 v be (1/(-3))/(4/(-24)). Suppose -5*c + 26 = -b, -4*c + v*b = 6*b - 40. Let k be 914/10 - c/15. Calculate the highest common factor of 13 and k.
13
Suppose 0 = 5*l - 2*p - 11, 2*l - 36*p + 41*p - 16 = 0. What is the highest common divisor of l and 1?
1
Let b(j) = -j**2 + 11*j. Let p be b(8). Suppose 3*u - 2*u - p = 0. Suppose f = -f + u. Calculate the greatest common factor of 30 and f.
6
Let n be (-5 + 10)/(1/134). Suppose -2*g + r + 2*r = 446, 0 = -3*g + 5*r - n. Let o = -100 - g. Calculate the highest common divisor of o and 15.
15
Let g be (-200)/6*(3/1 + -6). Suppose -4*m + 4*z + g = 0, m + 3*m + 3*z - 86 = 0. Calculate the greatest common divisor of 69 and m.
23
Let t = 479 + -275. Let p = 244 - -94. Suppose 5*u = -3*k + p, -t = -5*u - 4*k + 130. What is the greatest common divisor of u and 28?
14
Let u(w) = -w**3 - 8*w**2 + 8*w - 1. Let i be u(-9). Suppose 5*r + 4 + 0 = -3*l, -i = 4*r. Calculate the highest common factor of 6 and l.
2
Let i = -1861 - -1956. Let j be (0 - (2 - 3))*19. What is the greatest common divisor of i and j?
19
Let h(k) = -k**2 + 7*k - 10. Let q be h(7). Let x be -1 + (-1)/(-1)*4. Let l be ((-48)/40)/(x/q). What is the greatest common factor of l and 1?
1
Let w = 167 - 97. Calculate the highest common divisor of w and 224.
14
Let x be (-1 - -3) + 1 - -2. Suppose n = 1 + x. Suppose 6*m - 72 = -0. What is the greatest common divisor of m and n?
6
Let d(y) = -3*y - 54. Suppose 2*o = -0*o. Let j be d(o). Let n = -2 - j. What is the greatest common factor of 13 and n?
13
Let g = -78 + 90. Let u = 19 - g. Calculate the greatest common divisor of u and 35.
7
Suppose -164 = -5*p - 24. Suppose p = -0*k + 4*k. Let z be 1*k + -6 + 4. What is the greatest common factor of 45 and z?
5
Suppose 6*a - 11*a + 2420 = 2*d, -a = 2*d - 476. Calculate the highest common factor of a and 90.
18
Let z be (240/(-50))/(1/(-10)). Suppose -5*h + z = -h. What is the highest common divisor of 4 and h?
4
Let m(f) = f**3 + 11*f**2 + 10*f + 4. Let u be ((-30)/(-9))/(2/(-6)). Let o be m(u). Calculate the greatest common divisor of o and 20.
4
Let a(b) = 5*b - 1. Let k be a(1). Suppose -2*m - m + 84 = k*w, -4*m = -w + 40. What is the greatest common factor of 24 and w?
24
Suppose 18*p - 656 + 116 = 0. What is the highest common divisor of 40 and p?
10
Let v = -160 - -225. What is the greatest common divisor of 91 and v?
13
Let p(a) = a - 2. Let d be p(-2). Let x be (28/16 - 3)*d. Suppose -j + 5*j = 3*m - 8, 12 = -m + x*j. Calculate the greatest common divisor of m and 72.
8
Let i = 1392 + -1335. Calculate the highest common factor of i and 171.
57
Let g(q) = 13*q - 70. Let h be g(29). Let b = -182 + h. Calculate the highest common factor of b and 25.
25
Let m(n) = -n + 12. Let w = 26 + -26. Suppose o + 5 = -w*o. Let i be m(o). What is the highest common factor of 17 and i?
17
Let t be (0 + (6 - 8))*(5 + -63). Calculate the highest common factor of 12 and t.
4
Let n be ((-3)/(-4))/(4/160). Let s(g) = -g**3 - 7*g**2 + 7*g + 2. Let x be s(-8). Let m = 20 - x. What is the greatest common factor of n and m?
10
Suppose 0 = -2*q + 2*r + 4, 3*q = 2*q - r + 4. Suppose 0*k = 4*k - q*b - 490, 0 = k + 5*b - 111. What is the highest common divisor of 11 and k?
11
Let t(f) = -f + 0*f - 5 - 13 + 5. Let h be t(-16). Let m be 1/h + 2080/24. What is the greatest common divisor of 29 and m?
29
Suppose -z = -2*z - 79. Let v be z/(-3) + 0 - 4/(-6). Calculate the highest common divisor of 135 and v.
27
Let d be (-1 + 6)/((-1)/(0 + 2)). Let n(l) = l**2 + 6*l + 14. Let t be n(d). Calculate the highest common factor of t and 36.
18
Let k(a) be the second derivative of a**3 + a**2/2 - 11*a. Let g be k(4). What is the highest common divisor of g and 5?
5
Suppose -21*x + 2595 + 807 = 0. What is the greatest common divisor of 12 and x?
6
Let w(q) = 4*q**2 - 6*q - 14. Let u be w(6). Let s = u - 86. Calculate the highest common divisor of s and 28.
4
Let m be (-2)/(-8) + (-396)/(-16). Suppose 4*r = -r + m. Let p be (-20)/(-50) - (-98)/r. Calculate the highest common factor of p and 4.
4
Suppose 3*t - 24 + 6 = -4*r, -3*t + r + 33 = 0. Let y = 6 - 4. Suppose -6 = -n - y. Calculate the highest common factor of t and n.
