAe98LE 0HHbYDNscM/NOlgFy2EJXbkA5sJMmAaTYQKMhZEwBAZAH+gBkdABIpjfCsKhMYRivy7UhGD8VsF/ BShLPCWhGPEVIc6CxBtE3HmIPyfryMx60rGulKwvCev0XGK6LKm8odv/ptuf2TTy2KaTP2xGuWez 0aEBcpNuv2GD5Drdft0W4ecSXC/H/SqMq8H42syrx/wG2GmEvSbYDcN+c/y0wl8bujVCclLHPNQz iLoWhCLUuRj1Lkndy1L/ClCFfgiGmlCXPgmFxhBO/7SijyKgA0TSXz2gDwyAITASfP3o40P33rlz 51/2/sD47p3Om2E7GQajYCxMgCgijYbpMBu+cm3p5jayCJbBCtdaVsO3sAG2sMIY10L2sdpDLlyO u2Z0cRM6uLH86hpyHjSQO66e/ObqyB+uFl1Vg/MgmA6rynlQmfOgHOdBSZ6BitKBBfnMw/dPuZ6V +xkYl47xaZiXkvkpsJMMe0mwmwj7CfDj8Cf41fhXxPGOLnxjtlD5DfAtnbAaVtAVy2ARLKBTvoLZ MJ3uiYYomABjYRQMg8HQH3pDd4iEjhABraE585tBI2iA3ToQjK9K+C0HpaEEsRSDAsSVh/j8iTMb 8WYg7rTE/wnrSMJ6ErAuYX3v6MJ/6MK/6cK/bAa6Kyv746fywOaBglCU7yW5Xo77lRlXlfHBzKvB /FrYqYO9ethtgP2G+GmMvyb4bUb3hUsB6lSMepWA0tSuHFSijsFQh/o2gEbQjLo3p/6tIQI6QiT9 0R16Q38Y/J6P/97zw9+HTkET04liLnwNy2A1kX0Hm4hyO+wi4v0ulD2xARVtIKdYyVlXVy6xqjhX W264muxHITxdBLM3VaMrKtEh5XlqLiVvXXG6pohorwCfgXz353o27mdiXHrGp2ZeSuanwE5y7CXD bhLsJ8JPQvwlwK/DvyUOIR4hLk18mjgV8SriVsSvWIfiiUnJFzASBkNf6AGdGd8OWjG/GTTEXl3s 1sB+VfxUxF9Z/JbEfzHiKEw8+YkrL/H5E2d24s1M3BmIP70LhAJQhO/FuV6K++UZV4nx1ZgXzPwQ 7NTEXm3s1sF+XfzUw18D/DbAfyhxNCSexsTVmPiaEGcT4m1G3M2IvxnraCa++vj4+O9BP/wWeyIe psJ0mIPHBbAEVhDBWiJZD5vox61EFoPm9xDlAaI96Kpz2lXjubEqmefNndVc5Z3gFu8Hd3ln+I33 iAes+CHvHQ9cAN9zcD0r9zMyLj3j0zAvJfOTYycZ9pJiNzH2E+EnIf4S4NfDv0ccjngscVnis8Qp xCvELTIRxsJwGAR9ud8DIqED89oyvwU0w15D7NbHfi38BOOvKn4r4b8clStNLCVcKiqQRgoRXz7i DCTeXMTtT/z+rMOf9eRiXYGsLx/rLMR6i7HuEq4C8ythpzL2qmK3Gvar4ycYfyH4rYH/msRRi3hq E1dt4qtDnHWJty5x1yX+eqyjnkx8z8e1uC1+57+kmtgjtqU9bNtBF+gNA+0hO8IetONgMky3sfYr +5NdZA/Y5bDW7rcb7T67ze61u+wevu1m1k57wsbYs/ZHe8lut9e4e9tutQ/sFvvIbrbPmfHKbrDv 7Hpr3bc2oVtrk7nVNpVbZdO55TajW2azucX2U7fI5nYLbJCbZwu4ufYzN9sWczNsSfelLeOm2vJu iq3qJtiaboyt64bZUDfQNnF9bLjrZpu7jraVa2tbu+bQGOrxvQbXq3C/PONKMr4o8wowPw92/LGX FbuZsZ8RP+nxlw6/qfGfgjiSE09S4kpMfAmJ0yNeR9yG+BXreMtu+5qn1Ffy3L7kyfUFu/Jfcts+ k2v2iVyyj+WsfSQn7B88+f7OU/BDnoofyDZ7XzbCWntPltu7ssjeka/sbZlub8lkGAcj7E0ZaG9I b+gC7aAlNIF6EAKVoDQUhfyMz828HJAR0mAvGXYTYF/j5x+5L8/hT3nAnw/lpvwuV+QPOS+P5JQ8 lmPyRA7KM9krf0mMvJCt8lK+l1fyrbyWlfJWlomyi8TYeeLsLPHsl5LQTpbEdqIkteMkuR0lKeww Sc2zejqe3dPzPp7R9pDMPNdn5Rnfn/f1PDz3F+D5vyhPRiV5QirPk1IVW1dq2DqsqI40huZ8b8v1 jtzvxrg+jB/IvGHMH4OdCdibgt2p2P8SPzPwNxu/c/E/jzgWEM8i4lpMfMuIcznxriLu1XYZ2V4p 39pvZT3v+Bt4r99oY2Sz3Stb7EHZao9RlVOy3Z6XH+0ViSGbO6nQbvun7LHPeYf5R/ZZTacnoP+T QRr0kBFd5EAfuSE/FEU3pVFCJQiBeuDTl48Panzy+ty/7KXp4vfSRKoO2fVlYZNMs43tOvvEzo3v 5LZO7H/uOfvf6roPuu6Drvug697x/w60vdB1L3TdE133RNc90HUPdN0dXXdD111RaVeUG4muI1lt J1bQEV13QNft0HUEum6Lrluj61bougW6bo6uw9B1U/TQ2CZyjWxyF2pTu/o2vatrM7la6KeG9XfB 6KkauqpsC7qK6Ky8Le7K2FKutC3rStiKrrit7grbWi6/re9y20Yuh22KLpujxxZosTUabIP22rp3 0sa95GnkKbvh7zyZ3JOm7gZPKr+yU55nxzwt1d1xzr6DnIEHeAPcx5vgHvnM7eJZ+0eeubdLbreF nXgzT0MbJZPbwJm6XlK7byW5WyOJ3GqxbgW6Xo6ul6HrJeh6Ebr+Gl0vQNfz0fVX6Houup6Nrmeh 65noegYdNJ2u+pJOm0bnRdOJU9H1VHQ9GV1PRteT0XUUHR2FrqPQdRS6jkLXUeg6ChVEoesodB2F rqNQShS6jkLXk9H1ZBQ1GV1PRddT0XU0ipyGQr9EtdPR9Qy5JzPlhsxC17PR9Vx0/RW6no+uF6Dr r9H1InS9BF0vQ9fL0fUKflrNnTUyjyuzZL1Mkw0yWTbKBNksY2WLjJTtMkx+lEGyS/rJHukt+6S7 HJCuWO0gx6WNnJbmeGsqv0oo3usTRV32ljryVGqxh9SSd+Dr3MRoO4Wtz/4Qyr7QlBU1Z2VtWGEH KWy7SnHbXUrw/l/a9pMydhD7wzCpaEdKZTtWqtkJEszqa7DiWmS8LrquT0VCqVAjdN0YXTdF12Ho ujm6boGuW6Hr1ui6LbqOQNft0HUHdsqO7Iad0HUku3QkO3dXq+j5BPR/MnSQBj2wc6Hrnui6J7ru ha57oeve6Lo3uu6DrvvYJu/5+DPS4ng1/qzCmNcK2kGkDcZ+sO0Hg2GErY4iq9tJtpqdBrNsVTsP FtnK9htYg9/1sNlWRJkVOGfLc/aWY+8pY4/CSVvKnrEl7UVbwv5qP7fXbTF7h5jv28/s77aIfWwL o9JC9qUtYN/YfFa5vCg1EKUG2BQup03LCZiJ0y87Sgvg5MvDqZcPtRXktCvCSfeZe8MzyktU9Fw+ d4/4fMD3uyjqBm+ucajqEs8y53inOC0B7meeSo+gqljeOfZLCrcbRcWgqG2iUN0b+4O8ZHfjaYD3 lg3xv3O9T+3u2HW8Ua+RX+1quUg9z8BJFHjUfiOx1HifXcp+vASFLWbPXsQevkjW2IXyDSxClfNQ 5SyYRl9MQp3jYAQMhn4otQdEQjtoBWHQEOpAMFSGsvA544tAfgiEnNjLgl0/SIWfZPhLCBb/b1HT S1nMqcoOIUs5V5fJXfkGDSyXOLR1Ec6irlOo67isk8Mo7CcUtg+F7UJhO2QTavyBP7dwZRsjdjA6 Bk3uxNJuWSj70XAsuj4i0fKzRKG0CXIOVV6S0XgYiacReByO5+FEMJxIRhDRSHnDfYNqPFSTmP0j OXtFavandKwwI9FnJaM57Qr5lGwHkPncVCKQquRFPfnsDk7pXVLI7kOVP5GNw/KZPc5edEqK2bNk 6CIqjeMEvyGleLYow/NMGZ5xynFKlucZqIJ9i2ot/ZoQktG/qcCPfs4COenvQMhPvxeBz+n/slAZ fP/WQR8NIew9/6OuY/921n34zXUdOr8BNIFwaAPtsR0J3aEvDEQVQ2EUyvgCJqGOaJhBHHNhPipZ jEq+QSWrYB0xbkAtm20QqsvLk20ennIDORN9p30uTnR/+zOcZk1n2S0u26woLzPKy2Af2nSoLhWq +4SzMal9axNZzdllUVMCnhkTuVe8mf8lSTnDkrk/OXce8nmP77e4fpX7V3h7v4Bqzop2p+St/Zmz 6AiqOYhqDshDdrc7dieK+VEu222cRVvktN0sP1PDIyjrIPXcj7J2o6wY6rsNNqOuDbCOmq+yq1DO Sp6SVsh8VDYXZqC0aPpiEkr7AkbBUBQ3EMX1he4QSde3hzYQDk2gAdSBEKgM5aEUFINCEMS83JAT smDPD7tpIAUkwV8C/Ar+36KaV/T+c1TzRFZxgqzmOXWN3IYbaCMOLqGg8yjoF/RyAgUdQzuHOadi UdB+tLQbFcVwXm3nvNqEir7j1FvNWfUNZ9ViVLQQFX2FHmejyxlygVPzCufdVdR1S6Zybk3luXgq J2k0Z9c0noOnE9EMIpuNmr7iDFsoiVhFUiL+hCymst+hqE2SwW7nPIthdbtR1n7JbmM52w6z4mM8 956AXyQX509uewmVxfEcfAOl3SYz91Hb7+w1T1Dcc3hFxt6iOqEfE0AS+jMFpKFf/SAL/ZsTctPP QVAIikEp+r08VIYQqPOej/+9T9N49axR4XR6Szq9LXSELtAD+31gAAyFEShgDIxHBVGoIBpmEMcc mA9fo4ilNoCnSH+7GtbZT1FPTtSTg3fA7JxZZAZ1HOZsPYlCzqCQSza1jbMp7S1Ucg+VPEQlj6xn n7L+v+0bzooXPIU9QgEPODvu8vMtlHCN67/K3/acPGVHesTO9NAelXv2kNwi73Hk/5Ldw/mxi/Mj hqez7ShhK2fHDzzjb0IFG1HBRlSwgXeCDTylrZel8DVKmQ9zUMoMiLZrJQrGo5gxMAKGwgDq3gd6 QBfoCG2hJYRDY2gAtSEEqkJFKAslmV8MCkE+yIP9AMiBv6yQEf/pIBXxfAJJiC8hWOLV8JaefkW3 v+DMeEbHP6bjH9Drd+j5a5wol3k6O4sOTqGH43KIf49y3hznvDnFiHOM/JUZ15h5C+7CA3jE9Rfc f8M4Yb/3yGQispqU7H7Cfp/SXubsuEZkd+j0B0T5mG5/Rre/IOpXko2Ozc6bUQ72/Jzs+Z/Stf5U 1J/9L4Aq56Liual+bkbk5kogHRRIh+Whe/PSvXl5cgniDAji6SaIEyKIDs5na0MDaAy+/vTx8b+H 8Yvv5kmqtc3EW0pGOjkj+39Gnuoy8hSXkTMgI92cwQ6BkahpvE3PGZDeToFpxDkT5qG0xXTlcmJf S2euZx0/2OR2O925m3Xtp0MP0qFHWOsJa9j7FXv/G7nA2+Flzr6r5OUmT5a3UfYdFH7bXuX7Ja6f 4f5Jxh1nrz7KXn2Yd4eD7NUH2Kv306F72at38/a5U36ga9dzBq+lc5fTuYvZ2+ext8+EaXTwFDph EoyHkXTHEBgAfaEndINI6AgR0BqaQ1NoBPWhDtSA6lAFKkBZKMkTdHHsFoIg/PlDVvz7EUdq4klO XAmJzxKnIt5X8b8t2M9+fYBd8yD9dJhd9Ch79nH27JPs2aybXfsCe+wFrl5gR7/MyDj69wZPKrfl H8a/YZ4ia4Z90Nq/6MBXdKAi35a8JyT/yalDaurhR12y8pM/dQqiXoWoXXEoCWW5W4HaVoHqUIN6 14H60AiaQnPw9YePj++Nb+Pfx4ep+ax8Ck9CPHFLQU7hYlAKKkA19vaaUJ/KNkYt4fY02f6FZ8wz 0hm6s0f1Zt/vby/IILpgOEoaw941ga6YbK9TzVs8s95nz/lTZrP2max9Ol0UbV9T4XecwppOFd4R PNuf84B3DfblhLyrJLKdbWKecBKzZydh707K6pLZUKhNroLJViUoC59DEc6QfHzmhpyQFTIwLh2k Yk5KSBKf6cR4SgQJ+Nfjmy//wmhhnNi0kAGycj1bvNodenYo2POpk+enBOg5IedOIt5KEnEiJeJE SkQ1EttafNaHJtCcMW0Y2555kczvjq3eqKkfNR/IuoegqOHkYQT5GE5ehtg/eAp5SB4fkM/77L13 2Xtv0+G32Ht9vxW7Tndf5V0wjn33V7r6V+pzhTpd5qn1MufqZc7bS5zBlziTL7FjXZJMPMWmh1SQ HMpT5/nvORNf+07qpCshB1xVaR1PZWnvKkikKy89XVnp50rLIFdShjFmlCsuX7iiMskVkSmusHzp CspMV0C+ckGyyOWRpS5AVrhPZbXLLutcVlnvMsgGl47PVPKt+0TWuKTcTyxLXEJZ4BLIXOfJLJgO 0TABxsBw7g1yiaQPY3syp6tLTjypiCuVdHTJpAv3ujGup7OMEenvDOM1Mfr+ZuKdGQvj3Vsz2b0x 02AWzINFsIzrq7i/DjYwfjPztmFjJ/b2YvcA9n9yKflMDem45ie7XUaJcZllB2va4nLIJta4nrWu dblZT17WnV++Jg/zyMcc8jKT/EwjT1NcMXJVnHWVkLHkcCS5HObKyBDyuhLWwUbYCjtgN/cOwEFX So4y5+R7Pij42LFj/3IeBMZXMZWKIFstibwtWe9N1P1cCqJJTDVSU51PyWJJCaeq4S5YgqlyYSIr 4PylLPdDybJvvo9U8fYSqJauGhUKYcUhRFuH6OuK75qPj/9da/Z4C8lVLHU7TjS7XC7yU4wcF5Uj rpBc4vMYPXaLCO7RNzfI72mXRnzjfXz8934f/otUAd49Ewj5oCAUhc+9u6Y0lPPumEpQFUK826YW 1INQ75ZpAmHQEtp5N0ykd9309K6a/l6cGepdMaO9y2a8d8lM8S6YL71zZrZ3xszzTplF3kmz1Dtu VnhHzWrvkPnWO2i+9/aaH7wYs9XbarZ5G/lcx/eVXF/K/YWMm8f4ucybzfyZ2JmOvWnYnYr9yfiJ wt9E/I7H/xfEMZZ4xhDXaOIbRZwjiXcEcY8g/hGsYzjrGc66hrO+4axzGOsdxrqHsf5h5GEY+RhG XoaZAMgBWcAP0kJKSA6JIQHzBd654eY1/O1GmOfwBP5wI80DN8rcg1tutLkOcW6MOe/GmtPuC3PM jTexbqLZ66JMjJtstrqpZqObZr51080aN9OscLPNUjcXxc0zC9xCM8ctNTPdSjPdrTNfuo18buV7 DNf3cv8g4w4x/ijzjjP/JHZOYe8Mds9h/wJ+LuHvMn6v4D+OOK4Sz3Xiuk58N4jzBvHeIu5bxH+L ddxiPbdZ123Wd5t13mG9d1j3HdZ/lzzcJR/3yMs98nOPPN0zAe/5N7X9v/+f7i/dFFay2bwiyoF0 hq/6O6jof65P+f/8/8tLxPfwPHp4D7XaQ832ULs91HAPtdxNTXdT213UeBe13kXNd1L7nfTATnoh hp6IoTd+pEd+pFd20DPbTTdvm+kFfenFATDU+4He2mQmeN/TaxvMdO87em8dPbiGXlxllnkr6M1l Zo23hF5dZDbSq1u8WawkmpVE8TmO7yO4Ppj7/RjXm/E9mdeN+V2w0xl7HbHbHvsR+GmDv1b4bYH/ 5sQRTjxhxNWM+JoRZ1PibULcjYm/MetoxHoasa6GrK8h62zIehuy7lDWH0oeQslHKHkJJT+h5CmU +oRSq1BqFkrtQqlhKLUMpaah1DaUGjek1g2peUNq35AeaEQvNKInGtMbjemRJvRKE3qmKb3TjB5q Ri+F0VPN6a0W9Fgreq0NPRdB77WnBzvSi53pyS70Zjd6tCe92pue7UfvDqaHR9DL46h4FJ/RfJ/F dV/PL2LcEsYvY94K5q/CzhrsrcPud9jfgJ/v8bcJvz/gfytxbCOe7cS1nfh2EOcO4v2RuH8k/hjW EcN6drKunaxvJ+vcxXp3se5drH83edhNPvaQlz3kZw952mMC3vPx393ei+/p3io33ZEfPoOS3lpT HqrSLTWgnrfaNIZwdrfWdE57b7np4n1jetBBfdntBnmLzXAY5X1txnkL6IZ5ZrL3lYlm95vO7jeL 3W+ON8PMp7sW0V2L2fGWsNstpsMWeUO4PoD7fRjXi/E9mded+V2xE4m9TtjtiP0O+GmHvwj8tsF/ G+JoRTwtiasF8bUgzubEG07c4cQfzjrCWE8Y6wozucEfskMWyAhpIDnjEoCB13TCCzrhMTx0Lc0d OuIGHXEFLtAVZ1w7c9J1MEfpjEOukzngIqlkV/MjnbHF9aHCA8x6N4Rqj4CxMJ7vUVyP5v4Mxs1m /FfMm8f8Bdj5GnuLsbsY+0vxswx/3+B3Of5XEMdK4llNXKuJbw1xriHetcS9lvjXsY51rGcd61pn cr/n307n//d/m5KV6n1K9QKhAHwGJahkWajEnlAdalLReuwNDalqU86zFlS2jTefrM8znaluV6rb g+r2Zt/oT3WHcLaN5GwbQ4W/8CZQvbFmIufYBM6bL7xBXO/H/d6M68H4rsyLZH5n7HTCXkfsdsB+ O/xE4C8Cv23w34Y4WhNPa+JqSXwtibMF8bYg7hbE34J1tDBZwQ9SQzJICAJvqOJLeOZamz/hAZW8 AzeoZhxcoqLnqegvVPQEFT2K3g9R1Viqusf1QKu9zTb0vsUNMpvdMBgFY/k+geu+828q46Yxfgbz ZjF/NnbmYu8r7M7D/nz8LMDfQvx+jf9FxLGYeJYQ1xLiW0qcS4l3GXEvI/5lrGOZ8dXHx8ff37bF VzNM5aM6haEYlKRKZaESVKNaNahWHahPxRpBU6rWAlpTuQjoSPUioQdPJ32p4EAqOJQKjuIEGMMT yChOgKFeX6734n4PxnVjfBfmRTK/M3Y6Ya8jdjtgvwN+2uOvPX7b4b8dcUQQTwRxRRBfBHFGsKNH 0KsRVC6CVUbQyxEmHaRkfDJIzHwPDPbeUp1XVOcF1XlKdR5RnT/Yke+xI9+kQnGul7ns+ppz7Mhn eXI5x458mcrEUZmbVOYeTyV/UJlH8JTqvIBXVOgtGPLhQWLykwxSkq905C0jZIVPyWduyPeej/9u ZnF8NeqovGQ1PxSGYmS2JJSBClCZnbA61EYvoWS8GRlvxa4YwdNDJ7LeBd30YHfsyzNgP3TT1xvI 9z5c78X9HozrxvguzItkfifsdMReB+x2wH57/LTDXzv8tsN/O+JoZ/JCAOSALJAR0kFqxn/CvKSQ ECy2DLwj0y/J8jOy/CdZfkCW75DlW+xwV91AMjuMz9F8H8/1CdyPYtxkxkczbxrzp2NnOvZmYHcG 9mfiZyb+ZuF3Fv5nEccs4plNXLNN3vd8vNeD47ObU71zQ6lXZ+rViVWPZPWj6bXRPEmMpu9G038j OQuG8pQxLD7zJfBchiyXo6/Lk2Uf5ch0WW8STxoTuT/BpCfLqTmDUrBDJYdkkISeT8RnAvC8/qh0 oNHY9fn38fF9tkB8tGlVAur0DyfCO/YNy16YGEtF4r1Gm0JEloA8OaIzfH9Nx74gj495tn5IXu/z rH0P7nCq/E0dfLZ8+MfbTqHSk4W81Ks217oSXXdW35qVVSHn9eihcPyFc7o2RMG14zM1gnx3N755 Pj6e7w//FeMRpqJObjrqrmai3mS6aN93Hx/u35JdKrn9ThW0W1RCezj+u4//0cqDr/4lP7niZ6dU n9stktYelcT2smS116SNvSu97SPpYd9IFetsDvtOEti38laEO88kTq7J73JC0thd4pvr44OtcjaN 7Ws/sXOsscvsPYmyZ6UatqvbWJluD8lSu0NO2+MSZ2/LMWwus8nsUOa0sOmtb66P/+6/6TSOCo10 W8xU3lQG8VaSzt03ITzB+a77+PAWvd6WkXV2iHxpR0onO1Bm2gbiu+Yj/j8Hrv4PXQystzhcAAB= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image039.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhNAAmAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAAAAQAz ACQAgwAAAAAAAGae5oCAgIe6oavPvbre9czMzP/MAP/rmfL81ubm5v///wECAwECAwECAwT/EMhJ q73S6I27/5QRMEQZBJsBrp52nkzMjC/Hsu4rF3zPy7UbZvPSAU8+XqBEmJ2EmRxDQKUWmbNkoQhT gYjGsOA0PjUDyRjM2SECd9sRgVutIgvqkXNeSYliTE0+RnNrMXVla2ZPFE5FMmqDXEd6h1Z5JnyN eZOSL0pccSN2e3OFfZWTMVqsPWpTVkuFhQGohqoMPUVpjrBjmbO1ISa3k3JMSJwzvkuyi8ITIs6K qoHLRst207R9wLSc2MpHvo7EKN3E5pRc2I9VpTUaqMjIxbjw5NMBCzH8IyoGTKVTJ44TsnyTFugI cABAwFnevkHCVA/hCQMHDhTJCNCMQIi0xFJ5DIbQQAxpReShjCjL3ItALUcJ6LWg5gw/HV96G0kL ZsU8NTNmvOYlxJWPSGHGnMNJYcZH5y4cDQQyYr1/a2zmKWphasuPS81tGDCAXQCyXC2spGqOHlME cBHkIUuXrrwWU9nCZIBgRAJINLjY+IDyq94RfRP8naE4AY20NwrrPdjXiOIAclFAjpz3KmK4J+Ru 3cxZZz0FCswWQX0XilHTL1DL5iKbNWkhOQSLqM1b9mDXIQpHzc0uBfAhKIviXH5bQgQAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image040.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhHQAmAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAAAAgAd ACMAgwAAAAAAAGae5oe6oavPvbre9f/MAPL81v///wECAwECAwECAwECAwECAwECAwECAwT3EMhJ q7Ul3L1LDiAneiCInIRYeV8ZnKemsqZg2+4wdGQZm4iAADSUSWiwF4pgGriENhbppNMhCFgm0An8 uWCxrPbrTT5f4if2TMiYfUuxXN56d7Mu+amggwefQQhVXAQ/H31AZ1RVgT58TlVwimB+j1yISn9n fhoZkZFdm5SdkIigmX6aO48gn6dgZlUAh6WXmKitfbMlfYMBvk++qzm9pqfCO0fEv66DxskTxM65 zToW0szFtcwXLc7HxUYr0t++CAYcLdnlTufiGOTfLwbv3fG3CCrKvMAHByH6dvHjEsCfv4BH1JUg cRDhLIUFEtab0SJiwgIRAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image041.