- -19. Is s a composite number?
True
Is (-1266)/(-4) - 2/(-4) a composite number?
False
Suppose o - 385 - 141 = -5*h, h = -4*o + 109. Suppose h + 127 = 4*k. Is k composite?
True
Let w = -41 + 174. Is w a prime number?
False
Let n(m) = -m**3 + 5*m**2 - 7. Let z be n(5). Is (-2935)/z - (-2)/(-7) composite?
False
Let d(k) be the first derivative of -k**4/2 - k**3/3 - k**2 - k + 8. Is d(-4) composite?
True
Suppose 3*v - 1358 = -5*x, 4*v - 1354 = -x - 4*x. Is x composite?
True
Let b = -996 - -2735. Is b composite?
True
Suppose 4*s = 4*c - 2552, 0 = 5*c - 5*s + 2*s - 3184. Is c a prime number?
False
Let p be (0 + -2)/((-2)/(-7)). Let c = p + 49. Suppose -4*z + 226 = -c. Is z prime?
True
Let p be ((-52)/(-8))/((-2)/4). Let g = p - -24. Is g prime?
True
Is 960 + 8/(-2) - 1 prime?
False
Let p(o) = -78*o**3 - 5*o - 2. Is p(-3) prime?
False
Suppose -2*g - 5 + 3 = 0. Is ((-130)/4)/g*2 prime?
False
Let t = 134 - -32. Let r = -83 + t. Is r prime?
True
Suppose 60 = -0*j - 5*j. Let q = -1 - j. Let m = 30 - q. Is m a prime number?
True
Suppose 5*x - 3*x = -4. Is ((-28)/(-12) + x)*2265 a composite number?
True
Let l = -186 - -46. Let s be 2 + (-3 - (78 + (0 - -2))). Let z = s - l. Is z a prime number?
True
Let x = 707 + -390. Is x a prime number?
True
Let d(f) be the second derivative of -f**4/12 - 11*f**3/6 - 11*f**2/2 - 8*f. Is d(-5) prime?
True
Suppose 4*w + 4*o - 26 = 6, 5*o = -w + 28. Suppose w*d - 8*d = -2525. Is d a prime number?
False
Let b = 5 + -2. Suppose -b*h - h + 48 = 0. Suppose q = -3*q + h. Is q composite?
False
Let h = -4575 + 7108. Is h a composite number?
True
Let o be (4/(-10))/((-3)/15). Suppose o*g + 65 = 7*g. Is g composite?
False
Let k = 51 - -471. Is 7/(-28) + k/8 composite?
True
Suppose 0 = -3*n + n - 4*s, n + 5*s + 6 = 0. Let i be 17/n - 3/12. Is 106*((-6)/i)/(-3) prime?
True
Let o be 46/4 + (-2)/(-4). Let m = o + 41. Is m prime?
True
Suppose 2*o = 2*f + 534, 8 = 5*f + 28. Is o prime?
True
Suppose -3*p - 212 = -5*p. Is p prime?
False
Suppose 6 + 2 = 2*s. Let t be s/8*(9 - -1). Let i(d) = 2*d**2 + 3. Is i(t) prime?
True
Let k(d) = -52*d + 2. Let b(t) = 104*t - 5. Let z(y) = 3*b(y) + 7*k(y). Is z(-3) prime?
False
Let m(c) = 654*c - 5. Let y(h) = -131*h + 1. Let p(k) = -2*m(k) - 11*y(k). Is p(2) prime?
False
Let m = 168 - 41. Is m a composite number?
False
Suppose 2*h = 3*i - 359, i + 5*h + 14 - 145 = 0. Is i a prime number?
False
Let p = 85 + 118. Let q = p + -110. Is q a composite number?
True
Let f be 2 + (4 - 2/1). Suppose -3*y = 3*y. Suppose -5*p = f*k - p - 68, y = -3*p + 6. Is k composite?
True
Let m be (1/(-1))/((-8)/24). Let c be (-183)/15 - m/(-15). Let u = 2 - c. Is u composite?
True
Let w be -350*(-4)/8 - 4. Suppose -5*m + 1103 = 3*v, 2*m = 3*v - w + 629. Is m a prime number?
