11). Suppose a*v = 3*v + y. Is v a composite number?
False
Let r = 1516 + -1512. Suppose 0 = -7*i + 4*i + 30. Is (i/r)/((-4)/(-1112)) a composite number?
True
Let b be ((-1)/(-2) + 1)/(4/280). Let q(a) = 60*a + 4. Let d be q(3). Let t = d - b. Is t a composite number?
False
Suppose 8*b + 244 = 4*b. Suppose -1060 = -3*w + 4*s, -355 = -w + s + 2*s. Let a = b + w. Is a a prime number?
False
Suppose -5*a + a = -r + 1949, -3*r = 4*a - 5927. Is r a composite number?
True
Suppose -7*z - 8*z + 30 = 0. Suppose -i - z*t + 1572 = 0, 4*i - 2213 - 4079 = -4*t. Is i a composite number?
True
Suppose -3*n + 210 = q, 0*q + 5*q = -n + 1050. Suppose -2*k + 688 = q. Is k prime?
True
Let z = -1154 - -2728. Is z a prime number?
False
Let u(z) = 94*z**2 - 64*z + 31. Is u(9) composite?
False
Suppose 5*d + 15 = 2*u, -3*d - 2*u = d + 30. Let g(r) = 9*r**2 - 3*r - 5. Is g(d) prime?
False
Suppose -2*h - 2352 = -3*s, 4*s + 4*h + 319 - 3455 = 0. Suppose 0 = d + 4, -2*d = -4*k + s. Is k prime?
False
Suppose 59*c - 63*c + 6108 = 0. Is c prime?
False
Let k = -271 + 67. Let s = 5 - k. Is s composite?
True
Let p = -52624 - -94005. Is p prime?
True
Suppose 20204 = 14*y - 10*y. Is y a composite number?
False
Let t(o) = o**3 + o**2 + o. Let i(x) = 7*x**3 + 10*x**2 + 3*x - 6. Let u(k) = -i(k) + 6*t(k). Let z be u(-5). Let j = 35 - z. Is j prime?
True
Let c be -88*-1*1/1. Let p = c + -11. Is p prime?
False
Let h(a) = -295*a + 6. Let p be h(5). Let u = p - -2110. Is u a prime number?
True
Suppose -76 = 5*g - 7911. Is g composite?
False
Let y(z) = -z**2 - 7*z - 7. Let h be y(-5). Is (-3195)/(-12) - h/(-4) a prime number?
False
Suppose -2*z = -r - 21071, 4*r - 7 = 5. Is z composite?
True
Suppose 2*t = -2*t + 32. Suppose v = t*v - 2359. Is v a prime number?
True
Let n = 17 - 19. Is (-1492)/(-3) + n/6 prime?
False
Let u(b) = -4*b**3 + 15*b**2 + b - 1. Let w(k) = 2*k**3 - 8*k**2 - k + 1. Let d(t) = -4*u(t) - 7*w(t). Let p be d(3). Is 2/8 + 6402/p a composite number?
True
Let w(v) = -v**2 - 8*v - 1. Let p be w(-7). Let h(n) = 1 + 3*n + 10*n - 11*n. Is h(p) a prime number?
True
Let f(g) = 49*g**2 + 9*g + 23. Let a(j) = 24*j**2 + 5*j + 11. Let y(d) = 9*a(d) - 4*f(d). Is y(6) a composite number?
True
Let g(z) = 2254*z**2 - 9*z + 9. Is g(4) a prime number?
True
Suppose o = 4*p - 107, -4*o + 14 = -0*p + p. Let g = -34 + p. Is 4/g + 1773/6 a composite number?
True
Suppose -x + 6343 = -85*d + 87*d, -3*x - d + 19024 = 0. Is x composite?
True
Let v(n) = 2 + 2 + 155*n + 230*n - 1. Is v(4) a prime number?
True
Suppose -5*o + 658 = -1222. Suppose 2133 = 7*n + o. Is n prime?
True
Let a = 50 - 47. Is 254 - 1/a*9 a prime number?
True
Let v = 4136 - 1827. Is v a prime number?
True
Let i be (4/9)/((-4)/(-18)). Suppose -i = -4*b + 6. Suppose b*g - 3*g = -131. Is g a prime number?
True
Let h(c) = -111*c - 163. Is h(-26) a prime number?
False
Let v be ((-6)/33 - 13/(-11))*2. Suppose -v*n = 3*n + 20, -4*x - n = -9808. Is x prime?
False
Let y(v) = -5*v**2 - 2*v - 1. Let p be y(-1). Let o(r) be the second derivative of -6*r**5/5 + r**4/6 + r**3/2 + 3*r**2/2 - 27*r. Is o(p) composite?
False
Suppose -2*o - 21 = -1. Let p be ((-8)/o)/((-2)/25). Let f(t) = -7*t - 1. Is f(p) prime?
