mposite number?
False
Let j(m) be the second derivative of -33*m**3 + 6*m**2 - 11*m. Let b be j(-4). Let y = b - 473. Is y prime?
True
Suppose 22*d = 21*d - 13. Let z be 2/d + 84/39. Suppose 3*n - 3 = 9, 224 = z*f + 3*n. Is f a composite number?
True
Let a(k) = -40 - 14*k - 8*k - 17*k. Let u(b) = b**3 - 10*b**2 - 37*b + 137. Let d be u(12). Is a(d) a composite number?
False
Let t(a) = 2*a**2 + 4*a - 10. Let j be t(-3). Is -1*(545388/(-36) + j/(-6)) prime?
True
Let t be 7 - 1/(3/(-12)). Let l(m) = 842*m + 15. Is l(t) prime?
True
Suppose 2*o - 2 = -2*b, 3*o + 6*b = 7*b - 9. Is o - (-5 + 1360)/(-5) prime?
True
Let h(g) = -2*g + 38. Let y be h(19). Is (y - -2)*(-446)/(-4) a prime number?
True
Let t = 258 - 251. Suppose 0 = t*l - 2*l + 4*i - 9843, -5*l - 2*i + 9839 = 0. Is l a composite number?
True
Let d = -60 - 122. Let z = d + 272. Is (-12)/z - (-3347)/15 a prime number?
True
Let i(t) = -t**3 - 13*t**2 + 16. Let w be i(-13). Suppose 2*n - 50 = -w. Let x(l) = 2*l**2 + 7*l + 22. Is x(n) prime?
True
Suppose 2*b + 51 = 3*b - 5*x, -2*b - 4*x = -102. Let c = -49 + b. Suppose -a + 4888 = 5*m, -4*a = -m - c*m + 2919. Is m a prime number?
True
Let o = 19640 - -12287. Is o composite?
True
Suppose 4*t - 20 = 0, 136*r - 3*t + 1864803 = 140*r. Is r composite?
True
Let q = 16 - 14. Suppose 0 = q*a + 4, -3*r + 2*a = -2*a - 29. Suppose 3*j - r*j + 767 = 3*t, -t - 3*j = -264. Is t a prime number?
False
Let i(p) = -62*p**3 - 17*p**2 + 97*p + 5. Is i(-14) prime?
True
Let g(t) = 217*t + 263. Is g(50) a prime number?
True
Let o be ((-8)/200*-5)/(2/230990). Suppose 5*l - o = 14946. Is l a composite number?
True
Let d be (-1 - -28)/(1 - 215/200). Let l = d - -2279. Is l composite?
True
Let b be 25*-14*(-288)/60. Suppose 0 = 7*d - b - 8799. Is d composite?
True
Suppose 126*v + 636801 - 6359213 = 1624522. Is v composite?
False
Let o be (-161)/2*((1 - -3) + -210). Suppose -o = -8*w + 21009. Is w composite?
True
Suppose 0 = -2*a - 5*d + 19098, 15*a + 28665 = 18*a + 3*d. Let j = a + -5756. Is j a prime number?
True
Let c(i) = 496*i**2 + 51*i + 21. Is c(12) prime?
False
Let g(i) be the first derivative of -414*i**2 - 49*i - 102. Is g(-5) a composite number?
False
Suppose 0 = 5*k + 17 + 3. Let i(x) = -7*x**3 + 3*x**2 - 9*x - 12. Let w be i(k). Let h = w - 101. Is h composite?
False
Let p(j) = 7*j + 158. Let o be p(-22). Suppose -2*r + 2*i + 1134 = 122, 5*r - 2*i - 2518 = 0. Suppose r = m + d + d, 3*m - 1506 = o*d. Is m prime?
False
Let b be (10/(-18) + 1)/(52/234). Is (b/(-15) - (-141)/45) + 5504 a prime number?
True
Suppose -5 = 5*s - 3*i - 23, -4*s + 16 = -4*i. Suppose -s*d - 4*g + 93 = 0, -3*g + 62 = 2*d + 2*g. Suppose -3*p = 0, b - 2*p - d = 148. Is b a prime number?
