-3*i = 5*r - 124, 5*r + 4164 = -2*i + 4290. Calculate the highest common factor of r and 256.
2
Let c(u) = u**3 - 4*u + 2. Let q be c(2). Suppose -g + 26 = o, q = o + 6. What is the greatest common factor of 210 and g?
30
Let s(t) = -3*t - 2. Let i be s(-2). Suppose -5*d + 18 = -i*d. Let o be (-1 - 3) + 3 + d. What is the greatest common divisor of o and 51?
17
Let v be 3/(-12)*-727*8. Let a be 4/26 + v/13. Let o be (-2 - (-52)/10)*(299 + -294). Calculate the highest common factor of o and a.
16
Let o be 1/(27/(-12)) + (-7994)/(-126). What is the highest common divisor of o and 9261?
63
Let x be (149/(-33) - 58/(-319))*-375. What is the highest common factor of x and 65?
65
Let q be -3*(4867/(-15) - (-34)/255). Calculate the highest common divisor of 28 and q.
7
Suppose 4*s - h = 382, 3*h + 481 = s + 4*s. Let b = -46 + s. Let l = b - 38. What is the highest common factor of 55 and l?
11
Let s be -2*(9/(-6) + -1). Suppose -s*v + 379 - 104 = 0. Let g = 110 - v. What is the highest common divisor of 11 and g?
11
Let z(h) = 128*h + 2505. Let l be z(-17). Calculate the highest common divisor of 517 and l.
47
Let i(t) = 88*t - 2558. Let s be i(32). What is the greatest common factor of s and 36?
6
Let o be (-189)/(-18)*(-3 + 13). Calculate the greatest common divisor of 390 and o.
15
Let g = -979 + 3571. Suppose 4*u = -4*u + g. What is the highest common divisor of 36 and u?
36
Let j = 97 + 17. Suppose -356 = -4*u - 2*x, -j = -u + 2*x - 15. Suppose 0*s + 5*s = 65. What is the highest common divisor of s and u?
13
Suppose 966*d - 10640 = 950*d. What is the greatest common divisor of 209 and d?
19
Suppose -36927 + 37347 = 15*n. What is the greatest common divisor of 273 and n?
7
Let u be (1 + (-7)/4)/(7/(-392)). Suppose p + u = 4*a - 8, -2*p + 3*a = 125. Let v = 98 + p. Calculate the highest common divisor of 140 and v.
28
Let b(z) be the second derivative of -35*z**3/6 + 217*z**2/2 - 2*z - 258. Let c be b(5). What is the greatest common divisor of c and 98?
14
Let y(z) = 537*z - 7353. Let o be y(14). Calculate the highest common factor of 2420 and o.
55
Let a be (36/(-27))/4*(1 + -1). Suppose -25*s - 25*s + 43700 = a. Calculate the highest common factor of s and 46.
46
Suppose 2*y + 120 - 132 = 0. Suppose -12 = -3*r - 3. Suppose -r*d = -2*d, -2*g - 3*d + 132 = 0. What is the greatest common factor of y and g?
6
Let g = 115 - 106. Suppose g*n - 120 = 258. Calculate the greatest common divisor of 63 and n.
21
Let z = -1 + 7. Suppose 5*l = -2*q + 8*l + 192, -3*q - 2*l + 314 = 0. What is the greatest common factor of z and q?
6
Let m = 23377 - 23338. Calculate the highest common factor of m and 4342.
13
Suppose -2*p + 86*t - 85*t = -394, 2*p - 3*t - 398 = 0. What is the greatest common factor of 1127 and p?
49
Suppose -4*f - 115 = -3*d, 66 = -3*f - 5*d - 13. Let t be (-2 + -1 + -21)*511/f. Calculate the greatest common factor of 6 and t.
6
Let g be ((-837)/81)/((-86)/84 + 1). What is the greatest common factor of g and 186?
62
Let i(f) = -7*f**3 + 273*f**2 - 32*f - 109. Let h be i(37). What is the highest common factor of h and 293?
293
Suppose -4*y + 3*a + 42 = 0, 0 = 4*y + a - 24 - 10. Let k be 3/8 + (-140)/32 - -14. Suppose -k*w + 65 = -y*w. What is the highest common divisor of 26 and w?
13
Suppose 114 + 388 = 101*g - 104. Calculate the greatest common factor of 14478 and g.
6
Let v be 1/(16/1488) - -21. Calculate the highest common divisor of 2850 and v.
114
Suppose -153*d + 1521 = -144*d. Let g = 284 - d. What is the greatest common factor of 15 and g?
5
Let y be 1*(2/(-4) + 1155/10). Suppose -8*n + y = 51. Calculate the highest common factor of 248 and n.
8
Let c(l) = 12*l + 3. Let z be c(-4). Let s be ((-24)/z)/(-4) + (-3422)/(-15). Calculate the highest common divisor of s and 12.
12
Let n(f) = f**2 - 3*f - 1. Let k be n(3). Let v be ((-6)/(3 + -9))/(k/(-61)). Calculate the greatest common divisor of v and 305.
61
Let s be -3 + 1 - (0 - 16). Let p(o) = 12*o - 11*o - 33 + 43. Let w be p(s). Calculate the greatest common divisor of w and 36.
12
Suppose 4*o = 9 + 31. Let j = -8 + o. Let p be 2*j - (10 + -21). Calculate the greatest common divisor of p and 5.
