mon factor of l and 2321?
11
Suppose 0 = -4*x - 4*v + 4, 8 = 3*x - 2*v. Suppose -x*z = -5*w - 388, 5*z - w = 560 + 433. Let a = z - 119. What is the highest common divisor of a and 16?
16
Suppose 0 = 29*p - 35*p + 1440. Calculate the greatest common factor of 165 and p.
15
Let n be (-20)/8*2/(-1). Suppose 0 = 8*o - 3*o - 5*b + 25, -3*o = n*b + 7. Let f(d) = -d + 3. Let u be f(o). Calculate the highest common divisor of u and 14.
7
Let s be (9/(-12))/3 - (-105)/(-28). Let r(p) = -2*p**3 - 2*p**2 + 3. Let y be r(s). Calculate the highest common factor of 9 and y.
9
Let p be 6*(0 + (-2)/(-6)). Suppose p*n + 20 = 4*n. Let l = 123 - 93. What is the greatest common factor of l and n?
10
Suppose 3*m - 15 = 3*x, -4 - 1 = x + 4*m. Let t be 16/x*(-6 + 81)/(-3). Calculate the greatest common divisor of t and 10.
10
Let w(g) = -g**3 - 2*g**2 - 4*g - 7. Let u be w(-5). Suppose -4*r + 34 = 6*v - 8*v, -3*r + 28 = -v. Calculate the highest common factor of u and r.
11
Suppose 2*y + 510 = 2*c + 4*y, y = -3*c + 763. Suppose -4*k = -2*p + c, 0 = -4*p + 6*k - 9*k + 552. Calculate the greatest common factor of p and 90.
45
Let s be (8 + 8)/((-2)/(-11)). Suppose 3*o - 37 = -4. What is the highest common factor of s and o?
11
Let s = -574 - -1429. Suppose -4*o - 3*u + s = 0, 3*o = 6*o - u - 625. Calculate the greatest common factor of o and 42.
42
Let o = 57 - 31. Let q be 87/(-58)*2848/(-6). Suppose j - 8 = -3*j, 3*u - q = -5*j. What is the greatest common divisor of u and o?
26
Let l(k) = k**3 - 9*k**2 - 7*k - 11. Let q be (-6 + 7)/(1/10). Let f be l(q). What is the highest common factor of f and 19?
19
Let g = -19 - -6. Let l = g + 17. Let n be (6/30)/(1/5). Calculate the greatest common divisor of l and n.
1
Let g be (-17)/51 - (-50)/6. Suppose g*k = 12*k - 84. Calculate the highest common factor of k and 3.
3
Let d = -1080 - -1104. Calculate the highest common divisor of d and 8.
8
Suppose 13*w = 732 + 126. Let g be (-1)/(-4)*w*2/3. What is the greatest common divisor of 1 and g?
1
Let h(p) = p**2 - 2*p + 204. Let t be h(0). Calculate the highest common divisor of t and 12.
12
Let x be (-7)/(-4)*(-57 - -97). Calculate the greatest common divisor of x and 42.
14
Suppose 0*q = 4*q - 8. Suppose 0 = -0*w - q*w, 4*w = 4*u - 128. Let k be ((-6)/4)/(66/(-1408)). Calculate the greatest common factor of k and u.
32
Let s = -1603 + 1626. Let t(m) = -32*m**3 - 2*m**2 - 2*m + 1. Let r be t(-2). What is the greatest common factor of r and s?
23
Let y(n) = 298*n + 295. Let a be y(5). What is the highest common divisor of a and 85?
85
Let z = -16 - -64. Let l be (184/(-24) + 7)*12*-3. Calculate the highest common factor of z and l.
24
Let v = -27 + 52. Let l = v + -10. Let o = 16 - l. What is the highest common divisor of 3 and o?
1
Let s = 316 + -280. What is the greatest common divisor of 72 and s?
36
Let o = 378 - 266. Calculate the highest common divisor of o and 48.
16
Let b(t) = 5*t**3 - 2*t**2 - 2*t - 1. Let m be b(-1). Let f be 0*(-2 - m)/(-8) + 135. Calculate the highest common divisor of f and 15.
15
Let u(r) be the third derivative of r**4 + 2*r**3/3 - 33*r**2. Let f be u(2). What is the highest common factor of 13 and f?
13
Let g be (-80)/(-6) + (-22)/(-33). Calculate the greatest common divisor of 49 and g.
7
Let q(m) = 3*m - 17. Let n be q(7). Suppose 3*p - 53 = -n*z + 600, 5*p + 146 = z. Let d be (23/(-4))/((-1)/4). What is the greatest common factor of z and d?
23
Suppose 5*f + 0 = 330. Let z(h) = -h**2 + 53*h - 564. Let n be z(38). Calculate the highest common divisor of f and n.
6
Suppose -2*j - 25*h + 26 = -26*h, 5*j - 3*h = 65. Suppose -5*r - 5*n + 135 = 0, 0 = 5*r - 4*n + 59 - 185. What is the greatest common factor of j and r?
13
Suppose 4*n = -5*l + 25, -20 = 5*n - l - 3*l. Suppose n = -23*s + 21*s + 210. What is the highest common divisor of s and 70?
35
Suppose -d - w = 2*d - 490, -4*d + w = -644. Calculate the highest common factor of d and 6.
6
Suppose f - 62 = -5*m - 0*m, -4*f = -4*m + 64. Let y be -1 - (4/(-2) - -3). Let i be (y/5)/(3/(-195)). What is the highest common factor of i and m?
