r of 284 and v?
71
Suppose -403*k + 20 = -401*k. Calculate the greatest common divisor of 6010 and k.
10
Let d(n) = 2*n**3 + 12*n**2 + 2. Let b be d(-6). Suppose 3*w + 48 = 3*h, -2*h + 8 = b*w - 4. Calculate the highest common factor of h and 1.
1
Suppose 119690 = 20*i - 57750. What is the greatest common factor of i and 16?
8
Let x = -18135 - -19138. Calculate the greatest common divisor of 1121 and x.
59
Let y be 218704/56 + (-66)/154. Calculate the highest common factor of 55 and y.
55
Let d(m) = m**3 + 26*m**2 + 27*m + 46. Let z be d(-25). Let w be (14/28)/(z/(-240)). Calculate the highest common divisor of w and 12.
6
Let g = -13871 - -13906. Calculate the highest common divisor of g and 18935.
35
Suppose 88*q - 86332 = -18572. What is the greatest common factor of q and 1056?
22
Suppose -7*o = -11*o + 2*g + 6026, -4527 = -3*o - g. What is the highest common divisor of 208 and o?
52
Suppose 5*j + 3*q - 1326 = -q, -535 = -2*j + 3*q. Suppose 21*o - 24*o - 1200 = 0. Let x = o + 414. Calculate the highest common divisor of x and j.
14
Let z be 14/(-147) - (-1 - 342671/147). Calculate the highest common divisor of z and 44.
44
Let z(y) = -y**3 + 28*y**2 - 22*y - 38. Let t be z(27). Calculate the highest common divisor of t and 97.
97
Let b(r) = -2*r**3 + 452*r**2 - 2641*r + 354. Let w be b(220). Let s = -63 - -130. What is the greatest common factor of s and w?
67
Let s = -175 + -53. Let u = s + 231. What is the highest common divisor of 4 and u?
1
Let d = 64 - 14. Let v(c) = -c**3 + 9*c**2 + 22*c - 54. Let j be v(11). Let s be (d/15)/((-56)/j - 1). Calculate the highest common factor of 18 and s.
18
Let l = -408 - -683. Let q = l + -247. Suppose -3 = 3*a - 45. What is the highest common divisor of q and a?
14
Suppose -49*b + 15960 = -14*b. Suppose -b = -342*n + 334*n. Calculate the greatest common divisor of 513 and n.
57
Let v = 98 - 102. Let j be (-728)/v + 5 - -5. Let d be j/36*(-135)/(-12). Calculate the highest common divisor of d and 240.
60
Suppose 5*p = -j + 27, -5*j + 5*p - 63 = -9*j. Let c = 211 + -7. Calculate the highest common divisor of c and j.
12
Let a be 312732/294 - 1/4*(-24)/21. What is the highest common factor of 1197 and a?
133
Let x = -1202 + 1236. Let n(p) = 2*p**2 - 10*p - 4. Let h be n(-4). What is the highest common factor of h and x?
34
Suppose 2*r - 89 = r. Let c = 131 - r. Let a = 175 + 161. Calculate the greatest common factor of c and a.
42
Suppose -874*t + 871*t = o - 1474, 0 = 2*t + 5*o - 974. Calculate the highest common factor of 5166 and t.
246
Let u = -360 + 360. Suppose -2*z - 2*y + 17 = 15, -z - 4*y - 11 = u. What is the highest common divisor of z and 245?
5
Suppose 3*g + 18 = 3*h, -5*g + 20*h = 17*h + 24. Let o be (855/38)/(g/(-100)). Calculate the greatest common divisor of o and 60.
30
Suppose 4*s = -2*z + 254, -5*s + 2*z + 0*z = -313. Let f = 804 + -762. What is the greatest common factor of f and s?
21
Let j = 107 + -19. Let y be (128/40)/(-2)*(-55)/2. Let c be (-1 + (-4)/(-2))/(4/y). What is the greatest common divisor of c and j?
11
Let y = -6 - -9. Suppose -193*p + 15084 = 140*p - 16884. What is the greatest common factor of p and y?
3
Let u = 11 + 0. Let f(i) = -i**3 + 10*i**2 + 11*i - 16. Let c be f(u). Let h = c + 64. Calculate the greatest common factor of 120 and h.
24
Suppose 0 = 735*o - 837*o + 7038. What is the greatest common factor of 8648 and o?
23
Suppose 10*l - 12*l = 6. Let h(m) = -m**2 - 2*m. Let z be h(l). Let p = z + 7. Calculate the highest common divisor of 4 and p.
4
Suppose -x = 2*x - 36. Let f(g) = g**2 - 16*g + 3. Suppose 23*p = 36*p - 208. Let m be f(p). What is the highest common factor of m and x?
3
Suppose f - 42 = 84. Let w = 214 - f. Let k = -464738 + 464749. Calculate the greatest common factor of k and w.
11
Suppose -j = -27*j + 10219 + 8735. Calculate the greatest common divisor of j and 3.
3
Let k = 57 - 56. Let l(i) = i - 2. Let y be l(6). Suppose 5*x - 29 = -2*t, -3*t = -y*x - k + 15. What is the highest common factor of t and 18?
2
Let d(n) be the third derivative of -5*n**4/24 + 70*n**3/3 + 5*n**2 - 2. Let l be d(-8). What is the greatest common divisor of 72 and l?
