k + 5*x - 12, 2*k + 4 - 16 = 3*x. Suppose k*i = 4*i + 224. Is 8 a factor of i?
True
Let c = 139 - 137. Suppose -m - 2 = 0, -c*a = -5*a - m + 127. Does 15 divide a?
False
Let c be 2 + -4 - (-10 + -4). Let p = c - 8. Is p/(-14) - 510/(-119) a multiple of 3?
False
Let t = 224 + -116. Suppose 2*q - c - t - 696 = 0, 0 = 3*q + 2*c - 1192. Does 12 divide q?
False
Let p(c) = c**3 + 5*c**2 - 15*c + 1. Let s be p(-7). Suppose 0 = -7*x + 3*x + s. Suppose 0 = -11*a + 6*a + 3*k + 268, x*a = -2*k + 120. Is 28 a factor of a?
True
Suppose 2*u - 9 = -4*f + u, 5*f - 5*u - 5 = 0. Suppose -14 = -f*m - 18. Is 17 a factor of ((-184)/(-12))/(m/(-3))?
False
Suppose k - 356 = -3*q, -21 = 3*q + 4*k - 374. Is q a multiple of 7?
True
Does 17 divide (-11)/55 - (-936)/5?
True
Suppose 20989 = 5*j + 4*r, -17*j = -16*j - r - 4205. Is 23 a factor of j?
False
Let a(y) = -3*y - 18. Let z be a(-6). Suppose z = -8*x + 9*x - 72. Is 8 a factor of x?
True
Let j(m) = -76*m**2 + m + 3. Let d(r) = 75*r**2 - r - 4. Let o(s) = 2*d(s) + 3*j(s). Let a be o(-1). Is a/(-5) - 16/(-40) a multiple of 8?
True
Let c be (-432)/(-80) + (-4)/10. Suppose c*b = 2*d + 2*d + 16, -7 = -3*b + 5*d. Suppose 3*a = -4*r + 98 + 79, b*a = -4*r + 176. Is 12 a factor of r?
False
Suppose -8*f - 9 = 7. Is 33 a factor of (-21)/f*(-400)/(-60)?
False
Let w be 3*(9 + -4 + -2). Suppose 445 = w*q - 1121. Is q a multiple of 34?
False
Let m(r) = 8*r - 37. Let g be m(4). Is 18 a factor of 9 + -3 + g - -89?
True
Is 6 a factor of (108/270)/((1/75)/1)?
True
Suppose -2*z - z = -1002. Suppose -2*a + 668 = 4*k, -2*a = -k - k + z. Is k a multiple of 41?
False
Suppose -3*w = -w - 2*p - 904, 5*w - 4*p = 2257. Suppose 4*u + w = -x, 2*x = -3*u - 281 - 62. Let r = u - -170. Does 12 divide r?
False
Suppose -3*i = 4*l - 1986, -4*l + 6*i + 1996 = 4*i. Is l a multiple of 13?
False
Let l(c) = 4*c - 12. Let n be -6*(26/(-4) - -4). Suppose t + n = 2*t - a, t - 5*a = 31. Does 32 divide l(t)?
True
Is (18 - 17)*368*1*4 a multiple of 92?
True
Let j(v) = -v**3 + 17*v**2 + 171*v - 69. Is j(21) a multiple of 80?
False
Let k = 23 + -14. Suppose -r + 5*v + 9 = 0, -2*v - v - k = 3*r. Does 2 divide (-15)/(-2) + r/(-2)?
True
Suppose 68*c - 4911 = 1209. Is c a multiple of 15?
True
Is 20 a factor of (2 + -12)*1*-36?
True
Suppose q + 2*w + 3*w = 4, 2*w = 5*q - 20. Let i = -196 + 199. Suppose i*x - q*b + 0*b - 30 = 0, -2*x + 16 = -4*b. Does 14 divide x?
True
Let o(h) = -h**2 + 4*h + 2. Let w be (-8)/((-2)/3*3). Let b be o(w). Suppose b*z - 44 = -0*z. Does 11 divide z?
True
Suppose -2*v + 26 = 3*v + 4*l, 3*l - 6 = 3*v. Suppose 0 = 4*k + 2*o - 210, v*k - 111 = -7*o + 4*o. Is k a multiple of 12?
False
Suppose 2*y = 747 + 179. Let x = y - 304. Is x a multiple of 11?