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhxQBSAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAgDA AE4AgwAAAAAAAGae5oCAgIe6oavPvbre9czMzP/MAP/rmfL81ubm5v///wECAwECAwECAwT/MMhJ q7046827/2AoikA5nmiqrmyblYDEzHRt33iu73zv/8CgcPiTwGTEpHLJbDqfNclgioRar9is9ial BrbgsHi86w6q5LR63TSj2fC4HOf+zu94eD3P74f3fnQTDBQzGYSFg4FrgIs2VXY0kJFokY5kjZeG dpabUZKUmmqZlzJviIZ0qaJppI6FXJyChKytAVNnna+Kj7C9urVbroGmukjAqMGYt16sx53HOafK WsN+z72PUcjUWNZ8k5SWvMndf8y5monrF6Dk5lnf8PN66NP0+Iz23Pn957j3/Amstm+gQTHymhhY yPAgvoREFn4hQFECQwMOzUH8IXFCgY8B/z4WQBRgYUZlG3Uw9CWhQEiRBSgSKHeyVMEhHRkI2CmA gkwGMF0WwljTJkB+NzpyosBzJwWRnmgWvXaTh4GJFIGCxCqjac8KmwJOnSMP1k+YvAY1TRaAQFuk Y+sd7XFB5NNDO0m6dQs3rr65Oa66sxO08EiSedvufef3zrerzxRtbXm4QmIJfN027vOYb+RBMjWv S1zxbd/NYx5jTqsoK8sApFeLRW0LMA4DFUsvPRT2sm6TtMlWvW1ad9jXfEnzXfBlwQyiwf8205F7 b2l3UWRKiB3gQADm3wlBj77MNg7tpbUbU+z58pcD8OPDH08e4fCk7BWz5ysptOnLFwVIX/99/0wX GGbVIaibeqUJgIhzDHj3xYAE2mfebVeFhp6GCfInAXMHSCJehaPcd2B+6fmXoAxnzLAAhLdQSCJB F6qkoIodlrbQUWbIOKM3Jtq4n3r7BYBANCRRANyPBaYDREcc+sfAkQnIkECV4l3EZHkGcgRZlBVN GcCVVV75RUlbSuekEF9GOQgCRxq5iY9pxhOkD5ANGYACCmTAJ511XpEShgpKwOehiCIKaKBQDEqo khIlyqdFizLqhKOPosmAgAJamtqdQTTkKWegjvpQqabOg2mqzqDKajervmpUl7KeWmOt8MSKK1W3 7kqNrr7mAWywjrlK7C69HivKsMrKRWtJs60mC+0idbhg7bXYZqutBjxu6+234Ia7AS4w4GLuueim q+667Lbr7rvwxivvvPTWO0W59uar77789uvvv/j+K/DABBdsMLsRAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image042.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODdhCAAIAHcBACH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACwAAAAACAAIAID///8A AAACDQSCaJa5rRh8U7Z1LigAOy== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image043.png Content-Transfer-Encoding: base64 Content-Type: image/png iVBORw0KGgoAAAANSUhEUgAAACwAAABUCAMAAADOKyWfAAAAAXNSR0ICQMB9xQAAAVBQTFRFAAAA GBQWM0tkP1ZtVjM3RFpxUmd8eRQMbE1RY3WIaHqMbXaPcHmSbHmTdX6je4Oae4SnikpUkFNckVVe nGZum2RsnWhwn2pykpyvkZirhpGmipGliZSpk5msj5apgpSthZmxgYyrjZWzn6W1pxYNrCQbrSYe riU6sTEptzxPsi9DszJGpHJ6oW52sYaMvZmeroGIvpugq7C+p628t7vIrbLAtrvOrrPBs7jFob7i vMHTrNL51SQc2iQb31E720M83EtE3VBJ31hR3U1Hyayxxaarx6ityKqv0Le70dPby8/XxcjSwcrW w8fR0tbeyMvVz9La1Njfz9Pb3d/l2dzi297k2dzj2t3i1dnj3uDm8Scd5nYV5XJa4WJc429p/v7+ +Pn6/Pz99vf47u/y7O3x5efr4uTp6uvx+fr79PT38fL1+vr77O3y8PH18vP28fP265KQYwAAAAF0 Uk5TAEDm2GYAAAAJcEhZcwAADsQAAA7EAZUrDhsAAAAZdEVYdFNvZnR3YXJlAE1pY3Jvc29mdCBP ZmZpY2V/7TVxAAAEqElEQVRIx4WXaZvcNAyAk2AwYLIQ2OUqdLJgcKFQoC1HiJwC7XKVmwVKdjgX ylXg/39Dko/YmaRon2d2xn6tyLIkK0WxJj/8GGU289PPp6e//Hrzy+MPPrx++dWn77nrziqVe79K 2N9EKVhKFLErpfhogi+LSqwIr61KNcF3i1JqDSg2FRoArSXxkf0Wf/BkYLIlI+LVBF8spfRkzjnR Wk+af78DjbAwLKODBQ0T/DE+R9PojgUeBivEo957+25nwxD2leyQdQBaYhpmPzEMD9shdURYMmzp hwHr4Be84m0wOjUFaJgBhv8wCZwp9Zo9bG4i/PUctpnpDrYevgYrsKM9bKz5FOELoO0chtTmLWsG fR3h5xDWOLvdOt/lnh4iDJeK4tQAewZhpiHTTSz7DuHHiuIzMhjPj2CkM7thYNjtEO4vile0wcMn k50MuQnbCW4eLw7QXoLH7TbDAYZpgB4OzWvFfRTzmszyzxyigz06WK/58+JMTJCdgBsHB/L2DDR/ Fk/4A3Q5xKOYSRqixPw6KoonOc9oPkGm/ONB9wPP5JIJP0YU64FA0aqgBeGzPIYcpbEUVaVUXdeK /rC6CEx6O/KhGITPgOHlyNWbtuv6VLpuo4SQMEYYl8lKtR3N7UrfHaJ+ZAh+EI3VKgN3FrVKOM0N mqHraX6yYGLbrtIeRhHJHILfzOF2gu0oN9mjc+uRPRSgg2ZtRb+8Pce2lSy1drAurdzrV7xBbCsQ NscOriSr7mc+jmyFrtX6LMMS7SfvMdFGifChEK2SuvFwJ6xWqmqwTssgXPErVSMrVY/uUA7e9BtJ VZgCZ8Q44Y+RIo/CRciq65UEr3nT4UqePsnEr8Qn57CiBD/ZEdK+BHu9WXZzXq3Aw7zUubTcgWuC wS5UuwXNBMMSCgua0Yylq4roked3vLEG7/X/qzlcFwinmtscTu5acJoTWLTedbMKBtGMmeZK5zda 8i2FNcL9nlzwWhig8EX4wMFdW4K9jcgatcGLDIu6xJozxI1Bsj3L4SFVhCWyQBEW4icGxhBiSZfa w1wtT5xO8ABLKP2uuXCw5VBmVZQB4+g5/Iff/f0I+mGCjWO1cBmYVXWSwd8WjdfMLOfynlLc9iXN miQ8hS2IrC6mtazGzmwYwfuZYNF2a4IHQqFgwwZHrAzdugiYvIGhUnW3E1QNAR7J4Hbdjq4VpHnf mQF4+azBXPWwBIEO3qDLSmBdO2wX1mBlrMiOAFOVorrmqyHehWqvpuuQvV6WdFuxGVNHOYYL1ZdR X07xPHHG8AbxZsdLzsTmeQwSvzkdDHMjhtdcENgVd+8jbFzXFhuFaVUiHL5o8xFdVmYtq1zSUAti yRvFu43xsP/Y7aHp6aN+nTrXpxiGhdYy9HgEwwVuid9sorLlmku3e/PIXwzfQlebpXY/ZDs+1zxw y/f8BwDGrrFkMh71jfCC8JLO4VlRp8fux9eUL5w7wC7bQia/EeG/jY2qwcaClJisj6dXqyMc4Y5t 8WBQz/Pp6+B70zHP44IOG17OXh7xGGNlSYPChRG8n79q/nPj4n7z0Pnzz7A8e+7clbfefue7769i VBjT/Oug/wDk27sLkg9w2AAAAABJRU5ErkJggk== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image044.png Content-Transfer-Encoding: base64 Content-Type: image/png iVBORw0KGgoAAAANSUhEUgAAAFQAAAAsCAMAAADMxG9fAAABgFBMVEWFmbEzS2Rtdo/mdhUYFBZs eZOClK11fqP4+fqhbnacZm6sJBuBjKubZGzZ3OKKkaXi5Onu7/LFpquPlqns7fK3u8izMkbHqK2r sL6nrbzFyNKxhoyxMSnV2ePb3uTs7fG+m6DIqq/cS0SGkaatJh7Z3OONlbPdUEn6+vuTmazd3+Wf pbXbQzzDx9G9mZ68wdNsTVFEWnH29/izuMWtssDa3eLLz9eQU1w/Vm2ugYj8/P3x8/ZSZ3zBytbP 09vU2N9jdYjQt7vfWFG2u86JlKn09PeyL0Pq6/He4OZ7hKdweZLjb2mus8HIy9X5+vtoeoySnK/l 5+ukcnrdTUfJrLG3PE+RVV7y8/bS1t7x8vWfanJ7g5qRmKvP0tqdaHDw8fX+/v7hYlzR09uKSlTl clrxJx2s0vl5FAzfUTuuJTpWMzenFg2hvuLVJBzaJBv///8AAAAAAAAAAAAAAAAAAAAAAAAAAAAA AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAfmPi5AAAAcHRSTlP///////////////////////// //////////////////////////////////////////////////////////////////////////// //////////////////////////////////////////////8At2Fi0gAAAAFiS0dEb1UIYYEAAAAM Y21QUEpDbXAwNzEyAAAAA0gAc7wAAAU2SURBVEhLjZdnd+M2EEVBmrISx2t7s9lsy25677333nvv oSgWEOT//5b3BoNC2Scn4yOLIoGLaRgMzXxa7n33zZ/PuP3/b5l86MnJ51ev/PZrDbk13T+6UJe8 FeXczZA/6prfB3V9IF+fZaAIvYE5fd9bFwW/KLa32c34lPcmfMIze+2hiI3Qr/qJIpOs69Nka21r 2x3xKD/aQZNpatwvtwUqoK+XA0XGERbZmAQlq6osi3Ih63XFQQ10mBr+F4Xrj68r1cw3hmooCAUw KStwNxTF0LaF2e5IaTGy68i1bdDC9vXBs0fkmvnLChNpgBoTDLeuacvRHOLpUI4qW35vVy3UA7Nx LZblD6gsAGs/ePntV80sWmaxEG0hFooaEWALf7W/ppQtkYBiNTMeVgBKSIPnanMToC2ZAcbxWNjZ pi1GzzqEDzLxtndODDCmwvKIMgJCMJ71ArU0wK++EekInYZDmSTUBgHBn4iM3HTtis6AIbZBgDUc 4AaoH5YEUOvsII4U6hCcBoVwycFuEAebEU6lpurXqXeWmtIpqmhgU1FbyixSERmJpFeHKsAYXTNB JVSAOjFf/SnzPJbQdl9DbkyJCCOBknSbRqHjiIdeUy/IngQNkRJoR5eGPBrHArFRqFq1C01xdu7b 09ApQIsM6po9+DnXNJi/0FRs7T/NzQ/6g9rBiMK7lAIH7XlNg1ujT8eRDmdKhen93wLNHCIR28C4 JXTaU2iYzDTVFRUaF+zfWUJ1tQ6BciH4oimgmlQajQ4pFaDINy1xBLv+QfNX1DTzNbaUs5LbPqmG BlDF+a8cuhP9/h7Z+3myqONyTbemTVAdm0HXCg2J2T9m5qcDNMtWmiGabqltgOZpk0E1T1Og7jDz a6c1hTa6oQKUPo3ZLeZ3LqTcIvnpU0DfWkDDeoB6TfkvmJ9latfZkHK7O6q/z8yPArqwXDRCPRHo 8x6aa+oDlaCxoGgk+1vM/JxCWX2ShT76omjSNGY/KkQTNZXSlxLOEXoxmR+3v5wMLFKnoZpRZ0N9 ngJ6tVqkFMGbjlUxh+6Yj4oaK+OIGr+sUoC+sISyBAOq29QfdBKoVPrEIJyKWm5RGFD4o++cA/Qf QnOH+nqKvR821Fa2acopcW3TrgMUp1JC4hrQo0qKND5x5ws01dOzoNDUhD2cQ3l9u5kfkcqfIq+V H6roLEQLtuxsfqypjw9xYIum+hHoCaCLrGbhlxM6HCfbbY16uqzSUzRkFaAhTd0PZv5azyge0OGQ FmgoU0hWpGLMUX/hlkdUFpPe1Wa+E+f+6SOaUN2HgJbaGRAWPBXKKc6vlFFMU3tg5vOE0gFJ0Q10 Qc/ip3FfEer7COklpg6p4NsCtAQEpeIJ6GWBwiu5dDzk2Z9JKETRCd1WFIxlhtnBbAnlWeddQkjv +utmfqYqqp1uyleURvfUGpa07FBXK+lSi9ZhVZ4vbKbYAWZpim6q/tHMr7DjRfsVe2eNImYW0HIf dthhP29Q15WDD5hjaOEYQ24odszSoLlL6E/nDy8+NVRV7N3R4rMJZMfaliu6BlPTaS3bVholuKBp fZJrJymN8t1seikfXX5JoZIwvqFntOiECs3pfhS2a+NK2y+0vVmKQ5O+52tNeJH44vEDeXnwnWrA NtKoLl8j6KrB9+QsAaoFcHgHeuKNP317HuWnb9gM69uEfqe3lOjycJE94mX9wJP520nCvn//d9e+ RyWFIDPOensSYp5ePgBQ+dJZL2fx3vnf7zr3yfF7D1+5cHz84uJN7z9+iCuj/Aufd3OUdOG71QAA AABJRU5ErkJggk== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image045.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODdhCAAIAHcBACH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACwAAAAACAAIAID///8A AAACCoRvocvti9CbtAAAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image046.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODdhCAAIAHcBACH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACwAAAAACAAIAID///8A AAACDYwPeQFovdRCcDL7MCgAOy== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image047.png Content-Transfer-Encoding: base64 Content-Type: image/png iVBORw0KGgoAAAANSUhEUgAAAM4AAAAnCAIAAADINuDZAAAAAXNSR0IArs4c6QAAAAlwSFlzAAAO xAAADsQBlSsOGwAAA1xJREFUeF7tXLGyIUEUXZtQJaBEPoFMSCYkI5TxB0IiNiIjU0XAJ8j8ASGZ DxCQIVIi7+72q9l53T2jp3vsvjZnMl3MdJ85c8+9R9+JPR6PHziAwOsR+Pn6S+AKQOA3ArGwotrl chmPxwD1/RBot9vpdNp8XaFFtUajcb1enQn9+nOI88M4w8QiHEqlkjnPQotqs9lsvV7P53NuTrGY PGpinAFlBQ7dbjcej/f7fVPCkYAaHsfjMZfL0Tyk58E4g8VeHG63W6FQ2O/3hjwJQUBbrdZoNDKl PH7/XRFIJBKTyaRerxtO0JRqi8Uim81Wq1XpPEggMM6E0mocKF07HA7D4dCIbSZRkZNOTiOcjxiX aqhd+JCMZjIZExmVJ1iK/KtUKqDRG9BITCWlj8Fms6GkXJEb4tf0BZSqTro2Z8vRRxILsbDCOJMe q3EoFou1Wk2/FNUjKZPO8/nsIMidB+NOtJPWnpbiY1KNagooSedqtXLoZW8lb7sT8e/nT1JG4U0j QukIKKs6WaLm1gWxPGF6gfF3woF4Vi6XdarRoPR0pFNUTFi4Vlu16gFST0YDCyiR2i2db5mRuBOD d8q0QlyXhowGoxr9y9lsNmFwRMfgcMdp7r4nk8nBYKCuigGo5pZOu+xHRd/IB1asl3u6CJCgMhqA amLVCXFxbEXx4bbUzggksoFkVJVq0+k0lUpFE1D3qqNAoEDr7XQ6ijKqRDW3YYsyMyJlJkc4r/uu LqNKVHNLJ9xadVNA8W7Z/vQqyuhzC1c0bEVLFiNRRkDV1PUvVjnDFpkKfERpJqcio08EVCqd8NXg q4nG0FMZ9aMaGbZO1Ql6gV5PfUeqRnu9npdOelIN24Q4yJA8qCQPPg0vnlSDYQuDWs+g9tqpK69A aYetuE2ILizuCGJMxzhwcKK+505dUVnR1xkRP+xFfp5XNSqJaujrjLJJZr52r75Rnmro63RjbXv/ 5v+av7xv1B1F0dcplU4YPRpGj9g3+qUCRV8n9qVxrDJ5zLi+0b9UwzYhFd9ITKXht/ng5jZ1P19K dTqd8vk8beZmr+Mjz5dLD9nL0jAOHBgxFHG43+/EqO12S2bbJ9V2u91yuTSvPnAGICAiQE4b/YsQ 2gtKATEQ8Efg+X41IAgEQkHgA43P4r9wFYFFAAAAAElFTkSuQmCC ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image048.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODdhCAAIAHcBACH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACwAAAAACAAIAID///8A AAACCESOqctsDWEBADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image049.png Content-Transfer-Encoding: base64 Content-Type: image/png iVBORw0KGgoAAAANSUhEUgAAANUAAABMCAIAAAB1S2VfAAAAAXNSR0IArs4c6QAAAAlwSFlzAAAO xAAADsQBlSsOGwAAGj9JREFUeF7t3XeYXUUZBvAEUJpIr4IEAlIMVUDhEUxAIICgNEE6JpSIFDFB LAiKUqR3lc2jCEpV6YQSEpr0KmpUIFFQVHpVEMTf3e/u7Ow5d7N3e7J77x/JPe+dM2fmm3e+NjNn h6699tqPPPLIkHY+K6644uKLL77RRhvNPffcc84551tvvfWTn/zEv2PGjPngBz/4zjvvuG+OOeb4 73//e8EFF7zxxhv77LPPIoss4jLwd99992c/+9mrr7665557LrHEEm+//TZ86NCh/r3oootefPHF L3zhC8sss0zC3fKLX/ziX//61+c///nlllsu4XPNNdfFF1/87LPP7rDDDpqkAVHP+973vssvv/yv f/3rdttt95GPfCRwH6395S9/OX369K233vqjH/3of/7zn8DnmWeeq6666k9/+tMWW2yx1lprJXze eee99tprf//732+66abrrbfev//97ygPnzRp0mOPPbbJJpt84hOfyPFbbrnloYce2nDDDf305ptv Rvn55ptvypQp99133/rrr6+qHL/jjjt+85vfrLPOOptvvnlez7333nvbbbeNGDFCU3P8wQcfnDx5 8qqrrrrtttvm7deYG2+8ceWVV/7c5z6X4xp/3XXXrbDCCjvuuGMuhz//+c+6TJhEalzee++9kA/h ENHSSy9tCIxj4O9///uffvrpyy67zKDvvvvu//vf/xJO+IZm4YUXNpRKBk7+zz333IUXXrjAAgvs vffeGOKWwA3uT3/6UwJBCZeBG8fXXntt4sSJGjB69Gh1VqSmLp+pU6fGl/zj1wMOOOCQQw55/vnn 9ZZAkQlfV1lllQ996EP333+/rpIaXL1EsMYaa8DvuusuhQN//fXXicCgwo0NMOoJ3KDCjTEkboE/ 8cQTn/rUp+AEh9MJf/LJJw0eHOcUi0f78tRTTxkkOE5rRuC+wA0GvKmp6ZVXXknliX633XaDn332 2S+//HLC//KXv3zxi1+En3LKKS+99BL2q0cD8PvAAw+Ef//733/hhRcSbqgOO+ww+FFHHUU+gWvP M888c8QRR8D9a3iMetTzt7/9TUn4oYceao4l3DB873vfgxP1P//5z8AJ5B//+MfJJ58MN7S+p/LK nHnmmfBdd93Vvam8On/4wx/Ct99++7///e9YFfVoA60B32qrrbQhcO3RF7Mavtlmm2lzKo86qAn/ 5Cc/qY8JJxOzlL74+Mc/nnBVkeFNN90Ep8vINrWHzJEKxVdfffU//vGP8Bh6Q/ONb3xj2LBhEyZM aOVfmXzBcfylLQx5FPBgzVUdKXz6059+9NFHAycg5HCp9b6gZuA66XYqAY7y1EDgeOzS1Ieb+jff fHPgGufSFIdj1dVXX51wSg4j4eRrjgZuvCnFSy+9FG6KU7eBk+8uu+xiCsJN5R//+MeB6/8ee+xh nOD77ruvgQycHJHvtNNOg+PBiSeeSHnDiWzcuHHHH3883Dw85phjQltgLRodffTRcHL8+te/HtoF C7/W/IFj21e+8hUI3F0K4yv8uOOO+/KXv6wGuKeo3CPgeL/ffvtpCZzC0BhNgp977rl77bWXlkdT Nd4lHKtoLz0NnAnCSDhW7bTTTiQTOOGYh/Bf//rXn/3sZxNOmC7h5v9nPvMZko/yhL/NNtvAsccY GanADRYGw+++++4tt9zSl8CpcEPs8uGHHzb0iBE4MmCIWUEx4QzmBP7AAw/QlwaXNu2YfyRCbxn7 xx9/HLs9gP6LilyyPiyCWeXLPffcE7hLCgwFkXLkyJFJs2qKSxSEM08mTZTHUe1zGSTGudD8uqRj LuF6jnPBCTgBmRK6qhs4F5wwQQnUJRwpcS7G3gQ1Hi7hSHnGGWfE2JugFCEKwpmVE044AdvgJI6a KKjBY8eOxbnghBFCze985zvwL33pS0ceeWRwwoiipks4wiFZjDFmUIEuaSAERbIYY7Whpku42jwr xtjTqVicg3u6aaOFcK099dRTTRu41u688856BNc71HQJ1zsWmQTgZgJquqSVGUeyCpz0UNMlnPQS h0gbNVENfs011yCNEYmhueGGG4wInL8xatSohKOES/idd95prKnhKM/HMMRwo48STErgfBWXijFK PDfDrSQr3DH/SMfokhdfhCJlBKPG+NDbfBG6NCnCwI0ox2v55ZdH9ry8Dqy77rpwNrqA86U+/OEP 33rrrUG++KCafnJfCCLIFx8CRU34lVdeGeSLj4HByGWXXfaSSy4JhRQfA0k7simURJAyPgaeLmE7 fvSjHwUp44Mo+++/P9x4BynjE1RjU0466aSkkOCoRucttdRSLGlSSHBlvv3tby+55JIEmBQPHAWp PTjdmRQP3LOoPb7ywQcfnBQPXNuoPbhWBSnjo490PHdNL4KU8SETag9uvgX54kOGJLbYYothZ1Jg cDKnBeGh4VJ5X1ANTl8k8sWvCLTooouy0difl0c1OI+LD5Djv/vd74yLITbnuZIEGJFA1f/LiyaN 