True
Let v(j) = 9*j - 11. Let w(p) = 6*p - 16. Let d(c) = 7*c - 15. Let l(y) = -4*d(y) + 3*w(y). Let n(i) = 4*l(i) + 5*v(i). Is n(6) a prime number?
True
Is 8/6 - (-2 - 4566/18) prime?
True
Let g(f) = 7*f**2 + f - 1. Let v(y) = y**2 + 9*y + 4. Let x be v(-9). Is g(x) a composite number?
True
Let k(v) = 40*v**2 - 2*v - 3. Is k(-2) a prime number?
False
Let b = -2 - -4. Suppose 2*x + x + b = 2*z, z + 4*x = 12. Let k = z - -7. Is k prime?
True
Let w(q) be the second derivative of q**3/3 - 3*q**2/2 - 3*q. Let b be w(2). Suppose 4*i + 7 = -b, 0 = -3*p + i + 32. Is p prime?
False
Suppose -2*u + 96 = -70. Suppose 0 = -b + u - 8. Suppose 48 + b = f. Is f a prime number?
False
Suppose 0 = -h + 85 + 6. Is h composite?
True
Suppose -2*s + 90 = s. Suppose -81 - s = -3*z. Is z a composite number?
False
Let w = -3 - -145. Is w composite?
True
Let x(d) = 4*d**3 + 4*d + d**2 - d + d - 1 - 1. Is x(3) composite?
False
Let t(z) = -z**3 - 6*z**2 - 6*z - 5. Let j be t(-6). Suppose 3*a + a = 5*h + j, -h - 8 = -a. Is 3/a + 544/6 composite?
True
Let l(u) = -9*u**3 + 9*u**2 - 3. Let v(c) = -4*c**3 + 5*c**2 - 1. Let o(n) = -3*l(n) + 7*v(n). Let a be o(8). Suppose -3*x + a*x = -83. Is x a composite number?
False
Let d(z) = 30*z + 2. Let r be d(1). Suppose 4*u - 120 = r. Is u prime?
False
Let z = 19 - 13. Is (-231)/(-14)*44/z composite?
True
Let u be 4/2*(-3)/2. Let x(s) = -8*s**2 + 7*s - 1. Let z(w) = -8*w**2 + 8*w - 1. Let v(m) = -4*x(m) + 3*z(m). Is v(u) prime?
False
Let f(u) be the third derivative of -u**4/24 + 3*u**2. Let n be f(3). Is -1 - n*12/9 prime?
True
Let h = 5 + -3. Suppose 4*r - h + 6 = 0. Is -3 + 4 - 114/r a composite number?
True
Suppose -2*j + 801 + 17 = 0. Is j a prime number?
True
Suppose i - 8453 = -5*n, -5*n = 2*i + 1901 - 10352. Is n composite?
True
Let x(b) = 3*b**2 - 2*b - 1. Is x(-6) composite?
True
Suppose -5*q - 2*m = -3543, 0 = 3*q + 2*q + 5*m - 3555. Is q a composite number?
True
Suppose -k + 5*q - 659 = -3*k, 4*k - 3*q - 1253 = 0. Is k composite?
False
Is 4049*((-2)/3)/(8/(-12)) a composite number?
False
Suppose 2*u = 5*u - 39. Is u composite?
False
Let d(m) = -m**3 + 7*m**2 + 3*m - 1. Let j(g) = g**2 + g. Let q be j(-3). Is d(q) a prime number?
True
Let s be (240/50)/(2/15). Let y be ((-2)/(-4))/(2/284). Let r = y - s. Is r composite?
True
Let j(r) = 6*r**3 - r. Let k be j(1). Is 2/5 - (-633)/k a prime number?
True
Let i be (-160)/9 + (-6)/27. Is (-7155)/i*(-2)/(-3) a prime number?
False
Suppose 3*m - 155 = w - 6*w, 3*m - 171 = 3*w. Is m a prime number?
False
Let c = -41 + -12. Suppose -565 = 5*r + 70. Let f = c - r. Is f a prime number?
False
Let z(k) = k**2 - 7*k - 4. Let l(m) be the second derivative of -m**4/12 - m**3/6 + m. Let h be l(-3). Is z(h) a prime number?
