4*d. Suppose -t = -i - 0*i + 56, 5*i - 280 = -3*t. What is the greatest common divisor of d and i?
8
Let t = -144 - -183. What is the greatest common factor of t and 13?
13
Let v(o) = -5*o**2 - 114*o + 26. Let f be v(-23). What is the greatest common divisor of f and 25?
1
Let p be (6/8)/((-2 + 0)/(-24)). Let v(k) = k + 9. Let m be v(-8). Calculate the highest common divisor of p and m.
1
Suppose -9*u + 72 = -6*u. Suppose -83 - 37 = -y. Calculate the greatest common factor of u and y.
24
Suppose -r + 15 = -s, 6*r - 5*s = 3*r + 43. Let h = r + -10. Suppose 5*u - 20 = 0, 4*u + 74 = -4*o + 210. What is the greatest common factor of o and h?
6
Suppose -3*s - 30 = -6*s. Let w = -23 + s. Let v = -8 - w. Calculate the highest common factor of v and 35.
5
Let h(s) = 4*s + 16. Let o be h(-4). Let y be 56/8 - (0 + o). What is the highest common factor of y and 21?
7
Let n(i) = i - 11. Let w be n(11). Suppose -5*v + 235 + 635 = w. What is the greatest common divisor of v and 6?
6
Let o be 162*((-30)/(-50) + (-3)/30). Calculate the highest common divisor of o and 18.
9
Let t be -6*(15/9 - 2). Suppose -6*v = -t*v - z - 119, 2*z = -5*v + 152. Suppose 7*c - 21 = 49. What is the greatest common factor of c and v?
10
Suppose -11*o + 34 = -9*o. What is the greatest common divisor of 187 and o?
17
Suppose -2*s + 4*f + 44 = 0, -4*s + 32*f - 34*f = -68. Let n be (-3 + 3 + -2)*-27. Suppose i - n = -i. Calculate the highest common divisor of s and i.
9
Suppose -2*s = -8 - 0. Let g = 6 - s. Suppose -5*j - 3*r = -101, g*j = r - 2*r + 40. Calculate the highest common divisor of j and 133.
19
Let t = -10 - -12. Let b(a) = -5*a + 9. Let x(l) = -2*l + 4. Let m(y) = -6*b(y) + 13*x(y). Let w be m(t). What is the highest common divisor of 48 and w?
6
Let j be (-129)/(2 - -4*(-15)/20). Calculate the highest common factor of 86 and j.
43
Let k be -3*((-4)/(12/9) - -12). Let x = 31 + k. Calculate the highest common divisor of 8 and x.
4
Let u = 10 - 5. Let f be (3/u)/((-3)/(-15)). Suppose a = -n + f, 0*n - 25 = -5*n - 3*a. Calculate the highest common factor of n and 32.
8
Let c be (21/(-6) + 4)/((-3)/(-1728)). Suppose 11*j - 2*j = c. What is the greatest common factor of 8 and j?
8
Let l = 7 + -5. Suppose 17*h - 14*h + 62 = 4*w, -3*h + 50 = 4*w. What is the greatest common factor of w and l?
2
Suppose 0 = 2*g + f - 7, 3*g - 5 = 3*f + f. Suppose g*k + 0*p = 5*p + 160, 0 = -2*p + 8. Calculate the highest common factor of 40 and k.
20
Suppose -2*i = -2*j - 312, -i + 2*j + 166 = 3*j. Let o = i - 109. Let q be o + 4 + -5 + 3. What is the greatest common divisor of q and 36?
18
Let r be 2 + (-48)/(-18)*15. Calculate the highest common factor of r and 70.
14
Suppose 0*d = -2*d + 6. Let g = 6 - d. Suppose -h = -2*a + 28, 0 = -a - 2*a + g*h + 48. Calculate the greatest common factor of a and 12.
12
Suppose -k = 6*s - 4*s - 42, 0 = -4*s - 5*k + 96. Suppose 5*g = 559 - s. Calculate the highest common factor of g and 12.
12
Let y = 221 - 158. Calculate the highest common factor of y and 567.
63
Suppose z - 4*l = 15, -z + 5*l + 16 = -2. Suppose -5*c + 2*u + 293 = 0, -z*c - 2*c - 5*u = -265. Calculate the highest common divisor of c and 38.
19
Let h = 109 - -159. What is the highest common factor of h and 201?
67
Let r be (0/((-4)/(-2)) - 0)/1. Let d be r - 13/(-3) - (-1)/(-3). What is the highest common divisor of d and 32?
4
Suppose 5 = -5*l + m, -10 = -l + 3*m - 5*m. Suppose 3*z = -l*z + 117. What is the highest common factor of z and 26?
13
Suppose 0 = -0*u + 10*u + 10. Let o be 2020/(-15)*u + (-2)/(-6). Suppose -3*j = -7*j + 60. Calculate the highest common divisor of o and j.
15
Suppose -2*z - 5*y = 0, -2*z - 3*y = -7*y. Suppose z = c + 4*c - 2*r - 38, c - 2*r - 14 = 0. Calculate the greatest common divisor of 30 and c.
6
Let z(o) = -o**2 + o + 5. Let w be z(3). Let m be 1*(-1 - (-4 - w)). What is the highest common factor of m and 8?
2
Suppose 8 - 36 = 14*h. Let y be ((-72)/h)/3*(-30)/(-45). Calculate the greatest common factor of y and 64.
8
Suppose 169*f = 167*f + 888. Calculate the highest common divisor of f and 12.
