t common divisor of 423 and z?
47
Let b(l) = 528*l**3 + l**2 - l - 1. Let o be b(1). Suppose -7*g + 2588 + o = 0. Calculate the greatest common factor of g and 5.
5
Let n(a) = 5*a + 23. Let w be n(5). Suppose 2*m + 98 = 3*y, -2*y + 104 = -3*m + 47. What is the highest common factor of w and y?
12
Let b be ((-5)/(-3))/((-1)/(-51)). Suppose 2*h = 291 + 117. Let v be 3/2*h/18. What is the greatest common factor of b and v?
17
Suppose 0 = r + f + 4*f - 14, 44 = 5*r - f. Suppose -2*o = j - 13, o - 11 = 2*j + 3. Suppose 17 = -o*p + r*p. What is the highest common divisor of 17 and p?
17
Suppose 10*t - 15*t = -j + 219, 4*j - t - 1047 = 0. Calculate the highest common factor of 1500 and j.
12
Suppose 74*k - 3*y = 75*k - 335, 0 = -2*k - 5*y + 671. What is the highest common divisor of k and 18?
2
Let y = -269 - -303. Suppose 3*v = y + 14. Let r(o) = o**2 - o + 2. Let w be r(0). What is the highest common factor of v and w?
2
Let f = 512 - 442. What is the greatest common divisor of 546 and f?
14
Let f be 24/(-48) - 30*(-5 - 52/(-16)). Calculate the highest common factor of 4927 and f.
13
Let y = -6409 - -6883. Calculate the highest common factor of 18 and y.
6
Let h(q) = q**3 + 14*q**2 - 28*q - 2. Let w be h(12). Calculate the highest common divisor of 39 and w.
13
Suppose -27*k - 75 = -86 - 205. Calculate the greatest common divisor of k and 856.
8
Suppose 186*d + 18*d - 2415000 = -296*d. What is the greatest common divisor of 35 and d?
35
Let p be ((-148)/3)/(22/(-2574)). Calculate the greatest common factor of 546 and p.
78
Suppose 0*v - v + 5*m + 290 = 0, -8 = -2*m. Suppose -805*b + 754*b = -6324. Calculate the greatest common factor of b and v.
62
Let q(c) = -100*c**3 - c - 1. Let l be q(-1). Let m = 120 + 11. Let i = m + -111. Calculate the greatest common divisor of i and l.
20
Let t be (-3)/(-11) - (-124362)/1386. Calculate the greatest common factor of t and 306.
18
Let l(v) = -v**3 - 4*v**2 + 5*v + 4. Let p be l(-5). Suppose 72 = 4*w + 54*q - 50*q, 2*q = 4*w - 48. What is the highest common divisor of w and p?
2
Let j(k) = k**3 - 14*k**2 - 30*k - 13. Let f be j(16). Suppose 0 = -o - 2*n + 3*n + 172, 0 = 2*o + 4*n - 338. What is the greatest common factor of f and o?
19
Suppose -12*t + 46 = -74. Let v be 2644/t + (-20)/50. Calculate the greatest common factor of 24 and v.
24
Suppose -y = -5*p + 34, p + 0*p = -4*y + 11. Suppose 2*x + 2340 = p*x. Suppose -9*g = 9 - x. Calculate the greatest common factor of g and 17.
17
Let x(u) = 31*u**2 + 123*u - 21. Let g be x(-5). Calculate the highest common divisor of 3 and g.
1
Let h be 2/6 + 177/9. Let u = -296 + 321. Suppose -d = u*d - 104. Calculate the greatest common factor of h and d.
4
Suppose 0 = 142*g - 141*g - 87. Calculate the greatest common divisor of 696 and g.
87
Let j(f) = -1113*f**3 - 7*f**2 + 8*f + 39. Let d be j(-2). Calculate the greatest common divisor of 11 and d.
11
Let n = -123 - -232. Suppose -331 = -11*p + n. What is the greatest common factor of 24 and p?
8
Let r be (-26)/(-2) - 3*(-2 - -3). Let y be (232/(-10))/((-2)/r). Suppose 5*g - y = 44. What is the highest common divisor of g and 4?
4
Let t(h) = 155*h + 2162. Let l be t(0). What is the highest common divisor of 282 and l?
94
Let l(a) = a**2 + 10*a + 7. Let z be l(-11). Suppose -5*h + 32 = -z. Let q be 45 + -5 + (3 - 3). Calculate the highest common divisor of q and h.
10
Suppose -s - 1071 = -4*s. Let l = s - 340. Let n(m) = -m + 187. Let b be n(0). Calculate the highest common divisor of l and b.
17
Let z(h) = -h**2 - 6 + 7*h + h**3 - 2 - 2*h**2. Let s be z(3). Calculate the greatest common divisor of 104 and s.
13
Let x(v) = 19*v**3 - 161*v**2 + 46*v + 44. Let t be x(12). What is the highest common factor of 52 and t?
52
Suppose -4*t + 89*u - 94*u = -614, 464 = 3*t + 2*u. What is the highest common factor of 480 and t?
12
Let f(k) = -k**3 + 24*k**2 - 86*k + 11. Let i be f(5). What is the highest common factor of 1656 and i?
8
Suppose 0 = -5*z - 5*m + 2*m + 13, z = m + 1. Suppose z*v - 3 = 3. Suppose w - 4*f = 132, -f - v*f + 92 = w. Calculate the greatest common divisor of w and 16.