True
Let c = -100 + 100. Let g be c - ((-116)/(-6) - (-14)/21). Is (g/8)/(5/(-710)) prime?
False
Suppose 39*m + 1360339 = 5376052. Is m composite?
False
Suppose 306 = w - 18*w. Is (-8 - 207/w)*4678 prime?
False
Let t(y) = -15*y**2 - 5*y - 4. Let r = -9 + 13. Let u be t(r). Is 2/(-2) - (u - -12) a prime number?
True
Let t(l) = 1130*l**3 + 3*l**2 - 4*l - 15. Is t(4) a prime number?
True
Suppose 86315 = 5*l - 3*j - 109, -2*l = -3*j - 34566. Let d = 1231 + l. Is d a prime number?
True
Let m = -7048 - -17036. Suppose -434*q + 438*q - m = 0. Is q a composite number?
True
Suppose -4*k - 4*k + 8 = 0. Let u(z) = 2776*z**3 - 5*z**2 + 2. Is u(k) prime?
False
Let z(a) = 173*a**2 + 3*a - 33. Let d(t) = -87*t**2 - 2*t + 16. Suppose -6 = 5*h - 7*h. Let v(r) = h*z(r) + 5*d(r). Is v(6) composite?
False
Let s(x) = -x + 10. Let o be s(13). Let q be ((12/(-15))/1)/(o/(-45)). Let p(v) = 6*v**2 + 27*v - 7. Is p(q) prime?
False
Let b = 27228 + -14514. Suppose 2*x = -2*q + b, -x - 2154 = 5*q - 33947. Is q prime?
True
Let k(z) = -81*z + 19. Let g(c) = -243*c + 57. Let b = -40 + 37. Let y(s) = b*g(s) + 8*k(s). Is y(12) composite?
False
Let n = 124 + -300. Let b be (-4 + 0)/(-8)*n. Let r = -55 - b. Is r prime?
False
Suppose -39*j + 17364886 = -1562801 - 688260. Is j prime?
True
Suppose 3*i = -3*v + 67761, -9*i + 5*i = 2*v - 90348. Is i prime?
False
Let f(z) = 1106*z**2 + 160*z + 3. Is f(-6) a composite number?
True
Let q(j) be the third derivative of -29*j**4/12 + 5*j**3/6 - 2*j**2 + 9*j. Is q(-12) prime?
True
Suppose -217*i = -172*i - 8333695 - 38969450. Is i a composite number?
False
Let t(o) = -2*o**3 - 6*o**2 - 21*o - 187. Is t(-24) a composite number?
False
Suppose 0 = 5*h + 4*z - 9*z - 7429445, 0 = -4*h - 2*z + 5943556. Is h a composite number?
False
Is (151 + -147)/(8/422258) prime?
True
Let s(g) = g**2 + 9*g + 5. Let i be s(-4). Let h be (-48120)/27 - 74/(-333). Is i/(-60) + h/(-8) composite?
False
Let k(y) be the second derivative of 56*y**4/3 + 5*y**2/2 + 25*y. Is k(3) a prime number?
False
Suppose -15*m = -5*x + 31525, -5*x + 31493 = -0*m + m. Is x a prime number?
True
Suppose 0 = 358*j - 4049670 - 27587793 - 29018119. Is j prime?
False
Let h(x) = -x**2 - 11*x + 4. Let a be h(-11). Let q(z) = -z**3 + 3*z**2 + 3*z + 7. Let m be q(a). Suppose 1712 - 101 = m*d. Is d a prime number?
False
Let b = 1820 + -736. Suppose -3*n + 4*x + 3309 = 0, n + 2*x - b = -3*x. Is n prime?
False
Suppose 5*y + 0*t = -2*t + 179595, -t = 2*y - 71838. Suppose -5*k - 4*h + y = 0, 7 + 9 = -4*h. Is k composite?
False
Suppose 0 = p - 4*s - 9076, 2*p - 27201 = -p + 3*s. Suppose -4*u = 0, 0 = -g - 2*u - 1613 + p. Is g a prime number?
True
Let s be 116/(-12) - 2/6. Suppose 0*n + 4*n - 6658 = -3*v, 2*n - 5*v = 3342. Is n + s + (1 - 0) composite?
