*n + n - i*v, 1821 = 5*n + v. What is the highest common factor of n and 91?
91
Let k(l) = l**2 + 12*l + 224. Let n be k(-16). Calculate the greatest common divisor of 56 and n.
8
Suppose 9*x = 12*x - 3*p + 1458, p = -5. Let s = -482 - x. Calculate the greatest common divisor of s and 9.
9
Let q be (8/6)/((-24)/(-108)). Suppose -q*j + 22 = -44. Let v = -3 + j. Calculate the greatest common factor of v and 16.
8
Suppose -4*m = -24, -14*x + 10*x + 12*m - 56 = 0. Let z = 19 + -15. Calculate the highest common factor of x and z.
4
Let j = 3476 - 3266. What is the greatest common factor of j and 48?
6
Let f be 4*25/60 + (-316)/(-12). What is the greatest common divisor of f and 32?
4
Let j = -224 - -297. Suppose 83*z - 390 = j*z. What is the highest common factor of 52 and z?
13
Let c(t) = 19*t**2 - 30*t + 20 - 17*t**2 + 32*t. Let l be c(0). What is the highest common divisor of l and 270?
10
Let w(p) = -p**3 + 4*p**2 + 37*p - 8. Let n be w(7). Let s(a) = a**2 + 25*a - 13. Let c be s(-26). What is the highest common factor of c and n?
13
Let o(x) = 5*x**2 - 78*x - 106. Let d be o(17). What is the highest common factor of 3159 and d?
13
Suppose -69204 = -2*r + 20*r - 24*r. What is the greatest common divisor of 146 and r?
146
Suppose 38*a - 15 - 821 = 0. Calculate the greatest common factor of 33 and a.
11
Let w = -367 - -379. Let m be (18 - w) + 1*295. Calculate the greatest common divisor of m and 86.
43
Suppose -2*c - 69 = -5*h + 23, 4*h - 4*c = 64. Suppose 7*z - 24 = -4*o + 11*z, -5*z - h = -3*o. What is the greatest common factor of o and 55?
5
Suppose -85 = n + 3*f - 167, -n = -3*f - 70. What is the greatest common factor of 8284 and n?
76
Let y(r) = r**3 - 13*r**2 - 30*r - 2. Let h be y(15). Let i be ((-240)/(-9))/((-2)/(-9)). Let p be i/5 - 0/h. Calculate the highest common divisor of p and 8.
8
Let h = 4558 - -9386. What is the highest common divisor of h and 168?
168
Suppose -3*c - 17*i + 331 = -21*i, -4*c - 3*i = -408. Calculate the highest common factor of 8715 and c.
105
Suppose -4*x - 3*j = -14, 0 = -5*x - 2*j - 174 + 202. What is the greatest common divisor of 7148 and x?
4
Let c(u) = -u**3 + 15*u**2 + 964*u. Let f be c(-30). Calculate the highest common divisor of f and 180.
60
Let w be 287 + -3*1/(-3). Suppose n = -t + 28, -5*t + 627*n + 180 = 622*n. What is the highest common divisor of w and t?
32
Let k(a) = 3*a + 1. Let r be k(5). Suppose 0 = -3*f - r + 70. Let g(l) = 15*l. Let j be g(6). Calculate the highest common divisor of j and f.
18
Let k(o) = -294*o - 1612. Let b be k(-6). What is the highest common divisor of b and 494?
38
Let r(c) = c**3 - 3*c**3 + 19*c**2 + 18 + 111*c - 137*c. Let f be r(8). What is the greatest common divisor of f and 7?
1
Let s(m) = m**2 - 2*m - 38. Let n be s(7). Let w be 6 + n + 12 + 6. Calculate the greatest common factor of 49 and w.
7
Let f(z) be the first derivative of 49*z**2/2 - 7*z + 29. Let v be f(1). What is the greatest common factor of v and 70?
14
Suppose -69*i + 71*i = 132. Suppose 0 = 68*p - i*p - 8. Suppose 3*j - 2*j - 5*q = 176, -p*q + 528 = 3*j. Calculate the highest common factor of 16 and j.
16
Suppose -3*r - n - 1040 = 0, -2*r - 103 - 562 = -5*n. Let a = 14 - r. Let l = -251 + a. What is the greatest common factor of l and 18?
18
Let v = 56 - -105. Let f be (-1)/(-3)*1 + 1370/30. Suppose -4*c = 3*i - 92, c + c = i + f. What is the greatest common divisor of c and v?
23
Let f(x) = -x**2 + 4*x - 1. Let y be f(2). Suppose 4*n - 315 = -3*o, -o + 234 = y*n + 2*o. What is the highest common divisor of n and 27?
27
Suppose 2*m = 17*m + 122*m - 140973. Calculate the highest common divisor of 14 and m.
7
Let a(f) = 5*f + 2*f + 5 + 3*f - 9*f. Let k be a(11). What is the greatest common factor of 784 and k?
16
Let x = 850 - 490. Suppose 2*b = -3*b + x. Suppose -18 = -g - 4*n, -7*g + 3*n + b = -3*g. Calculate the highest common divisor of 126 and g.
18
Suppose -2*u - 130 = -5*o, -595*o + 591*o + 104 = 5*u. Calculate the highest common factor of 4966 and o.
26
Suppose 5*j - 301 - 689 = 0. Let z be 9 + 262 + (29 - 36). Calculate the greatest common factor of z and j.