5dcPfOAD/p1//vlFIRypvJjv5GgwmNcCrj8Gm8Yu4C6Rj4Yv4yuttJJZWMaR/uc//3kZ522cf/75 ZZx3kqxq/qv5Z8hzcsev1MC3vvWtMs7KH3744Tnpozy1RAvmpA+coUCCnPSB03+0b076wL/5zW9S RTnpA2edDXYZ1ylDkE+GKG9QPvaxj4WGzj9moLAmnyTxK3vCfc8nSeDCHbFdPkkCZ22RJp8kgdM4 5meBlHDhnXlVIB+cUsTLs846i6mhAiNimyP+K3xo1ISQnZs1i3fCwgoO8sKGQSMEPoUaiBsu3ing hhlfy+UVozzK5eEmvQBKGwpVmdzitQis8o9OwvGmjFP4ZZwXIs6NWD7/LLjggsK3Mk52ZmMZN1F9 yrhKuDs1cY8o44L0hRZaqIzrlKbWxHW5jBMmvVXGCZ/oynKgjYi6Jo5PZTkbEUNWHheIoS+TSv0m FW3KIFDhvOFqmcK8yS+VEH8EYmbzhHg5M2bMSGU0C9Px1SwpUB7fw/kr4J5tflOBZZyrwSku4MxQ OH/wXEvBw/mD51oKHs5fxICpqWYw95wWgedaCk5v8bfgudYx5ag0/hm8YIIZRxEcPNc6NMr48eO/ +tWvwnOt4zv9etBBB8ELppm3x7+E59pFnaY6JQHPTbA28PbYU3huguG8PV2G5yZYX3h7RATPTTDV ILwlUnhuauHXX3+9IYDnWo2sOEWGDJ6bWrINb4+Tx/FNcoZLHrE2VFWKRfxKr3Nh+TkxKJ3mn3t0 jwkw26ZNmyYmSI/UMhkvDqIIKGeP5vIP4EKkHNc9/YGLRXKcOMgFrsMFXGAB5wXmLCRW4wEP1iYW aidKwYO1iYWGjf/E+vDKcxYaZpSCs2XwZCvRgn8GP+ecc3IWoibrCUeUnIXodeyxx8pEMvQ5C1Hw Bz/4AZzQcxaijvkAN6vhyfahjnGCs905CzWM/8rhFv3kLEQR1hYuL5uzUMd5e3ADn7OQoEgSLnbJ 2WZ6kzxHSLgJp0HSEPPX4WKUAgv598OHD8dCkUDOQtaZNccW2gou18Z/lcZKM6fIv/byf+H/xYcJ kGPjMFHIa665Jo8ytc+Qi4s5IlrDA0245wmctQOeAmS/Glq3U5zw3E00BnCzEC4iTpQytMJ4DhNc jJYoZWj/8Ic/mP3wK664Iik2WsQkofDg2pwoZcglj7ATLhGaFJ4vHBcKD45tSbHByU66BC4ITYpN heY3BxFuZifFpgFCPHyCE3GilAZLF0DgIpWk8HTQCKkBjm1J4aECvYLfcMOWFBtcIoMXBRca5goP A7AWzsHPFZ50BAUJJ6Vc4WGSOABOqrnCE6WKjuER+aahpHH4jnCjluOUHDZjmwgy10poJ2pebbXV Nt54Y5pVa/n3XKmiaa7T/iYrLMQz/5CMrkrhrUZH2k8LtE9YHuU1VKDqEi6S1aDA8dJkcgkXjUts hm2Fy/+5hCM6SgUFDYxJ6RKuAEoFBcPauoSL6SiwoKABphpdws1yAxYURAjKwCXcOInCwrYikMSH SzhJffe73w0KwiVKdBmOB8xuUNC/8n+0INwXRAyquQu9GGK4LwQVVPMU5KNl4b4gelANvylLWhnu i4kRGkJrBcKcH7gvJlJQTe8oEjEQ3BeJvaAaaVCNYny4L2QVVCM9gbBYCk5HGrJENUaDdYb7klON a0TCcF+YqUQ1asKQwakqCi9RjXFzu0v6hdmVro8hpo8iHUg4Fn4KwWJX7G/USxD6icsmLm799re/ beT/Gvm/4EYh/0cFsma0snmV+7JKdp1/bhZtcJwZGuxmiKVUGvm/Rv4vKJjyfxQta8ChZE/4NvFr +syMf+X8X26zBdICe6ZEWEfrcmMLSWbPaOT/kqAHZ/4vrDPLyzLIvcvsVLPNbb2/evN/OXNxS2DL JeLgS+dIbsmfNfJ/jfxfcABVLD0IVZlEKQKOsmiMnSxk+Ltlf4OOlj1YYbFFLArnGRO/NvJ/IaVB mP+TkUAJ+8FYXkqqYHnjsgf4J0aTtlWRtJ9ASaTdyP818n9BLwGHhf7ygm27/l89+b/yoorFJbG6 CJ+zKc9n1bmR/2vk/4SncqhyQBYqy5zpVv6vrEsFH6wwWyyZJNhu5P8Gc/5PglB631YGyVT5+ZqW t8fsb1TEr5Q4tfNZHjKQxv6/Qbv/TzJYMk5C3tLzTMjXM/5feoAUv8S69HqKcRr7/1LwMaj2/1ky tbZkYam876tAx67n/2purbEPxZpSykI38n9J3IMn/0fpWFBleS0fd+z2NZfoSv6vrFexzaKqjaI2 9vD/1GuZsrH/L8Zg8Oz/k+eTc7GaH3tG+87+xpMs1VsOZ/hjx0Aj/5dM8IDf/2c9wpYROwxs0Sjv xK5JxB7I/5XrtfYnFpYFjJ8a+/8SBQfw/j8LsLah2GHF8haOB81EBXZl/1+HRt3hc/yz3pf2SDf2 /8UYDOD9f7SMs2Y2INuriwAdkiQv0Or/5Wc+8hL12PJEc1lopxtlBO0Vi0rI3SK02W8DrTOIMkOB cxltVcdUuM12/AaVwNlu3RDAw+2+tMsrTh7AuRfWc+DnnXeeWDtOKqjfJjxbAOF2Adr6Fice4ryt o4Rw+9tsAYq3MsAtURAWXGNsP463BcCdv7TlGK79sS8wcNtOHXSA28Rh1TveUgAX6Fn4hvO7dYT7 EXhsMY9D+M5fysUEHoeR4U54kImkQeA8FtMVblevja72KQX+q1/9SjoDbhU1dg6HHMjKTju4k1Y2 PNsOF7ju+MDtm3Rk3b7AkLMFUvtG4XbN2TioDTEENmt6NNzuQ/sLjV3gDtTarwq3i9EtCZfYcwAA 7kwCVuh1lHfUwT4ru83jfH5Hjl/1916xv1E3K2y7vL31mmh1pHH+d6Ce/8U2Ztcih52/adtp//NP C2zZtS/Q60jSYfVoVuP8b8hhAJz/tchmG54jvTZp1zw4O3Mi9mT+L/Rw/mGYbLl2wKLciMb535DJ 7H7+V6ghxcYXYqPrWucts6Sn8n9lkkl/c8VMEba48FwvS5ASKzfGIeea3fCSg/wMVLrRzLP1sFwP ocDDm8w/zh2nY885zrdzDrdc3pZJ523LuMOzvOwy7lhgTe9bJfREuZ0O+aqqjGsMR7CM65SmlnHC 0bXy7k7CtA+vjBM+0XnVWKEqXilRl49mww1N+Wi2bRZcVUPsJUnlU+sdWuHQf5Vz40711qJmBeNp es0A695egZnghGgFmv116tvAcJD51D62RVgpwUIDwDtOuFfgOCRr1I0W0E8iBuWdzhKpkDLp57il bktbGkBqcRYpyssFxIE01j/HxSJiI56yfEGOO0pjmxBpyp/H2aWox6ktx8Ns6uFI5LhTXg7giQDs L4o3xEV5MY295iKADTbYIMcVszlDDOQQYMQ6UV61TvR5hAfluG1sfClOveNaIhgEivKaLXQ4/fTT dSTHddPtuizsYNZTeSRDGoFRerNbyJ8YCVOQR+AploKbDIQvAOK757hhwj8xChrkuEF02khjHLHt Aj1EBYLUygs4ylM5VaczrLtoqAsPcAu5EIodiE6g6XZEoPEeQa/UiNf/mLsJj3OsEteOrqX3/ylP OrZ4oU6cs4zRirfNORFnuwORpff/xcy2EuOcIu6m9//Bdcd5WOcgtSq9/w/uI30qvJW7T+//C9xb UbBEciC9/y9wL+wSnKJUev8fUJNsCKfyUTC9/y9w0RgW4mJ6/5/G4Af94cyO3RuJJfFeQ8Gp4cHF 9P6/KG8+ozguOtIWEXqUF7Rae3UIMr3/L8oTvngZgQxBzLoor7OC4nj/X6wXRHnCEXcjYv7+P+Xj vYD0iIPxQfGI920ArXGksg660Hq0Wyv/9LacgvEkcyUyCF34uNe4EqWwwzDoZLTVeGi9bnMTY8tC 4PrvWTVx5YmPLQjFnsoz9GRRP24GU07x5qW8nvZwY4zudpMTRd5+YE1c5W7RvEJ/28PjbXnl8jqr awRCVvlz28MJjYgUdkteviYebSNqX+LdJiHPenD1h03HUarXzO8CMVoVXO/pPzOV7mSn9C3skY8J FPknktKNmHl9iYf2Kj83cJMh0o2pnbMaTmih+AvtDJwwIy2a2t97uMG13YTy7hr/Qv9V7p2Jq+jX 9P6XDj3KvIA5Lc5NC3H5T+09sYGHlGYjOTDrEvWdIkYqHPFH7f0vXWN0fpdUOI9B7NL9qho1zLIS kOKwRmXxplstLPN35ud/63lYuAjlmuPeBj5g5CAKrpnVqock1TI9a39ZXqFrWN4C1dJlT+EN/VrP MJNSwbL3lPzVE46WLE9nrXBv2V+bDIT0wQxtSvnPiB/TvO8RvLC411kRDJLy8fc1ekP+BCiDYV+F BKpETz2ToVCmh/0/XZWDrcY1LaZWz/PO5xTsPt6FPg/CW7ov51AlNeuRJ5fKtazQBcH2cP7PGlRs 10mqLrUpeYSFVnYHL4ujCyIY8LeElLoj51xENeuR8rRMIgGU/uROnVLtyf1/dpnbARtGLZnX1I7e xuvs8KAt1qvyl/+3UGSlu2bGraaf08P+H8tridNO0rKHlw95TWoWPMXulB+09Kqz470nf8voVjvt hUl/FayeJvWM/+eRYg7rg+ZBPU9tlBmQErC9w3KRXdOd613383+2+lCneT1JCxYq71k8FGeXP1PG Dxk/pZN3u6f5M7ppuj/N0lT5txuf6U2jU2WVappr73SbOmhALqWelX/5weq3Vt5d/qV6VdTh+psd HB5ZIF9cFviRLnsJ7xwROhzrMruCLs38aP7aTMLufZrrSYzrsE1deVhZ7L0k/6jWkRd7nTo8hdkz /h/LG+vQPZLP0/pO1dO5eZaXnjFxq1EnI9Cqw9qpY+qEoaOmDS/8OmPapJZ7ho25YUrTTpu1d3vd LatU2dqKkZXF1JNG1n13Jwr2Uv6vPF6yb2JhfyKqnsZ11//zrieen7NPQZ1ezTPVrL+eTpbKTJ0w bshObb0UhBw6YeoQtBvqVTZDh1bYefKooVtNnJHdPWxVymrS2HEBjhwzZljlNp/mYs3fq3XAJkyt VNbyY/V7W9A9Tz4+ZHQzjfPC1UdWK682IhWYOMFDOvfpy3ERA9gw6kUcVnHramXo9K69/88GyYJJ iEfW9Ax6HK9ZYUcmisWr2LtmU9diQKt2L5w7YOVLTeNaddiyH1tNZutNzd9GVx6TmelaYBvr28b4 Vn6ptKClRKrIl06a/ZBSX46Lx1FMtGAn+Fdz2Nzfnv/HwNuF2x4D+gbvAv9a4oeQTBpJ8GiBW9Wf m6kb1kLBcNpaGVSLiIWfq49re09LG3IutrAvmyTVx3YhOMml1DfjQi7oQTfZpN2eOuju+d/4Y8zl ICM9rw+62ln+VVVfcxNL2qaVjDVji+lNTc2ES/dG1NCi9IIezVzKiNT6tV2wDf2qF62TpI2qy8Kf jpR8/ntBSn0wLvF0gakDUP40Us3Gdiv+sKvZQYdWCtelZ/u7UMXrO6/Fua84XkOGPP7kjEqrZky+ YtKQ8V8bMyya2BwTFGILRcaOqvpdcW9z1DD1On7iiOFDJp4zbQQCjhgyecLEyS0hxYyJ48ZOGt10 0MiWOit3FMER1SCnObZpuUiq+Ybh51RcSp4gF3PYmPOwvNrm/pZmx893YsZb0WzQijc0tPsp07PD /X/Web3jvO+9ily5Rn/qUwQFty0zwpHH46+1GraWwrkHOL2pYpuz+6rFq0jVZWxWgM22c/z4tom9 dsHoxeimKZEJ9EnOabpqTjRWC3TS96uIJ5dSe0LrJTyscAcbBGcyhJpV9v/8TbOC5S3wIF32MV4f F3u5VNuEXvVhNcFebkjZEeqXcWGF8a/8Ot4u2l+W9/bbb3dzn+WTQmo184Id24C+L9E2oVd9fk2w b9vWX+PluLQ/4GhXaLyYtManfv1HnTp+20u6umBby60qP7du+9tXqmaWfE6/jxfaONvvbHUunq68 /886b1jefvf8UhtmyRGftRoVs7R/WcgKO5VR+6R6nfpPFSNGjCgUbk8D9Q3e0H/1ML0Qf9S8pQ/G S0baK0H8nehoQOf8P+u8Evrl95rnnllu2vsL71ufavZ7Wn+Ni+d6U4dXKxXel1Dv+q+/tup9ndZ5 Zz+RN1o8y0jAMSUv8fFn29u0qKyQy/m/tOu/bH9rqu6+8TbqXWGcZQagXxpCSl2I7XrJy/cS5eLb 6Gbu/3nfkfxNyjbnhfslnxSudM34o4EXxFJQDbOCfMTCoggvH6t3/Rdb7ejKJ1Bj7BtzoDt8EMjK 4sW7NDt+/5/1Ey/Ayw1Hr57kq7Sp5d0dBWvVwEMgA0AOEnkOyz3zzDOV/gSXa+7/azhY/eKxDZKH Vt4IGvwbJB1udHOWkgBFXm/+ZZZqd6MxA0YCDf4NmKGcLTtSm3/pr2cV+tTAQyANOfSUHBr+32yp NgZGoxv+38AYx9m4Fw3/bzYevAHQ9Fb+NXyanvJpGvXkE2PmvGr4fwNAicyuXags5JRfFDm79qbR 7tlNArj3f1Ruj5+FqdNrAAAAAElFTkSuQmCC ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image050.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhKABDAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIAAgAk AD8AgQAAAAAAAP///wECAwJdlI+py+0Po5y02ouz3rz7D4biSJamGZRpqgbu+rkCO9OcTcLtmx/8 iRsFQbKT8Xh7DTe4ome4vDh9oWk0o7wiKdqbb9ph0bpcMJmbOGNR6q37DY/L5/S6/Y7P6xsFADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image051.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhLgA7AHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALBAADwAM ABwAgAAAAAAAAAIyhGOpiOoBIWiTJXmcnnyfSD0X5mWl6ZHnylaRFlbLRqnoNz9gy3/xBezcGqGi kPYTGQoAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image052.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhjQHAAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALA8AAgBp AbwAhwAAAAAAAAAAMwAAZgAAmQAAzAAA/wAzAAAzMwAzZgAzmQAzzAAz/wBmAABmMwBmZgBmmQBm zABm/wCZAACZMwCZZgCZmQCZzACZ/wDMAADMMwDMZgDMmQDMzADM/wD/AAD/MwD/ZgD/mQD/zAD/ /zMAADMAMzMAZjMAmTMAzDMA/zMzADMzMzMzZjMzmTMzzDMz/zNmADNmMzNmZjNmmTNmzDNm/zOZ ADOZMzOZZjOZmTOZzDOZ/zPMADPMMzPMZjPMmTPMzDPM/zP/ADP/MzP/ZjP/mTP/zDP//2YAAGYA M2YAZmYAmWYAzGYA/2YzAGYzM2YzZmYzmWYzzGYz/2ZmAGZmM2ZmZmZmmWZmzGZm/2aZAGaZM2aZ ZmaZmWaZzGaZ/2bMAGbMM2bMZmbMmWbMzGbM/2b/AGb/M2b/Zmb/mWb/zGb//5kAAJkAM5kAZpkA mZkAzJkA/5kzAJkzM5kzZpkzmZkzzJkz/5lmAJlmM5lmZplmmZlmzJlm/5mZAJmZM5mZZpmZmZmZ zJmZ/5nMAJnMM5nMZpnMmZnMzJnM/5n/AJn/M5n/Zpn/mZn/zJn//8wAAMwAM8wAZswAmcwAzMwA /8wzAMwzM8wzZswzmcwzzMwz/8xmAMxmM8xmZsxmmcxmzMxm/8yZAMyZM8yZZsyZmcyZzMyZ/8zM AMzMM8zMZszMmczMzMzM/8z/AMz/M8z/Zsz/mcz/zMz///8AAP8AM/8AZv8Amf8AzP8A//8zAP8z M/8zZv8zmf8zzP8z//9mAP9mM/9mZv9mmf9mzP9m//+ZAP+ZM/+ZZv+Zmf+ZzP+Z///MAP/MM//M Zv/Mmf/MzP/M////AP//M///Zv//mf//zP///wECAwECAwECAwECAwECAwECAwECAwECAwECAwEC AwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwEC AwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwj/AAEIHEiwoMGDCBMixMawocOHECNKnKiw osWLGDNq3Mixo8ePIEOKHElS4cSTKFM2LMmypcuXMGPKnEkTgMqbOFfW3Mmzp8+fQGfmHJoyqNGj SJMqrUm0qcSlUKNKnUrVptOrOqtq3cq1q0isYL2KHUu2rFWwTs2qXcv26NAADQPIjTgXZdu7ePO6 zAk3LsO+futS1Eu4sOGLOAUDBoytL+OnhyNLTiqX5U24jhfHlcv58UORlSeLHl2xs+WUmP2q/sva bkjTpGOT7hyaJOrWjR0ydlz0NW3ZwA3THk68uHHPEGnjfswb5fHnz4NLzzv89O3Vu3GfBP17une8 sG2r/2QuuHV5yCDDf1/ftvZItLpzcmdPv35B+Knl29/P/yN+5K71J+CAFcGXFoEIJjiQgU0p6CCB DBL14IT8RThUTK0IkuGGGmrYCjYftpIhiCSKKEiJII4YYoonrmgiii+6qGKJG8roIY03hlgjjiLy aGOPK+ZIopAfEomNkUgCOaSSRTJ5pJNJinhFKzEFIAh0WGap5ZZcdjnchxKJCGZDPT5UpkNnkplm imMyJKaZa76JZpx0tskmnHbKqWaedeLp55x8BvrnnniyQOVG7iVkpSBXeunoo5BGymgAYI5Z6Zsy unhnpjA6iSmNmn6qY6ieegrjqaGiqmqqrK7qaquwvv/KZitXdJQoQosymiOQvI66aa+/+oopsMMK S+yxxiar65V2Alopmm5CSyKZ0VI7rZsrqnltitxi2y23Z/Kqbbg6jmtpud6S+6246baJbrRpvksj tPGmaytnFsmVIaNXaChrrAD/K3DABGPTL7+NhUvop9hmu+nCEDd8LcMPS2wpivBOjPGpGV/ssKYd U/vxxiCDKrLCevoKL6/33mqQviYuK+aoM89abM0z36xzrzjnTPPOPwO5rL+tUDpRzhE1u621Zibt NERrfqstnFA3G/XVVmdd9dZUdz3n001XPTNH1Smkb4mCHEz0wGwX7HbbQ6bNKIpGa7zuyRffXa3d fOf/3TfTfgcO+OB7C1444X8frnjijI+5K9ndKUqpr0MjG+zlxWJueeacbx6zrsXWnbS7XH/t9dSm p4766t6e3nrYsEsbO9Oy10777XvbnvudbiJKnNlGh6prv28XD7fxmqp9haqTA64kiC3iiPGMlUbv +MbWN5Q9Q9sfif33DncvPvjXjh8++Y4//2T46gvJvakiehQARnP5rOPQNvMMdP5B98////azWeV6 JibRiS2ArpPa6wgFqEFJrIEQZKAEHzhB3lVQTxTMoAU1iMENPixn8qNf8FZVueOZEHmuwl+s6pY3 lH3whaKCYalIRcNO1RCFODyhDnOIrRBeBGaaK5LM/5IVxCJ2johHZNMAkSgiAybwWduCYrVIF0WH getr6sriudb1LnaBa4taNJcY20Uv0tXrjGa8FNR8mK8RAmx4a8uhHGWlPLY1r3Dq49S5PpbHPvLx jxPLI8kGObJCasyQHjukIhPpMZQ5spEl0xEbSzM5/Vlyif4LoCZ9BkBOarKEm0Ra0ZTWMPtZEXdL 250qU6nAVmKtdKxzpdaeOEvVLfCWq7yUKQ9FNhEiT25zDKaqDmZCFlpLYaVsoeEah7hlOrOZ0Fzc M6UZTWZS83Aj66GtfMnEbhrRc95MojjBySYn2nKM53wlLWGJS3Wek5VKiyfYdAfPeaJSnqQE0SSB J//Mfu7wnyu6YyCzKb1sUc9N5isf+rS3UO411Hvni6hCJXo9ijKUfRgtX/vaN7j4bfOHcAklAUe6 P5GW1JMoFWVKSWrOPe1yi+t0oAc7SNM+RZCDNr1gTnEqqJvOlFwv5SWifAnQovpzjsac4jOFZTI9 NvWpTI2qDI9q1KoWT5Da7CVIyTnOcHL1q14Na0txCTVpUfGsWEwrOr3I1i66lYtwDSMZ5/rFMtr1 ZHfV4Bo/2kaq+tWqAhPoHhMH1IEadrCIjVjFOMbYSBJykSKDbMgm21gLqsxklG3kPiVHUktmcqUn ValoO/vZ0WJqrPzbJT3lWdbWxjSdtYylO2Ub23b/1raVqeyfzzaLKzcC9q/ApZsU1UhNg07Tmsg9 rnKrudxrJpe5kXWmUDUyv62G9ZvX7Sp2t3tE1EYtTLBlpyzFO1vb2jOX562na1ebXpimZLoZqW5f f0vf4KZKsIoVnEG3d1CHWtS/Ew1wRQV8UQIDeMAILnCCD6y9jWY0fQTVLF8p2UnTerbCpMVwaDNs Uu8GFYG0FZtMa9pTnZaYpyPe6U9PvGI8fXhsEzZbHOtL4+AmdVrI7NsMbchjp0o1hkCGX42HfFXl wpd+9NMVd8G65OwyWZyTyud3jyZFHJtVrenCIhi3vNa3yrWudG1rXNOY13nhbShH/mGS1WZfIheV /1/MChxWdQzIxFosv36UbGURGd0+Z/axjPQzZgd92aWmOV++xOSFTbpo0DbawqUlYOU8/GJOrvee 7b1tecf72hB32rwJTG2leXuQs+0LmG5uc8HUFr0bE/e5zm0urGct61pDN9aIc1/jDl0abrJoWU0O tnaHzVVQNlHK+USJppdNXmZ/Gr2XhvbspG27Dt6E12YjqovkxihVp/pUcM7eh/B7Z1xDr1PiPmiM Csru+zFpR+7+kbx9hKIo1RtK+NaUvYNkKlx7VKtt/N8ANfxoDjs60kBbos0oXWmkibrhEI+4xCdO 8Ypb/OFBJfXLfLttmX07uCpk3nBfZ+voRcvkQ//SGMqLpPKWX2zlEKUWzGfucpnX/OQ3T/nLc25k jRcEiJ1T4ZOH7mQkGjtZHiYKa6etXqYvnb3RbjrUnd7eTCf7aD4niKlfxe0ZezuH4UaRKaIx9rEH NMcUky4e1x5ItsP07VODe+vk3i26l8nuw8272+Pu0uX+e6jWLbiiEV7wDYdW0dFQhuIXbwogMTzi zY78szdNeWeHd/LMrnjWB7J1gsHx6yZkNYqUkXjFJ/70piCRq0nezB6dqHWv71bsyzT7S3WIQ7i/ ve5zz/vd+773wP+98IOPe3TV3qGwn1r3pLt5gQD9q6ArurDBCjo2lX7x0cg+9kOU9Gu38MrHBD// Ky1E/vJbscroz90p39t8AHT+4/D/0NhJbwpokB4ap1eG/aMxbrTPOdDvszf+olEC+CwwZ260dmsJ uDgDmD4F+IAaFWEn0371c3AER3gYeIGdRH/RgA2lBw3XsHgieGxUBnmYxzVXV34qCBbyAmqwBXEU yHHxR2TZByL81xBjh3/6R3r6l3qrpzeQRXM7N4Q2N3sKaGsIiIR/Ez1CaHNEWG46FoNEN33SR2wf QnrSYIMd2BCJZ38i6IWjRGXvRUVUF3VTtoJoiBVkOHXVloK9E2OcNYOqlngkkn2lcINuQnb7x4Nk N0pyJoFw1XaCiHcHuICGqITHdXyDyHdzx1DF/4VtisJNhTeJGchohMeDytAK1wcN+OcQ1yeCi/d4 L3V5pFhBOBENtIAT1yAiroANregUIpKKuNUU7uVpL/hiUiiH9ZV/9teL2McKW8gQfDiM0fCDaOeI sqd8yph8zJhcrdCKz2QKtNAK1zAItFaNJCKNiAhRYKKI3riMyShNkIgrvmaFVHiOnLN4mqh9oKh/ rOAQ0kB62ceOytB94JV+UaR++sg3qjhlq/gQ/PeKwUiLbqh0+XiQaBV+ZIUmuQh6wBWPp9eK2Vd/ PLh/lnJ62nd65LZYftOADQaBDkiAOsdc0sAKrjAmiYANg3ANGmKNY9J40IgNpnCSMokNrNAKif/A kq5ACyxJCzeZktfwjz+pJi3Sk4koRR4ZgCIZkoU2gXDYWxpoiVFpgSZFj8rAhe3IidGQhQxRetfH f6JoabY4lo2YE6iIh6s4ja0wja/oEKu4ll35IfyXirH4jylCC3MJIrL4jF0pkdDIk235XpxWiiT3 YQ2pi8K0g6c3JhVZkaknizK5hzdojHLWhDj3hCOJc0YoTSy5IdB4gyzXkTtpk6mIjdFAk8/4IS6J jayYItD4jNgYlJu5hJlZm6HphLgZYeNYakk2heb4m55jlaTHEK7Qhe3YgXTphaRXQMh2j1VnhqOj iq9olyAikHDpELKYl6e5ihJZKd3pJq1ol2n/6YEYhIfXxoaY5lpSRoGo5pCARYypl4eNSXagiXok 0i8bmXZmhnd7V5Yswkwugpo0iQ3XkJLwMo02ySTRkJImmYrWSKApmZqkGSI0aZKawn+JyIh1p6F3 x3eFtJsvI0LAJpUkSpUmKkqfqHhjEg3KaXrZ1wqmJybLEpZ3Z3lk6UESEZAN850UdA08KSbdqSN4 mTJikp1igqGu8JbnEpiC6YI3Gi+7lIse557BJJnLiYNdaHY2mHpCpGSUGV3dCI60J6Zh2ozbmIQ1 uaSHCE0tUqbh+KZjaqZ9JIUhMkTo6JtMZgrHyYX414ESyX/8t0T2eEUKOUXiZ2WFWpBomJdo/wKZ abgxiGqohRqpOHY1hylExIOYJjR/+YcNdLmY9PkhdXR2f4hjSfkkIPmRS6mqt4mmrrqmr8qUrDqr SimrSumRf0ddIsQ/Q0SJUwlpGtiOYPKVL3p0JBgmllZ5kmc6ivqozno0g/mkWmM/l1pv1Uelx2Oc 9smHXTo39zVyQNiqthlzl4mbmnmE6Bqr6Uqb4tqu5DquNFd7dIo5dgqcVQhW17cM2LecChc6zSl1 6VmGofasBKsSaxiw6ElBIPpz2pZC7ampsTKMFmkwwyMr+cku/LmI/tmh2FKIZwqrIHs9G6t3Gruh yZQidPpoI3qiBgesjDaP83hq3cZhj7es0v96QBaXszq7s0Rqs07aLmJSrbEypRArKyEXMJTpemSK fHDqpnHatEz7tFLrtFQbtVXrPXJqtVqLtVDLtVO7td8IYwBHSU9Wr3h6r8rSq9hFaZOKjwkpqXBL qW57qHPbtvv4tnJ7t3Srt3abj0H7lKUmgwHTbUXbKghjPBfLPqlaq7SKqqvKuJDruLYquY17qpaL lJi7uJQbuZeruZebq/G1qyXqsixreL46usc6Ojy7uqzbuq77uq4rtIVbtD8Ysuv6sbh7u7qrrkm4 sFpXjmd7p2grvKhVsMZ7vMj7qL7LeQ2Lrc5rscfIu7YrvblLvbs7vTiWspVYuqfLvdsrSsX/m7zi O77kS4uy+7zoK1zWu77YW73te724u7zOB7zDa6/CS7zNWr76u7/lK7/u17yzm779574EDL8GzL4F zLv+K18Uhrqm+70tG8GGF778W8EWnLwLDMACPLu1m8Dvi8AH/MHtm8HWdb/2e8LBy5ywu8Is3MIu /MIgBLgv43UBrKmNEik4nMM6vMM83MM9zJ4z+6sS3L2kW8SkpSs+nMRKvMSdwQJpgwVXEMVXMAgn 6QqDcAVMnMUxSLQbjK1cfCRdtyysBkeEazxlfDzeakJnXDxpLCL1V3ZkpwyfYAqfoAxCssYD08b0 5TJax8DMa10rW78pPMhGF32bMjSInMiB/8xd3jp0M1t0QWyOZdwKepoMizcMi2fJlowpjXxdkyzI o8LHnOfH87tV93mtNQxyD5s8NNwqmWo8r4zG4sY2eOw2aZONypAM0IDJlozJvJzLoEmxv7Q8NkbK fXwrxhy4AhR9QwzBDyzExRLIkuYh7yYqMeO9j/zM2VyJ2TyVj5zLO2jJiifOyomh+9K9jwzNiybK 7ocvDGvK+obKXVxVX5wq6exjv4ZCtZzHs1ww++x50YN9vqwMA61/mBwkrcx1/VxVolw2f9xXadvJ JkzIjGzIUNam1iwqEj1sGw191NxkkcxkhPuB9qfJIviVdYrR2/XJE100ydzO6vG/8DxM8v+cyrS8 ynSU0KkSy2/D022jx2/zz/9yy5qIycpwDfjXy4qH1NFw0Kc8zEPGx8Xxu4GXSWZrxM/swJ7VqxjY xjhjM9CzK0Uc0kb8yRLcyUM8s+NseiXtol6YDOa8zYQn186sP+ws0yE600Nb0/NsuHwtMGu8Y0Kk zzqt0Dok1G/UIk1N0Iw90HU80Aj9SwstTHedzC/9c83TVYuMwqB8yBZdtkTy1TnT0eFE2t90z9Qn 1ivtL9EgzmYnDevIf5ksNCqtXSzN2eV02Xj9zvPV0389z3A2Rz4dK8MtMMUN0Idd2LBC1NHwCag4 Eamopyty3FxHzDRW2eQIUtCM1lntvRr/xt1E3M0/AypyfYHlLZXbHJXibaJqPZzKNgxxLdYGh9pY vc66bdkabNMbfM9Qlc9qrNwkNNlGC+Cs4q1ynInQfSQIPtiyHNX3nd0Q3dISjtu/yd2gwiSmfdHT R9/YRdarfYXKcAqACrMvmiJXui/BdtuEjN28qdf6PbvUvdMEfioxbtiEjUNErQypp6elAA263OOW 7Nx4yaXCjMbW/Vd8PBi7zU/dXd91/eTqjOLjPeVk3bJVvmFmbXjgPdceMpy57OPgLM6Khw3LEN/c S9dRvnDJrOS6Pcp9/eIM/mNKgtgOi+MCvtd2DiI6LpON3efwPeRxI9kOvhDo0ebOl9kU/03hiQ7a 1dzoUg7aG/7RVujhtu0v+ocNjL3Wmo7poJnhlqPioJzkhZ7fb77BNc7KKHTqAZ7cOE7Me66nvzzQ f052T23kg34QbC663q3VUM7rvyreYD0q531www6s6U2i6026ai3bmg7OiycNL3rN20vfzQxAoh4R D022cF7D/C3ndO7XeX7jJ2TgdazU5Kx/nFjHkd3gxUzo2F7KEa7onS3vwmbhUx7W9V7bHm2vlE5O hDvO0KCnikeRAb+DJ+7pRATqxLvmo+7ipQ7jMy6qEY8iql7gd17n4+7qwwANH5KKMRkirR3wtc7G R77HDP/uS85ZTV7tvt7y2Gw9oo0zV/+usvKN5URTultOcO0dnycRo9Ke1tTM8qB17RCR7fy07cAd R4INxuIu6E3P7gQdzGOSitG953H+0xefQ0T/GfBOtvO+6F+fXZEc7Muc75HO76pd6SCueEat4zpO dqYg8J2u796k8Jy99Q5h9HH48G+uPGTcdX6f6hPfcaye8TYo637e50Re8TBC1Nd98kXf9cCT5i7v 5JR/ooqc+YNn3kHvq8dOlck+3x5yfSbdjtsn7d4s6bvuSXifFYbeznyP9G727av+9Gwc0ImP+Fe5 7rd/6waR6yVM78IP9hNO/MMf9jbY7GIuzuZc/KEO+Vyf8r0V+9Qv+6W+2Ig/0ERe/eP/Bv15L/kq T8RCb/mVP/7mv/LoL/7on6KKp68+n/69PvTe7/qkbv32z/33X8OtzxB6P/3If/wAga3VQIEEB7Yq iPBgQoYLHRqEqDBiw4kPJV6kiNFiRo4bPVYEqTFkx5EfRZ4kidJkgAAAXL50iU3mzJkvW8LECZOl QoE9ef70GRToUKFFiR41mhTpUqVNmT51GhXqVKlVqV61mhUrQpY5Y9KkadOrV5YJD148a9Zi2rNr 3UZk2xbt27lw6aq1m7fuXrx85fqV21fw38GBCR82nLht4cWIGytm29Ur2LAub47VGWCrVs6bPXcG /Vl0aNKjTZcGLTkn5ZqWMePcqbLk/2zZtVPeNombtm7buX3v/t0b+HDhxXnzVo2TtUyxr21qRn1a enTq061Xx35de9XkMJdja+4cQGy9jOM+Rn9e/V3H68u3Zw85fvr57gHTfy8/P/779s3Xb6W7l74L z7mdskNwOwUTZHBBBxukTsCvWCvwtdiOCw5D4jQ0LkMPN/ywQxBHFLFEDk88SEIACHRNvPGgezBG CGWkcUYba/xMRRbHc/HF//bzDz4gARyyyP6IPNLIH5NkckknhWwSysF0XK5CzA7E8UYts+RySy8f pJLCFsW7MEQUSTzTRDPXRJNNNduE8005EwqTMivHwvJLPbvkc08/+0SqTrDuJEszJP+f1C/KRBHl j9EgF5UyUkgnbVTSSil9lD4VCb3MQBj/BBXQUEcVdcFNx4StxzLjTLNVN11l9VVZY6V1zllPOpVH slT9tFRSf/U1WGC563RXY8kMwNFDLc202WUxffZSaZ1VktloqVW00lyLJTSnPIUFd9hwx/11Wzx5 rRVWW9O9VV1324WXXXkD5DbVYz0lN19x99U3SxVZAhjgFwM+lbxssVW2WmgVnvZahxlG2FqIHz5y U4Ivuxhffjful2OPt7OY4OcCxnddk9+dF+WT4105ZZZTKljgzHJ9sWObP8b5Zqxi7o5kTxM+mGKg h5Y46ImPNjppohf2a9t6aR74Yqn/p6a6aquvxjprrbfmumuvvwY7bLHHJhtrTwt1sWy112a7bbff hjtuucHusW6778Y7b733du47v/8GPHDBB2eOb8MPRzxxxRdnvHHHMSM8csknJ/xxyy/HPHPNN2+c cs8/B51z0UcnvXTTEwc9ddUFP71111+HXfTVZ6d90Nhvxz133XusvffZdwded6iD39x340MnHvjh H/c5edePh35y53dvnvOMp2/d97Jo2n4mgFnrfnXsc78+87nPR59g45P1Xib23Yefe2zCTz19+++X 2XyRxzdd++XeB6D85lc7/t2ufNbLXwFl17v3gYV93QPgxX6nwNdVj3TLoyDqGAi+lfZ1MH4NVF0G XYdBEZZwQBt0oADj90ECmtCFLySe/1S4QhA+sIUwxGEOX4fCDgZwhQMEIu10OEQijq5233MfEr1H vweCMHVFhGIUHxe9yDlxglLEYhb3RsXAJcuKV9RiGMXYNy7+jX69G2Ma1aicMraxSmuE4xjdOEfb xdGOWKRjHsFzRz5CUY907GMgh/jHOQpydAEBADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image053.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhawA9AHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABgBm ADUAgAAAAAAAAAKwhI+py+0PT5gh2ouzBrTvD4ZRR4nmaZLoyl5qC8fIZJTyvdJShfeh7gumeMLi BmhMWpDKZoPpjCagUim16rxim9qtsesVgsO+MblnPsvSahi7zXrDc8S5uG4v4/M4G1//FyQXeLRH 6GZ4SKd4M8i4lPg4JIlI2eJo+RSZWciJguk5tRnqMkoKAXrKYaqq2QqSehqreDXL6LHzOvJC0uv7 CxwsPExc7KsLiYu8a+sJVQAAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image054.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC6VTzWsTQRR/M5M1bRrJx+pBEE396KHQfDXpQQhkmwR7iYQmRfCSrrrahXxIsqLx skVBRIR4FKHgn+HBQ07eBPEieOrJs8ieFBrfm9mNGgQRZ3fe/Pbte+/33ryZj+/evgQ5JuFDwRYJ Za8xQCCSHCAEB/KvhpMz5iPGp9OpRGl2ytct8cAuyg/FJKwjWjkWg9MwJWOoQ5xYEL/GuR8GeCHQ y7eKQt109lqjOxbawAJqv2E8XaXGQyjWmIp+ggMvS6QjuiQC3YdQoLsVJrRI+XD1t8fSmAfAd75/ pEI+ZyoyxFt21xqmrlj3Utv9rtmDC5y5azhT74WLewGKm8FxXPMRciJNLruenwA94GfwTPwvB5fr F+TSZ1y0E7lCcSNXSBcV3zYnuTvj7bFP2jwv+8faFC+nrvu8FMEZBRy7/JX4Q22MOJqj7vV+B9wy Kqp65MHfavudo4QcB/4ZyLDgDOzsnGcawyZXm/VWEbt61e4Znc6mObRvVPo3rYZ52xpCQpuvLyH8 bBJapX93YFuD1p5pQyJUb6Vq952BCUlYWM7UxtWM0fDisctto/H17BnEJ2MGeDXvojfebCOKxyq0 jGveanvLG0tNGVd3C4Gx2q62ax69RizKsA7GceBmMKxPgNzPCKEltUdPciSyJNZJ5H9VF0gUSWzI o/64BKWZ5yNn3vRhWtnL8fP20B1Txw1mtycYQZdVB+MQlto30gIzP9ccDR2rS18RWIanMgzFa3xO wsoRuMpfzE6JkP4/ABrC9jU6BAAA ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image055.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhUwApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABABM ACIAgAAAAAAAAALQhGMJgcrsoJq02nvfbG25k3TYSJZe+FFcaragKcaqJbpkPcooO9ulBuPFJBtf C4fRvYo8Y9KmPDGXzhxUWOkgq9lrCqltcndbFfEwPD+A4825DY/L5/S6/Y7P19drvf/PFyg4GAhF eCjoN/jH2Oj4CBkpeUTj9sZmtFXWt/CGJkaV6dlZ2VUUtdOGg6BZ+qGFKTW2KhsSW7vS4zHqRWaF FUqWW6VUliqF6nvsE7ZsupTYk+wCy/cbjH0yTfmcAVpLNezU+mQLZr5q/DPa3ElUAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image056.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC6VTzWsTQRR/M5M0aZqy+dCDILr1o4dC89WmByGQbbLYSyQ0GzxuV13s0nyUZEVz iiiIiBCPIhT8Mzx4yMmDKKgXrzl5FtmTQuObmd1ogyDikHnzy2/fvN9782Y+v3/zAsRQoxMGixx9 bBIOWIoChOBIfA3jpIT4iNDpdCpQhpzxuSUa+MXphKnRNKLVBQXOwpQ7Qw0SyIwRv8I5iQA8Z7jL 94pDzXL3jcGhjT4QRfY7xkvL1GgIzTqR0U9RoGWB0oiusID7FAq4dxGOFnk+VH7tEAvzAPhB7x/L kM+IjAwJw2nbffWafVfd7batDlyiZLiOU/3AhgA5kNoElnEtxPgmzuQ3M8UxZrqH5yQ1nrLMf2pQ sX5FrfRMKyq0ilv53EaB641hl8o10O2Q5YV5XfKPtUldKtovdXkEdxBo7NGX7A+1Ea7RGLRvdFsw LCNxoMTe/q22kxol1Djy70CWBHeg2bxIwgSbXG3UjCJ29brT0Vqtbavv3Kx0b9l167bdh2R4vr4k 87NJhivdOz3H7hn7lgPJUM1Q9Xtuz4IURFey+qia1epeQrlqavVv588hPq1o4OneZW+0bSJKKBW+ jHRvzdzxRoIp4zrcQaCtmVVT9/hPU+IE6yAUBx4GwfoYiPOMcbQkz+hxnptNNA8yHBXnaWTQbImr /qgEpdnOh+7vrjluNrgpyC78ej38jcnrBrPXE4ygy7KDCYgI9rXwwMwvNAZ9127zfzFYgSciDI9X /5KC1WMYyv1sdkuY2P8Tte2wUToEAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image057.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhVwApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABABQ ACIAgAAAAAAAAALShB2nkHsBm5u02ovg1Bv7D3ZLIo3hSZWgyrROxKJf7KkN/chnJJcSntOtdD8F ECGcCX8wTuWYRBJTGGjUShU9o1VpiPcKMsBcC7mMTqvX7Lb7DY/LM03s/J6u6/d856wPyCe3h1do eIiYqLjYk/VwNman9ThyZulHKWaSBHmj6ekViuQzyWl0GuYSykLyiClphiqquikKWksCO0kqm7qq icqhW0vrg2n7mcU7lew7y9QkstzYTBxDg/271HsN7D1bDP612a0dqQXzMmz0auxXB1AAADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image058.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC6VTzWsTQRR/M7MxaRrZfOhBEN360UOh+WrSgxDINgn2Eglmg8d01cUG8lGSFA0e IooiIsSjCAX/DA8ecvKkoF685uRZZE+Kje/NZFMaBBE3mTe//e2b93tv3syXD+9egXyMwETAEqFP NUZARDmABgfyqw8HZ2yGGJ9OpxLF2ZkZt8w9vxCfCCMQQ7R6QoezMCVnKEMYmTHiNzgmfoCXAlfN vEJQtvu71mDPQR8IIPsD48VUalxDs85U9FMceF6iGKIrwuM+ax733k9oifLh6mubxTEPgJ/8waEK +YKpyBC2Gi2nZ1xz7hrXOy27DZc4G67jMD6KIUASlDaTuaSDtIiySyU30qlMPDsG+j3mZHdwz5Te czHW/k+Py/kb6p6c6xKTymQ3leaR1n22qMX+sTalxWX7lRZF6A88jR3+WvyhHkYa1UHrZqcJwzwS v/Sg+bd6jmvkUONgdgYSzDsDtdpF5mPY5GK1bGWxqzcabbPZ3LJ7jVuFzm2nYt9xehDxLdYXEbNs Ir5CZ7/bcLrWrt2AiFa2jNK9fteGKARWEqVRMWFW3LB+tW5Wvp8/h/i0boJbci+7o606orBeoGlU ctfq2+5IMnmch9sIzLV6sV5y6W/qIYZ1MI4PbgbD+gTI/QwSWlZ79DRFJklmg0xa0Y/68mw/yUFu wTWD5mGcUHaRRgbNpurC0e2hO6aOGMxvj/d4XVYdDINfsm+lB2Z+oTro9Z0WvQVhBZ7JMBSv8jUK q4cwVOvF/JQIuf43GftT/joEAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image059.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhVwApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABABQ ACIAgAAAAAAAAALQhGMJgcrsoJq0pkZxflGvczngaJVdJWWmxqLkZ8Yv6IVla4uuHNdIveDsXh7g jKfSGXM64imJvDWXTGd1Ro3CtlyLr9m1aqWHh5AMxk0w2bGx/VUO1WOwHXpJlTssc7unl8N2Vldo eIiYqLjI2Oj4CBkZ5UcoaXnJQ6m5yRko0wnaiRlEOWp6ipqqusra6nqFVVn5Oht0d4T0h/hFB5s5 ypsXqLvm+ViEy2brBjzltRe2Yqrs29Ar3Vzmt3ONdvn2zKVrjQmOR55r7Fg76JlSAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image060.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC6VTzWtTQRCf3U2aNE3JVz0Ioq9+9FBovpr0IATy8oG9RELzgsf0qQ8byEdJXtGc IgoiIsSjCAX/DA8echBPCurFa06eRd5JoXFmNy/aIIi4ZGd+mTczv5md3c/v374AuTT/RMAyoY91 RkBEOYAHjuVXL27O2AwxPp1OJYqzszPbCnf9gnwiNH8M0cZSCM7BlJyhAmG0jBG/wj3xATwXGDXz CkLFtA+MwaGFPuBH63fMF1OlcQ+KLaayr3HgeYliiK4K1/bJ49re+QgtUz1cfe0wE+sA+MHvn6iU z5jKDGGj2bb62nXrrrbXbZsduMzZcAu39kEMAZKguBmsok4HKIgsqUw8O8ZK9/GcFMdTEf9PDi71 V+SKzbnoJFLJ7XQqk90hvjHscaVd3g5bXVrkZf/Ym+LlcvyKlzLYA5djn78Uf+iNEUdt0L7ZbcEw j4bCWuDN33o7zZFDjuPZHUgw9w7U65eYl+GQS7WKkcWp3mh29FarYPabt4rd21bVvGP1IeJd7C8i ZtVEvMXuUa9p9YwDswkRT8XQyvfsnglR8K8nyqNSQq864dC1hl79duE84jMhHZyyc8UZFRqIwqEi qVHZ2WzsOiNpyaMe7iLQNxulRtmhnx4KMuyDcVx4GAz7EyDPM0BoRZ3R4xSJDIoHcULZ381JEtsk 0vKqP8pBbh750F7MgMEodtQUfr0eemPqusH89bjLnbKaYBh80vpaemDlF2uDvm216V8A1uGJTEP5 ql+isHECQxUv5rdEyPifENDdAToEAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image061.