13
Suppose 25 = 6*z - 71. Let k = -66 - -28. Let n be 3 - (k + 0 + 1). What is the highest common factor of z and n?
8
Let w be 3/(-2)*(0 + (-320)/24). Suppose 3*v - 400 = 5*a, 4*a - 2 = -4*v + 574. What is the greatest common divisor of w and v?
20
Let m be 153/(-27)*-18 + -9. What is the greatest common factor of 403 and m?
31
Let r(q) = -11*q - 6. Let o be r(-2). What is the highest common divisor of 208 and o?
16
Let x be (-18)/(-5)*1*-5. Let r be ((-12)/x)/((-1)/(-18)). What is the greatest common factor of 24 and r?
12
Let x(h) = h**3 + 19*h**2 - 23*h - 15. Let o be x(-20). Calculate the greatest common factor of o and 495.
45
Let t = 12 - 5. Suppose -2*d + 41 = -2*v - 19, 0 = 5*d - 4*v - 155. What is the highest common divisor of d and t?
7
Let f be (-300)/30*(-24)/5. Let z be (2*-2)/(1/(-3)). Calculate the greatest common divisor of z and f.
12
Suppose -14*x - 50 = -834. What is the greatest common factor of 42 and x?
14
Let w be 4/(4 + 56/(-12)). Let y be w/33 + (-332)/(-11). Calculate the highest common divisor of y and 20.
10
Suppose -5*i + 720 = -2*i. Suppose i + 288 = 6*h. Calculate the highest common factor of 16 and h.
8
Let q(j) = -38*j**3 + 3*j**2 - 2*j - 3. Let a be q(-1). What is the greatest common divisor of 20 and a?
20
Let r be ((-3420)/24)/(14/(-8) - -1). What is the greatest common divisor of r and 80?
10
Suppose 3*m - 93 = -3. Suppose -390 = -5*d + 3*i, -3*i - 6 = 9. What is the highest common divisor of d and m?
15
Let t be -1*(-2 - (-5 + 3)). Suppose t*l = -3*l + 48. Let i = 29 - l. Calculate the greatest common divisor of i and 26.
13
Let i = -213 - -237. What is the highest common divisor of i and 8?
8
Let k be ((-80)/(-12))/5*15 - -2. Let l(z) = 7*z**2 + 4*z - 8. Let w be l(-6). What is the highest common factor of k and w?
22
Let i(f) = 57*f**2 - f + 9. Let s be i(-3). Suppose -15*p - s = -20*p. What is the greatest common factor of p and 21?
21
Suppose 3*s - 2*o = 2*s + 8, o + 1 = 2*s. Let z = s + 5. Suppose z*u + 4*p - 68 = 0, -3*u = -5*p - 21 - 56. Calculate the greatest common factor of u and 8.
8
Suppose 30*x - 5278 = x. What is the greatest common divisor of 130 and x?
26
Suppose -4*w + 44 = 24. Let p be ((-48)/10)/((-1)/w). Calculate the greatest common divisor of p and 120.
24
Let i = 1787 + -1702. What is the highest common factor of 55 and i?
5
Let y be (-2)/(-8) - (-6153)/12. Let l = y - 117. Calculate the greatest common divisor of l and 44.
44
Let u be -4 + (197 + 0/(-4) - 5). Calculate the highest common divisor of 470 and u.
94
Let c be 18/117*(16 + -3). Calculate the greatest common factor of c and 74.
2
Let r(p) = -p**3 - 3*p**2 + p + 25. Let x be r(-5). Suppose x + 117 = 17*l. Calculate the greatest common factor of 55 and l.
11
Let y = 13 - 4. Suppose y*o - 4*o = 90. What is the highest common divisor of o and 90?
18
Let w(j) = -2*j**3 + j**2 - 3*j - 2. Let l be w(3). Let y = l - -136. Let s = -7 + 17. What is the greatest common factor of s and y?
10
Let j = 314 + -287. Calculate the highest common factor of 459 and j.
27
Suppose 4*k = m - 3*m + 86, 3*k = 5*m + 45. Let v be (-404)/(-16) - 5 - 4/16. What is the greatest common factor of k and v?
20
Let z = 1335 + -1321. Suppose 0*s + 1014 = -5*s - 2*g, -194 = s - 4*g. Let b = -104 - s. What is the greatest common divisor of z and b?
14
Suppose 3*m = 4*m - 26. Suppose 0 = -17*d + 18*d. Suppose 2*c - 67 = -3*p, -3*c = -d*p - 2*p - 68. What is the highest common divisor of m and c?
26
Let h be 3/2 + (66/(-4))/3. Let t be -1*(h/18 + 43/(-9)). What is the greatest common factor of 40 and t?
5
Let o be (19 + 516/(-28))*7/(-2) - -65. Let y be ((-6)/(-4))/(-3)*-18. What is the highest common factor of y and o?
9
Suppose 0 = 5*a + 2*z - 183, 58*z + 182 = 5*a + 61*z. Calculate the greatest common factor of a and 2516.
37
Let k(r) = -r**2 - 5*r - 3. Let h be k(-4). Let a be h*-1*(13 - 16). Calculate the highest common divisor of a and 21.
3
Suppose 3*h + 5 = h + 5*m, -5*h + 3*m = -16. Suppose -h*a + 71 = 11. Calculate the greatest common factor of a and 132.
12
Suppose 793 = 8*u + 217. Calculate the greatest common divisor of 24 and u.
24
Let z(j) = 2*j**2 - 7*j - 21. 