3 - 45*v**2 + 3*v - 32. Let m be x(15). Calculate the greatest common divisor of s and m.
13
Let m(d) = 2*d**3 - 4*d**2 + 4 + 4*d**3 - 5*d**3 + 2*d. Let f be m(4). Let a be (-4)/44 + (-1916)/(-22) + -3. What is the greatest common divisor of a and f?
12
Let t be (-2 - -2) + 15 + -11. Suppose 106 = t*i - 134. Let g be 40/i - 163/(-3). What is the highest common divisor of 22 and g?
11
Suppose -4*d + 20 = -12. Suppose 9*y - 168 = 2*y. What is the greatest common factor of d and y?
8
Suppose -4*u + 69 - 5 = 0. Suppose -4*h - p = -36, -5*h - 5*p = -59 - 1. What is the highest common divisor of h and u?
8
Let f(g) = -g**3 - 27*g**2 - 16*g + 30. Let a be f(-27). Calculate the greatest common divisor of 132 and a.
66
Let p be 2/12*1 + 21042/756. Calculate the greatest common factor of p and 14.
14
Suppose -225 = 12*b - 21*b. What is the greatest common factor of 1075 and b?
25
Let q(n) = -n**3 - 8*n**2 - 7*n + 18. Let v be q(-9). Suppose -4*a = 5*a - v. What is the highest common factor of 27 and a?
9
Let q = 337 - 325. Let j = 1 + 2. Suppose -c - j*w = 17 - 149, 396 = 3*c - 4*w. What is the highest common divisor of q and c?
12
Let i(b) = b**3 + 5*b**2 - 2*b + 3. Let l be i(-5). Let c = 95 - 107. Let t = c + l. What is the highest common factor of t and 3?
1
Let d be (-357)/(-7) + 0/(-3). Suppose -3*i + 135 = d. Calculate the highest common divisor of i and 14.
14
Suppose -312 - 44 = -2*g. Let k be g/11 - (-4)/(-22). What is the highest common divisor of 40 and k?
8
Let z(y) = y + 3. Let h be z(2). Suppose 405 = h*l + 5*t, l - 3*t - t = 76. What is the highest common divisor of 16 and l?
16
Suppose -4*s + 162 = s - 4*y, -6 = -3*y. Let c = 53 - s. Let v(p) = 2*p**2 - 10*p + 7. Let x be v(6). What is the highest common divisor of x and c?
19
Let k be (-3 + 0 - -4)*4. Let j be k + 1/2*-6. What is the highest common factor of j and 2?
1
Let t(n) be the third derivative of n**4/12 + 28*n**3/3 - 10*n**2. Let y be t(-14). Calculate the highest common divisor of 12 and y.
4
Let g = 41 - 34. Suppose -2*j = 3*m - 38 - 161, -164 = -3*m + 5*j. Calculate the greatest common factor of g and m.
7
Let g(i) = i**3 + 10*i**2 - 14*i + 11. Let y be g(-11). Let l be ((-28)/(-8) + -3)/(1/y). Calculate the greatest common factor of l and 2.
2
Let b be ((-14)/3)/(7/(-21)). Let y = 27 - b. What is the greatest common factor of 13 and y?
13
Suppose 4*q = -3*p + 325, -3*p = 9*q - 12*q - 360. Calculate the greatest common factor of 92 and p.
23
Let n be 18/15*(-425)/(-34). What is the highest common factor of n and 75?
15
Suppose u + 39 = 51. Let o be -13 + u + 1/((-2)/(-166)). What is the greatest common factor of 41 and o?
41
Let l be (-2)/5*3/(9/(-30)). Suppose 30 = 3*r - 18. What is the highest common divisor of r and l?
4
Suppose 0 = -4*s + 5*j + 91, 3*s - 115 = -2*s + 5*j. Let l = -12 + -69. Let w = l - -117. Calculate the greatest common factor of w and s.
12
Let u(l) = -8*l**3 + 2*l**2 + 4*l + 3. Let j be u(-1). Calculate the greatest common divisor of 18 and j.
9
Suppose -5*w = -3*i - 0*i + 20, 4*i - w - 21 = 0. Suppose -258 + 21 = -g + 2*r, g - 246 = i*r. What is the highest common factor of 21 and g?
21
Suppose 0 = -2*j + 3*k, -3*k - 7 = -19. Calculate the highest common divisor of j and 114.
6
Suppose -h + 5 + 15 = 0. Suppose -4*m - 2*x + 40 = 0, 2*x - 28 = -m - 3*x. What is the highest common factor of h and m?
4
Suppose -4*l = -4*u + 744, 0 = -3*u + 8*u - 3*l - 936. What is the highest common divisor of 27 and u?
27
Suppose 4*c + 2*b - 42 = -0*c, 0 = c + 2*b - 15. Let j be (90/(-48))/(1/((-8)/1)). What is the highest common divisor of c and j?
3
Suppose -130 = -30*y + 32*y. Let x = -57 - y. Calculate the greatest common divisor of x and 16.
8
Let w = 6 + -3. Suppose 0 = m - w*m + 4. Suppose -5*i = -l + 16, 3*l - m*i - 40 = l. Calculate the greatest common divisor of 42 and l.
21
Let h be 1778/35 + (-3)/(-15). What is the greatest common divisor of 357 and h?
51
Let c be -1 + (-6)/(-9) + (-29)/3. Let l be (2 - (-66)/(-15))*c. What is the greatest common divisor of l and 72?
