s c(-18) composite?
False
Let m(p) be the third derivative of 201*p**5/10 - p**3/2 - 14*p**2 - p. Is m(-2) a prime number?
False
Let c be 117/6*(-840)/(-9). Suppose -4*u = -2*w - 6902, -u + 3*w - 102 = -c. Is u a composite number?
True
Is (-20)/10*429955/(-10) prime?
True
Suppose -972*g + 585927 = -945*g. Is g a prime number?
True
Is (((-323)/(-6))/17)/((-1)/(-54294)) a composite number?
True
Suppose -5*r - 31358474 = -4*r - 15*r. Is r prime?
False
Let s(t) = 121*t**2 - 2*t - 1. Let i be 2 + (4 - 1/1). Suppose -i*b + 20 = -2*h, 5*b - 5*h - 57 = -22. Is s(b) a composite number?
False
Suppose 0 = o + 5*n - 1884704, -88*o = -84*o + n - 7538987. Is o composite?
False
Let n be (0*(3 + (-8 - -6)))/2. Suppose 16*f - 39359 - 138225 = n. Is f prime?
False
Suppose 6*l = 3*l + 9. Suppose -4*s = v, -4*s + s - l = 0. Suppose 0 = -j - 2, 5*b + v*j = j + 4239. Is b a prime number?
False
Is (-15373)/(-10) + (555/150 - 4) a prime number?
False
Let c(m) = -178*m - 237. Let x be c(9). Let y(h) = -16*h**3 + 5*h**2 + 5*h - 8. Let w be y(-6). Let q = x + w. Is q a composite number?
False
Suppose -w + 37609646 = -14*w + 59*w. Is w a composite number?
True
Let z be 95/(-30)*-4*-6. Let g = 16 + z. Let n = 187 + g. Is n composite?
False
Suppose 11*u - 2 = 42. Suppose 0 = 3*p + u*g - 5894, 3*g = p - 933 - 1036. Is p a prime number?
False
Let l be 0 + 359 - (-2 - -5 - 6). Let u(g) = -7*g**2 + 6*g. Let c be u(4). Let d = c + l. Is d a prime number?
False
Suppose -208*q + 212*q - 8 = 0. Suppose 2*x - 166 = -5*k, -132 = -4*k - q*x - 0*x. Is k prime?
False
Is (5/(-3) - -1) + (-16 - (-7553394)/54) composite?
False
Suppose 9*r = -32 + 185. Suppose 1021 = r*f - 3450. Is f prime?
True
Suppose 9*l = 9, 29*v - 24*v = 4*l + 1122951. Is v composite?
False
Let p = 18 + -13. Suppose v + 2702 = 4*y - 4*v, p*y - 3363 = -v. Is y prime?
True
Suppose 75832 = f + 3*n, f - 54507 = 4*n + 21290. Is f a prime number?
False
Let n(q) = 3*q - 2. Let a be n(-2). Is 2/a - 2/((-32)/2484) prime?
False
Is (-41 - 33)*(84500/(-8))/5 + -6 a prime number?
True
Is ((-736)/115 + 3)/(2/(-18010)) a prime number?
False
Suppose -14 = -3*k - 5. Suppose -5*p + p = 2*q - 778, k*p = 15. Is q a composite number?
False
Suppose 17*f = 9*f + 112. Let y be -3 + f/(-21) + (-316)/(-6). Suppose -52*l + 33 = -y*l. Is l a composite number?
False
Let x(m) be the first derivative of -8/3*m**3 + 33 + 1/2*m**2 + 15*m + 3/4*m**4. Is x(6) prime?
False
Is -12 + 28/(-4)*-8179 prime?
True
Suppose 4*s - 14534 = 52446. Suppose -4*q = -5*d + s, 3*d - 5*q - 7592 = 2455. Is d a prime number?
False
Suppose -918*b + 922*b - 139581 = -m, 2*m - 279156 = -2*b. Is m prime?
False
Let g(v) = -228*v**3 + 14*v**2 - 4*v - 19. Is g(-6) a prime number?
True
Suppose -195 = 3*q - 3*k, 0*k = -q - 5*k - 89. Let o = -57 - q. Suppose -n + 61 = o. Is n prime?
