t y(v) = 3*v**2 - 35*v + 23. Let o be y(11). What is the greatest common factor of o and j?
1
Suppose 1317*r = 1139*r + 45568. What is the greatest common factor of 136 and r?
8
Suppose -810324 - 839301 = -159*t. Calculate the greatest common divisor of 166 and t.
83
Suppose -1706 = -198*a + 1206 + 256. What is the greatest common factor of 21168 and a?
16
Let t(p) = p**3 - 10*p**2 + 20*p - 27. Let h be t(8). Suppose -60 = -h*j - 15*j. Suppose 4*i = 33 - 9. Calculate the greatest common factor of j and i.
3
Suppose 9*t + 41 = -4. Let p be -42*6/(-9) + (-6 - t). Calculate the highest common factor of p and 459.
27
Let o(d) = 840*d - 5029. Let m be o(6). Let y be (-266)/(-1) - 6/3. Calculate the highest common factor of m and y.
11
Let s = -32796 + 32846. What is the highest common factor of 4850 and s?
50
Suppose 4*j - j = -3. Suppose 25 = 59*v - 54*v. Let a be 208/40 + j/v. Calculate the greatest common factor of a and 30.
5
Let u = -6794 - -32754. What is the greatest common factor of u and 708?
236
Suppose 6193 = 13*g - 216. What is the highest common factor of g and 51?
17
Suppose 3*k - 43 = -4*a, 3*k - 7*k = 2*a - 24. Let n(o) = 22*o + 10. Let h be n(5). Calculate the greatest common factor of h and a.
10
Suppose 627 = o + 17*v - 16*v, -585 = -o + 5*v. Calculate the greatest common divisor of o and 1023.
31
Suppose 0 = -5*r - 152 + 32. Let c be (r/(-36))/((-1)/(-3)). Let k(x) = -x**3 + 4*x**2 - 5*x + 4. Let n be k(c). What is the greatest common divisor of 6 and n?
2
Let t = 54 - 63. Let r(j) = 2*j**2 + 6*j + 8. Let i be r(t). Calculate the highest common divisor of 87 and i.
29
Let x = -2651 + 2697. Suppose 4*q = -q + 115. Calculate the greatest common factor of q and x.
23
Let g(r) = 59*r + 3189. Let k be g(-54). Calculate the greatest common divisor of k and 1851.
3
Suppose -13*s - 78 = -702. Suppose 2*f - 264 = -s. Calculate the greatest common factor of f and 24.
12
Let h be (2 - 2)/(3 + -1). Suppose 5*a = h, 2*a = -3*k - a + 360. What is the highest common divisor of 15 and k?
15
Suppose q = 4*q + n - 53, 0 = -5*q + 2*n + 92. Let u be 6604/1143 + (-4)/(-18). Let w be 2/3*(12 + u + -9). What is the highest common divisor of w and q?
6
Let p(n) be the second derivative of -25*n**3/6 - 26*n. Let y be p(5). Let w = -120 - y. Calculate the highest common factor of w and 2.
1
Suppose 6 = 191*q - 189*q. Let o = -48 - -52. Suppose 4*c = 4 + o. What is the greatest common factor of q and c?
1
Let y(b) = -30 + 14*b + 4*b - 8 - 7*b + 10. Let w be y(4). What is the greatest common factor of w and 12?
4
Let g(j) = 30*j - j**2 + 58 + 11*j + 3*j**2 - 58*j - j**2. Let n be g(13). What is the highest common divisor of n and 222?
6
Suppose -2*v + 4*v - 200 = 0. Let y = -6468 + 6508. Calculate the greatest common divisor of y and v.
20
Suppose 233*v + 1879 = 20519. What is the highest common divisor of v and 3140?
20
Let b(j) = j**3 + 41*j**2 + 41*j + 34. Let i be b(-40). Let v be i/(-22) - 1134/(-77). Calculate the highest common divisor of 30 and v.
15
Let t = -779 + 1187. Suppose 44*j - 57 - 2187 = 0. What is the highest common factor of j and t?
51
Let y(p) = 2*p**2 + 4*p - 12. Let a be y(2). Let g be a - 25/1*(-24)/15. Suppose g*m = 42*m + 176. What is the highest common divisor of m and 11?
11
Suppose -4*m = 8, 39*k + 9*m = 40*k - 84. What is the highest common factor of k and 54?
6
Let b(r) = -r**3 + r**2 + 121. Let l be b(0). Suppose -l = 4*v - 1. Let o = -7 - v. Calculate the highest common divisor of 207 and o.
23
Let d(u) = u**2 + 23*u - 8. Let i(r) = r**2 + 21*r - 9. Let q(f) = 5*d(f) - 6*i(f). Let h be q(-9). What is the highest common factor of 224 and h?
32
Suppose -4*c = 29 - 109. Let n be (-9994)/(-38) + 41 + -44. Calculate the highest common factor of c and n.
20
Let g(b) = 95*b**2 + 62*b + 213. Let o be g(-4). Calculate the highest common divisor of o and 55.
55
Let o = -32 - 109. Let p = -140 - o. Suppose -72 = -5*l - 17. Calculate the greatest common divisor of p and l.
1
Suppose -2*s = -4*x - 32, -3*x - 2*s = x + 48. Let b(j) = 2*j**3 + 26*j**2 + 22*j + 10. Let m be b(x). What is the greatest common divisor of m and 104?
