et y(k) = -20*k**3 + 42*k**2 + 7*k - 329. Is y(-28) composite?
True
Let y(c) = c**3 - 5*c**2 - 6*c + 7. Let d be (-84)/49 + 2 + 346/14. Suppose -3*n + 4*q = -50, -5*n + d = 2*q + 3*q. Is y(n) prime?
False
Is (140547 - 0) + ((-11)/(-7) - 288/(-672)) a composite number?
False
Let t = -100486 + 163347. Is t a prime number?
True
Suppose 0 = -20*j + 10*j + 1300. Let m = j - 67. Suppose -86 = -a + m. Is a a prime number?
True
Let z(o) = -o**3 + 121*o**2 - 39*o + 54. Is z(83) prime?
False
Let y(u) = 1. Let d = -32 - -33. Let i(z) = 19*z - 21. Let v(o) = d*i(o) + 4*y(o). Is v(12) composite?
False
Let k = 107 - 103. Suppose -10709 = k*l - 5*l. Is l a prime number?
True
Suppose 26 = q - 0*q + 3*c, -4*q - 3*c + 77 = 0. Suppose -q = s - 25. Suppose 0 = 6*r - s*r + 638. Is r a composite number?
True
Suppose -4*s = -5*p + 6959, -5*s + s + 16 = 0. Suppose p - 63 = 4*g. Suppose -3*t = -336 - g. Is t a composite number?
False
Let c be 1159548/(-130)*-1*10/(-3). Let b = c - -43087. Is b a prime number?
False
Suppose 14*s - 11*s - 5*x = -14339, 0 = -5*s - 2*x - 23888. Let l = s + 8443. Is l a prime number?
False
Let i(y) = -4*y**2 - y. Let d be i(1). Let o(n) = 438*n**2 - 26*n - 27. Is o(d) a composite number?
True
Let o = 16 - 14. Suppose 10 = -o*f - 0*f, -11 = 3*l + 4*f. Suppose -9*x = -l*x - 2148. Is x a prime number?
False
Let g(j) = -4*j**3 + 31*j**2 + 33*j - 14. Let x(i) = -7*i**3 + 61*i**2 + 66*i - 27. Let m(n) = -5*g(n) + 3*x(n). Is m(19) composite?
True
Suppose -199*i - 95914 = -182*i. Suppose 43364 = -2*l + 6*l. Let q = l + i. Is q prime?
False
Let l = -7474 + 14471. Is l composite?
False
Let w(l) = 2*l**2 - 2*l - 4. Let i be w(4). Let c be 38*(-5)/i*-2. Let z(u) = 2*u**2 + 4*u + 1. Is z(c) a composite number?
True
Let z(s) = 5*s + 56. Let y be z(-10). Suppose 10782 = y*h - 7212. Is h composite?
False
Let j(t) = 3752*t**2 - 151*t + 35. Is j(12) prime?
True
Let h(j) be the second derivative of -j**4/6 - 11*j**3/6 - 7*j**2 - 42*j. Let s be h(-6). Is (0 + 4996/s)/(2/(-10)) prime?
True
Let y = -163 + 161. Is ((-29691)/y)/9*10/5 a composite number?
False
Let t = 92 - 88. Let j = 4 - t. Suppose -3*z + 7091 = -5*k, -z + 2*k = -j*k - 2364. Is z composite?
True
Suppose 3*j = -3*v + 389598, -v + 5*v - 5*j = 519437. Is v prime?
False
Let j = -42 + 42. Suppose x + 2 = 2*v - 3*v, j = -3*v - 5*x - 10. Suppose 0 = 4*u - y + 2*y - 1009, 4*u + 5*y - 1029 = v. Is u a composite number?
False
Let l(t) = 18*t + 1264. Let p be l(0). Suppose y - 2*s = p, -y - s + 771 + 490 = 0. Is y a composite number?
True
Let b be (-42718)/(-6) - ((-96)/18 - -6). Suppose -10*u + 50149 - b = 0. Is u a composite number?
True
Let z(c) be the third derivative of c**5/10 + 35*c**4/24 + 20*c**3/3 + c**2 - 128. Is z(62) prime?
