se -4*p - p + 75 = 0. Let w = 3402 - 3397. Calculate the highest common divisor of w and p.
5
Let u(y) = 130*y**3 - 2*y**2 + 4*y. Let l be u(2). Calculate the greatest common divisor of l and 52.
52
Let m be (-136 - -137)/((-7)/(-189)). Let f(p) = -2*p**3 - p**2 + 4*p + 3. Let j be f(-4). Calculate the highest common divisor of j and m.
9
Suppose 132040 + 7955 = 17*i. Calculate the greatest common divisor of 405 and i.
135
Suppose 25 = 3*r + 4*q - 347, 4*q + 12 = 0. Suppose -43*x + 59*x = r. Calculate the greatest common factor of x and 152.
8
Let g = -50 - -130. Let b = g - 78. Suppose v - b*v = -51. What is the greatest common divisor of v and 34?
17
Let k = -7626 + 13192. What is the highest common divisor of k and 92?
46
Let x be 2/(-6) - -334977*1/(-9). Let l be 8/18 + x/(-90). Calculate the highest common divisor of 46 and l.
46
Suppose 0 = d - 4*p - 2985, -45*p = -42*p - 24. What is the highest common factor of d and 7?
7
Suppose 0 = -o - 7*o - 16. Let m(p) = -14*p - 9. Let c be m(o). Suppose -3*l = -0*l - 456. What is the greatest common divisor of c and l?
19
Let y be 190/45 + 7 - (-6)/(-27). Calculate the greatest common factor of y and 1276.
11
Suppose -3*i = -4*u + 225, -59*i + 61*i = -5*u + 287. What is the greatest common divisor of u and 418?
19
Suppose 35 = 2*j + 3*j. Suppose 5*u + 4*k - 23 = 0, -5*u + 11 = k - 3*k. Suppose -u*d + z = -46 - 35, -4*z = -12. What is the highest common factor of j and d?
7
Let a be 1*23 - (-6)/38*-19. What is the greatest common factor of 272 and a?
4
Suppose 0 = 5*b - 3*r - 93663, -3*b + 4*r = -56404 + 215. Calculate the greatest common factor of b and 30.
15
Suppose -38060 = -67*r - 41*r + 53*r. What is the highest common divisor of 52 and r?
4
Let b be -40*(-2 - 20/(-8)). Let c be (3 + 7)*b/(-50). Suppose -53 = -k + v, 2*k + c*v - 99 = -v. Calculate the greatest common divisor of 39 and k.
13
Let f = -49 + 190. Let c = 256 - f. Let r = 186 + -140. Calculate the highest common divisor of r and c.
23
Let r = -218 - -326. Suppose -h + 2*j = 7*j - 57, 4*j - r = -2*h. Suppose -13 - h = -5*a. What is the highest common factor of 1 and a?
1
Let w = 0 - -2. Let o be 7 + 0 + -8 - (-79 - 1). Let m = o + -59. Calculate the highest common divisor of m and w.
2
Let c(h) = -53*h**2 - 798*h - 25. Let o be c(-15). What is the greatest common divisor of o and 2510?
10
Let x = 3643 + -3616. Let q(d) be the first derivative of -61*d**2 - d - 1. Let g be q(-2). What is the highest common factor of g and x?
27
Suppose -10*z = -5*z + 20. Let b be -3 - (z - -3 - 5). Let t(i) = 3*i**2 + 2*i - 2. Let g be t(b). Calculate the highest common divisor of g and 31.
31
Suppose -g = -2 - 4. Let c(m) = 2*m**3 + 7*m**2 - 5*m + 18. Let v be c(3). Suppose -22*n - v + 450 = 0. Calculate the highest common factor of g and n.
3
Suppose 3364 = 61*l - 296. What is the highest common divisor of 420 and l?
60
Let d = -1958 + 2363. What is the highest common divisor of d and 480?
15
Let a(x) = -x**3 + 20*x**2 - 16*x - 12. Let o = -296 - -315. Let m be a(o). What is the highest common divisor of 3 and m?
3
Let h = 94 + -91. Suppose -5*n = 2*x - h*x - 19, x + 3*n - 21 = 0. Suppose 9*g = x*g + 30. What is the highest common divisor of 30 and g?
10
Suppose 0 = 3*t - 12 - 15. Let i(f) = -3*f + 30. Let y be i(t). Suppose c = 3*c + 2*s - 28, 58 = y*c - s. What is the highest common factor of 72 and c?
18
Suppose -3*u - 56 = -2*y, -y + 136 = -5*u + 87. Let r be (-1218)/(-4) + 4/(-8). Calculate the greatest common divisor of r and y.
19
Suppose 4*b + 12 = 0, -2*b = -6*n + 2*n + 150. Let h = n + -16. Let w = h + 15. What is the highest common divisor of w and 21?
7
Suppose 23*m + 20 = 43. Suppose 4*g - m - 3 = 0, z - 2*g = 79. What is the greatest common divisor of z and 1?
1
Let u(n) = -19*n**3 - 110*n**2 + 18*n + 43. Let z be u(-6). Suppose -2*g + 161 = -2*x + 3, 2*x = -g + 79. What is the greatest common factor of g and z?
79
Suppose -43*d - 1656 = -46*d - 2*q, 3*q + 2798 = 5*d. What is the greatest common divisor of 12 and d?
4
Let h(x) = 9*x - 108. Let z be h(14). Let v be (84/(-2 + 0))/(z/(-36)). Calculate the greatest common factor of 140 and v.
