. What is the greatest common factor of 1784 and x?
8
Suppose -7*h = 21*h - 4452. Suppose 11*m - 7*m = -8, -5*m = 4*i - 202. What is the greatest common factor of h and i?
53
Let n(d) = 4024*d**2 + 61*d + 2. Let u be n(1). Calculate the highest common factor of u and 61.
61
Let y be (15/20 - 150/(-24))/((-5)/(-140)). What is the greatest common divisor of 2912 and y?
28
Let s = -773 + 1328. Calculate the greatest common divisor of s and 255.
15
Suppose 368*z = 354*z + 5040. What is the highest common factor of z and 960?
120
Let i be (2 + -1)*(-215)/(-5). Let w be 2 - (-295 - (4 + 0)). What is the greatest common factor of i and w?
43
Let s be -6*(-18)/(-135) - 128518/(-10). Calculate the greatest common divisor of 71 and s.
71
Suppose -10 = 3*k - k, -50 = -5*o + 5*k. Suppose 2 = 3*m + o*g - 19, 14 = 2*m + 3*g. Let c be -1*0/1 + 1. Calculate the greatest common divisor of c and m.
1
Suppose 2*p - 2 = 0, -15*k + 4*p + 19871 = -12*k. What is the highest common factor of 125 and k?
125
Suppose -8*b + 160 = -0*b. Let f = -36 + b. Let v = 46 + f. What is the highest common factor of 45 and v?
15
Let k(h) = 46*h**2 - 81 - h**3 + 70 - 109 + 0*h**3 + 103*h. Let r be k(48). What is the greatest common factor of r and 8?
8
Let b(n) = n**2 - 8*n - 627. Let o be b(-22). What is the highest common factor of o and 3201?
33
Let p = -2788 - -5715. Suppose 3*j - 2*j - 961 = -2*v, -5*v = -3*j + p. Calculate the greatest common divisor of j and 57.
57
Let b be 475/9 - 8/(-36). Let w = 19024 - 18335. What is the greatest common divisor of b and w?
53
Suppose -7*u + 185 = -1131. Let d = u - 96. Calculate the highest common factor of d and 69.
23
Let y = -39 + 175. Suppose 0 = -2*w - 4*z + y, -4*w - 2*z + 302 = -0*w. Calculate the highest common divisor of w and 6.
6
Suppose 0 = -6*s - 18, 0*z - s + 101 = 2*z. What is the highest common factor of 1859 and z?
13
Let o = 88 - 94. Let m be (64/24)/(5/((-135)/o)). What is the highest common divisor of 162 and m?
6
Let k(t) = t - 4 + 3*t - 5*t. Let n be k(-6). Let m be 10 + (2 - 40/18) + 2356/558. What is the highest common divisor of m and n?
2
Let o be 0 - -14*6/12. Suppose f = -2*f - 6. Let s be 462/6 + (f - -2). Calculate the greatest common divisor of s and o.
7
Let o(v) = 3*v**2 - 29*v - 30. Let y be o(17). Suppose 0 = -13*n + y + 228. Suppose 0*k + 66 = k. Calculate the greatest common factor of k and n.
22
Suppose 2*b + h = -912, -2*b + 2265 = -7*b + 5*h. Let z = -452 - b. Calculate the highest common factor of z and 309.
3
Let n(u) = u**3 - 11*u**2 - 45*u - 6. Let l be n(-3). Calculate the highest common divisor of 62 and l.
1
Let y be (-2)/(-8) - 143/(-4). Let b = 108 + -129. Let q(l) = -7*l - 129. Let w be q(b). What is the highest common factor of y and w?
18
Let i(j) = 215*j - 1933. Let u be i(9). What is the highest common factor of 537 and u?
1
Suppose 624 = 37*k + 11*k. Let n = 0 - -3. Suppose n*a - 195 = -2*a. Calculate the greatest common divisor of a and k.
13
Let b(x) = -2*x**3 - 33*x**2 - 77*x - 49. Let l be b(-14). Suppose 0*c = 2*c - 490. What is the highest common divisor of l and c?
49
Let w be 9/(-1)*4/(-3). Suppose -3*c - 2*c + 20 = -5*a, -c + 3*a + 8 = 0. Let q be (-182)/(-15)*1 + c/(-15). What is the highest common divisor of q and w?
12
Let p(m) = m**2 - 5*m + 4. Let s be p(5). Let l = -1379 - -1381. Suppose -l*o - s*b - 2 - 2 = 0, 2*b = -3*o + 2. Calculate the highest common factor of 2 and o.
2
Let h(g) = 7*g**2 - 8 + 2*g**2 - 10*g**2 + 19*g. Let c be h(18). Suppose -78 + c = -4*x. Calculate the greatest common factor of x and 51.
17
Let a(n) = 141*n**2 - 16*n + 3. Let l be a(1). What is the highest common factor of l and 3456?
128
Let a = 8395 + -8095. Let j be (-2 + 22/5)*5. Calculate the greatest common factor of j and a.
12
Let y(s) = s**2 + 5*s. Let u be y(6). Suppose 23*m - 2*m - 2709 = 0. Suppose -16*o = 33 - m. Calculate the greatest common factor of o and u.
6
Suppose 7*a + 3*y = 8*a - 2515, 28 = -4*y. Calculate the highest common factor of a and 602.
86
Suppose -113*l = 44*l - 1150653. What is the greatest common factor of 42 and l?
