7811) - -2) prime?
False
Let i(m) = 519*m**3 - 8*m**2 + 11*m - 43. Is i(7) a prime number?
False
Suppose -779*z + 1562*z = 780*z + 302361. Is z a prime number?
True
Suppose -x + 9 = -g, x = 8*g - 3*g + 29. Suppose x*f = 5*l + 10, l + 3*l - 2*f + 14 = 0. Is 1 + (736/(-5))/(l/30) a prime number?
False
Suppose 4*c - 5*x = 7429627, -2*c + 3844603 = x + 129772. Is c prime?
False
Suppose -w + 2185424 = 6*r, -1092713 = -21*r + 18*r - w. Is r a composite number?
True
Let y be (18/33)/((-102)/(-748)). Suppose 2510 = y*v - 10*g + 8*g, v = -4*g + 641. Is v prime?
False
Let t = 158 + -158. Is (-12)/(-18)*3 + t + 237 a prime number?
True
Suppose 0*f - 8*f = -7008. Let a be f/(-7) - (-4)/28. Let t = a - -244. Is t prime?
False
Let f(t) = 5473*t**2 - 9*t - 8. Let s be f(-1). Suppose -1 - 5 = 3*h, -2*g + s = -4*h. Is g composite?
True
Let u(x) = -385*x**3 - 3*x**2 + 24*x + 19. Is u(-6) composite?
True
Let n = -368468 - -1075455. Is n a prime number?
True
Suppose 0 = 5*h - a + 3*a + 55, 5*h + 4*a = -45. Let j(w) = -9*w**3 - 12*w**2 + 10*w + 8. Is j(h) prime?
True
Let r(a) = 25782*a**2 + 611*a - 26. Is r(5) a prime number?
True
Let k(d) = d**3 + 2*d**2 + 4*d + 3. Let p be k(-3). Let c be 4/((-24)/p) - 0/1. Suppose 266 + 1222 = 2*m + 2*g, 0 = c*g - 15. Is m a prime number?
True
Let d = -216865 - -558566. Is d prime?
True
Suppose 2*t = 4*b - 118418, 58*b = 63*b + 5*t - 148030. Suppose 23*g + b = 28*g. Is g a prime number?
False
Let w(z) = -1664*z + 9. Let j be w(-3). Let p = 10581 - j. Suppose -4469 = -4*k + 3*s, -5*k + 8*s + p = 3*s. Is k composite?
True
Let c(w) = 55*w**2 + 6*w - 11. Let l be (7/(-35))/(2/(-30)). Is c(l) a prime number?
False
Suppose -3*d + 58669 = -2*b, 9*d = 8*d + b + 19555. Suppose 14*z - d + 6021 = 0. Is z prime?
True
Suppose -113826 = 93*h - 890097. Is h a prime number?
False
Suppose -z = 3*v - 12, 8*v = 13*v - 5*z. Suppose -3*t - 96155 = -5*o + t, -4*t = v*o - 57725. Is o composite?
True
Let t(f) = 266*f**2 + 8*f - 7. Let o(g) = -21*g - 40. Let c be o(-2). Is t(c) composite?
True
Let s = 1005998 + -494737. Is s a prime number?
True
Let m be 1/(-6)*10*-3. Suppose 8*g - 42 + 10 = 0. Suppose g*a - 5*v + 3*v = 1278, m*v + 659 = 2*a. Is a a prime number?
True
Let b(c) = -7*c - 68. Let p be b(-10). Suppose -2000 = -p*h + 1686. Is h a prime number?
False
Let k(u) be the second derivative of -u**4/12 - u**3/6 + 4*u. Let n be k(2). Is (3 + n)*5173/(-21) a composite number?
False
Let f = -17346 + 30439. Is f prime?
True
Is 1 + -2 + -5 + 176/(-16) + 4758 a prime number?
False
Let p = 79 + -74. Suppose -5*n = -15 - p. Is (n/(-2))/((-4)/958) prime?
True
Let u(i) = 111*i**2 - 10*i - 113. Is u(-10) composite?
False
Let l(r) = 1451372*r**3 - 3*r**2 - r + 1. Is l(1) composite?
