t + b = -96. What is the highest common divisor of t and 34?
34
Suppose 3*p - 8 = -20, c - p = 394. What is the highest common divisor of 240 and c?
30
Suppose 39*h + 16*h = 16280. Suppose 13*m - h = 367. What is the highest common factor of 6 and m?
3
Let b = 629 + -624. Suppose 0 = 3*f - o - 144, -7*o + 10*o - 240 = -b*f. Let s = -104 + 176. What is the greatest common divisor of s and f?
24
Suppose -4*v + 32 = -2*v. Suppose -5*b - 226 = -3*u, 8*u - 142 = 6*u - b. Suppose u*j - 70*j - 80 = 0. What is the highest common factor of v and j?
8
Suppose 2*h - 2*i = -0*i + 622, 3*i + 21 = 0. Calculate the greatest common divisor of 5 and h.
1
Let x be (1147 + -1)*6/18 - (30 + -33). Let u be (-6)/33 - 123/(-11). Calculate the highest common divisor of u and x.
11
Let p(d) = 3*d**2 - 5*d + 15. Let n be p(11). Calculate the greatest common factor of 133 and n.
19
Suppose 7*q = 4*q + 96. Let w be ((-63)/14)/1*(-2)/3. Suppose w*u - 7 = -2*h + 80, -3*h + 159 = -5*u. What is the highest common factor of q and h?
16
Let s be (8 + -7)*(2 + -1). Let g(r) = -r**3 - 40*r**2 + 177*r + 60. Let c be g(-44). What is the greatest common divisor of s and c?
1
Let a be 5 - -8 - 12/(-6). Let z be (-2)/(-6) - ((-1735)/a + 0). Calculate the greatest common divisor of 493 and z.
29
Suppose 0 = -r - 5*t + 73, 3*r - 2*t + 382 - 720 = 0. Calculate the highest common divisor of r and 513.
27
Suppose -2*v + 7442 + 653 = d, -5*d = -3*v + 12149. Calculate the highest common factor of 690 and v.
46
Let q be (2 + 3 - 2) + 1. Suppose 5*t - 2555 = -5*l, 1538 = 3*l - 0*l + q*t. Suppose 5*b = -131 + l. Calculate the highest common factor of 25 and b.
25
Let h be (0 - 2) + (-13 - -8). Let a = 5 - h. Let j be (0 - (-3)/(-4))/(2/(-48)). What is the greatest common factor of a and j?
6
Suppose -5*y + 60 = -3*w, -2*w + 5 + 12 = 3*y. Suppose -y*o + 83 = -322. Let v be 128/7 + 2/(-7). Calculate the highest common factor of o and v.
9
Let a(x) = -x**3 + 10*x**2 - 6*x - 22. Let y be a(9). Suppose 109 = y*b - 41. Let u be b*(-3)/18*-3. Calculate the highest common divisor of u and 9.
3
Let j(a) = a - 12*a + 58 - 62. Let l be (-10)/(6*3/9). Let y be j(l). Calculate the highest common factor of y and 68.
17
Let b(d) be the second derivative of d**5/20 + 7*d**4/6 - 13*d**3/6 + 23*d**2 + 73*d. Let x be b(-15). Calculate the greatest common divisor of x and 40.
8
Let v be (2/1 - 4)*(-329)/14. Suppose 6*q - v + 23 = 0. Let r be (-46)/(-10) + (-6)/10. What is the highest common factor of q and r?
4
Let g(c) = -c. Let y(w) = -16*w + 4. Let f(p) = -5*g(p) + y(p). Let n be f(-6). Suppose -544 = -46*l + 100. Calculate the greatest common factor of l and n.
14
Suppose 1 = -5*g - 4, -3*t - 3*g + 276 = 0. Let w be (-2)/(-3)*10788/232. Calculate the highest common factor of t and w.
31
Let g be (-143)/13 + -4 + 859 - -11. Calculate the greatest common factor of g and 2610.
45
Suppose -107 = 5*d + m, 5*m - 2*m = 5*d + 99. Let u be ((-4)/(-3))/(14/d). Let t = u + 11. What is the highest common factor of 36 and t?
9
Let s = 133 + -85. Let r(i) = -54*i + 27. Let p be r(6). Let y = 417 + p. Calculate the greatest common factor of s and y.
24
Suppose 15*o + 572 = 13*o. Let l = -185 - o. Suppose 4*x = -4*k + 136, 0 = -2*x - x - 4*k + l. What is the highest common factor of 140 and x?
35
Let a(i) = 35*i**2 + 3*i - 1. Let k be a(4). Let l = -404 + k. Suppose 0 = 4*o - 105 - l. Calculate the highest common divisor of 34 and o.
34
Let j(u) = -2*u**3 - 21*u**2 - 22*u + 60. Let g be j(-9). Calculate the highest common divisor of 965 and g.
5
Let w(q) = 252*q + 104. Let a be w(-2). Let o = 464 + a. What is the highest common factor of o and 1?
1
Let x = 205 + -198. Let r = 201 - 75. Calculate the greatest common divisor of r and x.
7
Let q(m) = m + 6. Let o be q(-11). Let f be 0 - (-1 - (44 + o)). What is the greatest common divisor of f and 8?
8
Let n be 3 - (-18 - (3 + 1)). Let a(b) = -b**2 + 4*b - 10. Let y be a(5). Let k be y/(15/6 - 4). What is the highest common divisor of k and n?
5
Let b(o) = 3*o + 30. Let i be b(6). Suppose 5*r = -10, -15*r + 16 = 4*c - 17*r. Calculate the highest common factor of c and i.
