 13?
False
Let y = 231 + -99. Let p be y/28 + 8/28. Suppose -p*l + 595 = 2*l. Is 34 a factor of l?
False
Suppose z - 40 = -4*z. Is 22 a factor of 243 + (z/(-6) - 12/(-36))?
True
Suppose -2*i - 200 = -206. Suppose i*u + 132 = t, 3*t - 2*u - 381 = 2*u. Is 41 a factor of t?
True
Suppose 0 = 4*w + 2 + 6. Let o be (-3)/(-3)*2 + w. Suppose -4*g + o*g = -52. Does 13 divide g?
True
Let c = 61 - -18. Let m = 139 - c. Does 10 divide ((-4)/3)/((-8)/m)?
True
Let t(g) = -g**3 - 14*g**2 - 14*g - 8. Let f be 1 - (3 + (11 - 0)). Is t(f) a multiple of 5?
True
Suppose 0 = -4*r + 3*j + 3091, -3*r + 3*j = -r - 1553. Suppose -5*b - 3854 = -2*y, b + y + r = 2*y. Does 16 divide 14/(-77) - b/11?
False
Let b = 609 + -158. Does 18 divide b?
False
Let p = 24 - 22. Suppose o - 2*x = p, o - x = -0*x + 6. Is o a multiple of 6?
False
Suppose -5*o = -210 - 15. Does 2 divide o?
False
Let k = -231 - -1001. Is k a multiple of 70?
True
Let j(x) = 15*x**2 + 2*x - 1. Let v be j(1). Suppose -4*g + v = -3*g. Let c = g - 12. Does 4 divide c?
True
Let q(f) = -f**3 + 18*f**2 - 20*f - 7. Let c be q(17). Let b = 129 + c. Is b a multiple of 26?
False
Suppose -v + 2*k = 7*k - 6580, 3*v - 19740 = 5*k. Does 22 divide v?
False
Suppose -3*y + 5*i = -8*y + 3115, 0 = -5*y - i + 3119. Is y a multiple of 24?
True
Let d be -15*(-9)/(135/(-6)). Let r(y) = -y**2 - 10*y - 12. Is 12 a factor of r(d)?
True
Suppose 744 = 3*r + 3*r. Is r a multiple of 11?
False
Let x(z) = 144*z**2 - 4*z - 3. Let p be x(-3). Suppose 1503 = 9*n - p. Does 23 divide n?
False
Let i = 97 + 338. Does 9 divide i?
False
Let v = 13 - 9. Suppose 4*w - 12 + 88 = 0. Is 6 a factor of (-7 - w)/(2/v)?
True
Let f be ((-1)/(-2))/(3/24). Suppose -4*p - 5*j - 60 = 10, 0 = -4*p + f*j - 52. Does 13 divide (-381)/p - 9/(-15)?
True
Let c be (-14781)/(-13) + (0 - -1)*-1. Suppose 0 = 6*l - c + 236. Is 10 a factor of l?
True
Let s(x) = x**3 + 8*x**2 + 15*x + 2. Let l be s(-7). Let w = 42 - l. Is w a multiple of 24?
True
Suppose -19*r + 292 = -15*r. Does 4 divide r?
False
Let v(s) = -3*s**3 + s**2 - 4*s - 5. Let p be v(-2). Let l = p + -26. Suppose l*q + 96 - 416 = 0. Does 16 divide q?
True
Let k be 8/(-2 + (-144)/(-74)). Does 9 divide (9/(-6))/(6/k)?
False
Let r(x) = -x - 17. Let f(u) = -u - 16. Let w(y) = -5*f(y) + 4*r(y). Let k be w(-11). Does 21 divide 1 - (77/k)/(-1)?
False
Let n(f) = 2*f**3 - 6*f**2 + 15*f - 49. Is 7 a factor of n(5)?
True
Is 60 a factor of ((-1028)/10)/(3/(-15))?
False
Let h(r) be the first derivative of r**4/4 - 2*r**3 - 4*r**2 - 3*r + 1. Let t be h(7). Let g(y) = -y + 11. Is 7 a factor of g(t)?
True
Suppose 0 = -5*z - 3*d + 3, -2*z + 0*z = d - 2. Suppose -2*i = -5*y + 12, z*y = -4*i - y - 24. Let u(f) = f**2 + f - 4. Is 26 a factor of u(i)?
True
Does 22 divide (-51086)/(-133) - (2 + (-144)/76)?