False
Suppose 0 = -5*v + 2*c + 23, 0 = -2*v + 4*v + c - 2. Suppose -5*x = -5*q - 25, 5 = v*q - 2*x + 3*x. Suppose 2*d - 5*r = 731, q*d - 1116 = -3*d + r. Is d prime?
True
Let z(k) = 572*k + 1. Suppose -5*g + o = -10 + 2, -2*g - 4*o = 10. Suppose t + p - g = 5*t, 5*t + p - 10 = 0. Is z(t) a prime number?
False
Is 32860683/696 - 10/16 composite?
True
Let m be 120/(-1020) + (-64)/34. Is 12/16*m*(-7556)/6 a prime number?
True
Suppose 4*n = 5*m - m - 86444, 2*m + 5*n - 43208 = 0. Suppose -7*j + x + m = -2*j, 0 = -2*j - x + 8638. Is j prime?
False
Let x(r) = r**3 + 31*r**2 + 38*r + 64. Let n be x(-32). Let l = n + 4679. Is l prime?
True
Suppose -5*g - 14 = 2*g. Let a be (((-20)/3)/g)/(10/(-30)). Let b(c) = c**3 + 12*c**2 + 11*c + 29. Is b(a) a prime number?
False
Let b = -211976 + 396999. Is b a prime number?
False
Let n(t) = -3*t - 4. Let b be n(0). Let c(x) = -2*x - 10. Let p be c(b). Let u(i) = -30*i - 5. Is u(p) prime?
False
Let r = 298 + -465. Let n = 776 + r. Let m = n - 431. Is m a composite number?
True
Suppose 2*x = -x - 15. Let v = -4 - x. Is (v - 32/6)/((-6)/18) composite?
False
Let y(p) be the third derivative of 187*p**5/60 - 5*p**4/24 + p**3/6 - 60*p**2. Let g(x) = x**3 - 11*x**2 - x + 13. Let c be g(11). Is y(c) composite?
False
Let s be ((-1)/(-6) - 8/48)*1. Suppose 2*x + 8 + 18 = s. Is -2 + x/(-6) - 4011/(-18) a composite number?
False
Suppose 78*f + 132 = 81*f. Let k = -40 + f. Suppose 5640 - 14452 = -k*m. Is m a prime number?
True
Let h(x) = 20*x**2 - 8*x - 18. Let j be h(-7). Suppose -5*i = -2*m + 4416, -3*i = -m + j + 1191. Is m prime?
True
Is (282114/(-21))/((-3)/4) + -9 prime?
True
Is (-474878)/(-3) + (-134)/(-603)*(-6)/(-4) a composite number?
False
Let o = -45 - -40. Let q be (o + 4)/((-4)/(-92)). Let k = q + 162. Is k composite?
False
Let p be (49/(-35))/(21/(-5) - -4). Is (-4)/(p/(6629/(-2))) a prime number?
False
Suppose p = 3*p. Suppose -s + 40 = 4*s. Is (358 - (0 - p))*4/s prime?
True
Let t be (-2 - (2 + -8))/(4/2). Suppose y - f - 8698 = 0, -8*y + 4*y = t*f - 34780. Suppose 11*x = 19*x - y. Is x prime?
True
Let w(a) = a**3 - 12*a**2 - 3*a - 7. Let y be w(11). Let k = y - -1556. Suppose 268 = b + 2*s, 0*b + 5*b - s = k. Is b composite?
True
Let v(d) be the second derivative of -127*d**3/6 - d**2/2 + 49*d. Let z = 19 + -21. Is v(z) composite?
True
Let h = 31096 + 1137. Is h prime?
True
Let b(s) = 27*s**2 - 15*s + 27. Let c be 36/(-27)*1*-6. Let x(r) = 41*r**2 - 22*r + 41. Let z(m) = c*b(m) - 5*x(m). Is z(-6) prime?
True
Suppose -4*v + 3741 = q, -5*q - 2*v + v = -18686. Let y = q + 64614. Is y composite?
False
Let i = 10 - 2. Let g = i - 6. Suppose 2*d + 7*t - g*t = 813, 5*t - 1651 = -4*d. Is d a prime number?
