 highest common factor of s and f?
13
Let r = 15402 - 8234. What is the highest common factor of 280 and r?
56
Let b(p) = 36. Let q(u) = u + 1. Let o(h) = -b(h) - 5*q(h). Let d be o(-10). What is the greatest common divisor of 171 and d?
9
Let u = 74 - 549. Let p = -363 - u. Calculate the highest common divisor of 392 and p.
56
Suppose -3*d + 1692 - 96 = 0. Suppose -62 = -9*q + d. What is the greatest common divisor of 165 and q?
33
Suppose -3*z = -4*n + 274, n - 4*z - 101 = -26. Let a = 155 - n. Let g = a + -23. What is the highest common factor of 13 and g?
13
Suppose -7249 = -5*s - 4*y + 7876, -12100 = -4*s - y. Calculate the highest common divisor of s and 242.
121
Suppose 2*r + 3*d - 1161 = -0*r, -r - d = -579. Calculate the highest common factor of r and 128.
64
Suppose -k + 132 = 5*b, 5*b + 114 = 9*b - 2*k. Suppose -3*l + b = 3. Calculate the highest common factor of 40 and l.
8
Suppose 0 = 51*x - 55*x + 32. Suppose 2*d + 2*v - 752 = -2*v, -2*d + 2*v + 776 = 0. Suppose 2*p = -p + d. What is the highest common factor of x and p?
8
Suppose n - f - 28 = 9, 0 = -3*n - f + 127. Suppose 6*p - 107 = -n. Suppose 4*l - 17 = p. Calculate the highest common factor of l and 77.
7
Let a(i) = -i**3 - 5*i**2 + 3*i - 16. Let x be a(-6). Suppose -2*h = 3*s - 45, -x*s + 10 = -h + 50. Calculate the greatest common factor of 45 and h.
15
Suppose -47*c = -2774 - 5686. Let f be 19 - (1 + 2)/(-3). Calculate the highest common divisor of f and c.
20
Let u(o) = o**3 - 3*o**2 - 5*o - 10. Let n be u(4). Let q be ((-4)/14 - 312/n) + 2. Calculate the greatest common divisor of 88 and q.
8
Let m(w) = 6*w + 70. Let c(b) = -7*b - 71. Let g(r) = 5*c(r) + 4*m(r). Let h be g(-12). Calculate the greatest common factor of h and 9.
3
Let o(b) = 15 - 11 - 55 + 8 - 18*b - 92. Let r be o(-8). Calculate the greatest common factor of 108 and r.
9
Let w be (-5)/10 + 7/14. Let n be w/6 - (-4 + -36). Calculate the greatest common divisor of 10 and n.
10
Let w be -1 + 2/((-10)/(-775)). Calculate the greatest common factor of w and 198.
22
Let c(z) = 4*z**2 - 3*z - 3. Let k be c(-1). Suppose 284 = k*n + 2*y, n - y - 73 = -2*y. Suppose 4*d - n + 9 = 0. What is the highest common factor of 15 and d?
15
Suppose 525*l - 527*l = -462. Let f = l - 147. What is the greatest common divisor of 12 and f?
12
Let d(x) be the first derivative of -7*x**2/2 + x - 42. Let k be d(0). Let w be 0/k + (4 - -1)*12. Calculate the highest common factor of 40 and w.
20
Let n = 2273 - 88. Calculate the highest common factor of 19 and n.
19
Suppose 3892 = 43*i - 881. Suppose -115 = 31*u - 26*u. Let r = 60 + u. What is the highest common divisor of i and r?
37
Let i(x) = 263*x**3 + 7*x**2 - 3*x - 1. Let a be i(1). Calculate the highest common divisor of 126 and a.
14
Let j(k) = k**3 + 4*k**2 - 12*k + 8. Let a be j(4). Suppose 63*b = 67*b - a. Calculate the highest common factor of b and 550.
22
Let q be (-1 - 560/15 - -4)/((-26)/234). What is the greatest common divisor of q and 4120?
103
Suppose -10*u + 709 = -4*t - 13*u, 4*t = -5*u - 707. Let s = -108 - t. Calculate the greatest common divisor of 10 and s.
10
Suppose 5*k - 36*p - 177 = -32*p, 162 = 5*k + p. Let d be (4 - 9) + -1 + 765. Calculate the highest common factor of k and d.
33
Let h be (-3 - 1) + (-1757)/(-7). Let w = h - 197. Calculate the highest common divisor of w and 90.
10
Suppose -4*b + 1098 = -b + 5*f, -4*f - 754 = -2*b. Suppose -3*r + 3*a + 400 + b = 0, 3*r - a = 769. What is the greatest common divisor of 32 and r?
32
Let j = -444 + 440. Let i be (16/28)/(j/(-112)). What is the greatest common factor of 304 and i?
16
Let b = -338 + 730. What is the highest common factor of b and 1078?
98
Let y(q) = -41*q - 61. Let v be y(-24). Suppose v = 57*p - 56*p. Calculate the greatest common factor of 71 and p.
71
Let c be (-6392)/(-153) + ((-6)/(-27) - 0). Suppose c*n - 38*n - 54 = -d, 4*n + 136 = 4*d. Calculate the greatest common divisor of 247 and d.
19
Suppose -14*a - 8622 + 10812 = -9780. What is the greatest common divisor of a and 3195?
45
Suppose 0 = -11*r - 3521 + 17755. Suppose -4*k + r = 54. What is the greatest common factor of k and 31?