16
Let j(h) = 365*h**3 + h**2 + 2*h - 9. Let v be j(2). Let x be v/45 - ((-103)/(-15) - 7). What is the greatest common factor of x and 65?
65
Let n(v) = 13*v - 7. Let t be n(19). Suppose 13*o - t = 7*o. Suppose -5*q + o = 5*f, 3*q + 2*f - 23 - 3 = 0. Calculate the greatest common divisor of 4 and q.
2
Let z(k) = -2*k**2 - 15*k + 2. Let a(r) = -3*r**2 - 15*r + 2. Let s(d) = -3*a(d) + 4*z(d). Let g be s(-6). Calculate the greatest common factor of 24 and g.
8
Let x = -25320 + 25328. What is the greatest common factor of x and 1384?
8
Let a be (7 - (-8 + 14))*(1 + 93). What is the highest common factor of 118 and a?
2
Suppose 0 = -5*r + 4*b + 19853, 4276 = 3*r + 4*b - 7591. Calculate the greatest common factor of r and 65.
65
Suppose -2*z = 2*s - 606, -10*z = 2*s - 6*z - 600. Let o = -42 - -59. Calculate the highest common factor of o and s.
17
Suppose 3*o = -5*m + 606, 43*o + 3*m - 210 = 42*o. Calculate the greatest common divisor of 114 and o.
6
Let m be 4/(-1) + (8 - 1). Let y be (((-4)/m)/((-4)/12))/(-1). Let v(w) = w**2 - 4*w - 4. Let h be v(y). What is the greatest common factor of 35 and h?
7
Suppose 5*h - 192 - 288 = 0. Let w = -296 + 302. Calculate the greatest common divisor of h and w.
6
Let g(r) = -3*r + 33. Let d be g(3). Let w be (((-255)/(-68))/(1/(-48)))/(-1). What is the highest common divisor of d and w?
12
Suppose -6*n + 174 = 48. What is the highest common divisor of 168 and n?
21
Suppose -5*c + 1431 = 3*m, -2*c + 2*m + 851 = c. Suppose 4 = -v, 0 = 2*s + s - 2*v - 53. What is the highest common factor of s and c?
15
Let z(n) = -n**3 - 28*n**2 - 52*n + 47. Let l be z(-26). Let x be (-2 + l)/(5/(-45)*-3). Calculate the highest common factor of 15 and x.
15
Let h be (-144)/(-120)*(-365)/(-3). Let a(v) = v - 4. Let b be a(6). What is the greatest common divisor of b and h?
2
Let j(b) = b**3 + 18*b**2 + 30*b - 26. Let w be j(-16). Let f = w - -24. What is the greatest common divisor of f and 210?
30
Suppose 39*j - 34*j = 334 + 2891. What is the greatest common divisor of j and 120?
15
Suppose 8*y = 11*y - 24, -l - 5*y + 3491 = 0. Calculate the highest common factor of l and 1015.
203
Let p(m) = m**2 + m - 90. Let f be p(-10). Suppose f = -4*s + 557 + 843. Calculate the highest common divisor of s and 25.
25
Let u(a) = 95*a**3 + 4*a**2 + 21*a - 26. Let p be u(1). What is the greatest common divisor of p and 1739?
47
Let t(u) = -3*u + 23. Let i be t(6). Suppose -5*x + 111 = o + 12, -3*o = -i*x + 103. What is the greatest common factor of 20 and x?
20
Suppose 5*c - 5*v = -920, 10 = 2*v - 4*v. Let h = -187 - c. Calculate the greatest common divisor of h and 48.
2
Let g = -35 + -15. Let w be (0 + (-6)/3)*g. Suppose -467 - 1064 = -43*i + 189. Calculate the greatest common factor of w and i.
20
Let p be 25 + (-5 - 12) + (2 + -4 - 4). Suppose -15 = -7*v + 4*v. Calculate the greatest common factor of p and v.
1
Let n(g) = g**3 + 9*g**2 - 12*g - 7. Suppose -4*w - 180 = a + 35, -2*a - 45 = w. Let o = 50 + w. Let q be n(o). Calculate the highest common divisor of q and 9.
9
Let l(i) = 45*i**3 + 8*i**2 - 9*i + 1. Let s be l(1). Let w be (-242)/(-3) - (-3)/(s/(-10)). Calculate the greatest common divisor of w and 40.
40
Suppose i - 1 = -0. Let q be (-105)/(-12) + i/4. Suppose -3*o = -4*l - 19 - 70, 4*o = -5*l + 98. Calculate the greatest common factor of q and o.
9
Suppose -o + 5*p = -132, -179 = -4*o + 5*p + 394. Let n be 1*190 + 1 + (39 - 34). Calculate the highest common factor of n and o.
49
Let m(o) = 1134*o + 4788. Let t be m(-4). What is the greatest common divisor of t and 616?
28
Let l(r) = -r**2 + 9*r + 29. Let t(j) = j**3 - 6*j**2 - j + 8. Let m be t(0). Let v be l(m). Calculate the greatest common factor of 518 and v.
37
Let k(y) = 2*y**3 + 9*y**2 + 20*y + 10. Let t be k(-6). Let o = t + 235. Calculate the highest common factor of o and 1292.
17
Let x be (-87)/(-2) - (108/24)/(-9) - -1. What is the greatest common divisor of x and 4815?
45
Suppose -5*s = u + 1310, u - 5*u = -4*s - 1048. Let j = 294 + s. Calculate the highest common factor of 416 and j.
32
Let d(b) = -8*b**3 + 2*b**2 - 4*b - 3. Let s = -23 + 29. Let w be d(s). 