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhVwApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABABQ ACIAgAAAAAAAAALQhB2nkHsBm5u02ovg1Bv7D3ZLIo3hSZWgyrROxKJf7KkN/chnJJcSntOtdD8F ECGcCX8wTuWYRBJTGGjUShU9o1VpiPcKMsBcC7mMTqvX7Lb7DY/LM03s/J6u6/d856wPyCe3h1do eIiYqLjY82JzdjalRfd44+dSFJTZc5lhlGUi5hLqk8RC8hk2WRqqKvnJdEnD6lXb2pgaU9RJOzqm e5Xqm3tz2ys6jOs7W9t73FwWCyPiLJw8anfBTG1tY+v1/AXa3SzrA9m01IkdOXZQAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image062.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBQYHRgZOEEsUrjGBmADOa5QDYTgwxYlhWIOZlgLCZGRiiLken///9g lh6jBFSMG66Oh8mBUYFRCMhSY+NnkGL4D1LMIADkHwCy1ID0AyBOAxrGDVXDw+CbWJIRUlmQCnQR 2O7fTA3/IC6cwAh2EBODQHBlblJ+DkO9A1DAnosrUYWJsV4XiBUuMNczMBgwsADFdYGqOYC0ERcD oxIDSOuWSi6oLVxglzCCTYXYIcDADubtAbudkYlJKbiyuCQ1F8TjYlBk6AIrBuma8FmIQe0fQz3E DkawXR+Assxg/QA6xKQYUAEAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image063.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhDAANAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIAAgAH AAcAgAAAAAAAAAIKDH5miYr8HASyFQA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image064.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBQYHRgZOEEsUrjGBmADOa5QDYTgwxYlhWIOZlgLCZGRiiLken///9g lh6jBFSMG66Oh8mBUYFRCMhSY+NnkGL4D1LMIADkHwCy1ID0AyBOAxrGDVXDw+CbWJIRUlmQCnQR 2O7fTA3/IC6cwAh2EBODQHBlblJ+DkO9A1CAg4fLXoWJsV4XiBUuMNczMBgwsADFdYGqOYC0ERcD oxIDSOuWSi6oLVxglzCCTYXYIcDADubtAbudkYlJKbiyuCQ1F8TjYlBk6AIrBun68FmIQe0fQz3E DkawXR+Assxg/QB27La3UAEAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image065.png Content-Transfer-Encoding: base64 Content-Type: image/png iVBORw0KGgoAAAANSUhEUgAAAQoAAADoCAIAAACYUj2jAAAAAXNSR0IArs4c6QAACCdJREFUeF7t 3V1yGzkMReFoNhYv3V5ZpieqcjyWpYiCYBDkp4cpP5ggcW4ftX6C8enXr18/PBBA4CsC/8CCAALX CNDDtYHAVQL0cHEgQA/XAALjBNw9xpklrDidTglVlYwSoEeUYN76w5nz49ji4895O6r8iQA96i+J dwE+HeX8mfvlf+tPvM0J6NEj6kMh31B9f1T0+H7m/9vx47uOy3cghxLelhQmRI9C+LaenYBbdmVC X94ZLl9EeWVVFZK7RxV5+zYg4O4xRUg37g9uHYUJuXsUwv/L1ufvOnxgVZgQPQrh/2XrQwxu1MZD j1r+dp+aAD2mjsfhagnQo5a/3acmQI+p43G4WgL0qOVv96kJ0GPqeByulsDYx+pvb2+1x11y95eX l/e+Xl9fl+yxqqmfP3+Gtj5/uH7n4wjvzt+88WuKXMI5IgyCRfUSYJyJF1ehJxeL1yZAj7Xz1V2I AD1C+CxemwA91s5XdyEC9Ajhs3htAvRYO1/dhQjQI4TP4rUJ0GPtfHUXIkCPED6L1yZAj7Xz1V2I AD1C+CxemwA91s5XdyEC9Ajhs3htAvRYO1/dhQjQI4TP4rUJ0GPtfHUXIkCPED6L1yZAj7Xz1V2I gFnzEL6nLDZr/hSMXxYxa/74kHZ8FvnY+ylFjmgfb+P3yqccQ5FPKXhxlffMpXJ7AvRoH6EG8gjQ I4+tyu0J0KN9hBrII0CPPLYqtydAj/YRaiCPAD3y2KrcngA92keogTwC9Mhjq3J7AvRoH6EG8gjQ I4+tyu0J0KN9hBrII0CPPLYqtydAj/YRaiCPAD3y2KrcngA92keogTwC9Mhjq3J7AoZp6yM0TJuX gWHax6dQ55kdPa6Px9swTHuFXTxfL67ynrlUbk+AHu0j1EAeAXrksVW5PQF6tI9QA3kE6JHHVuX2 BOjRPkIN5BGgRx5bldsToEf7CDWQR4AeeWxVbk+AHu0j1EAeAXrksVW5PQF6tI9QA3kE6JHHVuX2 BOjRPkIN5BGgRx5bldsToEf7CDWQR4AeeWxVbk/AMG19hIZp8zIwTPv4FGp82PJZfxL2uD4eb8Mw rWHavCcYlRG4RsB7D9cGAlcJ0MPFgQA9XAMIjBNw9xhnZsU2BOixTdQaHSdAj3FmVmxDgB7bRK3R cQL0GGdmxTYE6LFN1BodJ0CPcWZWbEOAHttErdFxAvQYZ2bFNgTosU3UGh0nQI9xZlZsQ4Ae20St 0XEC9BhnZsU2BOixTdQaHSdg1nyc2bNXmDV/NtE/9cyaPz6kbdb8E7t5gExyEi+u8p65VG5PgB7t I9RAHgF65LFVuT0BerSPUAN5BOiRx1bl9gTo0T5CDeQRoEceW5WnJnD6/TiO+P7D5XHpMXWEDpdH 4PjO5734x58/7kiPPP4qz07gsOK4dVxz4zg9PWaP0PkKCdCjEL6tiwmcbx3ndyBfPuhRnJDtqwh8 tOKaIfSoSse+xQTO/xzzOMT7Dz65Ko7E9r0IuHv0ystpv5UAPb4Vt83mIXDj28D3Q9JjnrycpIDA bUnGhmlvf4dyZ3OKXIKKM4lXOE61VZHLT6suvx/8rMeNz4DvvPr9GgKtCXyUxN3jzz+8eSzUSZ5x JzlGo1vQPXcP7z0ek8KqpQhc++pjTI/j/x8Rp6JInOFlBVQfY3LjO8Gj4JgeGbmqiUAJgdtinI9E j5JobNqDAD165OSUJQToUYLdpj0I0KNHTk5ZQoAeJdht2oMAPXrk5JQlBOhRgt2mPQjQo0dOTllC gB4l2G3agwA9euTklCUE6FGC3aY9CNCjR05OWUKAHiXYbdqDAD165OSUJQTGpgXf3t5KTrn2pv5w c16+/nCzP9z8H4FJ/tLxYifx4irvmUvl9gTo0T5CDeQRoEceW5XbE6BH+wg1kEeAHnlsVW5PgB7t I9RAHgF65LFVuT0BerSPUAN5BOiRx1bl9gTo0T5CDeQRoEceW5XbE6BH+wg1kEeAHnlsVW5PgB7t I9RAHgF65LFVuT0BerSPUAN5BOiRx1bl9gQM09ZHaJg2LwPDtIZpDdN+fQ3EB4y9uMp75lK5PQF6 tI9QA3kE6JHHVuX2BOjRPkIN5BGgRx5bldsToEf7CDWQR4AeeWxVbk+AHu0j1EAeAXrksVW5PQF6 tI9QA3kE6JHHVuX2BOjRPkIN5BGgRx5bldsToEf7CDWQR4AeeWxVbk+AHu0j1EAeAXrksVW5PQF6 tI9QA3kEzJrnsb23slnze0mN/55Zc7PmZs3Nmo8/c1iBQJCA9x5BgJavTIAeK6ertyABegQBWr4y AXqsnK7eggToEQRo+coE6LFyunoLEqBHEKDlKxOgx8rp6i1IgB5BgJavTIAeK6ertyABegQBWr4y AXqsnK7eggToEQRo+coE6LFyunoLEqBHEKDlKxOgx8rp6i1IgB5BgJavTMCseX26Zs3zMjBrbtbc rLlZ87xnGJURuELAew+XBgJXCdDDxYEAPVwDCIwTcPcYZ2bFNgTosU3UGh0nQI9xZlZsQ4Ae20St 0XEC9BhnZsU2BOixTdQaHSdAj3FmVmxDgB7bRK3RcQL0GGdmxTYE6LFN1BodJ0CPcWZWbEOAHttE rdFxAvQYZ2bFNgQM09ZHbZg2KYPoJO2PH2N6JLWh7OkkiBmvAi+uZkzFmSYhQI9JgnCMGQnQY8ZU nGkSAvSYJAjHmJEAPWZMxZkmIUCPSYJwjBkJ0GPGVJxpEgL0mCQIx5iRgG+jZkzFmSYh4O4xSRCO MSMBesyYijNNQoAekwThGDMSoMeMqTjTJAT+BR2fwkKoyaM7AAAAAElFTkSuQmCC ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image066.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODdhCgHoAHcAACH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACwAAAAACgHoAIEAAADA wMD///8BAgMC/5SPqcvtD6OctNqLs968+w+G4kiW5omm6sq27gvH8kzX9o3nIaD3/v/iJQBEAVEI TCqXj6MCiWRKp0rn0BClare2Y/Ga5YrHLG+YFyar1zvzmQ2Pf9xvuf2OSRvx/H7krOcn2Bc4aDhY eKiIl7joCNf4KDkWOWlJVXmpWbWZE/AJGio6Slpqeoqaqrpq6sX6ChsrO0uKEqBxm5GLsXvRa5Gp 8FsxTFE8cSyR/LEM0fzw7BDdMM0QnFC9kC2M232yje3NK35xjQB+Tm6BfsBurE4M/55h3i6PfK9s mx/hLuDvr54BgPycFexAUNdBaRoE/ltIDSIDf/oUWhx3sVzGdf8StXXECNLXEDcMN1ZwmDAkR5Mi UooceaCQS2As8dWsqHLEzHgw+328knNeUJtDQewUGhONwZt/mC4t6tMpwp/pRn4pCRUCSqr2pGIt cZRo0j3QuGLxGhHtRLNiV+a8Wlbtgq1yudUN943tsKsy2dLNGhfwVxJhcWIhmVZwg78vFa+967Yx MCuRK5+E3NWxR8xILUtAzFPzE84PSRdmxhV059AaReN1XRU2MVq03dC+LcsV7t28e5vah1l1W9Y0 ZQ/Uy9aw58+UiTunwHi58ufDWyI33RC7duPVu09fDX5CdOrfvUc1cfqpZOlNuacPvF7ndffZ6W+P b/0+e/XF8Zv/50/eeWDN5195n+kXIIDhGUXgfvD15+BgCT44IQfvSbiggBBWmFiBGnLYIIibcTde hgr+R2F+9q3YmocnGvihiVMhKCOG4tGIoo0wenBhhxH6eBmLPz7G3Y4p5ghkjYvhaKSOMYbQI5Eu HnmgkCLaVeSTTSaJpJQbKunlla9NaWGIYI7Y4pBoqoklmRv4BmecvekmZ512rgKclWe2+WWXa4oZ m5tm+sknoDExqWWiL6KG6KKONtEolYpKyuOgW4YJXaROPrrpjHoSOmafl/65Z6iGlhoom6aieuin oxbKaqyluTqpAyWCmuqpsw6oKZevAiUoqbhmFiytnPpa65LG/1LKbKdl9orpsGct6yyyx1qabLS/ InDrtsSqmquKxa4q7a6iZiust8eRpq65ukY5F7TpogsrlNheO69W8tbbLkX0ktuvX/sC/G+49g5s cLvdFvztu3mOmzDD6+aBcMOy+osvvxK7K+vCGRP8ccQ83klyyaXQaXLKdz4MrsXlBlTxxBC7zGDM HJfrcbPW6qwto9TuXK01NsOrcaVDC/xzzyHT7PPMMrf8dJBO3xwwuxsTDTLP8Sadr9ZFezo11iJD yvXXQXf9bNlZnz2a2mOzvfab93odt9BuM7101OJCTfXV9YU9N9x8i4033dwebXPVd+t94+J95/04 2IMHrizgiP+jR7nShrdqueMYb8644lPnLHjhpYfe9OQ2kw5065qf/nLmaFeuuucsO7z65Z3zajtp rL/u+uzA46Jy8XeibHzyu91+sext71771KJHz/fvwl9vdvC9O2599sNjX7fu1Es9fvNWQ0446pB3 H7734L8tt/i6sg//9+7fDz3uJMpvPub84/y/6XELDQ6JHOzSZ0Da6S9/GVKK89oHwfptjYGxc0oB 1Qe6BNovgpwrXwWzckENvs902uPgtCgowAaSJYB+owcL0bcYAj5QgvijIbA8mMJy5XCHG6MfCTdo wyAuEIc9fGEGP3fAGf5wgkSE4U3gYsQkunB7KPTCBgqIxb//pelc+poixby4xQFa0VZ0KKMZz4jG NKpxjWxsoxvfCMc4ynGOdKxHFsHIxS5+MYyZwiP5ziWcPu6Rj40bZB5tpcVDItKPSYFiE4+INBS2 sCiOlKQT90fFR6bNkpBkJA8vKb1JchJ2PsSgFLMESk2W8HCZHKJ8orjKDrqyf6FM5SwB2EpaEkaJ pozlCVUJxCXW8JafzGApRTjMXgZTl8QsYi4/yLtR+hKZN2ymLWVVzFOODpbLpCYwR6hMcK7wm8n0 pjCl2U0EHhOBCMzmNNXJTXEi8Z28NOcvrdlJVEJDefzkDfL6CdBXMA+a5KwmMw+qQ1EWVIj3RKg7 u/lQeUZy/6HnZKg9CYpPUsaznPNMZz1h9syIhlShf3QoSbF5Uox2bKMmvKhIWwrPkV7zYDI1Jkst 2lGJ3lSWJp1pu16K04lmlJ7nyyc6xbnOjw4UqBVtakNVCtWfppSp4XweRasK06VOdat6vOpF28lV o1Zvp1i1KFW/KtSeilVXZ2VnItWqTb4pI6B0jcU/64rXWuSFrBdNKl/bWk+/1nSTXo3pUTmanLDG dX58BatPFTtNwR62pYDN3WCJ6r/LdlOy47PiGCkLWY/6rrFzgYIecopYvnJ2lnw5rVYfC1uyTTao TzAtREOrU0zO1qkco8NtY7vYlWqWVK397VrhGlnS1nYs4v+sLPeU2xMjuHavwy3napnp2ebw1rm7 fSp3J1NJyH13qHbrrj0DKV7cpla3haWHGeSq3qyOtrpi1O7G5prX/LbiCPo9nhlk8drjRrU95g2I fe8bX9qyl7y5raWAxyvI9iYuwbw1rIQdB+EBd5XB63VwcDVsU/oqOJoedEIgLMxhU/lWtJll4BfC i1ZPUlhvfMEsiV0JlxOnFcQYgvGId4kgH/+4pDxOUhES4dgHf0jIFX5rkTH1WRbfGLtCiPKQI5zi cB1ZyUazUnGlrEgwP4fJMW5x+V6s4/kWuLQzfrKwrCxfQyI3THDuMJCNU+c2X1c8BwZu/GSDXj+X 96qB/nDuzQD9Xq/u+Q+JnnPFCm1oAhO60W7mhfJs09/9EiHTmuav8QJ8ujwLmolZbmQ9khzpUVsX uh628YUJ2Wa3UnfNan61VzN81kXHGtSuLrV3dz1hVcd5myJu8qxtzdhil3W7wH6usss85UoPO8wN RvbefA1tatsZ26idNredjOs2h1vYrKQ1hpttXl2Tm9nrXra7+8pq+LY728k2t3nHzWXZWlva+851 vNnaD04L/K4CD2gndBDCgyvcBQlfuMNT0PCHS5wEEZ+4xedw8Yx3QeMcl0HFOw7yKoV85Cj4OMlP jvKUq3zlLG+5y18O85MXAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image067.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBIYExgZOAEsQTjwAzmfiCbiUEALMsKxJxMIBYLSJSRESzCyPT//380 OT1GCbCIIRMjVB83E8wEHiaQLXxAlhobP4MQw3+QdgYOIP/AfwUGBcYGRm6oHA+Db2JJRkhlQSoD gwGSDSDX/GZq+Adx8wSgO4BOBDoyuDI3KT+HgQnkAl2gIMgjRlwMjBoMIFcUMFxm4IKazAW2lZEB YZoAAzuYtwdsAyMTk1JwZXFJai7EP7pAO0D0B6AWZrA6ACzANpY0AQAA ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image068.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhDwAPAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAwAL AAgAgAAAAAAAAAIShIOJsHEGH4tyUmcjzmevrm0FADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image069.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBIYGdgYuQEsQqiGRmADGYFRgYGJgZRsCwrEHMygVgsQMzEyAgWYWT6 //8/mpweowRYxJCJEaqPmwlmAg8TA1MCOx+QpcbGzyDE8B+knYEDyD/wf8t/BfYtjNxQOR4G38SS jJDKglQGBgMkG0Cu+c3U8A/i5gmMIDuAjhQIycxNLVbwSy1XCMrPTcyDukUXKA3ykhHXAkYBBpDa MIZXcJEEFpBIEcNUuEgGG0gkg+EAgwCaPWBbgPYEV+Ym5ecwMEFMZwTb8gHJlh6wi2wZLsNFbjCD RK4zJMBFHrDCRAQwfYPFFgaoLYxwE9aBw7YAaAskPBT+I7kTe3goY3fxFwZJsGuMgKZxQcOeCxwv EKMgLhRgYAfz9oDjgJGJSSm4srgkNRcRyjAXMoPVAQCAGbclVgIAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image070.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhTwAVAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAwBJ AA4AgAAAAAAAAAJghI+py80RnJy0ugiw3bwjXUGQIYLeSU7jAa7om4XfDL+R+dAxXJahqEpocJsR hsi6IS8k17IHzO0axs4tc6ylto+l5Iqd1rI6bvCTBVOhxOEX5Xbxhk84K6yVy4X2JqAAADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image071.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhNgAsAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALBEACgAL ABoAgAAAAAAAAAImhI+By+2mUpgzrQhfPhjQf1maVkFfyYnjyrYcGnqwd5WddMdPfhQAOx== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image072.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhiQCVAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAAAAQBh AJQAgQAAAAAAAP///wECAwL/hI+pyxf/mpy02gqz3jzcD4YdJ5TmuIXqOpruC8dCt9bTJud6nto+ vgsKXz3fRzNMKk8ZIwayjEY1TkZGipU2qw5o9qvcVr3gUoB4Lrsg47R65jbH32wbWf14D+uqPP0O FTj3FdE3mJXnxyR3V1Z4dIjlpyhXSen4aHFJCARnGckJqbc2N3lmqpd5A8qJdvr6muqhyTpqu6Mq Qbl5a3uZa+XW2Nu7O0shiKK8zNzMLKfblTZM7KsIbFAHWFuNWHqs0ETdTQ4HjsDmcVXOzmgFoN7Z Xi22cJzIPQ9WH95VqV/sVbRswngBlGRqILw44w6GuXYuwb1v+RzK2KZw0zqL/3saYcvmL8ZGjhep fYQXUuRIkowMnpyIa6VDJDwioksZsyE9mSozVmypExNNIS9xJmnBqcMUmw6MLnUG9WfPBjBlReXp zSdLYkUJbg2o9au1sGJl+ZRaNuZZtGlLrm27r+tCg3A7MgXplW5dHfwk+gu6F0bfm17NBe4Ihyzg vV7kGmO7lYxjiocFGyPLRO/XodCoOjW3GCBnJpgthy6HtfO7wmtcQbaqObFn1otcp4YderLlksue Klui2zXRq1BrggpO6jZvZ8BHk5690LTzg0gtlwY9vd3vqauj25Z52m4ypdztOW28Uh7o5OOVbrcO XaMpj6OH4uhNEyvyzLAep/9fBwR+AI6zH1CckQcUdgUhaJ9Ld6FEm4EjIYidgvxF0iCGD1bFXn0k XChPhgky4lZ8g7TX4YTVSTggeg5e5yJEDK6oYH4tagijjAv2t6N629l43IbnXYEEkD2GiEKCqRVY I5FJsrgNgTSScl2T+DzZ24jSZaeaeRGCWJyFGepoJV9CfgmmlTdOY6R7H9ZUJXtQFrkmm0mqV2J3 sdnWYYUGqnnlQ3Ea5x+PIAL6GpMIofgnhQgNGleUez5qYmWU6vlaZYpaGsSmnJoJ6afl9YOmqHBW ampHMKY6ql9fZloWk5MGJmt4otFVq3LUZZcrl7fyeqZ3KdoaEJe9Bqjrokf/4hqsfORlKadwFyrJ Sq8tzfmLh5LdWFurhAnLH7VPHpriiOOikWML0Nb4nblTdkkquHNqqaK2TsaIJ7yuzvXdmjkdeF+d +jWb7ZvvlQlmJ+/KhilFhiKaMEPrsuttUwT5J2519+q4ME98eDmXxPNdqTGjiNppJ29acRxweyg/ vJ6bjra0MssbB1kyyTc7RwWq25Jg7I/4jgwePorZzCOyQhPNtMP6fvtYnxA/s96fWpL4HKZ8qnTn MxvlOy2VqG49LJ2S9if1lhXjJW/a/fq48VFLEtzpaf8FIjdgnpbNzptqjV031c0dPFyo/56Lra9/ a21NmGOZx+FOyWISjDptdrO6tjiw0noXH5sztmHkmK8dzudwnSSR6W2hjs6snH6MjOpisV766PCB QOzptNvjuu4Pxi77r0bkzhLsNUwemfE/EK+d8m303rfzXIQcfFK7OwE2aj1PTwvykUrP/SrZe1NE +HYgfnj55k9PnDLrv0+VM/BXUAAAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image073.png Content-Transfer-Encoding: base64 Content-Type: image/png iVBORw0KGgoAAAANSUhEUgAAAN4AAAC5CAIAAADI9BYCAAAAAXNSR0IArs4c6QAAAAlwSFlzAAAO wwAADsMBx2+oZAAAGKVJREFUeF7tnXmI1dX7xzUoBg1aYGiiXTNzqCioqaA9yxZavpVt2qZFC40W TrRhKZEVCi1CC41lSXu0ly2QRlpmVr9MZrQGppKyEKYGSsWB+r2m53ruZz73c+8957Pc+znnnvvH 