False
Let f(n) = -2*n + 2*n**2 - n**2 + 3 + n. Suppose -5*j + 2*j - 3 = -3*a, -5 = 4*a + 5*j. Does 2 divide f(a)?
False
Suppose 2*d - 288 = -2*d. Let l be (-1 + (-1)/(-3))/((-10)/(-630)). Let a = d + l. Is a a multiple of 23?
False
Suppose 3*x - 347 = -35. Suppose -3*l - x = -3*p - 329, -4*p = -2*l + 142. Suppose -5*v = 2*n - 61, 4*v - 5*v = -2*n + l. Is 19 a factor of n?
True
Let j be 1/((-4)/(-3) + -1). Suppose 662 = j*n - 4. Is n a multiple of 37?
True
Is (-58038)/(-476) - (-1)/14 even?
True
Let i = 36 - 25. Suppose 2952 = i*o + 7*o. Is 18 a factor of o?
False
Let d(y) be the third derivative of -7*y**4/24 + 34*y**3/3 + 29*y**2. Does 11 divide d(-28)?
True
Let g(u) = -10*u**3 + 7*u**2 + 11*u - 11. Let b(q) = -9*q**3 + 6*q**2 + 10*q - 10. Let j(k) = -7*b(k) + 6*g(k). Is j(2) a multiple of 4?
True
Suppose -4*o = 43 - 231. Let y = 22 + o. Is y a multiple of 23?
True
Let m(u) = 9*u**3 - 2*u - 1. Let n be m(-1). Let v(h) = -7*h**2 - 3*h**3 + 12 + 2*h**3 - 4 + 8*h. Is v(n) a multiple of 3?
False
Let k(a) = -63*a + 57. Is k(-4) a multiple of 3?
True
Is 9/(-21) + (-5166)/(-49) a multiple of 5?
True
Suppose -594 = -5*t + 176. Is 5 a factor of t?
False
Let g(a) = 26*a + 400. Does 4 divide g(10)?
True
Suppose 0 = w - 1 - 4, -3*j + 4040 = -2*w. Does 45 divide j?
True
Let n be 6/(-4)*(-28 + -8). Let x = -35 + n. Is x a multiple of 7?
False
Let o(q) = -q**3 - q**2 + 4. Let n be o(0). Suppose -n*h + 6 = -6. Is (-1)/3 - (-193)/h a multiple of 16?
True
Let r(t) = -1521*t**3 - t**2 + 7*t + 7. Is r(-1) a multiple of 38?
True
Let w = 9 - 5. Suppose 2*v + 120 = 3*s - 30, 5*s + w*v - 228 = 0. Is 10 a factor of s?
False
Let y = 61 - 56. Suppose -15 = -5*v, g + 2 = -y*v + 27. Does 10 divide g?
True
Let g = 1109 + -140. Is g a multiple of 17?
True
Let z = -11 + 11. Suppose -5*i - 5*g + 405 = z, -2*i + g + g = -166. Suppose i = d + 19. Is 21 a factor of d?
True
Suppose 2*i = 7*i. Suppose 4*p - 4 = -4*h, 5*p + i*h - 25 = -h. Suppose q - 81 = 2*a, 3*a = -p*q + 4*q + 162. Is 27 a factor of q?
True
Let p = 81 + -23. Let i be 6/9*-3 - -36. Let m = p - i. Is 6 a factor of m?
True
Suppose -1260 = -2*i + 3*k, 3*i - k - 513 - 1377 = 0. Is i a multiple of 56?
False
Let f = -98 + 118. Is 4 a factor of f?
True
Let y = -60 - -32. Let x = 250 - y. Does 27 divide x?
False
Let d = 3 + -12. Let j(n) = 2*n**2 + 11*n - 1. Does 31 divide j(d)?
True
Suppose -u + 0*u - y = -92, 0 = 2*u - 3*y - 204. Suppose s = -2*f - s + u, -4*f + 192 = -2*s. Is f a multiple of 6?
True
Let x = 17 + -13. Suppose 5*p = x*p. Suppose q + p*a - 46 = -2*a, 0 = q + a - 41. Does 8 divide q?
False
Suppose -4*j - 186 = -3*q + 2*q, 4*j = 5*q - 178. Let a = j + 69. Does 6 divide a?
False
Suppose -521 = 5*a + 569. Let d = -148 - a. Is 14 a factor of d?