False
Let q(k) be the second derivative of -5*k**5/4 + k**4/12 + k**3/6 + 2*k. Let y be 2/(-3 - 3/(-3)). Is q(y) composite?
True
Suppose 4*o = -4*p - 8, -3*o + 5*p = -24 - 2. Is (o + -1)/(1/89) a composite number?
False
Let v = 5613 + -3154. Is v composite?
False
Suppose -367 = -2*r + 15. Is r a prime number?
True
Suppose -j = j - 502. Is j a composite number?
False
Suppose -1028 = -r + 181. Suppose 7*a = 4*a + r. Is a composite?
True
Let g(k) = -3*k + 3*k + 15*k + 21*k. Let x be g(4). Suppose 174 + x = 2*u. Is u a prime number?
False
Is (3 - 1)/(6/627) composite?
True
Suppose 4*d - d - 5*b + 51 = 0, -d = -2*b + 18. Suppose -51 - 39 = -5*u + 5*h, 102 = 4*u + 2*h. Let v = u + d. Is v a composite number?
False
Let y = 8 - 5. Let w be (-2)/(-3) + y/9. Suppose w = h - 1. Is h a composite number?
False
Let c = -5 - -9. Suppose -624 = -c*z + 12. Is z a composite number?
True
Let j(l) = 2*l**3 - 8*l**2 - 3*l + 12. Let b be j(10). Suppose -2*y = -4*r + b, -2*r + 5*y + 456 = -155. Is r composite?
False
Let l = -1 + -28. Let q = 114 - l. Is q prime?
False
Suppose 0 = 2*r + 5*a - 1047, 0 = 5*r - 5*a - 2597 - 38. Is r prime?
False
Suppose 3*k = -5*v + 7, 9*k - 4*k - 15 = -5*v. Let d be (v - (0 + -1))/2. Suppose -3*a + 103 + 11 = d. Is a prime?
False
Suppose 4*q + 933 = 5*q. Is q a prime number?
False
Suppose 1006 + 140 = 6*f. Is f a composite number?
False
Let o(z) = -z**3 + 8*z**2 + 9*z + 6. Let x be o(9). Suppose x*n = 2*n + 652. Is n prime?
True
Suppose 3*t - 630 = -0*t - 3*z, 4*z - 631 = -3*t. Is t prime?
False
Let r(c) = 255*c - 2. Let i be r(-9). Let m = i + 1184. Is 2/3*m/(-14) a composite number?
False
Let a = 281 - 32. Is a composite?
True
Let s = -1379 - -2458. Is s a prime number?
False
Is (1 + 1720)*(-7 + (9 - 1)) prime?
True
Let z = 1096 + -496. Is 1/3 + z/9 composite?
False
Let d(n) = -5*n + 1. Let p be 120/55 - (-4)/(-22). Let f be d(p). Let l = f + 46. Is l composite?
False
Suppose 3*y = 521 + 1036. Is y composite?
True
Let z = 249 - 175. Suppose u + u = z. Is u a composite number?
False
Suppose 1390 - 36 = 2*g. Is g prime?
True
Let t = -6 + 9. Suppose -t*p + 131 = -2*p. Is p a prime number?
True
Suppose -t = -3*t + 32. Is (t/(-12))/((-4)/894) prime?
False
Let j be (-1290)/(-27) + 4/18. Let a be (-4)/(-10) - j/20. Is 16/10 + a/(-5) a prime number?
True
Let h be 0 + 1 + 7 + 1. Let r be (-8)/(-12)*h*-1. Is 2/r - 764/(-6) composite?
False
Let w(y) = 71*y + 10. Let j(z) = 24*z + 3. Let t(q) = -11*j(q) + 4*w(q). Is t(13) prime?
False
Let k be 8/(-28) - (-65)/7. Let u be 2*(-3)/k*-12. Suppose -w - 4*c = -11, -4*w + 0*c = -2*c - u. Is w composite?
False
Is ((-15940)/120)/(1/(-6)) a composite number?
False
Let d = 592 + 457. Is d prime?
True
Let k(a) = 23*a + 4. Let j(x) = -23*x - 3. 