8PHj2Z7ned/nnPd5znnu8H///XeY/3gN5E8D2+VvSH5EXgODGvDQ9DjIqQY8NHNqGD+s4Q271vzz zz8feughj4A8aOCmm27aeeedQyNpXGjOmjXrzTffPPTQQ/NgmwYcw//990Hwgw46aNGiRaWGqA7N HwOfWmpw3/8+fJkyQg/Q/Omnn6688spaCtXgfW3dunXZsmVfffXVp59+esghh0yaNOm0007DypFq qQTNp59++r777tu0adPuu+++2267NTc311KzGzdu/P333//666+///77uuuuu+OOO9Lt3UMzXX1W aK2vr2/lypUrVqz4+uuvJ0yYcMYZZ5x77rmlM7jWhM46bOLEiU1NTRdeeOHee+9dMxkiO/rtt9/e fffd7u5u3P6BBx6Y1mA8NNPSZLl2MBw+EkT+/PPPIPK8887DRwIqzX4jvObSpUuvvvrqa6+9tq2t TbOVGhTr6uqaP39+R0fHlClTUunOQzMVNZY20tPTs3z58k8++WRgYOB//31OOOGEGH2FoQnSTz75 5LvuuqulpSVGc5lWYaVyyy23LFy4MJXVp4dmusaC03z22WeAcpdddsFBXnLJJQmnuDA0TznllFNP PTVX/jKoQb6Rjz32GNOE/rxQzgAemsmhibNgEfn5558LrTn//PNZRJajNabdDdlyh/dg8tziEtn2 339/XOa9995rKqcvn6IG4Kbvv/8+3+0LLriApSR/2esAnWxPpoVLRjvEa8J45s6dm8OpPKhWvqno AvKe0HF6r2kKVkVrvv/++3POOceU1ph2V/Saa9eu3X777XOOS8TbYYcd2KSFq5mK6svH0wCLqGee eYb9Oxb62223Hc6rv7//2WefZe5O6B0qj6cITZaxTJfxRl/jWnvuuSdfpBp32mjdgYdHH32UXXHC uXvttdcLL7zAHtDDDz8cj27H0F4RmrjrqrugMTrIosqIESPYec2i5QZvU6I1+EV2tV999dWjjz6a f3733XezZ89OZVfESL1FaGJsTG5U2Rd2QwNCa+bMmaNozerVq1OnNaa68ofiTDXmTnnmybfeeoso xqWXXvrLL79cddVVkMu3336bcwV5oBwemu5ATVMSloyK1uAvFa25+OKLM6U1msNTxTw0TTVma3ki vUJr7rnnHkVrnnjiiZrRGlPFeWiaasyy8orWPPXUU0Jr2JWsC60xVZyHpqnGLCivaA3nfSRaA635 8ssv043WpK4ItquCGy8emqlruG4NCq3hYKuiNVi6Kq2h1uOPP163QQ8bRvSEY25EIo877rjglRgP zToaJZ2uoTXPP/+8RGvwlzNnzpRojSat2bJly/XXX//iiy/efPPNPKczpmqt0BE9Xn755TvttBPD 3nHHHWFjnA4J1vPQrKbFvP5/kNZwDk2iNdAajusaDZkZH2IuuMw6kIGH5kzjWWedxaUJzhLtscce fKnmzZt39tlnl25XeWga2bH+heExRAuJ1gRpzf33328UrcFjcboFUCIPpyrxuAQCOW2Y0XYmt8uY qY899lgOzhFkOuqoo/jLwoNvEf6ynE49NOuPtqojYJr++OOPidYIreFAbRJag4N84IEH2F0/8cQT CQKB6enTp3MmAQBVHYlRAWjN3XfffcABBxxzzDGc6YSNvfLKK0zf/JMzOlWb8tCsqqK6FeC2l6I1 XI0iWiO0Bien797AHA5SHdRi1saBvf766/jIW2+9lVUm4nHIEk+GK01FVPoC69AaDrqvX7+ete9z zz13ww03GPl1RuKhmYo50mxE0RogqGjNyy+/rElrZCis6viL3zrssMO4pgOsAShvxDUCcdZ8X3zx Bf+UaR1/zK382GKA+DfeeEPRmn/++QdaA/G/4oorYl979NCMbY6UK3IskmgNl/KI1gitYc4tpTX4 JD6CPIFgkLsANf7JTM2mOv/LqhTXuGTJEtwkb/CgcgodvAJEjgNv2LABf8kbcA9GBab6H4G40Br6 UrSGuVvfr5frzkNT3xCZlFS0hnmWaA3XmonWRNIaPBPOD9gp5DEgnpmI8Y7AjgLjxo1jKQksHnzw QfGRYJG/oBkaTuicv5AP/DFgDS4MIEO33XYbAxg+fHjVs7CK1uyzzz6K1uCVK9MaU/V5aJpqLIXy itawaaJoDcciidZUuIUobu+PP/4gTRUrRXGZQI314umnnw46eebkOW4MXMpBDXg3SAVw3377LW4Y UsJLFoJMtRAgmdmBuzhL/hf/yqK23BiE1hx88MGK1rAU1qc1porz0DTVWPzyQmvwLkRrhNZw20uf 1gAgVoTB497gj+mYv7TGjMzImKMpoMocf/zxPPf29rKJqO5L4Nv4JxwFB8nKgQKCRdrhqEcpLkO0 hu9PPFpjqjgPTVONGZeH1jDrMXsKrcFpEa0RWmN0rQAUsvSUFFbyUZuRUBB5A+yY1hUfp0f+KetO Pkz9EpPkRCarTHwkqMXFlg5D0RoWkfjFIK2p2S0dD01jqGlWCNIabnspWoP30mwhVIzJFAzBYFhQ gjDFfoC4ItcUwPO99NJLUhdHuHjxYgpThYq33367uowrPjJ0N1doDdmEFK2hLtGaVGiNqdQemqYa q1KelAESrQnSGt4Y7epFEhGZuIE4LIf1JTnSZCeSSZyFowp/X3TRRbKOlA/94iBZm+IdqR4ZxoTW AEGiNUJrwDF/hdbsuuuuKStIuzkPTW1VlS/IbS+J1kBrPvzwQ4nWVKU15dqD0wAOkBcZ0cZHykQM bqA4MCEmepylOj3Ee14GL0OLg+QTOsTOF0DRGoaNaxRac9JJJ+lEa1JQXMUmPDTja1jRGjb2FK35 6KOPjKI10j3+D0bCnMsD/g/kMdUy/5YbHP8LlQGCsvQk1yQLSjaSACg+lY2hCkwfOiXRmjPPPJNo jdAa3hj59fha067poamtqm0FhdZMmzZN0RrAVI7WqL3xct2AJ3YxARZQowzEmZkX5OHPBKaVxyeO EFpDdfi4LGT5W7rjLdEaFpEcjhRawwERojU1ozWmivbQ1NUYtObJJ5+UaA20BrIs0ZpSWgMcWQsy KbM7A/JKO2AtiIOU90zH4BIg0g5/gZo4POZfcFkangGvgAzvyG4lZSSWI3BkdRhCpKI1NCvRGio+ 8sgjdaE1uoreVs5Ds4rGhNZIEgsS2ki0hjcKE6H6zLD77bcfmIB5sCiUvXE+LOzwjvLM1EkxWQ5C YoCg3B2TzKjyXvbPFddWvdAyEz3voTtM3JF3IIXWkPRP0Rp2T+tOazw0TTUQUV5oDVOeojWSxIJQ XtWckczIMBV4tDCP4H1FICXzO76N9x988IF4Tf6p4Ag6FRzZYA9ybRkoqwjWtYAeqIX2IwX9Eq0R NpYrWmNqGO81ixqD1khuPqE1kptPaI1mbj5cGvhgAVdqBjBNIwpq+Dx1CA3vqDYmZSdIqvNeEZ0K dg3SmjVr1ihak+dklDow9dAcjEQrWkMSC7iq0Bq4hVG0RmZt/pbDMd5UeURgx7Qr/Dq4Mcl78C1O VGKM5YgzK04ITYjWXHPNNbmlNTpwDJZpaGhy/xVaI7n5hNZIbj5TJaryMt0HY4n8E5yJIwSCPMtu JbBjmSgBRpn01Zwe3PoppTX4WqI1Qmu4vWARrTHVauNCEwhOnjwZWiO5+crRGiOFAjjAFIImnlKi 2LI3TiSQZxDGszhRcCbcXPpiuRlCpNzHFVrDJhHcX2gNS+E6RmuMNBOjcONCk4lSh9aY6pRZGwcc 3I9kWclyUI6XA0FgypkjAjlQJcAqJVkgliZ4UbSG216K1nDbKyfRGlPNmJZvXGiaakqzPKfKmbLV YR/lLGVOh1FRADhy6gIsSvL8UMs4Xda73PYiWiO0httevLGd1mgqUBXz0DTVWJXyzMWAj00cCXCz gpTtTBUWwlWLvww1pGgN209Ea7jtRbTGJVpjqmgPTVONVS/PKpBgI6tJjmgQDeLWmGxDltbEvwqt IYmFojUsK9m3in3bq/r4LCnhoZmJoZiFOYrG5iiXJcBlaANIaA27p4rWkMTCeVpjqmgPTVONGZQP hY6gNUQ7idYIrWFOl2vm0JoKSSwM+nOrqIdm5vYM0hqSWChaQzgx875t7sBDMyvrQcklWhOkNSSx cCZak5XitrVbhCa7GPwUa9b9ud2+5OYTWsPZOYnWeFoTz+hFaLLrkXUOu3hDzH8tRWsI8Ei0Bloj 9zEcjtZkbZciNFmzcxw/6/5Saf/XX3+tejgtlY4qNyK05ogjjlC0hnNuntakpfkiNOXqHRel02o6 u3a++eabOv5uA7SGbXOJ1kBrOCAi0RpPa9K1+JC1JsfA3nnnnXQ7SL01TvUeeeSRybM9mQ5MaI3k 5iO7i0RroDWtra2mTfnyOhoY8qPTrOIPP/xw4my5DUVI9gvQWRtoShKL9957j6O+3L5gJ5JAdm26 1jGeY2U4k0UMQoXNhmweQdI7OzvJ1pBbmWG7d955Z9bgUCnHhdZIbj6hNVl3nVvN135g4X1NHAN7 H6zluY1Q+9FU6BF/yXeGTRlOlGU0MMnNJ7RGcvMJrUk3N19Gg3ev2SETuhKPddWNN94IRrk5lQeZ udbIIUj8ZRa4ZMuMw0GvvfbaDz/8gLBM2X75WBejwy+5CKAm9GhoMjIM1t7ejtvAVM3NzXUZK51u 2rRp+fLl7BQuWrQoo8kUjahMa/US0/crGuDqgToKUxaaUpRVFx409d9G0LcEqz2Gq3mhUb9ZXzL/ GqgCzfwL4Efoqgb88Y5sLUtuGdVB8DnbXp1o3UPTzIwheEX+s/YQpEf1MZMnx6U9NNM3Difb02+0 fIuAkh7VJwsnXfsvG1J4aJqhCAQoOwkmQv+kOU1Dlrq6crO/ZoNBSaSKdBECa/BlpK8NvYxsykxr sUp7aMZSW+JKIVcXA3xqCMGvR/Alz+JKQ5BVL4NjCH3BpIy8lBZKm0qsgyoNeGhmrWGD9hUagv5Y niu3IhV18F21KYPhZlzUQzOmghViIp1WzEYTVAv6Of1mdCZ0/dbSLemhma4+69ya6fckkj9Fvqy9 YB6axjqPNL/OtKvTkzSulndpNavTdd7KVF/H5G3EeRhPKWKCb3SekSK4NAwuActVLyd4aIkZakrx GOmxlBWFmFO5gQUpUW1M4L2mmZ6Hzy6SVnkufGYF2tF4pm5xJzJQXt5LW6Fn1UGw31A7wboCykE3 vG2cwWfVfoF6Dx2zGluw7rBgGTO1xSodXFj4Zx0NYKFBBDTwXx0tJS9T+GIlb6ihWhBcKn/TUM81 M7Rfa8aaa3yl7DXg15rZ69j3EEsD3msOqo2D7nzqeGJabMeJaVI/pJJVvhwYLJK0LDQtkiHWd7JQ iXuSXDkCEKNHj67jPRMZzcaNG0mgwq8C8/sH8+fPN/1pmMp6sE7SCGhaJ0M8aOIj+dVybh1NnTo1 XgvZ1eJKFp8FCxak8mu7lko6BJqWyhADIuQ+GD9+PNBMxfYxBlC1Cj8Zw28VrFq1KqHvtFfSIjTt laGqmUsLkBaGBE+XXXZZjLo1q4LjZH7nKmmSHu2VtAhNe2UwtRxfQlyR/Hppzj/8ojBZdGJfKLVa 0sLmETLwQ7Y59yLAiJQNZO2vQKVLzyyWvoHhjR07NueglOGNGTMm9NttRsO2WtICNK2WwchaFOa3 z/KQnlNn2PjLJNC0WtICNK2WQdk4eItFHZINnbWhMIlJRowYoYMM28tYLWkBmlbLoACkjjkG47y2 w6thx+9aoLLURzasaW0X3DVo2m4PP36lAQehGXmN2pvcOg24Bk11t9o6S/gBhzTgGjS9gZ3RgIem M6Z0TRDXoDl4M2tbHgt58JzdUsy6Bk3MELq8Yqlh/LAdhKY3qhsa8NB0w44OSuGh6aBR3RDJQWj6 LXcPzTxqwG+559EqscbkoNeMpQdfKXca8NDMnUn8gEQDrkHTb7k7g2zXoOm33D00ndGAFySnGnDN a+r8CkROTeGHNVQDrkHT29cZDbgGTaFBzpinkQVxDZqR930b2cD2yu4aNCPTOdtrnkYeuWvQ1LFl U1PTwMCATknby1gtaQGaVstgCiASF/b29prWqkv5/v7+lpaW2F1bLWkBmlbLYGo5MlKvWbPGtFZd ynd3dyfJn221pAVoWi1DEDQ6meLIYNjW1rZy5cq6oE2/056enpEjRybJHGa1pAVoWi2DvrFVSfKp Lly4sK+vL0bd2lTZunUr6dw7OztZayXp0V5JizTIXhmU5TQzxVGeBdy8efP4gYGurq4khs+oLtmy Ozo6pk2bljyft72SDrkLu3jx4hkzZrS3t7e2tmak9NjNYi3ANH369ClTplRoxOh279q1ayXb7ahR o3KS1pCtg3Xr1m3evBl/mWSVGVKRjZKGr2nbKENsuEvFpUuXkl6VNI4J20mlOtM3iOSTcB6PHIxd kkZnELBLhlQw4RvJmwZ8cou8WcSPp6ABl6NBKsOMt7aNGnAHmqEdTXW10h9EshGXjNkdaAYNYMTT 9S2nbrg7A/c8S+QmNPXRpl9SuWE53KRfMbcly0mU4hcvSVMOQjMjlxmJsApx0XIOKbQCDoYJpIvI JXJka6V1VfXYmIgcT2hUofwoSjOReVNir/idYuii1pBLSxGpkU0FX6rncp2WFgiOOfSsBAm1Fmwk JG/kYCq47aoSCSiDvZTrwkgPOjOJU14zcqpNcfINXnLXUW5pmcjBBF+ajta0fGhImhIl7CWerpyC ZjwVGNUS9CeZLmNPcJrjLDfblqseQyLNCV1zwOWKeWjGUWAQneq56spBCmTNooJXUPRlM/q+lesi Xtcemvpm8iVzoQGnaFCmGg1N4lXJVrB8kNAEBym+KpLulFIfVbEcPVIEv7RkpGYqSFSOkFXuooLI MVarfkLXxvOs4g8YDJtVrDV8dvHae/CZMmqCU+8HLTT0fRFnswMYHfosBFnVLeCjpExhTFH9DhLt knEG25RhhMYpDQ5+f4bWLS5Lhuoh8r3Iq63lQMHg+sA/V9ZAQcui66F/BzUa9b60ZIO/0cdY+KdM 9Gs2Zsmgz1PPCpchPxTykZF1G7CMJnIcXGuW7uzEnFDiTEK+TmoacA2aVXdwIjXHKXc+P/74Y2p6 jdXQvvvuy/3JFO9dlI7CIknLQtMiGYIGMIXmnDlzuLwGIEaPHt3c3BwLUalV2rhx4/r161evXj15 8mSuU3LNNbWmhw2zTtIIaFonQzxo4iMnTpw4bty4qVOnpoiAVJr64L/PggULkt+oZDyWSjoEmpbK EEKDjuPcsmXL+PHjgWYqtk8FjqFGuEE6e/bsVatWJfSd9kpahKa9MoS8ZilQSmnQzJkzN2zYIDd9 c/vBcTK/kx8gyQjtlbQITXtlMLUcX0JcEYY3rVj78pMmTVq2bBn0KF7XVktaiAYhw9y5c3PuRTDP hAkTlixZkpBKw/DGjh0bz9g1rjVmzBhGG7tTqyUtQNNqGUwtt2LFiiQ5rky7S1Ief5kEmlZLWoCm 1TKY2p5EHTlJI2M6ctPyVktagKbVMojBJAikTrkGH0wt6svnQQPunDwSGh4Zn82Dov0YTDXgDjRN Jfflc64B96EZ+x5Pzi3n/PAchGZouem8CV0V0DVoqqthat3pquWcl8s1aDpvsMYR0DVoDl5k8b9R 6QR+XYOmzOPyVxad/oi7pUB1EJrKEoWbOpZapuGH7TI0G964divAQ9Nu+zk8eg9Nh41rt2juQDPy YEfWadnsNn6+R+8ONEXP/nhHvvFmMDp3oCmgNM0uaaAqX7S2GnAHmiGv6afy2gIp/d5cg2ZoU9NH htKHTK1adBaaPhRUKwhl1Y9r0FRrTR8KygoytWrXHWgqN+lBWSvwZNuPO9AUPflra9nipYatuwPN CglFa6hP31VqGnAHmqmpxDeUDw00IjSbmpoGBgbyof9sR2G1pAVoWi2DqXlJXNjb22taqy7l+/v7 W1paYndttaQFaFotg6nlyEi9Zs0a01p1Kd/d3Z0kf7bVkhagabUMpqAhg2FbW9vKlStNK9a4fE9P z8iRI5NkDrNa0gI0rZYhBmLIp7pw4cK+vr4YdWtTZevWraRz7+zsZK2VpEd7JS3SIHtliGE5FnDz 5s3jBwa6urpiVM+6CtmyOzo6pk2bljyft72SDrlwuHjx4hkzZrS3t7e2tmatfdP2sRZgmj59+pQp U0zrliu/du1ayXY7atSonKQ1ZOtg3bp1mzdvxl8mWWWGRLZR0vBdWBtlSIjUpUuXkl6VNI4J20ml OtM3iOSTcB6PHIxdkkZf07ZLhlQw4RvJmwZ8BoG8WcSPp6CBRowGeeNboQEPTSvM1IiD/H+MIt21 9o1R8gAAAABJRU5ErkJggk== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image074.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhtQCZAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAAAAAC1 AJkAhwAAAAAAAAAAMwAAZgAAmQAAzAAA/wAzAAAzMwAzZgAzmQAzzAAz/wBmAABmMwBmZgBmmQBm zABm/wCZAACZMwCZZgCZmQCZzACZ/wDMAADMMwDMZgDMmQDMzADM/wD/AAD/MwD/ZgD/mQD/zAD/ /zMAADMAMzMAZjMAmTMAzDMA/zMzADMzMzMzZjMzmTMzzDMz/zNmADNmMzNmZjNmmTNmzDNm/zOZ ADOZMzOZZjOZmTOZzDOZ/zPMADPMMzPMZjPMmTPMzDPM/zP/ADP/MzP/ZjP/mTP/zDP//2YAAGYA M2YAZmYAmWYAzGYA/2YzAGYzM2YzZmYzmWYzzGYz/2ZmAGZmM2ZmZmZmmWZmzGZm/2aZAGaZM2aZ ZmaZmWaZzGaZ/2bMAGbMM2bMZmbMmWbMzGbM/2b/AGb/M2b/Zmb/mWb/zGb//5kAAJkAM5kAZpkA mZkAzJkA/5kzAJkzM5kzZpkzmZkzzJkz/5lmAJlmM5lmZplmmZlmzJlm/5mZAJmZM5mZZpmZmZmZ zJmZ/5nMAJnMM5nMZpnMmZnMzJnM/5n/AJn/M5n/Zpn/mZn/zJn//8wAAMwAM8wAZswAmcwAzMwA /8wzAMwzM8wzZswzmcwzzMwz/8xmAMxmM8xmZsxmmcxmzMxm/8yZAMyZM8yZZsyZmcyZzMyZ/8zM AMzMM8zMZszMmczMzMzM/8z/AMz/M8z/Zsz/mcz/zMz///8AAP8AM/8AZv8Amf8AzP8A//8zAP8z M/8zZv8zmf8zzP8z//9mAP9mM/9mZv9mmf9mzP9m//+ZAP+ZM/+ZZv+Zmf+ZzP+Z///MAP/MM//M Zv/Mmf/MzP/M////AP//M///Zv//mf//zP///wECAwECAwECAwECAwECAwECAwECAwECAwECAwEC AwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwEC AwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwj/AAEIHEiwoEGCARIqXMiwocOHECNKnEix okWIBzNq3MgRQENsIEOKHEmypMmTKFOqXMmy5cmGHWN2VOiyps2bOHPqNKlQps+BCXcKHUq0qM6E P2cGMMq0qdOn2JAmPbgUqtWrWF0GmFqwatavYMNG5SrQq9izaJtunWo2rdu3R5O2hUu3Lsu1Mefa 3cuXJN6NevsK7vuX6uDDiMdqDJy4FTbHkB9Ljkx5suXKmC9rzsx5s+fIL69kZIz4imlBplOfVp0a NesrrlnHVj279WvYt2uvfq3bNIvfKAsDXdmqlaDjyI/DTq6ceXPkxW+2Wi7IuHPrzLEn1w7deXXv 3I+H//9+HTx537AdvxRkkHRI26jj45ZPf759QSxg37xivHj/4tUB6F+A/xVI4IEDJijgggYq2CCD BLYmSEvCuTcdgf5lqOGGHGbomnosXdjhiCSWaOKJKAIYm3g1BSAaQiml1993M9ZI4402/odaTcvl iOOPPgYJ5JBCFqncaSDaFABqw6EkHocYOughlBnq15KMGkbJ4JQbalkgl1lS2eGR6Q21ZJMmiUjk mkbOyN+VbbIpZ5x0HhhbdEW5iGZJqKXoZ4dvEofln4QWSuKKSRq15Iuk9Tjnoz4ed2WAkFZaZ5uw 5RegVS6y55GT/BlKqJUqiSjqqX7ONuFXi5aFkoyWxv8qKUv8xXqppSr6NmtYnbp6Up+opkhqSqYG a2yuSLrVqnuO3nrrrio1a+u0BiKaVaIj9epen152K2aYVa660qBSlruluV8OqBqeI/VXlHIsiOtX fMxS6myl0MZ477406hroSa24iG1NZF4YGmrbhnpsicOiVOzCh9I2sEjAxouTcRKruB5s9VKLr7wx 2utxkRKmtGor8bKAzY4uTXdFfrXW2LBInV6RMMQMgwwwuRCTWR2x2KS2cqYTqlyqyz2OyHJJiwpS r4Ajr5nvq/zWCLW1IU0H2da1VmdawD+vzMLExemKIJAzh1TzzTiPmHZJD6PqM7YiBm1xfo/BXPaE P+f/i/FpXiqts9r0hhx1nFOfJO2lyIaquLgBO7ajwZK/HHZIPp+N6eAgrW1yzF1+C+boBtPqbege vlxmqZqCpN90IN3JZ8aog5v6xk6HDHXVUnNeUsxsIhvvhBM/xq7rwLE8Nkj+ZW2d3ppb+nZUuLHd NofTt8vzmCWbfNxv2JqGTbzWkfT39nL73nTHvCPuO0mwWm1dayCClvXQL6s8rGPiwy5S2YBL0OG8 pr7qfe56gHrf/7Y3t5HEhnmPuYLYhhZBin2tXSsKXM8kyJPCvUpk7RtS4kwCuud9bWAog9ybxqa1 8UUQcuw6n3iiF8L+TM9zoEIg9hSYtfRg7VccfA/f/yT4Jv1cDnMZ1KHgcMe+AQpphCXJz/CKNxLx Ma84KsMPxlaWpMqlpoa2uqEBc3g625HuXNnDIBXhZrSgFe17AMKghA4lOnSVUV1M1B0Yn8jDnbgs dlk84QIDuDsnSq+ACDugEsOFFfzghoP1Q9qTFlkoKK7PcHsUYR+F4hp5yZCGhtyXGBOZQ0ru7Syf NKWxljYvjukxlD+CYlO+9zVQZrJ9o7SZIk2ZRqGcT2GqxJklPfirGd7yRrLMiYqmCMtjBimXFirh GdN1LjSusSYARNI072jHOlaTmtRkZbaImSYfOvM7QfSjJG3ZzHbaEJG6JBYwEdgnPyYxmPjUWAdd qf+S+BgPQg5CEEAB1MtiwsyY7kzo5g4Wz34CzjsQjShzTnOx/N3mohjNqEY3ytGO5iaPIaqPSO9D UpFeE2CfSWlnVqrSlrL0pZJhqHsS40sI0vQml7zpxdQjrk0t718to6hgcKhTm/jvdY4rovNAo57w