66
Let w = 28751 + -28644. Calculate the greatest common divisor of 26857 and w.
107
Suppose 0 = -2*l + 239 + 61. Let q(c) = -c**3 - c**2 + 8*c - 148. Let g be q(-7). What is the highest common factor of g and l?
30
Let w be ((-10)/(-2))/(5/205). Let v = 13918 + -13877. Calculate the greatest common factor of v and w.
41
Suppose -b - 3*b + 72 = -6*l, b = 5*l + 32. Let o be 8/12*9/2. Suppose -4*n + 84 = -4*w, -2*n + w + 93 = o*n. Calculate the greatest common factor of b and n.
6
Let f be 5 + 3 + (1 + -1 - 1). Let x be -2 + f + 2*(-86)/(-4). What is the highest common factor of 192 and x?
48
Let z(o) = -3*o**2 + 62*o - 24. Let j be z(20). Suppose 0 = -25*k + j*k + 252. Calculate the greatest common divisor of k and 490.
14
Suppose 148*h - 56*h = 77*h + 10695. What is the highest common divisor of 299 and h?
23
Suppose 18*p + 1394 = -1162. Let m = 241 + p. What is the highest common divisor of m and 63?
9
Suppose 3*r = 5*d - 6*d + 541, 5*r = -3*d + 895. Let y = r + -162. What is the highest common factor of y and 160?
20
Let j(p) = p - 10. Let c be j(2). Let a(l) = -12*l + 8. Let o be a(c). Suppose 4*h - o = 156. What is the greatest common divisor of h and 26?
13
Suppose 20*y - 21120 = 21*y - 13*y. Calculate the greatest common divisor of y and 55.
55
Let n(x) = -x**3 + 6*x**2 - 22. Let s be n(5). Suppose -7 = s*d - 43. Suppose d*z - 1312 = 8*z. What is the highest common divisor of 41 and z?
41
Let a = -7 + 23. Suppose 85 = 5*n + 10. Let r be 125/n - 2/6. Calculate the highest common factor of a and r.
8
Let l = 7 + -5. Let s be -7*((-918)/(-119) + -9). Let n = l + s. What is the greatest common factor of n and 99?
11
Suppose 0 = -6*v + 46 + 50. Suppose -13*d + 11*d - v = 0. Let f = 20 + d. Calculate the highest common divisor of f and 3.
3
Let b(v) = -v**3 - 11*v**2 - 3*v + 44. Let z be b(-12). Calculate the highest common divisor of 1022 and z.
14
Let f be (-198)/(-4)*8/6. Suppose -5*h + 2*p + 70 = 0, -4*h + f = 4*p - 18. Suppose -h = 2*n - 44. What is the highest common factor of 154 and n?
14
Suppose -413*x + 278586 = -259*x. What is the greatest common divisor of 27 and x?
27
Suppose -360 = 29*b - 33*b. Let z = -85 + b. Suppose f - 1 = -t, 8*t + 29 = z*f + 5*t. Calculate the greatest common factor of f and 36.
4
Suppose -795*c = -789*c. Let z be (-102)/(-48) - ((-4)/(-32) - c). Calculate the highest common factor of z and 18.
2
Let w = -1486 - -3856. Calculate the greatest common factor of 240 and w.
30
Let i = -71 + 111. Suppose v + 2*q + 16 = 0, -5*v - 209 = 3*q - 143. Let s be 1/(v/(-16)*(-3)/(-18)). What is the highest common divisor of i and s?
8
Suppose -5*o + 3 = 13. Let a = o - -6. Let v = 30892 + -30860. Calculate the highest common factor of v and a.
4
Let l(y) = 1279*y + 425. Let g be l(2). What is the highest common divisor of 19 and g?
19
Suppose 5*p - 5*m = 8050, 1380 = p - 4*m - 215. Calculate the greatest common factor of p and 57.
19
Let a be 3 - 4/(-3 - -2). Let d be ((-33)/(-4))/(a/308). Suppose 12*k + 180 = 17*k + 3*n, 3*k = 5*n + 74. What is the greatest common divisor of k and d?
33
Let z = 6763 - 6667. What is the highest common factor of z and 1068?
12
Let q be 2/(-6) + (-973)/(-3). Suppose -3*x + 90 = -z - 896, 2*z - q = -x. Let k = 56814 - 56773. Calculate the greatest common factor of x and k.
41
Suppose -3*x - 219 + 1142 = 5*v, -5*x + 1509 = v. Calculate the greatest common divisor of x and 24381.
301
Suppose -5*g + 853 + 822 = 2*i, -g = -5*i - 335. What is the highest common factor of g and 603?
67
Suppose 12 = 4*t - 60. Let u be -68 + 9/((-45)/(-20)). Let x = u - -109. What is the greatest common divisor of t and x?
9
Suppose 86*c - 9*c = 770. Let i(x) = 21*x - 2. Let y be i(2). Calculate the highest common factor of y and c.
10
Suppose -f + 3 = -4*z, -4*f - 10 + 1 = 5*z. Let c = -2 + 1. Let q be (33/(-9) + z/3)*c. What is the highest common divisor of 8 and q?
4
Let p = 23876 - -42348. Calculate the highest common divisor of p and 16.
16
Let t(j) = -j**3 - 5*j**2 - 2*j + 4. Let d be t(-6). Let f = d + 4. Let o(v) = -3*v - 2. Let i be o(-6). Calculate the highest common divisor of f and i.
