 = p. What is the greatest common factor of t and p?
19
Let i = -4947 - -4951. Let o(j) = j + 1. Let w(k) = -7*k - 11. Let p(h) = 6*o(h) + w(h). Let y be p(-6). Calculate the highest common divisor of i and y.
1
Suppose 0 = -228*y + 231*y + x - 34, 3*x - 6 = -y. Calculate the greatest common factor of 513 and y.
3
Let p be -24*((-9)/(27/(-12)) - 6). Let l = -117 + 274. Suppose 5*j - l + 34 = -2*u, 5*u = 3*j + 323. What is the greatest common factor of u and p?
16
Suppose 0 = -8*b - 186 + 3666. Let d = b + -421. What is the highest common factor of d and 378?
14
Let k(h) = 8*h + 221*h**3 + h**2 - 449*h**3 + 4 + 227*h**3. Let m be (6/2)/(2/(-2)). Let v be k(m). What is the highest common divisor of v and 80?
16
Suppose -10086*h - 90 = -10101*h. Calculate the highest common divisor of 626 and h.
2
Let p = 57107 - 56355. Let t = -11 + 27. What is the greatest common factor of p and t?
16
Let i(s) = -2*s**3 - 115*s**2 - 55*s + 143. Let y be i(-57). What is the greatest common divisor of 4292 and y?
29
Suppose 4*m - 246 = 62. Let j(c) = -68*c**2 + c. Let x be j(1). Let l = m + x. What is the highest common divisor of l and 10?
10
Suppose 0 = -272*m + 70985 + 29111. Calculate the greatest common divisor of m and 224.
16
Let f(i) = -i**3 + 24*i**2 - 52*i + 30. Let y be f(12). What is the highest common factor of 21 and y?
21
Let f be (319/44 - 7) + (945/20)/3. Let r(m) = 144*m. Let k be r(1). Calculate the highest common divisor of k and f.
16
Let v(p) = -136*p - 855 + 18*p + 736. Let w be v(-3). What is the greatest common factor of w and 47?
47
Let a be (-20)/200 + (-762)/(-20). Calculate the highest common factor of a and 2470.
38
Let r be 273*((120/16)/5 - (-99)/14). What is the highest common factor of 20 and r?
20
Suppose t = 4, -31*s - 4*t - 404 = -35*s. Suppose -10*y + 9*y + 70 = 0. What is the highest common factor of y and s?
35
Let y be (7/(-4))/((-6)/(-24)). Let g be ((0 + 1)/(-1))/(y/189). Calculate the greatest common divisor of 27 and g.
27
Let t(j) = -11*j - 61. Let a be t(-7). Let v be ((-38)/5)/((a/5)/(-8)). What is the greatest common factor of 19 and v?
19
Suppose 2*j = -5*a - 0*j + 380, -4*a + 304 = 4*j. Let f be 12*-2*(-285)/a. What is the highest common divisor of 225 and f?
45
Let a be -20108*(7 + 2/(-4)*15). Calculate the highest common divisor of 66 and a.
22
Suppose 3*b - 301 = 4*p - 1027, -2*p = -2*b - 364. What is the highest common divisor of 220 and p?
20
Suppose 3*u - 5*u - 8 = 0. Let x(k) = 2*k**2 + 19. Let h be x(u). Suppose -39 = -5*o + h. Calculate the greatest common divisor of o and 12.
6
Suppose 3150 - 15 = j + 10*j. What is the greatest common factor of j and 1254?
57
Let v(q) = q**2 + 82*q + 265. Let i be v(-80). What is the highest common factor of i and 1330?
35
Suppose 8085 = 15*g + 6*g. Suppose -l + 3*p + 142 = 0, 0*l + 134 = l - 5*p. Calculate the greatest common divisor of l and g.
77
Suppose 31*m - 10*m - 63 = 0. Let x be (-10)/(-4) - 2/4. Suppose m*o - b - 36 = o, -x*b = o - 18. What is the greatest common factor of o and 27?
9
Suppose 59*o - 56*o - 96 = 0. Let l be (1 - (-2 + -27))*48/9. What is the greatest common factor of l and o?
32
Let r(p) = p**2 - 20*p + 21. Let w be r(21). Let m be w/((-25)/(-165) + 2/11). Calculate the greatest common factor of 14 and m.
14
Let y(q) = -q**3 - 8*q**2 + 132*q + 1122. Let w be y(-9). Suppose 162 = 4*d - 298. What is the highest common factor of d and w?
5
Let i be (-665)/(-13) + (-3 - 259/(-91)). Let x = 64 - i. Suppose -50 = -3*p + 301. What is the greatest common divisor of p and x?
13
Let z be -6 + 5 + 72/(-2). Suppose 0 = -5*y - 2*r - 2*r + 241, 0 = -y + 5*r + 25. Let w = z + y. What is the greatest common divisor of w and 12?
4
Suppose 964*u - 995*u + 52049 = 0. What is the greatest common factor of u and 146?
73
Suppose -12 = -7*p + 44. Let d be (96/14)/(9/(756/p)). What is the greatest common factor of d and 18?
18
Let k(s) = 56*s**3 - 21*s**2 + 71*s + 143. Let d be k(8). Calculate the greatest common factor of d and 33.
11
Suppose 0 = -1650*j + 1651*j + 5*h - 313, -650 = -2*j - 4*h. Calculate the highest common divisor of j and 243.
