mposite number?
False
Let a = 29539 - 19008. Suppose 3*n = -418 + a. Is n composite?
False
Suppose 3*t = 5*d + 79, 4*t + 0*d = d + 77. Let r = 22 - t. Suppose -2*i = b - 481, 0*i = r*b + 4*i - 1936. Is b a composite number?
False
Let p(b) = -b**3 + b**2 - 14*b + 11017. Is p(0) composite?
True
Let y(x) = 5*x**3 - 24*x**2 - 4*x + 18. Is y(10) prime?
False
Let u(s) = -11*s**3 + 9*s**2 + 23*s - 17. Let n be u(-10). Suppose -4*f + n = 5*q, 4*f + 4882 = 2*q + 204. Is q a prime number?
True
Suppose -x = f - 22, 4*f - 5*x - 49 = 12. Suppose f*q - 15*q - 28 = 0. Let n(t) = 7*t**2 + 6*t - 4. Is n(q) composite?
True
Let a(q) = q**3 + 7*q**2 + 8*q - 12. Let c be a(-5). Is c/10*(-11 + -103394) composite?
False
Let x be (-8 - -1) + 78519/7. Let k = x + -7607. Is k a composite number?
True
Suppose 0 = -l - 2*l - b + 11, 7 = 3*l + 5*b. Suppose -5*h - 3*t + 6*t = l, 5*t + 16 = -3*h. Is (-1551)/(-6) + -2 - h/4 a prime number?
True
Let w be (6/4)/((-36)/(-96)). Suppose 2*c = -w*p + 20, -7*c - p = -2*c - 23. Suppose u + 2048 = 3*l, c*u = -2*l - 2*l + 2736. Is l a prime number?
True
Let z(y) = -y**3 - 26*y**2 - y - 28. Let q be z(-26). Suppose o - 519 = -5954. Is o/(-25)*-10*q/4 composite?
False
Let m(z) be the first derivative of -11 - 17*z + 7/2*z**2 + z**3. Is m(6) composite?
True
Let u = 433386 + -134588. Is u a prime number?
False
Let a(y) be the first derivative of 7/3*y**3 + 3*y**2 - y**4 - 16*y - 15. Is a(-7) a prime number?
True
Let v = 1160383 + -712788. Is v a prime number?
False
Suppose -850 = -u + 2*h, -7*u + 2*u + 4215 = -3*h. Let a = u + 15. Let j = -368 + a. Is j composite?
False
Suppose -36*v - v = 5291. Let q = -164 - -426. Let g = v + q. Is g a prime number?
False
Suppose -3151852 = -70*m + 26*m. Is m composite?
False
Suppose -3842 = -2*u - 2*s, 341 = u - s - 1574. Let n = 3732 - u. Is n prime?
False
Suppose 417831 + 113553 = 24*d. Is d a composite number?
True
Suppose -48*k + 504984 = 28*k - 170732. Is k a prime number?
False
Suppose 2*v - 391322 = 5*i + 150374, -4*i = 4*v - 1083476. Is v composite?
True
Suppose -2*r - 5*h + 195 = r, 5*r - h = 297. Suppose -r*a - 6548 = -64*a. Is a a composite number?
False
Let b(u) = 19*u - 27. Let z(c) = -37*c + 52. Let v(q) = q**2 + 8*q - 3. Let m be v(-8). Let y(w) = m*z(w) - 5*b(w). Is y(26) a prime number?
False
Suppose 81*n = 78*n + 2664. Let v = -143 + n. Is v a composite number?
True
Let j = 301 + -223. Is 7816/3*j/104 composite?
True
Let j(n) = 6*n**2 - 2*n + 15. Suppose 3*l + 32 = 2*q, -3*q - 4*l = -2*q + 6. Suppose 5*k + q = 4*k. Is j(k) a composite number?
True
Let j(r) = r**3 + r**2 + 3*r + 5. Let b be j(0). Let q be (2 + -3 - 0)/(b/(-12130)). Suppose -9*t = -11*t + q. Is t prime?
True
Let a(f) = 113*f**2 + 95*f + 1051. Is a(-12) composite?