21
Suppose -7*o + 8*o = 28. Let h be o*(-12)/(-16)*(2 - 1). Let u be (-2 - 2) + h - 1. Calculate the greatest common factor of 8 and u.
8
Suppose -2*p + 3*a - 2*a = -57, 4*a = -2*p + 82. Suppose -833 + 497 = 3*d. Let j = d - -236. Calculate the greatest common factor of j and p.
31
Let i = -13323 - -15501. Calculate the highest common divisor of i and 12.
6
Let m be (21/(-14))/((-9)/12). Suppose 2 = -v - 0*v, 664 = 4*g - m*v. Calculate the highest common factor of 30 and g.
15
Let i(v) = 239*v**3 - 2*v + 3. Let p be i(1). Let y be (54/15)/(9/p*1). What is the greatest common factor of y and 6?
6
Let h be (183 - -3)/(345/1150). Calculate the greatest common divisor of 1023 and h.
31
Suppose 15 + 10 = 5*p. Let v be 2 - (20/p + -39*1). What is the highest common divisor of v and 333?
37
Let p(f) = -98*f**2 + 10. Let r(v) = -588*v**2 + v + 57. Let y(z) = 34*p(z) - 6*r(z). Let q be y(-1). What is the greatest common factor of q and 75?
25
Let c(f) = -f**2 - f + 336. Let v be c(0). Let u be (-18)/24*(-78 + 1 + 1). Let b = -15 + u. Calculate the highest common factor of v and b.
42
Let h = 25975 + -25959. Calculate the greatest common factor of h and 1396.
4
Let d = -3 - -13. Let t be (-2)/d + (-55)/(-25) + -1. Suppose -4*b - t - 97 = -g, 0 = 2*g - 3*b - 211. What is the highest common divisor of g and 10?
10
Let z be (4/(-3))/((-300)/171225). Let g = -641 + z. Calculate the highest common factor of g and 5.
5
Suppose -13*y - 9041 + 43047 = -7672. Calculate the highest common divisor of y and 21.
7
Suppose 10 = -371*s + 369*s. Let o be (-18)/(-6) - -4 - s. Let j be -24*((-3)/(-2) - 2). Calculate the greatest common divisor of j and o.
12
Let d(s) = 4*s + 51. Let v be d(-8). Suppose 0 = 23*i - v*i - 192. Calculate the greatest common factor of 6 and i.
6
Let k = -1 - -7. Suppose -3*c = 3*i - 9, -4*c + i = -4*i - 39. Let a be c/3 + 1 + 2 + 1. What is the greatest common factor of k and a?
6
Suppose 204 = 3*p - 55*q + 60*q, 0 = -p + q + 60. Calculate the highest common factor of 7 and p.
7
Let p(b) = b**3 - 12*b**2 + 30*b - 21. Let i be -6*30/(-36) - (-4)/1. Let d be p(i). What is the highest common divisor of d and 22?
2
Let k be (-5 - -2 - -32)*1. Let x = -6819 - -6820. Calculate the greatest common factor of k and x.
1
Let g = 1007 - 892. Calculate the greatest common factor of g and 253.
23
Let g = -20940 - -20946. Let w = -13 - -67. Calculate the greatest common divisor of g and w.
6
Suppose 3*t + 2*q = 10, t - 3 = -4*q + 17. Let v(b) = -b**3 - b**2 - b + 82. Let u be v(t). Let f = u + -42. What is the highest common factor of 50 and f?
10
Suppose 1171 = 2*q - 5*f, -5*q + 2944 = 2*f + 2*f. Let m = 602 - q. Calculate the highest common divisor of m and 14.
14
Let h be (-166)/(-913) + -4*2154/(-44). Suppose 0 = -4*y + q + 219, 3*y + 2*q - h + 18 = 0. What is the highest common factor of y and 154?
14
Suppose 2*d = -0*d + 4*y + 104, -148 = -3*d - 2*y. Calculate the greatest common divisor of d and 690.
10
Suppose 45*y - 41*y = 32. Let z = -80 - -88. Calculate the greatest common factor of y and z.
8
Let a be 4 + (16 - 0) - (-4)/(-2). Suppose 12 = 6*g - a. Suppose f = -g*h + 54, 2*f - 60 = 4*h + 48. What is the greatest common divisor of 36 and f?
18
Let x(z) be the second derivative of 11*z**3/6 - 7*z**2/2 - z. Let y be x(2). Let p be (-12)/(-4)*430/y. What is the greatest common divisor of 129 and p?
43
Let l be 2/(3 - 7 - -5). Suppose 2*f - 934 = -l*f - 2*m, 3*f - m - 703 = 0. Calculate the highest common divisor of 26 and f.
26
Suppose 75 = -17*k + 6892. What is the greatest common divisor of k and 2?
1
Suppose 241*b - 402 = -5*n + 243*b, -316 = -4*n - 4*b. What is the greatest common divisor of 632 and n?
8
Let m be 51/(-6)*(1 + -3). Let y(z) = -2*z**2 + 36*z - 22. Let n be y(m). What is the highest common factor of 18 and n?
6
Let v be 1/2 + (-341)/2. Let d = -117 - v. Let o = -14 + d. What is the highest common divisor of 26 and o?
13
Let n = 130798 + -130797. Let o be 1 + 1 + 9 + -2. What is the highest common divisor of n and o?
1
Let f = 37 + -18. Let v be ((-7)/28)/((-140)/980 - (-2570)/18088). Calculate the greatest common factor of v and f.