True
Let a = -48328 - -84289. Suppose 40*i = 43*i - a. Is i a composite number?
False
Suppose 6*a = 2*a + 320. Suppose 47*v - 42*v - a = 0. Suppose 23*o = v*o + 10157. Is o a composite number?
False
Suppose 0 = -3*a + u - 95, -2*a + 3*a - 5*u + 55 = 0. Suppose 8 = 4*l, -3*y + l + 15 = -13. Is (266/(-6))/(y/a) a composite number?
True
Let p(x) = 2883*x - 1819. Is p(10) composite?
False
Suppose q - 2*q - 27238 = -3*k, 0 = k - 5*q - 9084. Let p = k + -5670. Is p prime?
False
Suppose 87069 = 5*z - 4*n, -34854 = 34*z - 36*z - 5*n. Is z prime?
True
Let y(k) be the second derivative of 29*k**5/10 - k**4/4 + 5*k**3/6 + k**2/2 - 29*k. Let j be y(5). Suppose -15*r + j = -35744. Is r a composite number?
True
Let s = -399527 + 869860. Is s prime?
True
Let n = -145270 + 221751. Is n prime?
True
Suppose 0 = -5*d + 23*d - 108. Suppose 5*q = -d*q + 45155. Is q prime?
False
Suppose 8*m + 185 = -1439. Let j = 540 + m. Is j a prime number?
True
Let n = 387 - 383. Suppose -n*b + 3605 = -10*q + 7*q, 5*b - 4*q = 4505. Is b a prime number?
False
Let l(a) = -11*a**3 + 10*a**2 + 28*a - 3. Let u be l(-3). Is 2/5 - (-1135980)/u a composite number?
True
Let m(x) = 23 + 5*x + 2*x - 7 + 2*x**2 + 2*x. Is m(13) a prime number?
False
Suppose 7*n = -6 + 13. Is (-3 + n)*((-10460)/8 - -3) composite?
False
Is (-5859864)/(-888) - (-2)/37 a composite number?
False
Suppose -5*m - 8220 = 2*x + x, 0 = 2*x + 5*m + 5480. Let c = x + 4977. Is c composite?
False
Suppose 3*s + 596 = 1850. Let a = -415 + 256. Let m = a + s. Is m a prime number?
False
Let o(q) = 35*q**2 - 53*q - 63. Let f be o(-22). Let y = -2745 + f. Is y a composite number?
True
Suppose -3*y - 5*v = -79087, -58*v + 53*v + 26349 = y. Is y a prime number?
False
Suppose -2*q + 8*q = 7*q - 86627. Is q prime?
True
Let f be (0 + (3 - 1) + -2)/2. Suppose f = 2*q + 14 - 14. Suppose q = -6*j + 175 + 821. Is j a prime number?
False
Let y(f) = 11*f**3 - 53*f**2 - 13*f + 45. Is y(28) prime?
True
Let h(n) = 12*n - 60. Let k be h(6). Is (k/27)/(26/117) prime?
True
Let q = -649938 - -1145599. Is q prime?
False
Let v(x) = 91*x**2 + 2*x - 445. Is v(22) composite?
True
Let f(j) = 4*j**3 + 5*j**2 - 104*j + 44. Is f(17) a prime number?
True
Let l(v) = 11*v**2 + 31*v - 8. Suppose 2*h + 4*w = 26, -2*w + 6*w + 37 = 5*h. Let g be l(h). Let y = -713 + g. Is y prime?
True
Let j = -70 - -71. Is 568272/12 - (-8 + j) composite?
False
Suppose -52 = -28*w + 4. Suppose w*z + 1696 + 2036 = 4*n, -2*n + 1866 = 2*z. Is n composite?
True
Let v(n) = 26*n**2 - 17*n + 22. Let q = 283 - 270. Is v(q) prime?
False
Suppose 3*i + 15 = 0, -r - i - 13 + 10 = 0. Suppose -5*n = -3*l + 6538, r*n = -l - 0*n + 2183. Is l prime?
False
Let p = -56 + 58. Let l(x) = -4 - 2*x + 17*x + 6*x**p + 2*x**2. Is l(7) prime?