36
Let q be ((-44)/(-7))/(0 + (-18)/(-252)). Calculate the greatest common factor of q and 44.
44
Let g = 3050 - 3041. What is the greatest common divisor of g and 141?
3
Let h be 5*(0 - 1 - -2). Let c be (0 - -1) + 1590/h. Let x = 850 + -821. Calculate the highest common divisor of c and x.
29
Let r(i) be the third derivative of i**4/24 + 10*i**3/3 - 62*i**2. Let u = -23 + 14. Let j be r(u). Calculate the highest common factor of j and 1.
1
Suppose 5*c - 3*d - 532 = 0, c + 36 = 3*d + 128. What is the highest common factor of 176 and c?
22
Let c = 31 - 66. Let b = c - -35. Suppose 9*q - 11*q + 4 = b. Calculate the greatest common divisor of 22 and q.
2
Let l be (-8)/(-5 + ((-21)/(-154))/3*109). Let r = -35 + 57. What is the greatest common factor of l and r?
22
Let p be (-1872)/(-195)*(-5)/(-2). Let c be ((-28)/(-12))/(4 - 94/p). What is the highest common factor of c and 140?
28
Suppose 0 = 3*t - 5*g + 9 - 0, -3*t = -3*g + 3. Let o be 498/5 + t + (-24)/15. Calculate the highest common divisor of o and 25.
25
Let z be (238/(-204) - 47/(-30))*(-1660)/(-1). What is the highest common factor of z and 415?
83
Suppose -5*c - 5 = -4*c. Let o be (-2)/c + -23*6/(-30). Suppose -4*p + 121 = 4*z + 13, o*p + 3*z = 145. Calculate the greatest common factor of p and 128.
32
Suppose -161 = -4*p - 213. Let z(x) = x**3 + 17*x**2 + 19*x + 21. Let h be z(p). What is the highest common factor of h and 25?
25
Let g(q) = -372*q + 375*q - 6*q**3 + 4 + 1 + 3*q**2. Let w be g(-2). What is the highest common divisor of 1003 and w?
59
Let u be (-18)/(-54) - 53/(-3). Let s(i) = -i**2 - 6*i - 2. Let c be s(-9). Let h = c + 47. What is the greatest common factor of u and h?
18
Suppose -4*n + 5*r + 26221 = 0, -5*n + 5*r + 29202 = -3568. What is the highest common factor of n and 118?
59
Suppose 3*v = -m - 6 - 0, -2*v = -m - 16. Let a = m + 54. What is the greatest common factor of a and 84?
42
Let t(y) = -51*y - 6. Let s = -24 + 23. Let k be t(s). Let i be (k/(-60))/(-1*(-2)/(-96)). What is the highest common factor of i and 18?
18
Suppose -23*s - 152 = -22*s. Let k be (-706)/(-16) - (-19)/s. Calculate the greatest common divisor of 77 and k.
11
Let x(s) = 1. Let g(r) = 4*r + 3. Let z = -38 + 43. Let q(f) = z*x(f) + g(f). Let h be q(4). Calculate the highest common divisor of 16 and h.
8
Let x = 6232 + -6176. Calculate the greatest common divisor of x and 3108.
28
Suppose 8*k - k + 112 = 0. Let g = k - -20. What is the highest common divisor of 6 and g?
2
Suppose -6*p + 41348 - 35258 = 0. What is the greatest common factor of p and 35?
35
Let z = -171 + 225. Let p be 12/z*-15*1008/(-35). What is the highest common factor of 264 and p?
24
Let z(x) = 146*x**2 - 8*x + 8. Let h be z(2). Calculate the highest common divisor of h and 324.
36
Let k(p) = -10 + 30*p + 18*p**2 + 85*p - 50*p - p**3. Let b be k(21). Suppose 19 = 5*f - 221. Calculate the highest common factor of b and f.
16
Suppose -4*s - 2*p + 504 = 0, 126 = s + 29*p - 28*p. Calculate the greatest common divisor of s and 280.
14
Suppose -45 = 5*h - 10*h. Suppose -120 = -4*a + h*a. Let f be 12/a*33*-2. What is the highest common factor of f and 11?
11
Suppose 0 = -4*v + 15*v. Let r(u) = 5*u + 2. Let d be r(v). Calculate the greatest common divisor of d and 38.
2
Let u be 20/4 - 11 - -10. Let m be 419 + ((-12)/(-3) + -5)*u. Calculate the highest common divisor of 83 and m.
83
Let i be -5*-5*(-2 - (-11)/5). Calculate the greatest common factor of 134 and i.
1
Let t(y) be the first derivative of y**4/4 + 22*y**3/3 + 5*y**2 + 41*y + 9. Let g be t(-21). Calculate the greatest common divisor of 17 and g.
17
Suppose 0 = -5*s + 4*d - 37 - 67, 2*s - 3*d = -43. Let z be s/(-80) + 43/(-8)*-2. Suppose z*t - 45 = 120. Calculate the greatest common divisor of t and 45.
15
Let v be (-14 - -13)*4/2. Let k be 111 + (v/4)/(14/(-84)). Suppose -c = -k + 88. Calculate the highest common factor of 13 and c.
13
Let j(c) = -77*c - 7113. Let h be j(-93). Let s(o) = -o**2 + 8*o - 3. Let w be s(6). What is the highest common divisor of w and h?
3
Suppose -150 + 3 = -7*j. Suppose 219 = 6*m - j. 