5*g + 5*g + s. Let i = 48 + g. Calculate the greatest common factor of i and 27.
9
Let o(p) = 11*p + 26. Let m be o(-11). Let q = m + 191. What is the highest common divisor of 3 and q?
3
Suppose -n + 11*h + 183 = 15*h, -5*n + 969 = 2*h. Suppose 0 = 8*b - 7*b - n. Calculate the highest common divisor of 15 and b.
15
Let o = 4 - 4. Suppose -3 = r + 2*z, 7*r - 6 = 8*r + 3*z. Suppose 3*n - 4*c - 38 = o, -5*c + 13 = 2*n + r. Calculate the highest common factor of n and 15.
5
Let t be (-120)/(-3) - -2 - -9. What is the highest common factor of t and 408?
51
Suppose -4*u + 155 = 5*z, -3*u = 14 + 1. Suppose -z = 2*y - 49. What is the greatest common divisor of y and 2?
1
Let o be (-306 - 0)*-1 - 0. Let u(y) = y**3 - 11*y**2 - 10*y + 164. Let k be u(11). What is the greatest common divisor of k and o?
18
Let l = 177 - 171. Let d(k) = -k**2 + 17*k + 1. Let r be d(14). Suppose -a - n + 6*n = 16, 2*a - r = -5*n. Calculate the highest common divisor of a and l.
3
Let b(w) = -w**3 - 14*w**2 + 2. Let s be b(-14). Suppose -70 = -5*i + f, -6 + 62 = 4*i - s*f. Let u = 16 - i. What is the highest common divisor of u and 5?
1
Suppose 0 = 24*n - 25*n + 177. Suppose -9 = 3*i - n. Suppose u - i = -u. What is the greatest common divisor of u and 252?
28
Let a be (6 - -6)/6 + 1. Suppose a = -s, -s = 2*r - 25 - 6. Calculate the highest common divisor of 17 and r.
17
Let l(d) = -2*d**3 + 12*d**2 + 21*d - 14. Let n be l(-5). Suppose n*u = 425*u + 1116. Calculate the greatest common divisor of u and 6.
6
Suppose 77 = g + 75*i - 74*i, g + 4*i = 92. Calculate the greatest common divisor of 8028 and g.
36
Let o be 1*(-531)/(-3) + (4 - 8). Let x = o + -151. Calculate the greatest common factor of x and 99.
11
Suppose -45*q = -29*q - 48. Let y be 45/9 - ((-84)/q - 2). What is the greatest common factor of 14 and y?
7
Let v be (8/28)/((-24)/(-1008)). Calculate the highest common factor of 9468 and v.
12
Let g = -12767 + 13039. Suppose -5*m + 16 = d, 3*d + 0*d - 48 = -4*m. What is the highest common divisor of g and d?
16
Let m = -207 - -260. Suppose 3*v - 265 = -2*v + 3*g, v - m = 2*g. Suppose -795 = -6*r + r. What is the greatest common factor of v and r?
53
Suppose -4 = -q, -4*a + 1600 = -5*q - 1416. Suppose a = 11*b + 55. What is the highest common divisor of 32 and b?
32
Let m(k) = -133*k + 2. Suppose -20 = -6*z - 2. Suppose c = -z + 2. Let n be m(c). What is the highest common divisor of 15 and n?
15
Let j = 480 - 157. Let p(b) be the third derivative of -17*b**4/24 - 253*b**3/6 - 67*b**2. Let g be p(-16). What is the highest common factor of j and g?
19
Let z be (4/24 - (-919)/30)/((-2)/(-40)). Calculate the greatest common divisor of 66 and z.
22
Let x = -10 - -20. Let n = -474 - -477. Suppose -3*m = -4*i + 9*i - 20, -5*i = -n*m + 40. What is the highest common factor of x and m?
10
Let x = 4596 + -4574. What is the highest common factor of 10538 and x?
22
Let j(p) = p**2 - 11*p + 12. Let o be j(10). Let n be ((-432)/(-64))/(o/(-8)). Let l = n + 60. Calculate the greatest common factor of l and 99.
33
Suppose 10*x - 14164 - 16086 = 59450. What is the highest common factor of 92 and x?
46
Let n(o) = -113*o + 10178. Let u be n(90). Let q(b) = -26*b. Let x be q(-4). Let r = x - 64. Calculate the highest common factor of r and u.
8
Let t(s) = 912*s + 6582. Let b be t(-7). Calculate the greatest common divisor of b and 2574.
198
Let x be (-1)/((-9)/3 + 4). Let s be (5/x - -5) + 2. What is the greatest common factor of s and 10?
2
Suppose 9*l = 30951 + 14598. What is the highest common factor of 21 and l?
21
Let f be (-2)/2*(42 + 3)/(-5). Let n = 892 + -880. Calculate the highest common factor of n and f.
3
Let a be 3383 - (0 - (-1 + 6 + -5)). What is the greatest common factor of a and 17?
17
Let z(s) = -586*s + 1176*s - 586*s - 16. Let a be z(13). Let o(b) = 58*b - 10. Let p be o(7). What is the greatest common divisor of a and p?
36
Let x(p) = 3*p**3 - 7*p**2 + 13*p + 1. Let y be x(6). Suppose 0*m - 5*m = -y. Suppose 105 = h + m. Calculate the highest common factor of 210 and h.
10
Let i = 662 - 255. Suppose 6*r - 139 = i. Calculate the highest common divisor of r and 26.