False
Let n(w) = 193*w + 98. Let f be n(-8). Let k(b) = -77*b**3 - 2. Let a be k(3). Let u = f - a. Is u composite?
True
Suppose 2*t + m = -2*t + 25301, 3*m = -5*t + 31621. Suppose 2*w - t + 1108 = 0. Is w a prime number?
True
Suppose 11*h = 1240 + 806. Suppose 185*j + 2269 = h*j. Is j prime?
True
Let t = 41677 + -13235. Is t prime?
False
Suppose 2509 = 3*v + 8656. Let p = 2902 + v. Is p prime?
True
Suppose -8504 - 1016 = -5*c. Suppose -3*n = -294*p + 293*p - 946, 3*p + 2922 = -3*n. Let r = c + p. Is r a composite number?
False
Let w(q) = 272*q**2 + 50*q + 1151. Is w(-18) a prime number?
True
Let o(w) = -w**2 + 29*w + 53. Let p be o(32). Let z = p + 110. Suppose 71*d - z*d - 1324 = 0. Is d a prime number?
True
Suppose 0 = 151*w - 97*w - 1729336 - 299930. Is w a prime number?
True
Let r(n) = 3 + 18*n**2 + 70 + 3*n - n**3 + 54 - 19*n**2. Suppose -2*c - 3*b - b - 12 = 0, 5*c + 3 = -b. Is r(c) a composite number?
False
Is ((-4174391820)/289)/(-20) + (53/(-17) - -3) a prime number?
True
Is (-55)/66 + (-112906788)/(-72) a composite number?
True
Suppose 107760 = -23*h + 18*h. Let d = -38372 - h. Is 1/(-3) - (d/15 - -4) a prime number?
True
Let b(j) = 918*j - 7. Let d be b(10). Suppose -4*t = 3*q - d, 4*q - 8*q - 4570 = -2*t. Is t prime?
False
Let w be (-5)/(-10) + -2 + 267740/8. Suppose -11*c + 3813 + w = 0. Is c a prime number?
True
Suppose 0 = 2*q + 4*c - 1010810, 0 = -208*q + 206*q + 2*c + 1010864. Is q composite?
True
Suppose 83*j - 139294940 = -257*j. Is j prime?
True
Let c(q) = -q**3 + 59*q**2 + 131*q - 312. Is c(47) a prime number?
True
Suppose 0 = -0*j + 2*j - 4, -5*s + 19725 = 5*j. Suppose 100*k = 99*k + s. Is k a prime number?
True
Let i(h) be the first derivative of -h**4/4 + 2*h**2 - 4*h + 32. Is i(-9) prime?
False
Let m = -910 + 565. Let q = -52 - m. Is q a prime number?
True
Let j(g) = 3*g - 7 - 3*g + 23*g**2 - 11*g. Let y be j(-4). Let i = y - 118. Is i prime?
False
Suppose -4*c = -3*r - 6316 - 32598, -3*c + 2*r + 29185 = 0. Let z = -2220 + c. Is z a prime number?
True
Let r = 6281 - 5004. Is r prime?
True
Let r(c) = -109*c**3 - c**2. Let s be r(-3). Let h = 4162 - s. Suppose h + 461 = 3*g. Is g prime?
True
Let l(g) = 34*g**3 - 8*g**2 + 12*g + 7. Suppose 3*v - 378 = q, -q - 37 = -2*v + 216. Let k = v - 122. Is l(k) a composite number?
True
Let w = -1090 + 2245. Let i = w - 478. Suppose 3*a + i = 4*a. Is a composite?
False
Let r(j) = -4*j**3 - 7*j**2 - j + 14. Let p be r(-4). Suppose 912 = 5*v + p. Suppose 0*m - 3*m = 5*h - 221, 2*m - v = -2*h. Is m a prime number?
False
Let q(s) = 5573*s - 1727. Is q(32) prime?
True
Suppose -25*j + 18*j = -31927. Let z = j - -10108. Is z a prime number?
True
Suppose -3*q - 3353 = 2*h, q + 4*h = 2*q + 1141. Let g = q + 2632. Is g prime?
True
Let b(d) = -d + 2. 