31
Let o be (-176)/(-7)*224/64. What is the highest common factor of o and 1628?
44
Let k(q) = -q**2 - 473*q - 20524. Let n be k(-49). What is the highest common divisor of n and 2820?
12
Suppose 4*o + 10 - 66 = -2*k, 16 = 4*k. Suppose -o*j + 20 = -7*j. Let q(s) = 6*s**2 - 4*s. Let g be q(j). Calculate the greatest common divisor of g and 32.
16
Let f = 24 - 22. Suppose 116 = 4*h - 5*z, 29 = h - z + f*z. Suppose 5*o - 28 = -x, -o = 3*x + 3*o - h. Calculate the highest common factor of 1 and x.
1
Let w(q) = 5*q**3 - 2*q**2 - 4*q - 5. Let m be w(-3). Let y be -8 - -5 - m/(-2). Let u = -71 - y. Calculate the highest common divisor of u and 5.
5
Suppose -3*k + 24 + 12 = 0. Suppose 115 + 11 = 14*g. What is the greatest common factor of k and g?
3
Let v(g) = 1424*g + 8705. Let u be v(-6). What is the highest common factor of u and 3450?
23
Let w = 11299 + -11179. Calculate the greatest common divisor of 8220 and w.
60
Suppose -5*h - 4*b = -2 + 9, -11 = h + 4*b. Let z(y) = 61*y - 154. Let s be z(8). Let l = 341 - s. Calculate the greatest common factor of h and l.
1
Suppose 8*z - 2*p = 1404, 61*p = z + 57*p - 168. Suppose -3*i + 233 = 68. Calculate the greatest common factor of z and i.
11
Let v = -2 - -6. Suppose -3*h = -5*b + 12*h, -h = b - 12. Calculate the highest common divisor of v and b.
1
Suppose -4*u - 1523 = 5*w + 1076, -u - 661 = 5*w. Let v = u + 998. What is the greatest common divisor of 11 and v?
11
Let t = 833 - 805. Let p be ((-354)/(-30) - 9)/(3/315). Calculate the greatest common divisor of p and t.
14
Let p be 2*1 + 8/(-16)*-8. Let x be (2 + p/(-3))/(-2). Suppose -j + 3*i - 7 = x, 0 = 5*j - 5*i + 3*i - 4. Calculate the highest common factor of 2 and j.
2
Suppose -4*g = 3*o - 104, 94*g - 92*g = 7*o - 186. Let y be ((-18)/(-4))/(1/56). Calculate the highest common divisor of o and y.
28
Let s = 569 + -353. Suppose -s = -g - g. Calculate the highest common divisor of 135 and g.
27
Let l(c) = c**2 + 2*c + 3. Let z be l(-5). Let s be (-59 - -62)/((-6)/(-4)). Suppose 23 = s*o + 11. Calculate the highest common factor of o and z.
6
Suppose -5*v = -469 + 104. Let z = 73 - v. Suppose -9*i + 24 + 30 = z. Calculate the greatest common factor of i and 66.
6
Suppose w + 285 = 5*v, 2*v - w - 127 = 2*w. Let z = -344 + 352. Calculate the highest common divisor of z and v.
8
Suppose -585 = -18*h + 4239. What is the highest common divisor of h and 1541?
67
Suppose 21 = 12*o - 15. Let r be -1 - -6 - (1 - 82)/o. What is the highest common factor of 208 and r?
16
Suppose 17 = -z + 78. Let d = -51933 - -52421. What is the highest common factor of z and d?
61
Suppose 70*d = 75*d + 315. Let a be (176/14)/((234/d)/(-13)). What is the highest common divisor of a and 572?
44
Suppose 2*r = 3*b - 1391 + 402, 0 = -5*r - 3*b - 2504. Let t = r + 506. Suppose -35 = -3*u - 2*u. What is the highest common divisor of u and t?
7
Let n be (-832)/117 + 6 - 11505/(-27). What is the highest common divisor of n and 1375?
25
Suppose 35*z - 173110 = 13020. What is the greatest common divisor of 2 and z?
2
Let z = 803 - 748. Let d(q) = 13*q + 36. Let v be d(4). Calculate the greatest common divisor of v and z.
11
Let w(x) = x**2 + 11. Let n be ((-2)/(-1) - 1)*0. Let y be w(n). Suppose -153*p - 183*p - 3*p + 7458 = 0. What is the highest common factor of y and p?
11
Let w(g) be the second derivative of -g**5/20 - 5*g**4/6 - 8*g**3/3 - g**2/2 - 10*g. Let y be w(-11). What is the highest common divisor of y and 74?
74
Suppose 2*p = -2*r + 2, -p = -3*r + 4*p - 13. Let w be (-1 - r)/((-12)/4). Let x be 3 - 1*(1 + w/4). Calculate the greatest common divisor of 22 and x.
2
Suppose -21*h - 9843 + 10442 = -15529. What is the highest common divisor of h and 48?
48
Let d(j) = 10*j**2 + 154*j + 123. Let x be d(-15). Calculate the greatest common divisor of 770 and x.
7
Let x(y) = -4*y**3 - 86*y**2 + 70*y + 617. Let i be x(-22). Let j be 8/(-4) + (48 - 1). What is the highest common factor of j and i?
45
Let v = 234 - 231. Let l be ((-40940)/(-267))/(2/v). What is the highest common factor of 138 and l?
46
Let q(o) = -2*o + 76. Let b be q(13). 