28
Suppose 4*z - 11 = 3*z. Suppose 0 = 4*d + m + 970, 2*m = -m - 6. Let n be d*(2 - 10/4). What is the highest common divisor of n and z?
11
Suppose -b - b + 432 = 0. Let i be (-78)/((-12)/(0 - -6)). Suppose -u + j = -i, -4*u = -0*u + 2*j - 138. What is the greatest common factor of u and b?
36
Suppose 5*d = 4*d + 2*j + 234, 5*j = -3*d + 724. Suppose -d + 490 = 4*i. Calculate the greatest common factor of 567 and i.
63
Suppose -2714 = -41*v + 3723. Calculate the greatest common divisor of 3925 and v.
157
Suppose 4*o + o = 10. Suppose 4*z + 3*m - 2672 = 0, -10*z - 2*m = -8*z - 1334. Let a = -669 + z. What is the greatest common divisor of a and o?
2
Let n be ((-25)/4 + 4/16)/(-2). Suppose -u = -5*l - 38, -u - 3*u + n*l + 152 = 0. What is the highest common divisor of 133 and u?
19
Let s = -7441 - -7547. Calculate the highest common factor of s and 53.
53
Suppose -7*l + 8*l = -4*g + 388, -5*g + 773 = 2*l. What is the greatest common divisor of l and 432?
48
Let l = -6 - -132. Suppose -38*t + 75 = -609. What is the highest common factor of t and l?
18
Let m be (-417 - (2 + -3))*-1. Let d(r) = -43*r - 1393. Let h be d(-33). Calculate the highest common factor of m and h.
26
Suppose -240 = -100*b + 70*b. Calculate the greatest common factor of 40 and b.
8
Let a = -1766 + 1779. Let b(d) = 16*d + 2. Let p be b(8). Suppose 0 = 2*z + 3*z - p. What is the greatest common divisor of z and a?
13
Let l = 17 + -15. Suppose -2 = -n + l*n. Let i be (-2*n/4)/((-5)/(-115)). What is the highest common divisor of i and 207?
23
Let u(y) = -y**3 - 4*y**2 + 8*y + 3. Let z be u(-6). Let q = 23078 + -23051. Calculate the highest common factor of q and z.
27
Suppose -g + 5 = -5*b - 795, 4*g + 457 = -3*b. Let h = -94 - b. What is the highest common factor of 52 and h?
13
Suppose 3*k = 16*c - 18*c + 165, 325 = 4*c + k. Calculate the highest common factor of 18 and c.
9
Let p(l) be the second derivative of -4*l**3/3 - 14*l**2 - 2*l - 14. Let f be p(-5). Calculate the greatest common divisor of f and 48.
12
Let w = -93 + 177. Let y(s) = s**2 + 6*s + 29. Let c be y(-5). Calculate the highest common divisor of w and c.
12
Let f be (1 - 3/2) + 7105/(-70). Let j = f - 51. Let u = 412 + j. Calculate the highest common divisor of u and 37.
37
Suppose 7*c + 12 = 131. Let d(n) = -5*n + 93. Let o be d(c). Calculate the highest common divisor of 4 and o.
4
Let g(d) = 2876*d + 17298. Let c be g(-6). Let a(v) = 2*v**2 - 5*v + 3. Let f be a(3). Calculate the highest common divisor of c and f.
6
Suppose -81*a = -79*a - 714. Suppose 5*f = 243 + a. Let m(y) = 8*y - 8. Let r be m(4). What is the greatest common divisor of f and r?
24
Let w(d) = -31*d - 121. Let z be w(-18). Suppose -269 = -3*f - 5*x, 2*f + 3*x = 7*f - z. What is the greatest common divisor of 44 and f?
44
Let m = 3182 - 1782. What is the highest common divisor of 2975 and m?
175
Suppose 4*t + 7963 = 5*l, -54 = -3*t - 60. What is the greatest common divisor of l and 37?
37
Suppose 8*h = -3*h + 77. Let c(u) = 2*u + 5. Let z be c(h). Calculate the highest common divisor of 247 and z.
19
Let j = 12581 - 772. What is the greatest common factor of j and 482?
241
Suppose -l = 4 - 16. Let u(k) = k**2 - 2*k - 11. Suppose z - 4*i = 3*z + 6, 0 = 5*i. Let c be u(z). What is the greatest common factor of l and c?
4
Let f = 5 - 2. Suppose 2*c - 6*c + 378 = b, 4*c = 5*b + 366. Suppose f*n = -31 + c. Calculate the greatest common divisor of n and 3.
3
Suppose d + 30 = y + 4*y, -4*d = -5*y + 45. Suppose -y*v = 238 - 63. Let p = -7 - v. What is the greatest common divisor of 4 and p?
4
Let j be 31 + 924/(-30) - (1 + 789/(-5)). Calculate the greatest common factor of j and 16799.
157
Let f = 10028 - 9804. What is the highest common factor of 1952 and f?
32
Suppose 0*v = v + 12. Suppose -75 = 37*r - 12*r. Let s be (1/r)/(v/5148). What is the highest common factor of 13 and s?
13
Let s = -367 + 372. Suppose 0 = -2*j - m + 6, 25 = s*j - m + 6*m. Suppose -2*d + 5 = -9. Calculate the highest common factor of j and d.
1
Let x(h) = h**3 - 5*h - 4. Let b be x(-1). Let l(g) = g**3 + g**2 + 3*g + 279. 