3
Let p = 3342 - 3102. What is the greatest common divisor of p and 920?
40
Suppose -141 - 1283 = -2*o. Suppose 0 = 4*g - 4*y - 428, -o + 171 = -5*g - y. Suppose -16*h + 19*h = g. What is the greatest common factor of 4 and h?
4
Let q(g) = -g**3 + 7*g**2 + 10*g - 7. Let p be q(8). Suppose 16*x - 15*x - 225 = 5*l, -3*x + 3*l = -675. What is the highest common factor of p and x?
9
Let i = -1614 + 1617. Suppose -232 = 16*c - 21*c + i*d, -3*d = 4*c - 164. Let o be -88*((-2)/(-1) + -3). What is the greatest common factor of c and o?
44
Let r be (4/(-12))/(3 - 508/168). Suppose -r*x = -1781 - 1131. What is the highest common divisor of x and 96?
16
Suppose 8*r = -3*r + 44. Suppose 0 = -3*z + 9, 0 = r*c + 3*z - 407 + 118. Calculate the greatest common factor of c and 10.
10
Let q = -336 - -346. Let i be (66/9)/(q/210). Suppose j + 11 = 5*s, 4*j + 3*s - 36 = 7*s. What is the highest common divisor of i and j?
14
Suppose 0*h - 5*h + 1045 = 0. Suppose -2*d = 2*n - 20, 18*d - 37 = 17*d + 2*n. Calculate the greatest common factor of h and d.
19
Suppose -28*k = -32*k + 2*i + 108, 45 = k - 5*i. Calculate the highest common divisor of 690 and k.
5
Suppose -79*y + 112 = -86*y. Let u be (29/1)/1 + 1. Let p = y + u. What is the greatest common factor of p and 98?
14
Let q(r) = 4981*r - 218867. Let w be q(44). Let y be (2/5)/((-1)/(-5)). Let u be (30 - (1 - y)) + 2. Calculate the greatest common divisor of u and w.
33
Let i(m) = m**2 - 9*m - 7. Let u be (-12)/16 - 333/(-12). Let q = u + -16. Let t be i(q). What is the highest common factor of t and 75?
15
Let g be 1195/10 + 6/(-4)*(-2)/6. Calculate the greatest common factor of 1704 and g.
24
Let p(v) = -v**3 + 4*v**2 - v. Let k be p(4). Let z be (2 - 0)/(46/(-23)). Let r be z/(-5 - k/1). What is the greatest common factor of 4 and r?
1
Let u(b) = -2*b + 1. Let f be u(-7). Let y(t) = t - 5. Let j be y(7). Suppose -j*v = -54 - 6. What is the highest common factor of f and v?
15
Let m = -7786 + 7593. Let z be ((-427)/4)/((-1)/(-4)). Let r = m - z. What is the highest common factor of r and 18?
18
Suppose 2*t - 6*o = -3*o + 25, -4*t + 40 = -4*o. Suppose y - 1707 = -t*r, y - 224 = -r + 115. What is the highest common factor of 19 and r?
19
Let r be (-66)/55*(-20)/(-6) + -1. Let g(t) = 15*t**2 + 10*t - 2. Let n be g(r). Calculate the greatest common factor of n and 17.
17
Let g be 23 + (-3 - (2 - 4)). Suppose 0 = 9*b - 14*b + 5*t + 130, 20 = b + 5*t. Suppose 20*m + 110 = b*m. What is the greatest common factor of m and g?
22
Let z = 25715 - 25092. Calculate the highest common divisor of 210 and z.
7
Suppose 0 = -2*l + 5*d + 46, 5*l + 21 - 167 = -3*d. Calculate the highest common factor of l and 9926.
14
Suppose 46*s + 4*c = 50*s - 8, 4*s + 2*c = 32. Suppose 0 = -t + s*m - 3*m + 114, 510 = 5*t - 3*m. What is the highest common factor of t and 9?
9
Suppose -n = -2*r - 150, -3*r = 142*n - 145*n + 441. What is the highest common divisor of n and 456?
24
Let o be (2*(-11)/(-33))/((-2)/(-585)). Suppose 3*k = 6 + 6. Let v be k/(-12)*(-40 - -1). What is the greatest common divisor of o and v?
13
Suppose 159*q + 40516 - 278800 = -6939. What is the highest common divisor of 30 and q?
15
Suppose 5*t - 259*a = -254*a + 850, -2*t = -a - 353. Suppose s + 3 = 6. What is the highest common divisor of t and s?
3
Let o(n) = n**2 + 50 - 50 - n. Let c(b) = -b**3 - 6*b**2 - 6*b - 2. Let j(u) = c(u) - o(u). Let h be j(-7). What is the greatest common divisor of 22 and h?
11
Suppose 0 = 3*n + 497 + 754. Let m(h) = -3*h**2 + 122*h + 45. Let y be m(43). Let u = y - n. Calculate the highest common factor of 7 and u.
7
Let g = 485 - 264. Suppose 37 = 5*q - 2*u + 6*u, 0 = -u + 3. Suppose 94 = q*t - g. What is the greatest common factor of t and 7?
7
Suppose 0 = -j, 0 = -3*s + 2*s + 4*j + 3. Let o be (s - (1 + -1)) + 101. Let g = 786 - 773. Calculate the greatest common factor of g and o.
13
Suppose 0 = 72*v - 74*v + 3692. Calculate the highest common divisor of 39 and v.
13
Let d(k) = k**2 + 13*k - 33. Let c be d(-17). Suppose 33*u = c*u - 2. Let b = 33 - u. Calculate the highest common divisor of 4 and b.