False
Suppose 0 = -6*b - 254 + 1820. Let n be b/(-6) - (-4)/8. Let m = -31 - n. Does 3 divide m?
True
Let b be (-10)/(-35) + 3356/14. Let r = -10 + 14. Does 12 divide (r/(-5))/((-6)/b)?
False
Let t(p) = 33*p**2 + 20*p + 20. Is 35 a factor of t(5)?
True
Does 6 divide (35/14 - 3)/((-5)/7840)?
False
Let u(l) = 2*l**3 - l**2 + 11*l + 1827. Does 69 divide u(0)?
False
Let c(l) = 293*l. Does 32 divide c(4)?
False
Let c be (-15)/6*16/(-10). Suppose -3*w - 428 = -5*g, -c*g + 192 = -4*w - 152. Suppose 5*a - g - 90 = 0. Does 14 divide a?
False
Let t = 180 + -36. Does 8 divide t?
True
Let q(g) = -2*g - 44. Let p be q(-22). Suppose p = -4*y + 227 + 49. Does 11 divide y?
False
Let x(k) = 4*k + 181. Let n be 2/13 + 16/(-104). Is 15 a factor of x(n)?
False
Does 18 divide (-3)/(-6) + (-4962)/(-12)?
True
Let t(g) = -350*g - 170. Does 20 divide t(-3)?
True
Suppose -5*b = -5*p - 840, -3*p = -5*b + 951 - 111. Suppose 16 = 3*f + f, -f - b = -4*j. Does 19 divide j?
False
Suppose -288 = -5*l + 2*l. Let o = -89 + l. Is o a multiple of 5?
False
Suppose 2*n = 3 - 7. Suppose -2*s - 2*s = 20, 3*i - 36 = 3*s. Does 14 divide n + (i - 3) + 26?
True
Let s(x) = -4*x + 14. Let i be (-2)/8 - (-420)/(-48). Does 50 divide s(i)?
True
Suppose 43*t = 17*t + 1638. Is 13 a factor of t?
False
Let b(y) = -2*y**3 + y**2 - y - 6. Let x be b(-3). Let q = x + -35. Does 5 divide q?
True
Let o = -169 + 375. Is o a multiple of 3?
False
Let o(c) = 336*c**3 + 2*c**2 - 2. Let n be o(1). Let s = -224 + n. Is 8 a factor of s?
True
Let o(a) = 7*a**2 - 6*a**2 - 2*a**2 + 10*a - 1 - 1. Suppose 2*d - 12 = s, -5*d - 5*s = -3*s - 12. Does 22 divide o(d)?
True
Suppose 4*w = -2*c + w, -3*c + 7 = w. Suppose -p - c - 6 = 0. Is 7 a factor of (84/p)/((-4)/6)?
True
Suppose -d - u + 262 = 0, 0*u = 5*d + 3*u - 1314. Is 11 a factor of d?
True
Let r be (159 - (-3 - -3))/1. Let f = r + -80. Is f a multiple of 16?
False
Let r(m) = -3*m + 11*m**2 - 6*m + m**3 + 16 - 2*m. Is r(-12) a multiple of 2?
True
Let i = -256 - -564. Is i a multiple of 40?
False
Let b(w) = 2*w + 3 + 0 - 2. Let v(d) = 2*d**2 + 21*d - 1. Let l be v(-11). Does 21 divide b(l)?
True
Suppose 0 = -4*o + s, -4*o - 11 + 35 = 5*s. Suppose 4*d - 3*i = 3*d + 2322, 5*d - 11610 = -i. Does 41 divide d/18*(o - 0)?
False
Let s(l) = -16*l - 67. Is 41 a factor of s(-19)?
False
Suppose 366*d = 373*d - 10199. Is d a multiple of 17?
False
Let b(t) = t**3 + 6*t**2 + 2*t + 2. Let i be b(-5). Suppose 0 = -3*n + 3*d - 6, 0 = -3*n + 6*n + 3*d + 6. Let z = n + i. Does 5 divide z?
True
Let s = -14 + 641. Is s a multiple of 19?
True
Let q(d) be the third derivative of d**5/60 + d**4/24 - 2*d**3/3 + 4*d**2 - 3. Is 8 a factor of q(3)?
True
Let u = 45 + -31. Is (24/u)/2*14 a multiple of 12?
True
Is (3*(-1689)/(-9))/(-6 - -7) a multiple of 26?