2
Suppose 2 = -3*j + 11. Let k(n) = 2 + j*n + 2 - 2*n. Let d be k(6). Calculate the highest common factor of d and 70.
10
Let h be -4 - (-1 + (-3 - 0)). Let r(q) = q**3 - q + 24. Let p be r(h). Calculate the greatest common divisor of 12 and p.
12
Let z(g) = 31*g - 10. Let b(a) = a**3 + 4*a**2 + 3*a. Let i be b(-2). Let w be z(i). What is the highest common factor of 39 and w?
13
Let k = 1014 + -992. What is the greatest common divisor of 407 and k?
11
Suppose -15 + 23 = 4*o. Let k(c) = -2 + 12*c - c**o + 5*c - 6*c. Let q be k(8). What is the highest common factor of q and 110?
22
Let h(s) = s**2 + 36*s - 307. Let y be h(-45). Calculate the greatest common divisor of y and 10.
2
Let c = -165 - -249. Calculate the greatest common divisor of c and 140.
28
Let s(q) = -q**3 + 6*q**2 + 4*q - 25. Let m be s(4). Calculate the highest common factor of m and 437.
23
Suppose 4*u - 108 - 16 = 0. Let q = 40 - u. What is the highest common divisor of 99 and q?
9
Let p(a) = -115 + 139 - 7*a - 13*a. Let h be p(-18). Suppose -6*j + 2*j = -h. What is the greatest common factor of j and 12?
12
Let h = -8 + 10. Let y be (0 - 2)*(-45)/h. Let w(k) = -4*k - 3. Let i be w(-2). What is the highest common factor of i and y?
5
Suppose 6*x = 2*x + 16. Suppose -3*d = -4*f + d - x, -5*f = -2*d + 14. Let r be (-50)/f + 5/(-10). What is the highest common factor of r and 12?
12
Suppose 3*n = 453 + 858. What is the greatest common divisor of 23 and n?
23
Let v = 78 - 15. Let l be 28/16*96/4. What is the highest common divisor of v and l?
21
Let g be 2/(-6) + (-75)/(-9). Suppose w - 120 = 9*w. Let c be (2000/w)/5*-3. What is the greatest common factor of c and g?
8
Let n(g) = -2*g**3 - 4*g + 8*g**2 - 5 + g**3 - 4*g. Let x be n(7). Let i be (-90)/x*(-18)/(-15). Calculate the highest common divisor of 18 and i.
9
Suppose 5*u - 32 = u. Let z(j) = -j**2 + 5*j - 9. Let k be z(u). Let d be (k/(-6) - 1)*22. What is the greatest common divisor of d and 11?
11
Suppose 16*v - 13*v = f - 44, -4*f - 5*v + 244 = 0. Calculate the greatest common factor of f and 56.
56
Suppose -2*z - 7 + 31 = 0. Let l be 8/(-28) + (-246)/21. Let k be ((-4)/l - -1)*72. What is the highest common divisor of k and z?
12
Let x = -1151 - -1221. Calculate the highest common factor of 770 and x.
70
Suppose 4*y - 26*d + 30*d = 3172, -2*y = -3*d - 1586. Calculate the highest common factor of y and 39.
13
Suppose -104 = -3*w - 2*n, -71 = -2*w - n - 2*n. Suppose -7*o + 239 = -118. Calculate the highest common factor of o and w.
17
Let t = -598 + 601. Suppose 2*h - 5 - 19 = 0. Let q be 2/((h/266)/t). What is the highest common factor of q and 19?
19
Suppose 2*p = 11*v - 7*v + 1694, -4*p - v + 3406 = 0. What is the greatest common factor of 23 and p?
23
Let f be -6 - 22/(-6)*6. What is the highest common factor of 272 and f?
16
Suppose 4*s - 5*t - 66 = -7*t, 2*s = t + 31. What is the greatest common factor of 1 and s?
1
Let m = -1347 - -1389. Calculate the highest common factor of 66 and m.
6
Let u be (52/4)/(8*(-4)/(-224)). Let m be (-4)/(-14) - 48/(-28). Suppose m*n + 2*f = 5*n - 39, f - 13 = -n. Calculate the highest common divisor of u and n.
13
Let w(d) = -7*d**3 + 3*d**2 - 5*d - 1. Let v(b) = b**3 + 1. Let z(u) = -4*v(u) - w(u). Let a be z(2). Calculate the highest common divisor of a and 76.
19
Let y(w) = -w**3 - 15*w**2 - 2*w. Let j be y(-15). Let s(t) = -3*t + 75. Let o be s(21). What is the highest common divisor of j and o?
6
Suppose 26*y = 27*y - 217. Let b = y - 154. Suppose 4*m - 3*i = 373, -b = 4*m - 2*i - 433. Calculate the greatest common factor of 13 and m.
13
Suppose -15*t - 31 = -18*t + 4*r, 5*t + 5*r = 5. Let w = 4 - -1. What is the greatest common factor of t and w?
5
Suppose 3*g = p - 87, 331 = 3*p + 8*g - 3*g. Calculate the greatest common factor of p and 12.
6
Let x be 441 - (-11 - 6 - -7). Calculate the highest common divisor of 11 and x.
11
Let p(j) = 14*j**2 + 1. Suppose 0 = 12*v + 10 + 2. Let o be p(v). Calculate the greatest common divisor of 45 and o.
15
Let s(q) = -q**3 - 3*q**2 - 4*q + 456. Let n be s(0). 