True
Let s(q) = 2*q**2 - 11*q + 19. Suppose 19 = 2*f + 7. Let m be s(f). Suppose 2*g = 15 + m. Does 5 divide g?
True
Let m(r) = -r**2 - 5*r - 4. Let u be m(-3). Let p be 3 + (u - (0 - 0)). Suppose -3 = h, -p = -y + 2*h + 11. Is y a multiple of 5?
True
Suppose s + 101 = -5*h + 280, -783 = -5*s + 3*h. Is 16 a factor of s?
False
Let b(p) = -1118*p - 95. Is 31 a factor of b(-1)?
True
Suppose 0 = -2*b + 2*w - 8, -5*b + 2*w - 25 = -5. Suppose 0 = -k + 5*a + 18, 3*a + 6 + 0 = 3*k. Does 17 divide -34*k/b*-3?
True
Suppose -2*x + 60 = 3*x. Let p = -7 + x. Suppose p*v + 4*u - 236 = 128, 4*u - 148 = -2*v. Is v a multiple of 24?
True
Is 10 a factor of 1/((-8)/(-2820))*4?
True
Suppose 0 = -2*t - 2*t + 20. Let j(h) = 6*h - 10. Does 10 divide j(t)?
True
Let j(u) = -4*u**2 + u - 4. Let z be j(3). Let c = 20 - z. Is 19 a factor of c?
True
Suppose -y + 10 = 4*y. Suppose -3*h + 2*k = -h - 24, y*h = -k + 9. Does 7 divide h?
True
Suppose 85 = b + 2*z - z, 0 = z + 2. Is b even?
False
Let f(l) = -22*l - 2. Let w(u) = 25*u + 4. Let c(o) = 49*o + 7. Let t(i) = -3*c(i) + 5*w(i). Let x(m) = 3*f(m) - 4*t(m). Does 9 divide x(1)?
False
Let b(t) = 5161*t - 35. Let f be b(5). Does 43 divide (f/(-24))/(-5) - 2/(-8)?
True
Suppose -7*f + 5*y = -5*f - 7466, y + 18665 = 5*f. Does 15 divide f?
False
Let d = 41 + -5. Is 6 a factor of (d/(-15) - 0)/(2/(-5))?
True
Let j(z) = -z + 9. Let p be j(9). Let c = p + 5. Suppose 0 = -g - k + 34, 185 - 13 = c*g + 3*k. Does 5 divide g?
True
Suppose 34*j - 22*j = 35880. Is 65 a factor of j?
True
Suppose -19*q + 23183 = 2378. Is q a multiple of 12?
False
Let x = 39 + 25. Suppose 44 - x = -5*l. Does 2 divide l?
True
Let x be -11*1/(-3 + 2). Suppose -5*b = -x - 4. Suppose 3*k - b - 6 = 0. Is 3 a factor of k?
True
Let d be (((-4)/(-3))/(-4))/((-5)/135). Suppose d*w = -w + 600. Is 10 a factor of w?
True
Let g(s) = 4*s**2 - s - 1. Let i be g(2). Suppose 0 = 22*l - i*l - 2151. Is l a multiple of 37?
False
Does 8 divide 20356/(-35)*10/(-4)?
False
Suppose 5*t = -10, 5*m - 4*t + 15 + 7 = 0. Let x = 6 + m. Suppose x = 4*i - 3*a - 48, -i + 3*i - 38 = -2*a. Is 15 a factor of i?
True
Let h = -81 - -151. Let x be -32 - (-3 - (-20)/4). Let t = h + x. Does 8 divide t?
False
Suppose -4*u = -3*i - 39, u + 3*u = -12. Let b = 27 + i. Is b a multiple of 2?
True
Let p = -150 + 155. Suppose -p*l - 2*s = -589, 4*s = -2*l + 52 + 190. Does 8 divide l?
False
Is (-94)/(-3)*3*(24 + -11) a multiple of 26?
True
Let f(s) = s**3 - 6*s**2 + 5*s - 2. Let v be f(4). Is v/(-35) + 516/10 a multiple of 10?
False
Let s(n) = n - 11. Let u be s(11). Let h = 0 + -3. Is 3 a factor of h + 2 + 9 + u?
False
Let f be (-65)/10 + ((-1)/2 - -1). Is 11 a factor of (-1590)/12*f/5?
False
Let l be (4/6)/(4/18). 