False
Let o(r) = 4*r + 3. Let g be (-30)/15 - (-1 + (1 - 2)). Let c be o(g). Suppose -k + 4*n + 1390 = k, -c*k + 4*n + 2081 = 0. Is k prime?
True
Let b(n) = 658*n - 5. Let o be b(14). Let z = 2899 - o. Is (17*(-1)/4)/(19/z) composite?
True
Let w(g) = -13487*g**3 - 4*g**2 - 5. Let i be w(-2). Suppose -8*c - 26107 = -i. Is c composite?
True
Let n(q) = 78*q**2 + 47*q - 57. Is n(26) a prime number?
False
Let u be -54*(0 + (-251)/3). Let i(w) = -484*w + 3407. Let g be i(7). Suppose -u = -g*x + 13855. Is x composite?
False
Suppose 4*b = -2851 - 6033. Let p = 3730 + b. Is p composite?
True
Let l(n) = n**3 - 12*n**2 - 45*n + 3. Let z be l(15). Let r(a) = 362*a**3 + 3*a**2 - 8*a + 14. Is r(z) a prime number?
True
Is 6 + 13/91*270571 a composite number?
True
Suppose 2*j - 10 = -3*l, 4*j = -2*l + 6*l - 20. Suppose -h + 3411 = x - 2*x, 8 = l*x. Suppose 2161 = 6*a - h. Is a a prime number?
True
Suppose -250 = -6*p + 116. Let z = p + 81. Suppose 10*y - z - 88 = 0. Is y a prime number?
True
Suppose 2*t = 2, u + u + 5*t = 34397. Suppose 5*n - 3*c - 28670 = -8*c, 3*n - u = -5*c. Is n a prime number?
True
Suppose -59*v = 8300138 - 32008639. Is v prime?
True
Suppose 4*j = 4*q - 135900, 0 = -2*j + 8 - 2. Suppose -12*l - q = -18*l. Is l composite?
True
Is (-99 - -113) + 3*65099 prime?
True
Let n be -11 - 46/(-3) - 2/6. Suppose -42*q + 10 = -44*q, -i + 2769 = -n*q. Is i a prime number?
True
Let c be -594 - -3*(-1 + 0). Let w = c - -1107. Suppose -5*m + 20845 + w = 0. Is m prime?
True
Let b = 25 - 6. Suppose -4*o + 8 = t, -2*t - 2*t = -o + b. Let i = 1462 + o. Is i a composite number?
True
Let y be 23/3 + -5 + (-26)/(-6). Is (-6 + 5)/(y/(-17339)) composite?
False
Is 4 - 3*(-320457)/9 prime?
True
Let o(i) = -37468*i + 7081. Is o(-10) prime?
True
Let a(l) = 3*l + 1. Suppose -5*c + 9 = -1. Let j be ((-3)/c)/3 + (-9)/(-6). Is a(j) prime?
False
Suppose 0*s + 3*t = 4*s + 4, -5*t + 16 = -2*s. Suppose 0 = 5*w + s*c + 5 - 15, -w = c + 1. Is w/22 - (-8687)/77 prime?
True
Let d(i) = 98*i**2 - 29*i - 1420. Is d(-63) composite?
False
Let h(x) be the first derivative of -4*x**3 + 13/2*x**2 - 1/4*x**4 - 29 + 47*x. Is h(-14) composite?
False
Is 512885268/2220 + (-4)/10 composite?
True
Let g(f) = 27562*f + 1077. Is g(7) prime?
False
Let t = 46641 - -50878. Suppose 0 = -7*g + 13851 + t. Suppose 0 = -5*m + 5*i + g, 0 = -4*m + 5*i + 20170 - 7441. Is m a prime number?
True
Suppose -241*k + 129*k + 128*k - 14419568 = 0. Is k a composite number?
True
Suppose 373 - 5713 = 15*a. Is (a*5/(-20))/1 prime?
True
Let f(y) be the third derivative of -y**5/60 - y**4/12 + 7*y**3/6 - 17*y**2. Let k be f(-3). Is 33*(1167/45 + k/10) prime?
