 q be ((-656)/6)/(4/26 - 9184/31980). What is the greatest common divisor of q and 100?
20
Suppose -11*n = -96 + 8. Suppose -4*f = -n*f + 8. Suppose 0*t + 2*t - 3*x = 13, -4*t - x = -5. Calculate the greatest common divisor of f and t.
2
Let l be (40886 - 1) + (-6)/42*0. Let c be l/1360 - (-1)/(-16). What is the highest common divisor of 27 and c?
3
Suppose 19*a - 31*a = -14*a + 560. Calculate the greatest common divisor of a and 4270.
70
Suppose -404 = 418*l - 422*l - 3*s, -4 = -s. Calculate the highest common factor of 32 and l.
2
Let x(y) = -y**3 + 10*y**2 - 22*y + 5. Let g be x(7). Let p be 64 - (g + (4 - 5)). Let i = p + -37. Calculate the greatest common factor of 75 and i.
15
Suppose 11*k + 165 = 22*k. Let l be ((-756)/k)/((-7)/35). What is the greatest common divisor of l and 36?
36
Let r = 732 - 291. Suppose 3*h - 88 - 54 = -5*z, 0 = h - 2*z - 51. What is the highest common factor of r and h?
49
Let i be (-8)/14 - (-128)/28. Suppose -6*h + 38 = -i*h. Suppose -12*a = -2507 - 1. Calculate the greatest common divisor of a and h.
19
Let w = -19 - -24. Suppose -3*s + 149 = -y, -w*s - 2*y + 254 = -9. Suppose -3*o = -15, g - 5*o + 2*o = 19. Calculate the highest common divisor of g and s.
17
Suppose 0 = -39*i - 35505 + 37221. Calculate the greatest common factor of i and 473.
11
Let r(a) = a**3 - 4*a**2 + 5*a + 1. Let b be r(4). Let c = -959 - -1366. Suppose 0 = -402*s + c*s - 945. What is the greatest common factor of s and b?
21
Let x(y) = 0 + 10*y - y**3 + 3 - 7*y**2 + 0 + 17*y**2. Let d be x(11). Let w(i) = -5*i - 34. Let h be w(d). What is the greatest common divisor of 24 and h?
6
Suppose 0 = 2685*v - 2687*v + 1862. Calculate the highest common factor of 209 and v.
19
Suppose -13*j = 472 - 1993. Suppose -13 + j = 8*i. What is the highest common factor of 104 and i?
13
Let f = 225 + -50. Suppose -8*s = -13*s + f. Let o be (s/14)/((-3)/(-6)). Calculate the greatest common factor of 15 and o.
5
Let n(p) = 3*p**2 + 3 + 7*p - 2 - 2 - 8*p. Let c be n(1). What is the greatest common factor of c and 1?
1
Suppose -28 - 84 = 7*n. Let a be -1 + 5 - n/(-4). Suppose 0 = -5*o + 3*k + 2*k + 170, a = -k - 4. Calculate the highest common factor of 20 and o.
10
Suppose -19*x - 268 + 724 = 0. What is the highest common factor of 2820 and x?
12
Let z(r) = r - 2. Let w be z(5). Suppose -10*a + 185 = 25. Suppose 0 = -8*h + 4*h + a. Calculate the greatest common divisor of h and w.
1
Let k(s) = -8*s**2 - 33*s - 7. Let c be k(-3). Calculate the greatest common divisor of c and 755.
5
Let a(s) = -s**2 + 37*s + 152. Let p be a(39). Calculate the highest common divisor of 74 and p.
74
Suppose 3*y + v = 158, 0 = -y + v + 17 + 37. Calculate the highest common divisor of 1961 and y.
53
Suppose 0 = -16*b + 14112 + 1280. What is the highest common divisor of 111 and b?
37
Let p(c) = c**3 - 2*c**2 - 4*c - 4. Let q be p(4). Let z be ((-7)/(21/(-12)))/2. Suppose 0*v + z*v = 120. What is the highest common factor of v and q?
12
Let o = -22 - -32. Let r(b) = -b**3 + 9*b**2 + b - 5. Let q be r(-3). Suppose 14*y = 12*y + q. What is the highest common divisor of y and o?
10
Let c(x) = -x + 112. Let s be (((-12)/(-36))/(-1))/((-2)/186). Let u be c(s). Calculate the highest common factor of 18 and u.
9
Suppose 0*f + 140 = 2*f. Suppose 50 = 6*h - f. Let r be ((-8)/h)/1*-45. Calculate the highest common divisor of r and 36.
18
Let h(l) be the first derivative of l**4/4 - 13*l**3/3 + 3*l**2 - 5*l + 21. Let t be h(14). What is the highest common factor of 55 and t?
55
Let u(z) = -13*z - 48. Let m be u(-11). Suppose -x - 5*p + m = 0, -3*x + p + 0*p + 205 = 0. What is the greatest common factor of x and 28?
14
Suppose -2*b - r = -11, 0 = -5*b + 4*r - 7*r + 30. Calculate the highest common divisor of b and 1203.
3
Let o(j) = j + 19. Let p be o(-11). Let f be 3 - (0 + 74)*-1. Suppose 4*r - 2*y = 5*r - 74, r + 5*y - f = 0. Calculate the highest common factor of r and p.
8
Let c(v) = v**3 + 15*v**2 + 11*v + 22. Let l be c(-14). Suppose -5*z - 19 = -l. Let p be 8420/30 - (1 - 3/z). Calculate the greatest common divisor of p and 35.
