r of 201 and c.
67
Let k = 10 + -67. Let u = k + 62. Let y(g) = g**3 - 2*g**2 - 14*g + 3. Let n be y(u). What is the highest common factor of 8 and n?
8
Let l be (12/14)/(2/7). Suppose 4*t = -l*t + 98. Let x be t/77 + 588/33. Calculate the highest common divisor of x and 90.
18
Let c be 4*-10*(-5)/5. Let i(y) = 2*y**2 + 3*y + 3. Let t be i(0). Suppose 5*k - 81 = -t*o - 7, 4*o + c = 2*k. What is the greatest common factor of 2 and k?
2
Let u = -3067 - -3118. Suppose -4*c + 5*o + 116 = 0, c + o - 48 = -10. Calculate the greatest common divisor of u and c.
17
Let x be 2/9 - (641340/162)/(-5). What is the greatest common factor of x and 88?
88
Let u be (-1)/2 + (-7 - (-225)/18). Let z be u/(-2)*-61*6. Suppose 0 = 3*b - 5*n - z, -4*b - 2*n - 413 = -1659. What is the highest common divisor of b and 31?
31
Let b(n) = -n**2 + 6*n + 136. Let x be b(-9). Let q be 1066 + 36 + (0 - -2) + x. Calculate the greatest common divisor of 17 and q.
17
Let t(a) = 6*a**3 - a**2 - 4*a - 4. Let m be t(-1). Let z be 106 - (m + 2)*(-8)/(-10). Calculate the greatest common factor of z and 22.
22
Suppose 4*j - 1485 = -j. Let i(z) = -48*z - 165. Let v be i(-4). What is the greatest common divisor of v and j?
27
Suppose -2*z + 4*z - 5*v = 15, 5*z - 27 = 2*v. Suppose -88 - 227 = -z*h. Suppose -10*r + 1 = -69. What is the greatest common factor of h and r?
7
Let u be (-1 - -2)*(1 + 3*-23). Let o = u + 660. What is the greatest common factor of 32 and o?
16
Suppose 259*z - 107 = 250*z + 28. Suppose -24 = -4*b + p, -3*b - 5*p + 1 = -17. Suppose -2*g - 120 = -b*g. What is the highest common factor of z and g?
15
Let z = -80 - -76. Let x(j) = 2*j**2 + 22. Let s be x(z). Let c be (-1 - 4/(-6))/((-2)/s). What is the greatest common divisor of c and 6?
3
Let c be 4/10 + (-11370)/50. Let x = -221 - c. Let b(f) = -f**2 - 4*f + 1. Let p be b(-4). Calculate the highest common factor of x and p.
1
Let q(i) = 3*i**2 + 1. Let g be q(0). Let t(f) = 3*f - 1. Let p be t(g). Suppose p*n = -2 + 122. Calculate the highest common factor of 5 and n.
5
Let s be 4/(124/(-155))*52/(-5). Suppose -10*g + 14*g - 32 = 0. Calculate the greatest common divisor of s and g.
4
Let j(s) = -3*s**3 - 6*s**2 + 11*s + 46. Let n be j(-6). Let y = 430 - n. Calculate the highest common factor of 2 and y.
2
Suppose 3*i + 3389 - 3440 = 3*d, -3*i + d = -49. Suppose -3*n - n = -32. What is the greatest common factor of i and n?
8
Let z = 977 - 4. Let l = z - 854. What is the highest common divisor of 7 and l?
7
Let t = 34 + -11. Let u = 93 + 135. Suppose 226 = 2*p - 4*h, -3*p + 122 + u = 5*h. Calculate the highest common factor of t and p.
23
Let x be (4 - (6 - 2)) + 7. Let k(y) = -100*y**3 - x*y + 12*y**2 - 106*y**3 + 205*y**3 + 8. Let c be k(8). What is the greatest common divisor of 26 and c?
26
Let b(u) = -5*u + 28. Let n be b(-7). Let s = -63 + n. Suppose 0 = -2*h - 5*y + 24, s = -0*y + y. What is the highest common divisor of h and 60?
12
Let g be 2/(1 + -1 + 1). Suppose g*k + 3*k = 3210. Let r be k/4 - (-20)/(-40). What is the greatest common factor of r and 20?
20
Let h be ((-1)/((-3)/(-231)))/(35350/(-8834) + 4). What is the greatest common divisor of 77 and h?
77
Let d = 59 - 55. Suppose 66 + 126 = d*u. Let h = 329 - 323. What is the highest common divisor of h and u?
6
Suppose -18*x = -16*x + 10, -3*t - 2*x + 68 = 0. What is the highest common factor of t and 1053?
13
Let x(s) = 11*s**2 - 188*s + 25. Let k be x(17). Suppose -h + 610 = 5*j, 2*h + 10*j = k*j + 1204. What is the highest common factor of h and 24?
24
Let v = -1199 - -1721. Calculate the highest common divisor of 90 and v.
18
Let l = 188 + -139. Let w be 3/(-1) + -1 - -7. Suppose t - 5*i = 514, 916 + 676 = w*t - 5*i. What is the greatest common factor of t and l?
49
Let b = 2075 - 1782. What is the greatest common factor of b and 1?
1
Let p(a) = -12*a - 329*a**2 - 7*a + 1 - 324*a**2 + 644*a**2 - a**3. Suppose r + 2*r = -18. Let u be p(r). What is the greatest common divisor of 49 and u?
7
Let a(z) = -z + 71. Let c = -262 - -281. Let y be a(c). Calculate the highest common divisor of y and 416.