True
Let b(t) = -21*t + 44. Suppose 4 = 5*n - 11. Let g(d) = 20*d - 43. Let k(a) = n*g(a) + 4*b(a). Is k(-6) prime?
True
Suppose 111839 = -87496*b + 87503*b. Is b a prime number?
False
Suppose -41*t + 28*t = 67*t + 240. Let u(k) be the third derivative of 113*k**5/60 + k**3/3 - k**2. Is u(t) composite?
False
Let b = 3392 + -8034. Let r = b - -9903. Is r composite?
False
Let r(n) = -25*n + 236. Let b be r(43). Let v = b + 7600. Is v prime?
True
Let d = -1168841 + 2079482. Is d a prime number?
False
Suppose w = a + 5*w + 130, 4*w = -8. Let u be (-8 - (-3066)/(-24))/(6/(-8)). Let s = a + u. Is s a prime number?
True
Suppose 4*q - 13507 - 1277 = -2*w, 4*q - 4*w - 14760 = 0. Suppose -2*j = -0*j - q. Is j prime?
True
Let d(o) = -48*o**2 - 22*o - 102. Let j be d(-14). Is 21/28 + (-2)/(16/j) a composite number?
False
Suppose -629 = -a + 4*q, 4*a - 5*a + 611 = 5*q. Suppose 6*i - 777 = a. Is i composite?
False
Is (35811/(-1038))/(6/(-1868)) a composite number?
True
Let r be 0 - 6*8/12. Let s be (r/14)/((-1)/14). Suppose s*q + 4*d - 237 = 3*q, -q + 237 = 2*d. Is q composite?
True
Suppose -3*i + 4*f = -f - 169, 5*i - f - 245 = 0. Let q be (-32)/i - 5/(-6)*3326. Suppose 1015 = -4*r + q. Is r a prime number?
True
Suppose -22 = -4*p - 2, 3*p = 5*h - 304280. Is h prime?
True
Let g be (-14)/12 - -5 - 1/(-6). Suppose -g*l + 10 + 1 = 3*z, -l = 5*z + 10. Suppose 0*c + l*x = 3*c - 11818, -3*c = 2*x - 11825. Is c prime?
False
Let l be (-1 - 1) + 24/4. Suppose -2*w = -l*r + 23466, r = -w - 0*w + 5871. Is (-2)/4 + r/8 prime?
True
Let h be (3 - (2071 + -1))*22/(-6). Suppose -12*q + h = -q. Let z = q + 56. Is z a composite number?
True
Is (-28)/(-4) - 2794128/(72/(-6)) a composite number?
True
Let n(u) be the third derivative of -u**4/12 + 2*u**3/3 + 5*u**2. Let p be n(3). Is (p - 4090/6)*(-6)/2 a composite number?
True
Let k(o) = 5105*o - 692. Is k(5) composite?
True
Let s(t) = 2*t**3 + 8*t**2 + 8*t - 11. Let q(c) = -c**3 + 6*c**2 - 9*c + 26. Let a be q(5). Is s(a) prime?
True
Suppose 0 = 4*r - 11 + 3. Is (-13)/13 - (-12684)/r prime?
False
Suppose -4*g + 2*p = -1934, 0*g + 2*p = g - 485. Suppose -n + 135 = -191. Let o = g - n. Is o composite?
False
Suppose -2*z = 3*z - 2410. Suppose -371 = -h + z. Is h prime?
True
Suppose 25186317 = 57*p - 25409106. Is p prime?
False
Suppose 4*y - d = -4*d - 2435, -y + d - 614 = 0. Let n = y - -993. Suppose 3*b - 4*b + n = 0. Is b a prime number?
False
Let c = -79 - -86. Suppose h - 4*l = -c - 2, 5*h - 47 = -3*l. Is (-2)/h + (-3335)/(-35) a prime number?
False
Let f(j) = 9*j**2 + 80*j + 878. Is f(-53) composite?
True
Let h(v) = -8*v**2 + 3*v - 2. Let o be h(1). Let n be (-2)/o - 89/(-7). Suppose n*t - 5388 = t. Is t a prime number?
True
Let w(t) = -208*t - 4366. 