False
Suppose -17 = o + 5*r, 2*o - 5*r - 33 = o. Suppose -o*l + 6 = -5*l. Suppose -l*d - 5*c + 594 = 0, -d - 917 = -4*d - c. Is d prime?
True
Let q(c) = 1441*c + 45. Let d be 2 - (1 + 9/(-3)). Is q(d) prime?
False
Suppose u + 5*f = 52478, 59*f - 104926 = -2*u + 55*f. Is u composite?
False
Let o(y) = 165. Let d(s) be the second derivative of s**3/6 - 413*s**2 - 11*s. Let z(f) = 2*d(f) + 11*o(f). Is z(0) composite?
False
Let m(k) = -497841*k + 805. Is m(-2) composite?
False
Let v = 64 + -62. Let y be ((-3)/v)/((-33)/220). Is (-25)/y*(-764)/5 a prime number?
False
Suppose -2*j = -7*j, 2*y = -0*y + 3*j + 1021694. Is y a prime number?
True
Suppose 163*n - 161*n = 0, -3*v + 5*n + 1128126 = 0. Is v prime?
False
Suppose 12*d - 626248 = -2*d. Let z = -16827 + d. Is z a prime number?
False
Let l = -26428 - -42607. Suppose k - 5*k = -2*w - 16170, -w = 4*k - l. Suppose -2701 = -2*q - 3*g, 0 = -3*q - 0*g - 3*g + k. Is q a prime number?
False
Let z be (-2 - -4)*(0 + 2)*1. Let w be -1*z*(-1)/2. Is 1/((-6)/267)*w/(-1) composite?
False
Suppose -16*y - 7*y = -138. Is 6 + -123*(-230)/y a prime number?
True
Suppose -4*j - 2*t + 2459318 = 0, 5*j - t - 1713733 - 1360397 = 0. Is j composite?
False
Suppose -4*k + 2478382 = -2*g, 5*g = -3*k + 4*k - 619636. Is k a prime number?
False
Let y(z) = 3*z**3 - 16*z**2 + 13*z + 55. Suppose -5*u + 34 = -2*u - 5*s, 2*u - 29 = -3*s. Is y(u) a prime number?
True
Suppose -184556 = -2*q + 7*j, -5*j + 7 = -3. Is q a composite number?
True
Let s(d) = 116*d**3 - 24*d**2 - 40*d - 29. Is s(18) prime?
True
Suppose 30*l + 66876 = 196811 + 58555. Is l composite?
True
Let j be 20036/((-9)/(-9)) + -9. Let a = -12406 + j. Is a composite?
False
Suppose 2*l - 6*u - 11 = -u, -2*u = -4*l + 14. Suppose -8462 = -5*t + l*v, 5*t + 1816 = -3*v + 10284. Is t a composite number?
False
Suppose -175813*x - 301820 = -175817*x. Is x prime?
False
Let k(t) be the first derivative of -t**4/4 + 13*t**3/3 - 11*t**2/2 - 8*t - 1. Let a be k(12). Suppose -a = 8*b - 1196. Is b a composite number?
False
Suppose -2645 + 191751 = 46*n. Suppose 5*j - 1359 = 2*m - n, 2*m = -3*j + 2768. Is m a prime number?
True
Let j(w) = -2*w**2 + 22*w - 19. Let l be j(9). Let n(g) = g**3 - 10*g**2 + 34*g - 22. Is n(l) prime?
True
Suppose 0 = x - 4*f + 6, 4*x + 3*f = 2*f - 24. Let v be ((-1)/1)/(2/x). Suppose -3*g + 2033 = 5*d, -d + v*d + 3*g - 806 = 0. Is d composite?
False
Suppose 2*k - 50 + 2 = 0. Let u = k + 18. Is 6/14 + 40596/u composite?
False
Suppose -4*d + 32 = 0, 0 = 4*u + 3*d + 1171 - 16131. Is u a prime number?
False
Suppose 195*t - 136*t - 5664587 = 6420324. Is t a composite number?
True
Let k(a) = -3454*a - 1533. Is k(-8) a composite number?
False
Let d be 4 + -7 - (-16 + -3). Suppose -11*k + 4*h - 2391 = -d*k, 4*k + h - 1915 = 0. Is k composite?