False
Let j = 514 + -510. Suppose -j*n - 18493 = -3*k, 3*k + 1898 = n + 20388. Is k composite?
False
Let h(w) = 822*w**2 - w - 14. Let o be h(4). Suppose -o = -8*i + 1274. Is i composite?
False
Let r(c) be the first derivative of -2*c + 4*c**3 - 7*c + 2*c**3 - 11 - 2*c**2 + 5. Is r(4) prime?
True
Let p be (12/20)/(-1*1/(-10)). Suppose 0 = p*t + 11*t - 256241. Is t a prime number?
True
Let d = 114 + -205. Suppose -11*y - 1404 = 15*y. Let m = y - d. Is m a composite number?
False
Suppose d - 3*o + 145 = -0*d, 0 = 3*d - o + 459. Let a = d + 294. Is (-14)/(-4)*a - 1 a prime number?
False
Let b = 24890 - -5409. Is b a composite number?
True
Suppose -16 = -11*j - 38. Let l be ((-2)/(-6))/(j/(-30)). Suppose -4*s + 766 = 2*p - p, 372 = 2*s - l*p. Is s a composite number?
False
Let g(k) = -2*k - 8*k**3 + 12*k**2 + 10*k**3 + 2*k**3 - 11 - 3*k**3 - 11*k. Is g(-10) a prime number?
False
Suppose -714*g = -713*g - 7, -k + 69855 = 2*g. Is k a composite number?
True
Let s = 98 + -96. Suppose -1825 = s*n - 10383. Is n prime?
False
Is (-14)/((-504)/115604)*9 a prime number?
True
Let w(p) = -2*p - 31. Let l be w(-17). Let i be -2 + (-9)/(-6)*4/l. Suppose -14*u + 9*u + 3155 = i. Is u prime?
True
Suppose -19*p + 25*p = 54. Is (-1266)/p*6/(-4) a composite number?
False
Suppose -66*k + 654343 + 159545 = 21426. Is k a prime number?
True
Suppose 0 = -j - 2*p + 389203, -1798*j + 1799*j - 389187 = -4*p. Is j prime?
True
Let d be 2226 + 21/14*(-2)/(-1). Let q be 4/6 + 10986/(-9). Let t = d + q. Is t a prime number?
True
Let h = 1 - 1. Let x(t) = 51*t**2 + 63*t - 460. Let b be x(6). Suppose f - 3*f + b = h. Is f a composite number?
False
Let n be -14 + (18/(-15))/((-4)/(-10)). Let x(a) = 13 + a**2 - 24*a - 5 - 2*a**2. Is x(n) a prime number?
True
Let r = 48 - 46. Suppose 0 = -r*n + 2 + 4. Suppose n*q - 4550 = 649. Is q a composite number?
False
Let m(u) = -368*u - 108. Let y be m(9). Let k = 7981 + y. Is k composite?
False
Suppose 21 = 2*k + 15. Is (k/7 - 75030/(-7)) + -2 composite?
True
Let b = 147664 - 67643. Is b a composite number?
False
Let l = -793 + 795. Suppose 0 = -4*v - 3*u + 23, v + 5*u = 6*v + 15. Is 287/(3 - v) + 0/l a prime number?
False
Let m = -274660 - -386781. Is m a prime number?
True
Is 33/(-3) + 1159255 + -45 composite?
False
Let b(l) = -l**3 - 3*l**2 + l. Let r be b(-2). Let i be (-18)/2 + -12*(-8)/32. Is i + 2 + (-5 - r) - -676 a prime number?
True
Let j(x) be the first derivative of 70*x**3 + 8*x**2 + 5*x + 25. Is j(-3) prime?
True
Let q(a) = -2*a**3 + 32*a**2 + 34*a + 2. Let o be q(17). Suppose -4*t + 1435 = 3*c - 2556, -t - 2679 = -o*c. Is c composite?
True
Let h = 7806 + -1609. Let f = h + -4398. Is f a prime number?
False
Let y(x) = 7100*x**2 + 120*x - 359. Is y(3) composite?
False
Let u be (-144)/15 + 14/(-35). 