Na+eljGe84a2SZySs6guEY/4uhY01/EvPsqrYBVB5LRVwcyNoQJrWU+K0zFilUfz62oR+ee62J2H RSSpp//GVzkRjS096VTLVd+6En+qqWj8c4zRdjSfNpovQEE0WgpDddCuQoWohA0R3lIYtMRa9k2S 0irnJOc19XBwabCDDFCZktPMEqeznu3ChGQAki7/1PYKMuiCNLDRheL0NqqzMM0BJjQL1CAiaLNw 3cuOix8+2FYQMmCrktzq2pTMYgzXHQMitosI7XZ3u94NL3jHK15EdGG85m3Fd83LXfKOtxXafUpr q6sS26rXMfZFRCuui43tzmK7vJ3FfXn7GP3Owrb+5S8iBAzgLsziv/gt8IPtK1/q0vfClx0sSmHK 4ZjmhIAlDfFI6VNV881vxCIW8SYxCzAyedSjJe7halBM4xAL1SXwSXGN63NjkDosXl0jj5CxQ+Tu zBA5q2sJ+R7EZIEyuWzSdaPkAkrlgaYrjSw23zwRaEXTqXK1xfwyFecbRRCGEouJMs57eqhQyPZR /03njKtMHYa+tonzoUHU2pffvGUdinOc/CxnnPt1uekAWV7difMWS2VOd5YtOBZ2YFq9Cc47/tkk wKI0N8+VTOb1+ZubThdUmabhHg76nXkNLeYafc5La7nNcuZJpC0YTHFeiIirDmZB9WxKV3eu1J4+ NQEl3dU2JtrRvl4grBcta1Ji+tPXszVq8kNWaNuZz7UGM+ECDTfgxXlm9osdq9uZ7FXDWjmQdvbs ss2STFNy19YWZmABnbudCbtu/4sOWRHqTGbTedl7Zdqsc11pTYvO1kILorvN2M3a6VOeSjO4wzFW PDJr794NY6wLxX3ucnu64/Om2cDFze5BDo/gvP/EtiqTbfEFYlxnD18Zv5vp750tm+UjH1rJp5rX ePdM5b3W9q+5reWXa292IC/suI+Jc3X3fOfMo/blFq5EeEO9lfUWNKyT7DqwIvHmIX/1qR89ZyCC WuJm9DjJx4R20nU6ghGf+NlTV3Fg583ogro5n8Ge7oaSUIM4axi75FXnwLO18BDLXstFEj93OjaC w2MlyqrcZMpHqaBCtLKTN09lrvsl513nvOYtT1CdWW5qkrTNbh7J+hWpvjXYfL3rVz/71sNnjYuv 4ot3/8U0ee85aqWO8JFM/Od8uPjBR/7wgZ80lWQ5TUrE8GFyT5dqR1n6Qnm+XUDrNYJhHirWuX7/ 9u0OF5X57/HeUzPdiodCfXuYbLV6TOLSbFecaL8uylEtjnu6Ksi+rp4SEiidZByt8yFaJhK/UTRb dUEuUzQWoyTkBxdT533650KPVzR8NT4YyDK1AkmU1W2ntSpG1IFSxlVt5XTY9z8/k1aW5Wkv81kV 5D/JERKVBTc7MiuQJEWSc1ZvR2pEl4ILFEErFFNDaDQcZH5zNSsBZz5eJSnTsVvQ4jgrwwf2B3r0 lRrRJX+CkFwo0z8vEwWCYFvBJX/YUFyWI3NluDIyABvJlVxlaGhsGDRE5IZdgFuq9TLJ1WVaEYHV ZV4H9l+IwAJd4GDr5WDnBV5/+F2JqF2t4GBj/+Bdhghe2HWI2rWIC+aI3BWJikiI04WCgpEhNaFg +iUDxzUGjqFf2DAGZaiK/KVegJiKCwZg2AVf+CVgpghf/XVcAOZfqIhd/fVgqoiLouiGFMKHb8Ea AGMi0kA8xSENreCM0YEI0IhCcJOM0qgh/ZUhzvhPyziNzRhl99cu4yFR5AgdxSNLvcF7GiUd6rh7 10R97zFjOjaP8vEyKBR2cphQamdB+ih0amOFiGcs4PYbPUZ10YaPYrdIo+aDWfd3hbRHaGZizfNx wgZvfFd2j7NnIeJzC4N5AXksLGd3WrN1nmQ8m2JXFylPAIeQ4QgsofaSt4M5SEMqBjl3DMdpQP8n dwU3cQtJb6QxkqeGefEhbGoHZ/3Yd6RRkwf5WOi2diknKFfnk3SGd2yWMl83dkW5dGfWdH73dCsX WH2Ca05JSW/Ha2Tpj9QHlAo1MwTUU1qZSWo3lG3GlUnJkSCJj4hmlwKZkwrJkiLpbe7keZg2c7dU c+W0kkhZSjCpkxhia9g4lje5kwxXltC2mJOJln9JleOjKULDcUSJkGz2mX33Kc8GdX/jlU/JaFFJ M/FBmt2mmVeUZMfWb1mZkgLHJIyhlHYWdnqom8LEl0rUk6wJG65ZdCSZb54nl4MWl29pSFxZnJIG dSzgIvOBcu8GnH7ml8TJGGr5bYVmI1epUIb/2W2IeTC+sm6SuU0HB5rWGZmWGXP2xnaMWUfCuW17 4nLHqXRJx2j7yZD3GZpBp2S6tkkfuZcM9Z80eG/L024KgyMP+aA5cjVsxWsOGqEWWqHoVHfEiaBw 927sKWlHlh3mUR7ecUEtAVbjkaIj6hw9Rm9dYXP0GKMmZVTtCGPiN5M1mlFH9HlM8qJp0hwySo87 ik0uVaThJh1GmqQpUTOeAiNA+KQt0pqGAaVUuqSxsRhVmqVY9yJYqqVa2jQbChheWqVg2qQcMVNj +lZl+hNomqY3taZy0aZuOlRwOhVdOadveh9kARRyiqfKUjOnsacE4TRB4ad8oRAiJagGwTEXOtGo jvqokBqpkuoQI6WoGrFjQYqpmpqpnLqpnpqpltoRnTqqn1qqpHqqpRqqZGGqrIqqrtqqn2qpAQEA Ow== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image075.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBYwPqAmZETxAqIYGQAMphPAtnMDKJgWVYg5mQCsViAmImRESzCyPT/ /380OT1GCbCIIRMjVB83E8wEHqYHzAtY+YAsNTZ+BiGG/yDtDBxA/oH/W/8nsE5l5obK8TD4JpZk hFQWpALlQK5h+AU0RQDiVAYlsE26jBBTRZj+Mj5gArGEgSx3VoR7QG7/zdTwD6JrAiOYYmIQCMnM TS1W8EstVwjKz03Mg7pclxHsbwYjrgQmBwaQ4jAGEUaYyApGkIgtw3Wg20Ai2YxfmJiBrJzyDIZs oLoDUL2dzPuZQSqNge7mgvqGC+xTiPUCYDcJMLCDeXvA7mRkYlIKriwuSc2FuYQJTH8A2skMVgcA SnmrxKgBAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image076.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhPAApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABAA1 ACEAgAAAAAAAAAKAhI+pa8HqnpwpxGmpphfvz3SSCIKR5aCAmpKl1xzXeb7fLOerbnNIusPFer4c ULgjwhq0Hw81U5Wkw+QqQ7VWlUSRi2uqgLnIHxQ6XpTTrzV7qjWfM7K5/Z4FvrvxPdwPGCjIkTU4 4mQYlrjxtQjhqFEI+dA4yWMZgkmpWSGZUAAAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image077.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC22Qv0oDQRDGZ2bPP9kEPdSAZUghNga9xspH0MKksTOBA0XPBBKQ6661s7HxPWzE 4io7bSxs8wh2gqLrzOyGiHGXhW9ndn7z7bw+Pd6CrjIaG6yI2j5CYGHeWRuoa3aOT4VERXwIUSNI zrk/uRaua2SHMNRVaUKo0diU0RKrjfllWAEn5bAo3d2dK6IbUw25Gux3RyedfJByTtzAB1NibxWa 2mkLPXWNvvCeRK2y6kVTP/L+k4pvX3XNroF4x+086/XPgTxFfwuJPaZNEM8DeJmphH8rSX28/SIU 0gP2mFCfJQgj7pxm6bBxkF42DvtZ9yJMTVx4FoFV1hk+k3wiScowgcRemZYR0C5HbJiU1Sl6vHcd w4LeHnQGSNRs58NRmk06TV0bffcDrexYiwQCAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image078.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhMwApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABAAs ACEAgAAAAAAAAAJkhI+pC+HpApsUHmlwq5zpDWbd6C0fiZ4iyqohO7ouPMk0ad/dh/F6HXk0grOf 8ZgiCpEmSY8ZW12UxdYFynnCqNyIVMU9LpdYCK9aTquzxLUFgV7H03O6m1LH5vX3Wt/0B8hQAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image079.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlh7ADcAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAAAAADs ANwAgQAAAAAAAP///wECAwL/hI+py+0Po2yi2ouz3rz7D4ZiNZXmiabByrLjC8fy7KX2jT9tmwX0 DwwKL7misbTzgZTDpvO5OUqnhp2MCc1qg9SujQfEbsdkkfcscTXF5bYbg44v1E/2+16W6wGrsR0P mLV3Rrf1F4g4NEjV53aYCEmzeNT49hiJ+TKJU2iZ+fmzqXJJRgp6qiFqUploivpKopr26QqLKgvB GllrC4rboIvJ25v5Owc7TBxpjBBMqwxtwVxFnBwdyOx8an2NZ8yNB97t9it+Zz5OJquNnN6rih7u bisaLz//uml/j386uc+v36dB7KABFMhFz0FACxFKktMwoENIECdGnAgjzkWJ/xixEeq4sWOIjyBF UuwSkqHJRChXplzJgRHMlzBTTaHJsWYeKThz6hzDU2fPnwIo/Rz60whSn0QFFVl6rim5HFCjSt15 o6rVq0CzXtVqktNXruq+cAUr0uxZsl1RoN3KFooKtm8xziVbd6LbuHkdnujrKa5TJIIBC1wlWIDh fogLJ5Y7YbGjx08IJ5Y8LzJlzO40P+acbtZmyk5EfybdJALoNqu7qUbd+lou1IppC5kN23ZCB7FL 6Qaiw3ZvaMFpD1dWPPfvhwyO+1nO/Jhw6DN463b+rvlv7PS0X6cuA9h28DG8fyevSfp59GbUT2ff XgF3Q/DjN4M+P598/PVH7v9fnt8t/43X3wfuvVdgBwMSmGBMCQSoBYS+PEidhANRyF+DDt6XoYY2 cQigh1FgGKKIGZBYoolEgJiiirEcYCEUMWKCIoMuFsWijS7WuN6NPCLoY4497igkkETCCN6MyxRp 3I3SMKmckxYkQWWVVl6JZZZabsklGFJ+CWaYYo5JZplmnumHkjAUFCabUrl5Y5dY0iKnlWfCGcYF nUyJZx1qvtLnFUwM2kMFgQZxqIshEWpooY1OhiZcPrBBZaQ1ifEHo5a6pGdtjnq6qUmaUjplqJw+ Cmqpjf4ZKR17qpGoqbLOSmuttt6Ka6667sprr77+Cmywwg5LbLHGHotsssp/Lstss84+C2200k5L bbXWXottttpuy2233n4Lbrjijktuueaei2666q7LbrvuvgtvvPLOS2+99t6Lb7767stvv/7+C3DA Ag9McMEGH4xwwgovzHDDDj8MccQST0xxxRZfjHHGGmMsQcEdE/zxwCELPHLAJQN88r8p+7tyvxIU AAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image080.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBoYshu0MBYzxjAkMINAczsjAycDAbMPEwMDPIAAWYwViHqYVDGyMIBY3 03agHmYgSw6kkuEXUCUzWF0DgxIDC5DWZWRg4ADSqsxMDFMYLgKxJSNIXJ3x/3/8+hiR9FkyejMS q48JxT7i9TEj6dNiXAzExOljgetbDNaHbh8onDiZQHpAIfib6cN/sAEMe5gYoMCxKDMxB0hDzGNl QNUP4jEBQ4M809gY2IG0IisTg6GZA+N9uNmUuZGdqm7kQLjR6C9DBZXcyElVN3JB3cjI4MxgzdhI JTdyU9WNPHA3OjFYMYYyUseNvFR1Ix/cjY4MhxmasIYjAwMAIKdqXY4EAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image081.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlh1ACDAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAwADACy AGsAgwAAAAAAAAwKCwsKCgoICQgHBwcGBgYFBQUEBAMDAwsJCgcGBwkHCAAAgP///wECAwT/EMgp RbiD6s27/2AojmRpnh1xBQTqvnAsz9J6hUVgBAXt/8Bg6QYgeg6sAELIbDppRiMnkAAkAs+sdvuJ YjsKHWARUHDP6KfXw7AFGBO3fE6v2+/4vH7P7682ax07ZmEGcX6IiYqLjIuAX0WQjwIAFpCNmJma m3yPNZJDFw6jpKWmp6ipqqusra6vsLGlfxpuLyuyubq7vL2+tEG4vsPExcavwEDCx8zNzrvJP8vP 1NXWpNE+09fc3cTZUKLe4+S64DPb5errp+cy6ezx6u4x8PL33fQw9vj91Pq3xPkbaA2gC34EEw4z iAKhwofmpEgTCLFiL4YnHFrcuAqjCY0c/0Oa8hgqgMiTrkiSAIkypMoRLFtufCkipsyKNEPYvPkw J4idPBP67EIxaMuhHoAa9Ye0g9Kl+JpOKQrVpURtVKvOvBrOpNaTUh95/WoVFNaxZLea7Zq2LJOn bcmFrZU1LsG5FODazccVXd29/fAeQgv4bl8PZCQMQBJggdjCPQ9vGLDjC4IAAwaIyfsXcjyMARh7 4kzYc1TJGgxJVLGEtGnDa4lSCFOGbunXn1GPBjDgSgvbuJnqpjshQQIzj4Ofjp30S4EEGabeVl6O JJErNoBTlyf40/Tt3rpH+g6em3i95X8Nb9g5fbXz7d0/g09e/vz1GePbZ0Z//7j+/vHFXP89+gX4 DX4fFWigegPuo+CCvAAI4T8IljThexWu9OCFskjIIX8ZwrThh8iEWNOIJLbiYYoHNhhQfSx2aKJO KMaYyoo2RjjjTzXmONKORMHoo4pANifkkB0V6VSPSDqAY5OwPAllSkpKN2VELh7EJJJSXplkluwd 6SU2VYrFyZlopqnIW2q26eabczQgBJx01pmmnGnkqeeefPbp55+ABirooIQWyoUbB0SngQKM9WDo o3sSEUZrFGjmWCGQZopGIBSQoaimoG4h6RsbXBHqqaLacAAlxKGKGCQEXIbAp67KBsCku9U6AWWj EmCprjQesoGnwMYhGgA7FCuiBJhq8GtAs66q9oUSOxiirJEXGEArs0gk4CiwRFygQBiOXWvuO9Om e+66AUlgaiTsxpugBG0QEMa38uZrKwAMXIGvvhREAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image082.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBYwMfAxMAJYm0MYgQxmDMZGYBCMmBZViDmZIKxmBgZoSxGpv///4NZ eowSUDFuuDoeJgamBXxCQJYaGz+DFMN/kGIGASD/AJB1DIgT+BgYjgEN44aq4WHwTSzJCKksSGVg CADb/Zup4R/EhRNAlgJNZBAIrsxNys9hqHcACthxcUWqMDHW6wKxwgXmegYGAwYWoLguUDUHkDbi SmC8wwvSuqESxtfiBvFt4fy5HCD+BTg/kw1V/XZmVPV+jBD1WNzHwAJ0X0hmbmqxgl9quUJQfm5i HgN29zGC6Q9I7ozhAQWduQGM/xPsDh04/yULRB7V3j1MpNnLALWXEW7vIU6QPU4G6P5hpNA/newg E3Lh7i9mAvEd4XwrBog8FzT2ucApBByM0LgXYGBH8iMjE5NScGVxSWouiMfFoMjQBVEMsvezEIPa P4Z6dD8yg2UBrlamnegCAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image083.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhnAAVAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIAAwCY AA0AgwAAAAAAAAgHBwwKCwoICQMDAwsJCgYFBQkHCAECAwECAwECAwECAwECAwECAwECAwTpEMhJ qwXhYs1l+CD1VWFnXhmoBsJwoquYyfOLaqM91d7e/xudqTbIAQiBghAInNWeS9+NF/3xnNIqiXSl VrFSaNTrIwvF1qyW6bkq18F4EJqrk81zePy6M3LbgBZ3MwYHAQR6aHtGKRuNWxxgNDE4aniCjpmQ gisInCuXimaPdZswJVp8ah2kkmwyEwKHcKqvgaUirLlrtXKsTq6+fztvqbu2e5ZDx32glcovaL0w sJMqkcx3WaTLzEtewdhNeR1FAS5HSbyYwuO3oPDAfmfUkdJ9bfEp8C3rnHoAA3YTSLCgwYPPECp8 EQEAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image084.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBwYFnAyMgJYn2IZmQAMpj/A9lMDNJgWVYg5mQCsVhAooyMYBFGpv// /6PJ6TFKgEUMmRih+riZYCbwMC1gdGDhA7LU2PgZhBj+g7QzcAD5B/4f+M/AksDIDZXjYfBNLMkI qSxIZWBQQLJBFIh/MzX8g7h5AiPIDqAjBUIyc1OLFfxSyxWC8nMT86Bu0QVKg7xkxJXAaMIAUpvL IMIIE8kHu9AFKCKAZirYTKCpwZW5Sfk5DEwQsxjBZn5AMtMDbP8FBnVGUUwTsLurFeYuiFmMcLOa mUGaFBgSwCEOCgMdeBiEhiowsDAyMrNyMQo15zK1XRBqdmFqVGBgkLcAqZV0BBrHBdXFBQ5ViAMg /hJgYAfz9oBDkJGJSSm4srgkNRcWRgh/MYPVAQAHqQTvFAIAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image085.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhLQARAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIAAwAj AAsAgAAAAAAAAAI5hI+pEBgPl5QtVXPnzIdz7Sxf82BVqXxYupLMa22sy5wxJdbmGsr3Bez5QsEW b7iDKVGQZrPmRBQAADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image086.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhygBpAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIABgC5 AFAAgQAAAAAAAP///wECAwL/jI+py+0Po5y02imy3rz7D4biSJbmiaZjAATqC8fyTNcC29r6zvf+ hsv9hsSiURMUkhLHphO2KCWVIubziq1Gq4Cul/rZZsfkQ8YcmnpdWheaDL+i3+GvnQ0y0+P8orhu 94UXZnBT2IdI9OehdpemkBjpM3fIGBg4yNEgyWlDmYl0eQl6VrnXiZrCACjq2PF2miq7BGnZijmb W3Y7quvr1MhL+ku8EyxcnMxzzAum/KzC3DwMXb3SjGytvYSdvf3N2i1KDW4tLU5e/nwu7qxezd6e /u4bL0+vbX+Pv96+z59Mn795ACUJ9OeuYKeDCAkq5MOw4UNZESUimRipokWH/xiH4NEokWNHjzcQ mhQkcqRHkAO7DEqpssaBkw3XXIxp5KVLmjTd4GzCJgnLgTB/xnDDMymLokahDDUZhGlTFDie9pzq Z03SrVKxXtsK1qXXSWHLdh1rq2zYs2hDqTXblobVtwnjSqGrli3auXj1YuXb164qvIEFmwBMuK5h IIkLL07T2PHjV5ElT2Zcma7fjogzK47b2fPmh6FFXy7pOfFogKVTr6bX2vXj2Knr1hpJu/awReti aaptmtEh379uhwPemNQneMMrUUaeWXnz10+I/4Ye/dV05gRzYwezHJr1M99lA9kuvvnx8snPW0kf 1Dl59sFLIdhm3C397KxjeRbfT109+wEXYC7/DdjCBQouyKAD5RUAADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image087.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC11Qv0sDYQx9ybVqr0WPgiC4HP6oiwrq4Gr/AB1sOyqtcKDgWaEFue1AdO7s5B/i 0MlNuM1dnZzcBT+T3CmlHwSSl7zkve/15fkB9lJ+JK5otndCkMTLJGcsW7csUWHNSooSGULsnJvq bdOSITtMBa/KfxtqciPleckaMwuowykdc1KP3dgdcJeqRa+Gw97wvJ1cR0A4cSGQ+Ob0J9c8IpPI CFpJfNa/BKuCLUHVyK7fpX3oSIYNWpxiKq7M9kUcDcKj6CY87se9K+Au30Hm5mti16lxmvi0P1GV m/8qO50QJSKv7BPfZ/Xbpkys4gNreMe6RANv8AuWb77tfuEnwKxVT+aRmFdayWAYxfmPqp9cC8Gz uV/jtRXutgEAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image088.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhGwARAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIAAwAW AAsAgAAAAAAAAAIjhI+Bq5t+QoPTqfqguVTvz3gghlmSlHnVVFpZGz7nPAO1fRYAOx== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image089.