False
Let b(k) = 3*k. Let z be b(1). Let m = 7353 - 7351. Is (-2554)/(-3 + 0 + z - m) a composite number?
False
Suppose -33*l + 26*l = -39*l + 18947936. Is l composite?
True
Suppose 0 = -12*r + 448158 - 15714. Is r composite?
False
Let u be (-2 + 5 + (-33)/7)*-742. Let n be 7/(28/u) - -2. Let q = n + -133. Is q prime?
False
Let b(x) = -3*x + 20. Let l be b(7). Let a(h) = -5607*h + 2. Let d be a(l). Let c = d + -3672. Is c composite?
True
Let w be ((-2156205)/(-31))/(1 - -2). Suppose -288*d + 283*d + w = 0. Is d composite?
False
Let f be (0 + 0 - -2)*(-1)/1. Let k be ((-441)/(-6) - f)*26. Let h = 922 + k. Is h a composite number?
True
Let m be -4 - ((-20)/16 - (-2)/8). Is ((-4 + -1)/(-15))/(m/(-40437)) composite?
False
Is (-504)/(-378)*(-105306)/(-8) a prime number?
True
Let a = 31 - 26. Suppose a*d - 364 = -2*d. Suppose o + 5*k - d = -0*k, -5*o - 5*k + 360 = 0. Is o a composite number?
True
Suppose -8*j + 20*j - 660 = 0. Let y = j - 76. Is (y/(-12) + 0/(-2))*5108 composite?
True
Let p(d) = -d + 1. Let t be p(-5). Let x(g) be the second derivative of 5*g**4/2 + 2*g**3/3 - 17*g**2/2 + 5557*g. Is x(t) a prime number?
True
Let z(j) = j**3 - j**2 - 4*j - 6. Suppose -3*t = -5*g + 72, t + 4 + 0 = 0. Let m be z(g). Suppose -10*a + m = -40. Is a prime?
True
Suppose 4*r - 8 = 0, -3*r - 254 = -4*i - 4*r. Let s(m) = -16*m. Let w be s(-2). Let j = i - w. Is j prime?
True
Suppose 147*b = 149*b - 10. Suppose 2*l + z = -0*z + 1783, -2*z = -b*l + 4435. Is l a composite number?
True
Let k = 336 + -344. Is k/128*2 + 2393/8 composite?
True
Let d(j) = 313*j + 107. Let h be d(11). Suppose 8*i - h = 978. Is i a prime number?
False
Suppose 8 = i - 1, -3987502 = -4*x - 2*i. Is x a prime number?
True
Let p(d) = 235*d + 13. Let g = 287 + -179. Let l = -104 + g. Is p(l) prime?
True
Suppose 0 = -4*z - 3*k + 223562, -18*z + 55893 = -17*z + 2*k. Is z composite?
False
Let g(i) = -i**2 - 5*i + 11. Let j be g(-6). Suppose j*s = 1 + 4. Is 2/s + 3835/5 a composite number?
False
Suppose 2*p + 12*p - 8*p - 1637178 = 0. Is p a composite number?
False
Suppose 5*m - i = 218134 - 77505, 4*i = 6*m - 168738. Is m a prime number?
False
Is (-1)/((-14 - -2)/13044) prime?
True
Suppose 504*y = 501*y + 42. Suppose 0 = y*p - 15*p + 3098. Is p composite?
True
Suppose -6*c - 3672 = -5*m - 2*c, -5*c = 4*m - 2954. Suppose 5*k + m = 3491. Is k prime?
False
Let n(a) = -a**3 + 2*a**2 - 2*a + 1657. Let m(t) = t**3 + 3*t**2 - 4. Let u be m(-2). Is n(u) composite?
False
Let n(v) = -v**2 + 4*v + 1. Let g be n(3). Suppose -g*s + 28 = 4*y + y, 3*s - 4*y - 52 = 0. Is 1456/10 + s/30 a prime number?
False
Suppose -3*k - s + 2 + 0 = 0, -4*s = k - 8. Is 2*1894 + (-5 - k) + 8 composite?
True
Let x(c) = 9*c - 39. 