5
Suppose -5*w - 12*r = -17*r - 105, -5*w = 3*r - 121. What is the greatest common divisor of 9223 and w?
23
Let j be -4 + (12/9)/(-1)*(-27675)/90. Calculate the highest common divisor of 4 and j.
2
Let s be 6/2*1*(-70)/(-21). Suppose s*o - 318 = 502. What is the greatest common factor of o and 2?
2
Let y = 1327 + -841. Let r = y - 459. Calculate the highest common divisor of 171 and r.
9
Let m(u) = -u**2 - 7*u + 2. Let s be m(-4). Let h = s - 5. What is the greatest common divisor of h and 9?
9
Suppose 13481 - 3451 = 34*v. Calculate the greatest common divisor of v and 5.
5
Let f(y) = 27*y - 3639. Let o be f(136). Calculate the highest common divisor of o and 147.
3
Let u be (-850)/15*(-78)/10. Calculate the greatest common divisor of u and 3383.
17
Suppose -5*g + 144 = 3*b, -450*b - 16 = -452*b. Let m(f) = 58*f. Let y be m(6). Calculate the highest common factor of g and y.
12
Let o(d) = 31*d - 69. Let r be o(13). Suppose r + 50 = 3*z. What is the greatest common factor of 96 and z?
32
Let b(s) = -s**2 - s - 13. Let y(w) = w**2 - w + 12. Let j(p) = 3*b(p) + 4*y(p). Let o be j(6). Calculate the highest common divisor of o and 12.
3
Suppose 0 = -4*t - 4*r + 472, t + 2*r - 188 + 64 = 0. Calculate the highest common factor of 434 and t.
14
Let l(n) = 5*n**2 - 3*n + 45. Let x be l(6). Let z = x + -163. What is the greatest common divisor of 319 and z?
11
Suppose w - 2*s = 180, -875 = 13*w - 18*w + 5*s. Suppose -8*n = -3*n - 90. Let b be (-66)/(-4) - (-9)/n. What is the highest common factor of w and b?
17
Let n be 3 + 1/(5/15). Suppose -4*z = -n*z + 8. Let b be (15/20)/3 + 158/8. Calculate the greatest common factor of b and z.
4
Let i(b) = 5*b + 14. Let n be i(6). Suppose 10*z - n = -z. Suppose -4*u - 5*j = -4*j - 7, 0 = -2*u + 2*j - 4. What is the greatest common factor of z and u?
1
Let t be 2/4*(-18 - -16). Let g be 39 - (t + -5)/3. Calculate the greatest common factor of 41 and g.
41
Suppose 44*b + 2*d = 45*b - 68, -4*b + 332 = -4*d. Let j(u) = 36*u**2 + 3*u - 3. Let x be j(2). Calculate the greatest common divisor of x and b.
49
Let p(z) = -z**3 + 12*z**2 - 25*z + 79. Let y be p(10). Suppose 31*n - y*n - 5*g - 191 = 0, 5*n + 2*g - 434 = 0. What is the greatest common divisor of n and 8?
8
Suppose -279*y - 12720 = 272*y - 561*y. What is the greatest common factor of 106 and y?
106
Let n be 5 + (-13)/((-130)/40). Suppose -n*p + 605 + 2878 = 0. Calculate the highest common factor of 18 and p.
9
Suppose 0 = 2*v + v - 9. Let q be v + (-9)/(-6)*6. Let c be (81 - (-4)/(-8)*6) + 6. Calculate the greatest common divisor of q and c.
12
Let z = -872 + 968. What is the greatest common divisor of 27 and z?
3
Suppose -w - 42 = -4*w. Suppose 0 = -4*d + 20, -w*k - 3*d - 110 = -19*k. What is the highest common factor of k and 175?
25
Suppose 6*d - 8*d = -44. Let o = -9 + 12. Suppose -o*g + 2*a + 56 = 0, -6*g = -g - 3*a - 95. What is the highest common divisor of d and g?
22
Suppose 0 = -3*t + w + 386, -w - 650 = -5*t + 4*w. Suppose 9*b = b + t. What is the highest common divisor of 120 and b?
8
Let y(u) = -u**2 - 52*u - 105. Let o be y(-40). Suppose -73 = -5*d + 2*i, 18 = d + 3*i - 0*i. What is the greatest common factor of d and o?
15
Let o be (-1753)/(-4) - (9/4 + -3). Let g = 1283 - o. Suppose -36 = -5*w + g. Calculate the highest common divisor of 44 and w.
44
Let o be 38/8 + (-1)/(-4). Suppose -o*f = u - 325, -2*f + u = f - 195. Let w = f + -62. What is the greatest common factor of 27 and w?
3
Let x(q) = -17*q - 629. Let k be x(-52). What is the greatest common divisor of 15 and k?
15
Let t be (2 - 4)*(-143)/26. Suppose 4*k - 173 - 311 = 0. Calculate the greatest common divisor of k and t.
11
Let k be (-6)/78 - 34992/(-117). What is the greatest common divisor of k and 92?
23
Suppose 3*f - 1 - 2 = 0. Let z be 3 + -3 - -5*65 - f. What is the highest common divisor of z and 12?
12
Let m(o) = o + 21. Let n be m(3). Suppose -4 = -7*u - 4. Suppose u = 4*h - v - 155, 8*h + 2*v + 70 = 10*h. What is the highest common factor of h and n?
8
Let t(g) = -7*g - 1. Let f(d) = -d**2 + 10*d + 21. Let o be f(12). 