52
Let c be 1*((-184)/32 - -11 - 1/4). Suppose -k + 4*u + 103 + 94 = 0, k - 3*u - 194 = 0. Calculate the greatest common factor of c and k.
5
Suppose 0 = -5*z - 339*f + 336*f + 12665, -2533 = -z + 5*f. What is the highest common factor of z and 17?
17
Suppose 26*d - 1212 - 400 = 0. Calculate the highest common factor of d and 2728.
62
Suppose -38*x = -47*x - 4725. Let y = x - -550. Calculate the greatest common divisor of y and 1075.
25
Let q be ((-14)/35)/(1 + 231/(-230)). Suppose 0 = -2*n - 4*b + q + 46, 345 = 5*n + 3*b. What is the greatest common divisor of n and 92?
23
Let s(j) = -j**3 + 84. Let k be s(0). Let a(x) = -2*x**2 - 9*x + 42. Let o be a(5). Let d be 1*(o - 3)/(-2). What is the highest common factor of k and d?
28
Let d(g) = 6*g**2 + 2*g - 1. Let j be d(2). Suppose -x - z + 25 = 2*z, 5*z = -15. Suppose 2*v - 2 = x. Calculate the greatest common factor of v and j.
9
Let l(k) = 2*k**3 + 12*k**2 + 2*k + 9. Let y be l(-6). Let p = y - 51. Let q = -25 - p. Calculate the greatest common factor of 58 and q.
29
Suppose 138*i = 218*i - 8640. What is the greatest common factor of 1593 and i?
27
Let n = 2534 - 2144. What is the highest common divisor of 830 and n?
10
Suppose -8*i = -5*i + 7*i. Suppose i - 3 = -v. Suppose v*t - 12 = 648. What is the highest common factor of 20 and t?
20
Let b(a) = a**3 + 18*a**2 + 18*a + 28. Let v = 47 + -63. Let y be b(v). What is the highest common factor of 36 and y?
36
Suppose -7 = -3*m - 2*s + 283, 3*s + 300 = 3*m. Calculate the greatest common divisor of 21854 and m.
98
Suppose 3*t = -4*i + 1701, 0 = -5*t + 23 - 8. Suppose -638*l + 633*l + 235 = 0. What is the highest common divisor of i and l?
47
Suppose 1914 = 109*h - 3536. Calculate the greatest common factor of 1270 and h.
10
Suppose -3*d + t - 208 = -t, 5*t - 25 = 0. Let s = d - -64. Let x be (-39)/s*22*(0 - -1). Calculate the highest common divisor of 39 and x.
39
Suppose 49*p - 48*p - 18 = 2*y, -3*y + 15 = 2*p. What is the greatest common factor of 612 and p?
12
Suppose 0 = -i + 40 - 6. Suppose -3*a + 125 = 5*r, -2*r = 2*a - 4*a - i. Calculate the greatest common divisor of r and 44.
22
Let l = -310 - -464. Let n be 72 - (-2 + (-11 - -8)). What is the highest common divisor of n and l?
77
Let j = -4493 - -4812. Let y(s) = 12*s**2 - 9*s - 1. Let v be y(2). What is the highest common factor of j and v?
29
Suppose -4*f + j = 2*j - 11, 8 = 4*f + 4*j. Suppose -4*d + 8*d + 91 = n, -4*n - f*d = -288. What is the highest common factor of 15 and n?
15
Let o = 3509 - 1349. What is the greatest common divisor of 160 and o?
80
Let o be (53/(-2) + 1)*(41 + 3111/(-61)). Calculate the greatest common divisor of 4437 and o.
51
Let v = 796 + -789. Suppose -v*m = -2909 + 501. What is the greatest common factor of m and 16?
8
Let k = 10117 - 10007. What is the greatest common divisor of 85 and k?
5
Let n(c) = -c**3 - 4*c**2 - 4*c - 10. Suppose -4*b + 36 = 23*j - 27*j, -16 = 4*j + b. Let r be n(j). Calculate the greatest common divisor of 84 and r.
7
Let c be (-1)/(-16)*2 - (-214726)/1616. Let v be 9*(2 - (-21)/9). Suppose o - 4*o - 5*j + 82 = 0, v = o + 4*j. What is the highest common factor of c and o?
19
Suppose 0 = -2*h - 5*r + 20 + 32, -3*h - r = -104. Suppose 5*y + 8*b - 215 = 3*b, -3*b = y - 49. Let s = y - h. What is the highest common factor of s and 40?
4
Suppose -13*x + 14 + 38 = 0. Suppose 3*j + 2*l - 1012 = -230, -x*l = -j + 256. What is the highest common factor of j and 10?
10
Suppose 0 = 2*n - 10*g + 7*g - 356, g - 856 = -5*n. What is the greatest common factor of n and 430?
86
Suppose -5*n - 343 = -2*h + 76, -3*h - n = -603. Suppose 2*g = 3*a - 382, 3*a - 5*g - 195 = h. What is the highest common factor of 93 and a?
31
Suppose -x + 3*x + 3*o = 65, 5*o + 25 = 0. Calculate the greatest common divisor of x and 9104.
8
Suppose 9*u = 13*u - 72. Suppose 5*g - 94 = -3*n, 0*g + n + 82 = 5*g. Suppose -q + 2*x + u = q, 3*x + g = 2*q. Calculate the highest common factor of q and 10.
10
Suppose -104 = -38*d + 34*d. Let i(k) = k**2 - 3*k. Let y be i(3). Suppose y = 3*h - 106 - 89. Calculate the greatest common factor of h and d.
13
Let g = 8 + 1. Suppose g*h = -18 - 0. 