13
Let p(d) = 15*d**2 - 7*d - 30. Suppose -2*h + 14 = -26. Suppose 83*g + h = 78*g. Let w be p(g). Calculate the greatest common factor of 14 and w.
14
Suppose 0 = -3*k + z + 46, -k + 6*k = 2*z + 78. Calculate the highest common divisor of k and 875.
7
Let a be (2/(-6) + (-1106)/210)*(35 - 315). Calculate the greatest common divisor of 98 and a.
98
Suppose 3*s - 431 = v - 92, 952 = -3*v - 4*s. Let a = -75 - v. What is the highest common divisor of a and 166?
83
Let b = 43 - 43. Suppose -2*w + 5*v + 5 = b, 2*w = -4*v - 3 + 17. Suppose w*t - 42 - 48 = 0. What is the highest common factor of t and 54?
18
Let a be (35/(-5) + 7)*1. Suppose 11*o - 42 - 90 = a. Calculate the greatest common divisor of o and 444.
12
Suppose -213*c + 111962 = -179*c. What is the highest common factor of c and 37?
37
Suppose -108 = -39*q + 750. Let j = 153 + 265. Calculate the greatest common factor of q and j.
22
Let k = -1205 - -1369. Let j be (8/(-12))/(2/(-6)). Suppose 5*c + j*a + 43 = 6*c, 5*c + 3*a - 202 = 0. What is the highest common divisor of c and k?
41
Let b = -345 + 488. Suppose -4*c + b = -61. Calculate the greatest common factor of c and 102.
51
Let r = -11 - -16. Suppose 0 = 2*k - 3*h - 3, r*h = 2*k + h + 2. Suppose 257*w - 9039 = 213. Calculate the highest common divisor of w and k.
9
Let k be -1 + -17 + (-272941)/(-23). Calculate the highest common divisor of k and 41.
41
Let k(b) = -8*b - 3*b - 5*b + 22 + 2*b**2. Let m be k(10). Let v(t) = -3*t + 4. Let d be v(-9). What is the highest common divisor of d and m?
31
Let c be (-70784)/(-3712) + (-4)/58. What is the greatest common divisor of c and 1691?
19
Suppose -224 = x - 6*x + 3*i, -3*i + 6 = 0. Let p be x/(-4)*(-1620)/18. Calculate the highest common factor of 23 and p.
23
Let h = 32983 + -32915. What is the greatest common divisor of h and 8806?
34
Suppose 127*c - 266000 = -73*c. Calculate the greatest common factor of c and 210.
70
Let v = 19 - 24. Let s be 138 - (-8 - v)*8/12. Calculate the highest common divisor of s and 35.
35
Let j = 837 - 789. Let s(m) = 13*m**3 + 3*m**2 - 3*m + 2. Let g be s(2). What is the highest common divisor of g and j?
16
Suppose 0 = 100*t - 107*t - 147. Let g = 19 - t. What is the highest common factor of 56 and g?
8
Suppose -17 = -v + 3*y, 4*v - 268*y = -266*y + 38. Calculate the greatest common factor of 6728 and v.
8
Let n(y) = -18*y + 30*y + 3*y + 37 + 12. Let j be n(-3). What is the greatest common factor of 4 and j?
4
Suppose 11*f = 7*f - 2*i + 1744, 2180 = 5*f + 2*i. Suppose -4*p + 2*w = -440, -4*w = 4*p - 5*w - f. What is the greatest common factor of 459 and p?
27
Let p = 398 + -396. Suppose 21 = p*f - 149. Calculate the highest common factor of 68 and f.
17
Let z be -1 + 16 + (19 - (33 - 18)). Let x(g) = 4*g**2 + 3*g - 4. Let d be x(-7). What is the highest common factor of z and d?
19
Let d(o) = 111*o**2 + 12 - 120*o**2 + o**3 + 0*o**3. Let b be d(6). Let h = 103 + b. What is the greatest common divisor of h and 35?
7
Let h = -2 + 22. Suppose u + 13 = -5*n + 10*n, 4*n - h = -4*u. Suppose 3*r = 3 + n. Calculate the highest common factor of 20 and r.
2
Let k(o) = 2*o**2 + 3*o - 4. Let c be k(-3). Suppose -c*b - 2*j = -2781, 3*j - 6 = 6*j. Let l = b + -270. Calculate the greatest common factor of 41 and l.
41
Suppose 12*a = 15*a - 702. Let k = -120 + a. Let x = -555 + 631. What is the greatest common factor of x and k?
38
Let y be (-265)/3*(-466)/35 - (-22)/(-231). Calculate the greatest common factor of 3 and y.
3
Suppose 15*x = 19*x - 4. Let h = -771 + 787. What is the greatest common factor of h and x?
1
Let q = 463 + -459. Suppose 3*z = 2*z + 2*i + 18, i + 72 = q*z. Calculate the highest common divisor of 6 and z.
6
Suppose 2*m = 79 + 267. Let n = 19 + m. What is the highest common factor of n and 24?
24
Suppose -3*s + 590 = 2*b, 3*b = 3*s - 168 - 432. Calculate the highest common divisor of 6 and s.
6
Let n(j) be the third derivative of j**5/30 + 20*j**3/3 + 2*j**2 - 2*j. Let h be n(-6). Suppose 112 = 7*x - 3*x. What is the greatest common divisor of h and x?
28
Suppose 44*w = 43*w - 6, 0 = -5*z + 2*w + 179852. 