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBYwLSAkZkTxBKKZWQAMpgvANlMDNJgWVYg5mQCsVhAooyMYBFGpv// /6PJ6TFKgEUMmRih+riZYCbwAO1YwMQHZKmx8TMIMfwHaWfgAPIP/D/wP4EpgZEbKsfD4JtYkhFS WZDKwKCAZIMAEP9mavgHcfMERrATmRgEgitzk/JzGJhALtAFioI8YsSVwGjOAFJygUGdURRNJ0gc pDMkMze1WMEvtVwhKD83MY+BoRViBiPYNx+QzIoD63FieAUOE5ArdeCuDA1VYGBhZGRm5WJkarsg 1OzEALaYwU2+IUOTYb28ZwMDCxdUFxfY32BpqH8EGNjBvD1gPzIyMSkFVxaXpOZCQhTkH4hbGBmY weoAkJO2mbYBAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image090.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhHAARAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIAAwAW AAsAgAAAAAAAAAIlhI+BEN27FJQMGhoP1rby3FGbFzpTdyUqSpLj+b1gyji2WdtHAQA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image091.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBo4DnAyMgJYgUEMzIAGcx6jAwMTAwyYFlWIOZkgrGYGBmhLEam//// g1l6jBJQMW64Oh6mA4wNPEJAlhobP4MUw3+QYgYBIP8AkHUMiB14GBjagIZxQ9XwMPgmlmSEVBak MjAYgO3+zdTwD+LCCSBLmYBQILgyNyk/h6HeAShwlo8rVYWJsV4XiBUuMNeD9LEAxXWBqjmAtBFX AuMSbpDWDZUwfhgHiG8L599iBfEvwPkLmEF8bTjfjxEij8U9DCxA94Rk5qYWK/illisE5ecm5jFg dw8jmP4A1MUJNTeFkxnIMrQwSEU3mZEkkxmgJjPCfczADjLByQLGP8YC4ufC+SVMIL4jnG/FAJHn gsYDFziuwB6ExoIAAzuYtwccu4xMTErBlcUlqbkgHheDIkMXWDGI+PBZiEHtH0M9uq+ZwfoB0CZR 9nICAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image092.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhhQATAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIABACA AAsAgAAAAAAAAAKthI+pEMsOo2woWCsjPXcbXIGZ44XjqS1bOV7V+8Xyg8JKw3J1qur7TJN5KKtf 8HZM5H7LofHohM5wxGqPBFSSrAzWMvjNlIi+qQj3QGshZCwWrS6rXLcOfW2SN2mgsaajZHeX9tGW hZdU4wdmE1iYFRZ1VfcoxXOIIsnXaFMkN5n4WeYZiuglmKNpGEqqFpb0lTpKOMG5o+qzZ1aIKsir i7dC1VsF+NQ1NNgFUQAAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image093.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjB4wH2AkZETxDIIYWQAMph1GRkYmBhkwLKsQMzJBGMxMTJCWYxM//// B7P0GCWgYtxwdTxMBxgfcAsBWWps/AxSDP9BihkEgPwDQNYxIF7AzcDQBjSMG6qGh8E3sSQjpLIg FegOsN2/mRr+QVw4AWQpExAKBFfmJuXnMNQ7AAX283FpqjAx1usCscIF5nqQPhagOMj1HEDaiCuB 8T8XSOuGShg/mAPEt4Xzb7CC+Bfg/PnMIL42nO/HCJHH4h4GFqB7QjJzU4sV/FLLFYLycxPzGLC7 hxFMf0ByVz04SC0N0M1lJMlcBqi5jHBz/7KBTHAygPGPsID4uXB+MROI7wjnWzFA5LmgscAFjimw 96BxIMDADubtAcctIxOTUnBlcUlqLojHxaDI0AVWDCImfBZiUPvHUI/uZ2awfgAc4BwFcAIAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image094.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhfwATAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIABAB6 AAsAgAAAAAAAAAKjhI+pEMsOo3wnWDvhVRjt7DRLB5YjV5meIbLuS6lx0rSoHJ6waYs9bCsFV8MU 7kZbyX4zX6oDLRZf05nHh9UhqxImk0GqPcRJza58EpOVow/tAtdB2cmslQsP5uNPlpOOZqWC8XdW YacX8YX05neGB4jTssg2GRlYNWW5w9XEsQfJqWVZmHNpGEOKStc5QUJlmooFuuf3erkJZksLxnd0 ewhRAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image095.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC51RLU/DUBQ97+2r60bWVAFBFASOpltq6rEgWP/ASEogoYxkS5o6BAqFxtCfgCCZ mUBhFjTgxj8Y2VAklPtuuwoChia375zXc8/96PPT4w34mWqQoq7QzBcgUGoJQGKDv1Yo6nKJpBA5 EjJNU0a2WM3vGoWuKSGnmklou9rCOlIlhkH8gdCIItGAEZk1ck0Te73hsR+fB4DDtT+llWYdXqui KEsY/kkYDKz9ILIO+mHvDC+38+iNwrI+oteVo0mZdDukJnN09AXuaqqldifzu/j6n5+AOmeFbyLs Kvs6es59oaZ2vbbjFpoFVBnbW3KXueP90gttC0Y3Dg/7p8Dlmu4k7+afs2W9iKLObkVZ3Ht6vkmd t80j5ns0UGM25v8jpNzqxoNhEGKifEEZm7jiBPUaz038nLvE+d98hvNyNAIAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image096.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhXwAVAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAwBY AA4AgAAAAAAAAAKQhI+py+0PTQhnxouzXhT0voXi6CUf2KATWikWt7EeS5c280p6le9yD1mZdsSS Cnc7IpRFiiy4jBKdzCGoessea9KuVmJZ9Z6flvn89bnQaOyQnZQCq+Vi65m2v+3Y8P7rptfmtcYm JvTXFHUIZIQ0mEKYqEdX2EXmhWemyYcpB0P488bJI5mEh1gKipEKBlEAADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image097.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBYwO7AxMgJYn2IZmQAMpj5GBkYmBhkwLKsQMzJBGMxMTJCWYxM//// B7P0GCWgYtxwdTxMDkwL2IWALDU2fgYphv8gxQwCQP4BIGs7ECewMzB8BxrGDVXDw+CbWJIRUlmQ ysAQALb7N5PCf4gLJ4AsZWBhYhAIycxNLVbwSy1XCMrPTcxjuDH/c/lDIFZQ+Fr+TTLtOAtQnS5Q NQeQNuL6wvCQDaTVvBJiXsM/8sxjZADRH+DmLmD0YgV51dCAE8r/wMgM5pukwlRsAYeUjgGMb8UA 0mFiicUlTEAoEFyZm5SfA+RIcd1b8FEIp88gLmGEuySBBWTEFksuaDhygcMa7EFoKAowsIN5e8Cx w8jEpBRcWVySmstwHGQuA1CHIkMXWAOI2PNZiAHd18xg/QAEzXJYMgIAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image098.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhUQAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIAAwBL ABAAgAAAAAAAAAKEhI+py+2vgoS02guC0bj7ziFhNjXjdh7pk5Zi4mbbIp1cuzI1PL+q3AvyfsRZ zuQL2oDMZrI50iyf0GRUSS1Wey2t8BrR3nJgrtdIe3a9E7J6G06LI7XdUP4l1bursjN+Bwh3FrKW 52Bz5HSDJ7Q4pKiEoxJDonNhR/khuNnpefYZalAAADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image099.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBgjgYGBi5AQxBEIYGYAMZj5GBgYmBhmwJCsQczLBWEyMjFAWI9P////B LD1GCagYN1wdDxPQAA4hIEuNjZ9BiuE/SDGDAJB/AMjaDsQH2BkYtgMN44aq4WHwTSzJCKksSGVg MADb/ZtJ4T/EgRNAljKwMAEdmJmbWqzgl1quEJSfm5jHcGP+5/KHQKyg8LV8uWSaOQtQnS4jyEsM DEZcXxi+sYGcZGgIMa/hH3nmMTKA6A9wcxcwlrCCzTXghPKjGEEqLA0NTGAqfjGALNEzhPGtwHwT bC4BhZVAcGVuUn4OA8M9KS7VBR+FcPoM4hJGuEu6WEBGbDHkgoYjFziswR6EhqIAAzuYtwccO4xM TErBlcUlqbkM5iBzGYA6FBm6wBpAxJ7PQgzovmYG6wcAKGR9QjICAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image100.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhVQAVAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIAAwBR AA4AgAAAAAAAAAKChI+py+2/QjgS2otzmlT7DwKcMXZRpZSkamYs2oobS9YUbL90I6lcCURMaEGh MTb0FG0yZHNzdDp90Cqz2Vv9rtLuc2slRp+M0e5HlZoj5PGSHZu138m43bvT9vJtcnCfBXXmhsHX R5eSyHX19pCHEwdmxfVSZRh2UwYJeecQmPlQAAA7 ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image101.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBI4GRgYuQEsQpCGRmADGZrRgYGJgYZsCwrEHMywVhMjIxQFiPT//// wSw9RgmoGDdcHQ8TA1MCpxCQpcbGzyDF8B+kmEEAyD8AZG0HYgWgRduBhnFD1fAw+CaWZIRUFqQy MBiA7f7NpPAf4sIJIEsZWJgYBEIyc1OLFfxSyxWC8nMT8xhuzP9c/hCIFRS+lkdLpO1nAarTBarm ANJGXF8YnDlATjI0gpjX8I888xgZQPQHuLkLGPXYwOYacEH5IYwgX5tYGhqYwNV8YQBZo2cJ45uA +QaWWPwGDC0GgeDK3KT8HAaGIDGuxgUfhXD6DeIWRrgfT7KDjNC1xOJHFHNdxblycZuL6UcXVpAR Wyy5oDHEBY5FcNBB40eAgR3M2wOOd0YmJqXgyuKS1FyG/SBzGYA6FBm6IBpAqj4LMaD7gRksAwD7 ZlY2jAIAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image102.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhZAAVAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAwBe AA4AgAAAAAAAAAKThI+py+0PWQhnxouzjhT0voXiuIDGZ0rIlJ6KVW4t3KTU59CeW+n7v2rlfLgT q+gyCXcgZcJZWQExUF4sWX0Cs9PsTSsFW6fB2zEMbqLHVWR0/GZnuNswcY0Ufq9y6rr7tBcHSAeH 9/fAdcTy0jhotti45DWHaDlzKBanl+lH5tjDx8P5h2kXokPqMUk0qcEYtFEAADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image103.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjB4wHWAkZETxDIIZWQAMpgZGRkYmBhkwLKsQMzJBGMxgaTALEam//// g1l6jBJQMW64Oh6mA4wPuISALDU2fgYphv8gxQwCQP4BIOsYEC/gYmBoAxrGDVXDw+CbWJIRUlmQ CnQH2O7fTA3/IC6cALKUgYWJQSAkMze1WMEvtVwhKD83MY9BhYmxXheIFS4w14P0sQDV6QJVcwBp I64ExoecIK3GlTC+IDvIiYamML4wK0jeBM4XZQbxLeB8KwaQeiMTLO5hAkKB4MrcpPwchnoHoMAJ Pi4P7O5hBNMfkNx1mQNkxA4TGF+aDcTXhfP/g92xBc5nYgLxtU24oKHFBQ5RcLBAw0qAgR3M2wOO A6AGpeDK4pLUXBCPi0GRoQuiGOSOz0IMav8Y6mFhBXEbIwMzWBYA/2lRrhgCAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image104.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhdAATAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABABt AAsAgAAAAAAAAAKDRA6pGeu/DoI01tuczFdLo3Ch2IVW6aHRZKraejIgRbayC9YoqeO3nav0RMTX q9chfnwxWwYJ/TkfT+aMSktif1Hh8DpldnFLbtOw2Ri/Rik6XRu/1UIpnL11B1dpcd26lyWYB3Yl 53KoB8FS2AjUVHT2qILnB0fYRlXmg+TFQUe2VAAAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image105.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjBYwO/AxMAJYn0MZgQxmJcyMjAwMciAZVmBmJMJxmJiZISyGJn+//8P ZukxSkDFuOHqeJgcmBbwCwFZamz8DFIM/0GKGQSA/ANA1nYgTuBnYPgONIwbqoaHwTexJCOksiCV gSEAbPdvJtZ/j8FumACylAkIBYIrc5PycxjqHYAC+nxc81WYGOt1gVjhAnM9A4MBAwtQXBeomgNI G3HNY6xlA2nVqCTGvMl8XJOxm8cIpj8gmXubG2SEJtTchn8M+N25AJc7IeYyQs1dwFjPBzLCthLG b+cB8XXh/N+cIP4WOP8vO4ivDedvY0FV/4kRIo/FnQwsQHeGZOamFiv4pZYrBOXnJuYxEOf/BYy1 vCAjDOH28IPDwwTOFwe70xjO/wqOByM4/xQrqvw7JlDSMTSA8fUYQPKmBhB3K/wnz93o4fuFgRkc HkYGXNBUxwVOmWBjoWlOgIEdzNsDTsuMTExKwZXFJam5IB4XgyJDF1gxiPjwWYhB7R9DPXoYMYP1 AwANA36DYAMAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image106.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhpwAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAwCg ABIAgwAAAAAAAAoICQsJCgcGBwkHCAkICAcGBgsKCgwKCwECAwECAwECAwECAwECAwECAwT/EMg5 Q6A46817F14ojhNInt4FqGjrAuYrh/H8snaeCYPuU4PeT2OxYHAn5Eo5KrIIlOJN6kJCUcxNNpsy RiVcDu4yKFTO2C8WaRCKqG/iqsMdq2+AgtsuD4XlSGVpb3BLXlpid3N4AAcIiH10R5OTSAkHg0mZ GXxgjIuRlImcaGpKf6QtqIqioK4kVFujWodfp6W4cUdOha9EvL2drsC1pEynxHWhnrmgyambfrPD Mxe3ktKVu7ytutEp08KqjY/N0NilyhSX38/m6OeLq6N6uLLgrPcTgpqExd7bdlWBM8BABW7LDv6D hYFHkoVDIqK4IlGHmYoYMwJxo7FFghodEEP+AClSBMmSKGWcTLmjYwQAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image107.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC5VRPUsDQRCdmTWnOQM5ooWIxflBKk/iIdb5A1qYdKkiHih4l0ACetVdLRaWwV8i YmEhYiPY2VjkJwTsFHLOzn0UQQsX5va92TfzbnbfX59vQVZsjBWWNep3EBioTeQPrMlpiaNMOSLE DCElSSJoB1ey3GKhq9BYxUaNUd2owiokWgwW80dGdxxNA2CkuCbTVOCgOzxth32PNbDA2S9KK/Sa 43Aw7b1MQE1BS4y2Df2f3xRPU+UNip7Aap/53sA+9C7so57fDWCLMHI47DcVATSynihernmtPkiX 7oUpD/Be6XF293PeAOHurB/+y49knxS+AZ6UdIfQzfmLdLx0f5mL5wWrFfrHvXOImpzoVs3OX3Ol PlT4PMl8jmtmN27Kq8h1QeplwbywB3lHJNpohYOh52tmwjpciVgfTj5rUJ9CNDuTkvofEeQ6g1wC AAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image108.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhRQApAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMABAA/ ACIAgAAAAAAAAAKThGMZm+0PG3prxsOUvpxm2VHgFpbWUTqnmppsi0ZWBXztidifXcsePMLEhMMi KaioKCE45GTVe4mAx+YGuoKitK4qSGsdPqnGsQS8Uz7XVNp5So7HufK6j27Pv/X8vv8PGFijRlho eIiYSCjI2Oj4CBkpOWmHR8nBc+liqSnC2XkF2hUlehFWyrSIGvK52or62lIAADs= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image109.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC7t+9tgsBjB4wPKAkZETxBKIZmQAMpg5GBkYmBikwbKsQMzJBGKxADETIyNYhJHp ////aHJ6jBJgEUMmRqg+biaYCTxMDxgfsPABWWps/AxCDP9B2hk4gPwD/x/8X8BygJEbKsfD4JtY khFSWZDKwBCAZIMoEP9mavgHcfMERjDFxCAQkpmbWqzgl1quEJSfm5gHdYsuUB7kJSMuB0YTBpBi Y4YDcBF2ZpCICVAE3VRGXKa2QkxlBJv+Acn0X2DTKxhWwEU+gk2vBIoIYLqZCWR6cGVuUn4OAxPM pRAzGeEmfAK7Q5fhMjgOQKGiAw+V0FAFBhZGRmZWLkamDmOh5gqmNl2mDhOh5koGhoRXlQcvxHU/ 4YLq4gKHMySoIG4RYGAH8/aAw5SRiUkpuLK4JDUXFmoI/zGD1QEA3AjvyyYCAAA= ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image110.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhNAAUAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAgAu AA4AgAAAAAAAAAJHRB6gy+1v4EpTWnhuo1on7nXiNzKIAXYUmCntaaZqFdN25CA6x+aufxvtUitg RCb6bXAmGjIpa6Gkr+dsmcyGtFyftQtFFgAAOw== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image111.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC11QsUoDQRB9M5eo2QQ9DgTB5rCw8gS19RcU8ZLSIsKBgmeEBMx2QtDa2iplPsIi lZ2FWNjmE+wF1525VeQWFt68mTf73n68vjxBz4KnxC1B+RnBg+jNY8amdpv+tlhQQ1giZYidc7Xe Lm0os8cUdG3+3dDxbyx41aPtpTUkcCLHiq/nLsWU59QOvQ6O+qOLrr0pgJN/L8T+fvHdd+X5kdQi I85teT64AouDzLMSZN+ADiEjGd6xXlMKL8ruZVkM0+PiNj0dlP1r4L7aQZrm04+ZsOuAxMLYzjDT XxGfO38+e70UDaKoaYgfsmQyTia2/m8mqIwmVwchUYxlrZ51lpi3cjscFWWlk0SVG0Kkcz+STnt6 uAEAAA== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image112.gif Content-Transfer-Encoding: base64 Content-Type: image/gif R0lGODlhHwARAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAwAY AAoAgAAAAAAAAAIjhI8QqxvHkmzwGYcjTNZODiof6Inl2CHaSLUiC5+w+s7TehQAOx== ------=_NextPart_01C9A253.E0445650 Content-Location: file:///C:/DE7BA2D4/MathSampleTest_files/image113.wmz Content-Transfer-Encoding: base64 Content-Type: image/x-wmz H4sIAAAAAAACC3VRsUrEQBCdmSRqcoeGgCDYBAsrIyTnB/gDinh3jZUnBBSMJ9yBl044lJS2Wl15 H2GRys7KwjZ/oFgquO7OJvE4cWHY2Tc7b9+8fX1+egBeE6tAtFV

Life Expectancy of Animals
In the wild	Life Expectancy	In cap= tivity	Life Expectancy
Lion	15	&n= bsp; Cat	12
Deer	8	&n= bsp; Cow	15
Elephant	38	&n= bsp; Dog	12
Fox	7	&n= bsp; Lion	17
Mouse	3	&nbs= p; Mouse	3