35
Suppose a = -2*b + 241, 5*a - 340*b + 344*b = 1241. What is the greatest common divisor of a and 1679?
23
Let u be 3 - (10 - (-3 - -2)). Let w be -4 - 0 - (u + -36). Let c(a) = -a**2 + 12*a + 143. Let m be c(19). What is the highest common factor of w and m?
10
Suppose 69 = 11*t + 25. Let d be 3/(((-17)/10 - 2) + t). Calculate the greatest common divisor of 12 and d.
2
Let o = 5889 + -3315. Calculate the greatest common divisor of o and 9.
9
Let q be 3 - 5 - (-48 + 5). Suppose 4*i + 29 - q = 0. Suppose i*y = -y + 80. What is the highest common divisor of y and 30?
10
Let v = -1 + -10. Let q be (-42)/v - 20/(-110). Suppose -q*s + s = -240. Calculate the greatest common factor of 10 and s.
10
Let s(h) = h**3 - 9*h**2 + 12*h + 42. Let u = 791 + -785. Let z be s(u). What is the highest common factor of z and 21?
3
Let z be 58*3*260/1560. What is the highest common factor of 23983 and z?
29
Suppose -146 = -5*d - 2*w, 5*w + 25 = d + 4*w. Let n be d*(0 + 16 + 7 + -3). What is the greatest common divisor of n and 35?
35
Let g(q) = q**2 - 2*q + 2. Let b be g(2). Let m = b + 4. Suppose 278*s + 4 = 17*s + 526. What is the highest common divisor of s and m?
2
Suppose -3*p = 19 - 133. Let k = -22 - -41. What is the greatest common divisor of p and k?
19
Let h = 1984 - 1945. What is the greatest common factor of h and 5?
1
Let m be -1*(-1 - (-95)/1). Let p = m - -101. Calculate the greatest common divisor of 1 and p.
1
Let q(m) = 14*m - 160. Let v be q(15). What is the highest common divisor of 15 and v?
5
Suppose 4*h = 5*z - 30, 5*z + h - 795 + 765 = 0. Calculate the greatest common divisor of z and 150.
6
Let s = 56314 + -29987. Calculate the greatest common factor of s and 7.
7
Suppose -4*d + 6*d = 4*s - 716, -3*s - 3*d + 546 = 0. What is the greatest common divisor of 144 and s?
36
Let v = -21 + 41. Suppose -371*g - 983*g + 18928 = 2680. What is the highest common divisor of g and v?
4
Suppose 624 = 3*n - 36. Suppose -113 = -3*r - 26. Suppose -40 = 27*k - r*k. What is the greatest common factor of k and n?
20
Suppose -4*z + 107 = 95, 0 = t + 2*z - 1788. Calculate the highest common divisor of t and 462.
66
Let r(l) = -2*l**3 + 37*l**2 - 11*l - 56. Let w be r(17). Calculate the highest common divisor of 288 and w.
48
Let l = 3156 - 3144. Let t = -47 - -131. Calculate the greatest common factor of l and t.
12
Suppose 303 + 763 = 13*c. Calculate the highest common divisor of c and 16031.
41
Suppose -12*g + 318 = -6*g. Let x = 354 - 195. What is the highest common factor of g and x?
53
Suppose -3*r + 21 = -2*r. Let k = -3332 + 3353. Calculate the highest common divisor of r and k.
21
Let s be -2*(-12)/(-56) + (-75)/21. Let t(d) = -7*d - 25. Let v be t(s). Let a be v - (5 - (2 - -3)). Calculate the highest common factor of a and 1.
1
Suppose -31*n + 30*n = -72. Let o(l) = -6*l + 6. Let j be o(-15). Calculate the highest common factor of j and n.
24
Suppose 0*r - 3*r = 0, 3*r - 906 = -u. Let x = 509 - u. Let n = x + 645. What is the greatest common factor of 31 and n?
31
Let s = 109 + -88. Let n = -23 - -26. Let c be (n - 4)*(-6 - -2) - -3. What is the greatest common divisor of s and c?
7
Suppose 0 = -2*i - 2*i - 96. Let d be 2 + (1 - -14)/((-9)/i). What is the greatest common divisor of 14 and d?
14
Let r(j) = -192*j - 190. Let b be r(-1). Let g = 1 - 1. Suppose g*x - b*x + 62 = 0. Calculate the highest common factor of x and 93.
31
Let p(x) = 34*x**3 + 4*x**2 + x - 1. Let l be p(1). Suppose -70 = -0*y - 2*y. Let c = l - y. Calculate the greatest common factor of 24 and c.
3
Suppose -14*f = 258 - 790. Suppose 3*g - 95 - 475 = 0. Calculate the highest common divisor of g and f.
38
Suppose 4*k - 4*j = 17404, -2*j + 5116 = 5*k - 16674. Calculate the highest common divisor of 132 and k.
132
Let s(r) = r**3 + 12*r**2 - 3*r + 1. Let y be (-9)/6 + (-2)/(-4). Let i be ((-1)/y)/((-5)/55). Let h be s(i). Calculate the highest common factor of h and 62.
31
Suppose 5*u = -3*h + 3631, u = -0*u - 2*h + 722. Suppose -524 = -13*p + 204. Calculate the highest common divisor of p and u.
56
Let i be -4 + 8 - (5/(-25) + 308/(-35)). Calculate the greatest common divisor of 21541 and i.