9
Suppose 5*k + 11 = -14, -3*r + 22 = k. Suppose 0 = r*x - 39 - 15. Calculate the highest common factor of x and 48.
6
Let h(n) = n**3 - 36*n**2 - 77*n + 37. Let o be h(38). Let k be (2 - (1 - -2))*(-91 - o). Calculate the highest common factor of k and 54.
18
Let u(s) = -2*s - 44. Let n be u(-15). Let b be (-1940)/n + 2 + 20/(-35). Calculate the greatest common divisor of 35 and b.
35
Suppose -71875 + 4276 = -29*u. Let w be (-3)/((-3)/(-2))*u/(-6). What is the highest common factor of 42 and w?
21
Let n(j) = -j**3 + 3*j**2 + 1. Let r be n(2). Suppose 471 = 2*p + 3*m, -m + 223 = p - 2*m. Let w = p + -208. What is the greatest common factor of w and r?
5
Suppose 12*k - 47 + 23 = 0. Suppose -1962 = -k*o + 2*w, o = -2*o - 2*w + 2958. What is the greatest common factor of 24 and o?
24
Let w(l) = -425*l - 845. Let h be w(-2). Calculate the highest common factor of 174 and h.
1
Suppose -9 = y - 3*d, -5*d = -0*y + 2*y - 15. Suppose y = -0*z + 2*z + 44. Let o = 46 + z. What is the greatest common divisor of o and 72?
24
Let z = -67 + 97. Suppose 6*k - 18 = z. Suppose k*r + 440 = 12*r. Calculate the greatest common divisor of r and 11.
11
Suppose -387 = -52*l + 2525. Let a be 4*140*(-5)/(-10). Calculate the greatest common divisor of l and a.
56
Let f(x) = -48 - 40*x - 44 - x**3 + 19*x**2 - 43 - 39 + 184. Let c be f(16). Calculate the highest common divisor of 184 and c.
46
Let f(x) = -5*x + 2. Let i be f(-5). Let r(q) = q**2 - 2*q - 28. Let y be r(0). Let d = i - y. Calculate the highest common factor of 5 and d.
5
Let k be (48/(-9) - -5)/((-17)/3264). Calculate the greatest common factor of k and 19904.
64
Suppose -2*m + 16626 = -4*u, -17*m + 22*m - 41520 = -5*u. Calculate the highest common factor of 27 and m.
9
Let g(k) = k**3 + 8*k**2 - 40*k + 4. Let d be g(7). What is the highest common divisor of 102 and d?
51
Suppose 1669 = 5*s + 864. What is the highest common divisor of s and 207?
23
Let f be (6/16 - (8530/(-80) + 17))/2. What is the greatest common factor of f and 170?
5
Let y(c) = -16*c**3 - 2*c**2 + 2*c - 1. Let p be y(1). Let u = -11 - p. Let l be (-12*9/(-30))/(5/25). What is the highest common factor of u and l?
6
Suppose -31*z = 52*z - 28469. What is the greatest common divisor of z and 7?
7
Let z be (-417)/(-1946) - (-1257)/14. Calculate the highest common factor of z and 170.
10
Suppose -2*x + 14 = 4*s, 2*s + 26 - 6 = 2*x. Let g = 180775 + -180550. What is the greatest common divisor of g and x?
9
Let b be (-4 + -16 - -7) + 776. What is the highest common divisor of b and 77?
7
Let n be 1/((-1568)/(-3128) + 2/(-4)). What is the highest common divisor of 46 and n?
46
Suppose 3*g - 16 = -2*y, g + 4*y - 10 = -18. Suppose 228 = f + 3*f. Let z = 129 - f. What is the greatest common divisor of z and g?
8
Let k = -27370 - -27434. Let j be ((-6)/(-4))/(3/160). What is the greatest common divisor of j and k?
16
Let n be (0 - 0)*(-2 - 2)/(-12). Suppose 3*l - 13 + 7 = n. Suppose -3*k + 20 = 5*r, -l*r + 0*r = -3*k - 8. Calculate the greatest common factor of 36 and r.
4
Let c be (-43 + 14 + 1)*(-6)/4. Let h = 949 + -403. Calculate the highest common factor of h and c.
42
Let k = 17170 - -2186. Calculate the greatest common divisor of 24 and k.
12
Let k(y) = 5*y - 31. Let g be k(9). Suppose 44 = 6*p + g. Suppose -42 = 4*s + 3*h - 121, -p*s + h + 113 = 0. What is the highest common factor of 33 and s?
11
Let w = 154 - 170. Let h = 33 + w. Suppose -q = -3*q + 238. What is the highest common divisor of q and h?
17
Suppose 17*j - 1345 + 274 = 0. Suppose 56 = -j*h + 70*h. What is the greatest common factor of 472 and h?
8
Suppose 247*z - 33*z - 2092 = 19308. Let x be (4/(-8))/(3/(-24)). Calculate the greatest common factor of x and z.
4
Let f = 4649 - 1828. Calculate the greatest common factor of f and 7.
7
Suppose -4*u = -4*v + 360, -4*v - 9*u = 64 - 502. Suppose o + 128 = 5*o. Calculate the greatest common divisor of v and o.
32
Let w(m) = -4*m**2 - 6*m - 1. Let a be w(-4). Let d = a + 52. Suppose 3*r - 2*t - 330 - 27 = 0, -3 = -t. What is the highest common factor of r and d?
11
Let d be (-9)/27 - (-2226)/9. Let y = d + -157. 