False
Is -3*(-4 + (-8)/(-3)) a multiple of 4?
True
Let t(v) = 27*v - 9. Let g = 78 - 73. Is 18 a factor of t(g)?
True
Let q be ((-108)/(-2))/((-3)/(-4)). Suppose -4*c = -5*c - q. Is -2 + 1 + 3 - c a multiple of 21?
False
Let b = -9 - -10. Let y(f) = 2*f. Let u be y(b). Let z = u + 4. Does 2 divide z?
True
Suppose 21 = c + 3*y, -2*y = -3*c + y + 27. Let p = -47 + c. Let h = 50 + p. Is 8 a factor of h?
False
Suppose -4*u - 17 = 31. Let x be ((-4)/u)/((-2)/(-18)). Suppose 18 = 5*v + x. Is 3 a factor of v?
True
Let n = -7 + 7. Suppose -k - 80 = -n*k. Let g = -47 - k. Is g a multiple of 26?
False
Let p = 120 - 118. Suppose -p*s = 6, 4*d - 4*s = 3*d + 286. Is 19 a factor of d?
False
Does 5 divide 2 + 1 + 0 + 63?
False
Suppose -2*z + 43 = n - 164, z + 819 = 4*n. Does 41 divide n?
True
Let q(h) = h - 1. Let x(t) = t**2 + 5*t - 5. Let a(i) = -4*q(i) + x(i). Let c be a(2). Suppose c*n - 131 = 69. Is n a multiple of 11?
False
Suppose 0 = -16*d + 15*d + 306. Is d a multiple of 29?
False
Suppose 3*g + 2*n = 506, -2*g - 2*n + 6 = -328. Let h = g - 80. Does 24 divide h?
False
Let g = 65 + -117. Let z(w) = w**2 + 13*w + 8. Let i be z(-17). Let q = g + i. Does 8 divide q?
True
Is ((-19)/(-4))/((78/(-216))/(-13)) a multiple of 32?
False
Suppose -2*u + 405 = b, -5*u - 81 = -5*b + 1914. Is b a multiple of 7?
False
Is 8 a factor of 34/119 - 565/(-7)?
False
Suppose -3*j - 6 = -12. Does 23 divide (-184)/(-4) - (2 - j)?
True
Let y(r) = r**3 + 7*r**2 + 7*r + 9. Let w be y(-6). Suppose 0 = 6*d - w*d - 2*j - 361, 2*j = -d + 123. Is d a multiple of 6?
False
Suppose -3*k = 2*m - 242, -2*k - m + 408 = 3*k. Suppose 4*v + d = -4*d + 153, 0 = -3*v - 4*d + 114. Let a = k - v. Is a a multiple of 21?
False
Let o = 11 + -6. Suppose 3*c + o*q - 53 = 16, -3*c = -q - 51. Does 3 divide c?
True
Suppose -3 = 3*i, -2*v - 3*v + 1014 = -4*i. Is 23 a factor of v?
False
Let z(m) = -m**3 + 15*m**2 + 19*m + 23. Let i be z(16). Let k be i + 0 - (-2)/(-2). Suppose o + 2*u - 4*u - 29 = 0, 2*o + 2*u = k. Does 11 divide o?
True
Is -8*(-2)/6*(-270)/(-8) a multiple of 18?
True
Let u(r) = -r**3 + 5*r**2 + 10*r - 10. Let q be u(6). Let t = 38 - q. Does 12 divide t?
True
Let d be (-6)/27 - 152/(-36). Suppose 3*g - d*g = 129. Let o = g - -181. Does 15 divide o?
False
Suppose 4*l - 2*l + y = 61, 5*l - 2*y - 166 = 0. Is 10 a factor of l?
False
Let m be (7*21/(-14))/((-2)/(-84)). Let a = m + 621. Is a a multiple of 45?
True
Let u = -584 - -604. Let g be (-116)/14 - (-4)/14. Does 7 divide g/u + (-428)/(-20)?
True
Suppose -u - f - f + 15 = 0, 0 = -5*u + 5*f. Let n(p) = 0 + 5*p + 13*p - 5*p + u. Is 11 a factor of n(3)?
True
Let t = 29 - -529. Suppose t = 12*y - 9*y. Is 12 a factor of y?
False
Suppose 6 = 2*n - 4. Suppose r + r - 2*f - 22 = 0, -5*f = n*r - 55. 