12
Suppose 3*h - 90 + 18 = 0. Suppose 4*x - 5*n = 490, -x - 5*n = 4*x - 590. What is the greatest common divisor of x and h?
24
Let p be (-80 - 9)/(2/(-14)). Suppose 7*o = -p + 1568. Calculate the greatest common factor of 15 and o.
15
Let k be 2/(-7) - (2 + (-279)/21). Suppose 5*v = 0, v = 2*x + 2*x - 132. What is the greatest common factor of k and x?
11
Let i be 1/((-3)/(-18))*29/2. Calculate the highest common divisor of i and 9.
3
Let i be (-4)/(-14) + (-7479)/(-63). Let m = -75 + i. Suppose -5*r + 6*r - 4 = 0. Calculate the highest common factor of m and r.
4
Let i(s) = -85*s**3 + s + 1. Let u(q) = -4*q + 3. Let o be u(1). Let w be i(o). Suppose 4*n - 8 - 60 = 0. What is the greatest common divisor of n and w?
17
Suppose -5*f + 513 = 4*f. Suppose 4*y - 38 = 3*y. What is the greatest common divisor of y and f?
19
Let m be (-12)/30 + (-182)/(-5). Calculate the highest common factor of m and 117.
9
Let b be 92 - 1 - 0/11. Suppose 4*p - 3*p = -19. Let t = p - -32. Calculate the highest common divisor of t and b.
13
Let o be -1 - -1 - 3 - -6. Suppose -2*b + 279 = -o*h, 2*b - h = 6*b - 537. Calculate the highest common factor of b and 15.
15
Let b(h) = -h**2 + h + 18. Let x be b(-3). Suppose u + 12 = 3*u. What is the greatest common divisor of x and u?
6
Let n = -1 + 12. Let y(g) = -g**3 - 6*g**2 + 16*g - 2. Let w be y(-8). Let h = w + n. What is the highest common divisor of h and 45?
9
Suppose -6478 + 912 = -11*b. Calculate the highest common factor of b and 44.
22
Let z(k) be the second derivative of -3*k**3 - 35*k**2/2 + 5*k. Let f be z(-5). Calculate the highest common divisor of 22 and f.
11
Let a be (-1)/(6/(-9))*20. Suppose 3*x + 4*z = 34, -z = -5*z + 4. What is the highest common divisor of a and x?
10
Let m(n) = -38*n + 118. Let b be m(-11). What is the highest common factor of b and 8?
8
Let v(u) = -u**3 - 25*u**2 - 70*u + 22. Let i be v(-22). What is the highest common factor of 30 and i?
10
Suppose -3*r - 4*o + 62 = 0, 4*r + 7*o - 83 = 2*o. Suppose -d + 6 = -r. Let s be (-58)/(-4) - 1/2. Calculate the greatest common divisor of d and s.
14
Suppose -420 = -21*d + 420. Calculate the highest common divisor of 16 and d.
8
Suppose -2*v = 2*r - 24, 7*r = v + 4*r - 12. Let y be (16/(-6))/(-4)*90. What is the greatest common divisor of y and v?
12
Let j(t) = t**2 + 15*t - 270. Let q be j(-30). What is the highest common divisor of q and 135?
45
Let g = -27 - -45. Suppose 0 = 2*j + 3*j - n - 625, -398 = -3*j - 4*n. Calculate the greatest common divisor of j and g.
18
Let v = -11 + 19. Let k(h) = h**3 - 8*h**2 - h + 9. Let w be k(v). Calculate the highest common factor of w and 11.
1
Let q = -20 + 49. Suppose q = 4*p - 5*l, 5*p - 3*p + 8 = -2*l. Suppose 0 = y + 3 - 4. What is the highest common factor of y and p?
1
Let o = 147 - 69. Suppose -1 - 6 = -7*f. Let i be f + (50 - -3) + -2. Calculate the highest common divisor of i and o.
26
Suppose -3*q = 6*q - 405. Calculate the greatest common factor of q and 495.
45
Suppose 70 + 35 = 5*v - 4*o, -5*v - 3*o = -140. Suppose -26*r + 38 = -v*r. Calculate the highest common factor of r and 114.
38
Let o = -35 + 73. What is the greatest common divisor of o and 95?
19
Let o(j) = j**2 + 38*j + 400. Let v be o(-14). What is the greatest common divisor of 128 and v?
64
Suppose -20 + 38 = 3*g. Suppose -y + 20 = 3*y. Let w be (-18 - -15)*y/(-1). What is the highest common factor of g and w?
3
Suppose -2*y + 6*i - 4 = 2*i, 0 = 4*y + 3*i - 14. Let b be (-4 - -8) + y - (-1 + -1). What is the greatest common factor of b and 36?
4
Suppose 22*l = 2871 - 869. What is the greatest common divisor of 117 and l?
13
Suppose -4*p - 14 = -6*p. Let n = p - 2. Suppose 3*v + 227 = 2*k, k + n*v - 509 = -3*k. Calculate the greatest common factor of 11 and k.
11
Let p = 218 + -177. What is the highest common divisor of 656 and p?
41
Let w(u) = u**3 + 20*u**2 - u + 36. Let f be w(-20). Calculate the greatest common factor of f and 4.
4
Let i = -2060 - -2144. What is the greatest common factor of 1344 and i?
84
Let t be (-116)/(-10) - 11 - (-234)/10. Calculate the greatest common factor of 3 and t.
3
Suppose -17*h + 20*h = 9. Let r be 83/3 + 1/h. 