24
Let k be (2 - -136) + (-2 - -4). Let r be 22 + (-6)/(-3) + 72/18. What is the greatest common divisor of k and r?
28
Let f(o) = o**2 + 8*o - 44. Let g be f(-12). What is the greatest common divisor of 4 and g?
4
Let i = 70 - 77. Let c(p) = -4*p + 2. Let d(q) = q. Let m(f) = -c(f) - 5*d(f). Let x be m(i). Calculate the highest common factor of 5 and x.
5
Let z(f) = f**3 + 3*f**2 - 9*f - 1. Let y be z(-8). Let a be (-3)/(-9)*(-4)/(20/1185). Let c = a - y. What is the highest common divisor of 34 and c?
34
Let d = 27 - 10. Suppose 11 = 3*m + d. Let p be 12*(m + (-3 - -6)). What is the greatest common divisor of 48 and p?
12
Suppose 4*s - 86 = -5*n, -5*s - 26 = -3*n - s. What is the highest common divisor of 35 and n?
7
Let x be ((-7)/2 + 3)*8. Let z = 14 + x. Let a(s) = s**3 - 9*s**2 + 2*s - 3. Let h be a(z). What is the highest common factor of 13 and h?
13
Let n(a) = -a**3 + 3*a**2 - 1. Suppose -2*d + 7*d - 10 = 0. Let y be n(d). What is the greatest common divisor of 33 and y?
3
Let w = 12 - -62. What is the greatest common factor of w and 2?
2
Let i(o) = 4*o**2 - 2*o + 6. Let b be i(5). Let g(z) = z - 2 - 6 - 13*z**3 + 12*z**3. Let w be g(-3). Calculate the greatest common factor of b and w.
16
Let w = -80 + 91. Calculate the greatest common divisor of w and 583.
11
Suppose b = 5*v - 50, 2*b + 2*b + 225 = -5*v. Let d be 10/b + -1*3084/(-22). What is the highest common divisor of 14 and d?
14
Suppose 5*n + 419 + 291 = 0. Let f = -117 - n. What is the greatest common factor of f and 15?
5
Let i = 85 + -80. Suppose -2*z - i*l = 3*z - 120, -4*z + l = -71. What is the greatest common divisor of z and 57?
19
Let v = -226 + 247. Calculate the greatest common factor of v and 77.
7
Let b be (-2)/(-11) + 40/22. Suppose -2*k + 44 = 4*o, 0*k + 2*o + 38 = b*k. Let u be 2/((-108)/30 - -4). Calculate the greatest common divisor of u and k.
5
Let r(p) be the third derivative of -p**5/60 - 3*p**4/8 - 7*p**3/3 + 11*p**2. Let m be r(-6). What is the highest common factor of 10 and m?
2
Let t be ((-117)/26)/((-135)/120). Suppose 14 = 4*f + 2*l, 5*l - l = 3*f - 27. Suppose 0 = f*p - p - 32. Calculate the greatest common factor of t and p.
4
Suppose 6*t = 2*t + 32. Suppose -21 = -2*y - 9*k + 10*k, -5*k = -3*y + 49. What is the greatest common factor of y and t?
8
Suppose 96*z - 93 = 3*z. Calculate the highest common factor of z and 277.
1
Let l(r) = 6*r - 4. Let m be l(-6). Let y = -18 - m. Let w be (-2 + 4)/(-3 - -4). What is the greatest common factor of w and y?
2
Let p be (-6)/(-4) - (-6)/(-24)*-114. Suppose -4*u - 36 = -3*t + 2*t, 5*u = -t. What is the highest common divisor of p and t?
10
Suppose -6174*m - 696 = -6180*m. What is the highest common divisor of m and 551?
29
Let k = -116 - -120. Suppose 5*s - 27 = -y + 20, -2*y + 61 = -s. What is the greatest common divisor of y and k?
4
Suppose 0 = -10*b - 9*b + 1007. What is the highest common factor of 371 and b?
53
Let m(p) = -p - 3. Let l be m(-8). Suppose 0 = 2*a - l - 27. What is the highest common factor of 2 and a?
2
Let n(d) = -d**3 + 2*d**2 + d - 10. Let u be n(-3). What is the greatest common factor of u and 48?
16
Let g(v) = -v**3 - 10*v**2 - 32*v - 62. Let o be g(-12). What is the highest common factor of o and 10?
10
Suppose -16*v + 405 = -11*v. What is the greatest common factor of v and 3?
3
Let d(p) be the second derivative of p**4/12 - 4*p**3/3 + 9*p**2/2 - 3*p. Let l be d(7). Suppose l*u - 20 = 2. What is the highest common divisor of u and 11?
11
Let k = 37 - 39. Let s be 1/k + (-45)/(-2). What is the greatest common divisor of s and 11?
11
Suppose 2*w - 106 = 2*r, -1 = -5*w - 5*r + 294. What is the greatest common divisor of w and 896?
56
Suppose 2*h + 0*j - 3*j = -4572, -5*j + 2279 = -h. Let q be (-2)/6 - h/63. What is the greatest common factor of q and 48?
12
Let t(k) = 21*k + k + 54 - 32. Let h be t(8). What is the highest common divisor of 18 and h?
18
Suppose 16*k - 5*k + 121 = 0. Let c(p) = -p**3 - 11*p**2 + 4. Let l be c(k). What is the greatest common divisor of 4 and l?
4
Let f be ((-20)/3 - -2)*-3. Let j(z) = 13*z**3 - 4*z**2 + z - 1. Let w be j(5). Suppose 19*a = w + 865. Calculate the highest common divisor of a and f.