26
Let t = -33 + 303. Let i be (t/(-24))/(6/80). Let x be ((-16)/(-10))/((-306)/i - 2). What is the highest common divisor of x and 16?
8
Let w = -43 - -112. Suppose 7087 = 10*y - 2713. Let d = y + -957. Calculate the highest common divisor of d and w.
23
Let h(c) = 2*c + 14*c - 15 - 4*c - 2*c - 7*c. Let l be 5*(-6)/((-4)/2). Let v be h(l). Calculate the greatest common factor of v and 15.
15
Let b be 843 - (15/24 - 1079/(-104)). Calculate the highest common factor of 338 and b.
26
Let n be 365/15 - (14/(-3) + 5). Suppose 0 = -5*x + w + 484, 2*x + 92 = 3*x + w. What is the highest common factor of x and n?
24
Let i(n) be the first derivative of -n**4/4 - n**3 + 4*n**2 - 6*n + 267. Let x be i(-5). What is the highest common divisor of x and 36?
4
Let s = 744 + -721. Suppose -2672 - 226 = -s*w. Calculate the highest common divisor of 28 and w.
14
Let i be (6 - (35 + -3))/(-1 - 1). Let a = 33 - i. Suppose -a = 4*t, 2*t = 5*y - 92 + 12. What is the highest common factor of y and 98?
14
Suppose 4*n = -z + 8*n - 274, -n - 557 = 2*z. Let q = z - -486. Calculate the greatest common divisor of 26 and q.
26
Suppose g = 4*b - 61, -4*g + 5*b - 211 = -0*g. Let z = 104 + g. Let y = z + -40. What is the greatest common divisor of 105 and y?
15
Let f(t) = -t**3 - 4*t**2 - 3*t - 5. Let c be f(-2). Let j be (48/(-18))/4*(1 + c). Suppose -j*w + 118 = -90. What is the highest common divisor of w and 13?
13
Suppose -5*c = -0*c - 165. Suppose -650*l + 787083 = 216*l + 537*l. Calculate the highest common factor of l and c.
33
Let h be 269 + (13 - 19 - (-9)/3 - -4). What is the greatest common factor of h and 72?
18
Let j(g) be the third derivative of -g**4/24 + 31*g**3/6 - 14*g**2 - 1. Let w be j(-20). Calculate the highest common factor of w and 459.
51
Suppose t - 4 = -0*t, 4*w - 8396 = -3*t. Suppose -1248 = -2*s - s - 2*r, 0 = -5*s + 2*r + w. What is the highest common divisor of s and 38?
38
Suppose 0 = -19*a - 104*a + a + 1952. Let x = 767 - 335. What is the greatest common factor of a and x?
16
Let n(s) = -77*s - 183. Let z be n(-9). Calculate the greatest common divisor of z and 1632.
102
Suppose 25*u - 159 = -28*u. Suppose -2*w = -4*x + 50, 9*x - 11*x + 13 = u*w. Suppose q - 8 - 36 = 0. Calculate the highest common divisor of x and q.
11
Let r be 10 - (2 + -2 + 1). Let w be 0 + 5*(2 - 1). Let f be 3/6*1*10/w. What is the highest common divisor of f and r?
1
Suppose 0 = -5*m - 953*r + 950*r + 24521, 2*r = 4*m - 19586. Calculate the highest common divisor of m and 100.
100
Let w(h) = -h**3 + 5*h**2 + 5*h - 7. Let g be w(5). Let c(x) = -x**3 + 11*x**2 + 17*x - 27. Let f be c(9). What is the highest common factor of g and f?
18
Suppose 0 = -2*u + 5*v, 4*u - 12 = 2*u - v. Let z be 150 + u/(-5)*4 + -2. What is the highest common factor of 18 and z?
18
Let d = -1383 - -1656. Calculate the greatest common divisor of 21 and d.
21
Suppose 9 = 5*u + 4*f, 3*f = -2*f + 5. Let k be u + -4 + 162/6 + 2. What is the highest common divisor of 39 and k?
13
Let c = -5295 + 6225. What is the greatest common factor of 45 and c?
15
Let p be 14*(-2)/(-1)*(-2)/(-7). What is the highest common divisor of p and 1880?
8
Let w = -47 - -72. Suppose 105 + w = 5*i. Suppose 4*r - 12 = 0, 5*r + 4 = 3*s - i. What is the highest common divisor of 165 and s?
15
Let c = 1392 + -1154. Calculate the greatest common divisor of c and 560.
14
Let d(i) be the first derivative of -i**4/4 - 19*i**3/3 - 12*i**2 + 12*i - 43. Let l be d(-18). What is the highest common divisor of 160 and l?
40
Suppose 3*d + 15 = 0, -4*o + 6*d = d - 49. Let p be 234/(-4)*o/(-3). Let t = 1084 - 1075. What is the greatest common divisor of p and t?
9
Let h be 4/14 - (-838)/7. Let b(i) = -285*i**2 - 2287*i - 31. Let c be b(-8). Calculate the greatest common factor of c and h.
5
Let c(d) = 903*d + 43. Let o be c(1). Calculate the highest common divisor of o and 22.
22
Let p(w) = 53*w**3 + 3*w**2 - 5*w + 1. Let a be p(1). What is the greatest common divisor of a and 1989?
13
Suppose -m - 20*l + 268 = -23*l, -3*m - l = -844. Suppose v - 100 = m. Calculate the highest common divisor of 20 and v.