False
Suppose 0 = 7*z - 4*a - 1241221, -398052 + 1284644 = 5*z - a. Is z prime?
True
Let a = -585184 - -882093. Is a composite?
False
Let c = -779476 - -1439883. Is c composite?
True
Let o = 108553 + -17654. Is o prime?
False
Suppose -8*r + 5*r = -9, -2*x - 4*r = -54394. Is x a composite number?
False
Suppose 13939388 = -42*o + 110*o. Is o a composite number?
True
Let t(b) = -b**3 - 5*b**2 + 9*b + 6. Let f be t(-6). Let k = f - 6. Is ((-1954)/(-12) + 9/k)*3 prime?
True
Let q = 160757 - 93034. Is q a prime number?
True
Let r(m) = 303*m + 95. Let u be r(9). Suppose u = 3*a - 3*v + 4*v, -5*v = 4*a - 3759. Is a composite?
False
Suppose -620 = -c + 3*m, -5*c + 3*m + 3154 - 6 = 0. Let n = c - 284. Let x = n + -135. Is x a prime number?
False
Suppose -8318 = 5*s - 1528. Suppose -2*z = 12, -5*d - 37*z + 42*z = -10205. Let f = d + s. Is f a prime number?
True
Let i(k) = -13941*k - 34. Is i(-1) a prime number?
True
Let v be 4/(-10)*(-4 - (3 + -166442)). Is (v/(-10))/((28/35)/4) prime?
True
Suppose -4*g = 2*v - 31918, -2*v = 13*g - 16*g + 23928. Is g composite?
True
Suppose 18*o - 47504 = 101620 + 94830. Is o a composite number?
False
Let g = -18840 - -60697. Is g a prime number?
False
Suppose 33*w = -0*w - 5*w + 7264042. Is w a prime number?
False
Let z = -15 + 20. Let b(l) = -3 - 1 - 4 - 25*l + z. Is b(-4) a composite number?
False
Suppose 0 = 27*m + 2 - 191. Is -8 + m + (4857 - -5) composite?
False
Let x = 63 + 19. Let t = 136 - x. Suppose -3*b + t = -15. Is b composite?
False
Let o = 578931 - 389452. Is o composite?
False
Let s(c) = -519*c**3 + 10*c**2 + 56*c + 20. Is s(-9) prime?
False
Suppose -5881*y = -5873*y - 368824. Is y composite?
False
Let m = 107 - 103. Suppose -47*p - 6933 = -51*p + v, -4*v = m*p - 6928. Is p a composite number?
False
Suppose -p + 5*p = -6*p + 1866430. Is p composite?
True
Is (-2)/(-2)*2 + 6379607/52*4 a prime number?
True
Is -4 + (233428 - 42) + (-2)/(-2) composite?
True
Let g be (-3)/(-2)*(-39588)/9. Is -2*g/4*1 a composite number?
False
Suppose 0 = -j - 5 - 11. Let a = j + 11. Let m(p) = 28*p**2 + 3*p + 12. Is m(a) composite?
True
Let r = 91 + -139. Let j = 42 + r. Let n(l) = 10*l**2 - 17*l + 5. Is n(j) a prime number?
True
Suppose -25079 = -b - 5*f, 3*f = -5*b - 39356 + 164641. Suppose -2451 - b = -5*o. Is o a prime number?
True
Let d(w) = 28363*w**2 - 45*w - 165. Is d(-4) prime?
True
Let f(s) = -1517*s**3 - 2*s**2 - s - 6. Let q be f(-2). Let v = q + -5783. Is v prime?
False
Suppose -14*y + 171710 - 36064 = 0. Is y a prime number?
True
Suppose 0 = 70*w + 3*w - 1404593. Is w a composite number?
True
Let n(y) = 305*y - 324. Suppose -1 = -3*g - 5*u, -3*g + 4 = -u - 21. Is n(g) a composite number?
False
Let q(a) be the first derivative of -35*a**4/2 - 14*a**3/3 - a**2/2 + 5*a - 137. Is q(-4) a composite number?
True
Is (61949 - (7 + 3)) + 0 prime?
False
Let b = 57 - -78. 