False
Suppose 0 = 13*l - 18*l + 45. Suppose -l*g + 8*g + 77 = 0. Is g composite?
True
Let f(a) = a**2 - 2*a - 5. Let l be f(4). Suppose 2*b = -b - 5*n - 5, -27 = -3*b + l*n. Suppose 2*c - 169 = -3*j, 2*c - b*j - 139 = -2*j. Is c a prime number?
False
Suppose -4*u + 24 = -u. Suppose 2*f = -u, t + 1138 = 4*t + 2*f. Is t a composite number?
True
Let b be 1*(-82)/1*-1. Suppose 0*m - m = 3*a + b, 0 = 5*m + 2*a + 410. Let p = m + 149. Is p a composite number?
False
Let i = 63 - 59. Suppose -2*a + 5*q = -685, 6*q - q + 1355 = i*a. Is a composite?
True
Let t = 119068 + 26931. Is t a prime number?
False
Let o(m) be the first derivative of 3*m**2 - 1/4*m**4 + 3*m**3 - 17*m - 1. Is o(9) composite?
False
Is (-6493)/((2/(-8))/(1/4)) composite?
True
Let u be (-16544)/(-6)*(-9)/(-6). Suppose -11*d + u = -3*d. Is d composite?
True
Let c(v) = -13*v + 6. Let r be (-4)/26 + 90/78. Let d = -8 + r. Is c(d) prime?
True
Let k(o) = -6*o - 3*o + 9*o**2 + 6 + o. Let y(i) = -2*i**3 - 73*i**2 - 38*i - 67. Let u be y(-36). Is k(u) a prime number?
True
Let c = 202 - 113. Let k = c - 27. Is k composite?
True
Suppose 2*l + 33449 = 5*r, -r + 8*l = 15*l - 6675. Is r prime?
True
Is 3/2*130/(-39)*-1699 a composite number?
True
Suppose 68 + 22 = 3*n. Let c be (2 + n)/4 + -2. Suppose -c*p + 858 = -72. Is p prime?
False
Suppose 5*h - 13376 = 39749. Suppose n = -4*n + h. Suppose -2233 - n = -5*x - v, 0 = -4*x - v + 3487. Is x a composite number?
True
Suppose -11*n + 154188 = -7*n - 4*q, -6*n + 231274 = -4*q. Is n prime?
True
Suppose -2*v = 2*t - 5*t + 41, 0 = -t + 3*v + 9. Suppose 4*z + y - 3 = z, -3*z + 3*y + t = 0. Suppose z*n - 466 = -5*f, n + 5*f - 30 = 213. Is n a prime number?
True
Let x(j) = -j**3 - 40*j**2 + 77*j - 20. Is x(-42) a prime number?
False
Suppose 6*m - 25*m = -25973. Is m a prime number?
True
Suppose -c - 7 = -9. Suppose p = c*u - 3*u + 2239, -u + 4*p = -2229. Is u a composite number?
False
Let u = -113 + 111. Is 2/(-1 - u) - (-11 - 2038) a prime number?
False
Let d = -1105 - -2998. Is d composite?
True
Let d(w) = 19 - 765*w**2 + 8 - 7*w - 2 + 768*w**2. Is d(5) composite?
True
Let n = -29 + 32. Suppose n*w = -3*x + 5640, 4*x + 9424 = 5*w + x. Is w prime?
False
Let i(r) = -r**2 - r. Let c(p) = p**3 - 12*p**2 - 12*p - 14. Let h be c(13). Let z be i(h). Suppose -o - 425 + 1542 = z. Is o a prime number?
True
Suppose 5*g - 4*t = 1247, 663 = 5*g + 3*t - 598. Is g composite?
False
Let v(c) = c**3 + 4*c**2 - 4*c + 90353. Is v(0) composite?
False
Let n be ((-15)/(-15))/((-1)/(-6)). Suppose j = -n*j + 3913. Is j prime?
False
Suppose -5*l = -3*x - 6599, 3*x - 5*x - 3959 = -3*l. Let d = -234 + l. Is d a prime number?
True
Let v(r) = -2*r**3 + 7*r**2 - r + 2. Let a be v(-5). Let s(w) = -278*w**2 - 5*w - 4. Let m be s(-1). Let f = a + m. Is f a prime number?
False
Suppose 2*v + 3410 = s - v, 0 = -5*s - v + 17002. Is s a composite number?
True
Suppose 0*f = -28*f + 2089220. Is f composite?
True
Let b(l) = -2*l - 5. Let z be b(-5). Suppose -z*t = -t + 2376. Let r = 1227 + t. Is r a prime number?
False
Suppose -4*y = -2*c + 502, 0 = 2*c - 2*y - 398 - 96. Let h = c - 124. Suppose i - 4*w = h, 3*i + 4*w = -i + 516. Is i prime?
True
Let z = -12 + 15. Suppose -2*l = -z - 1. Suppose -u + 0*s = -4*s - 31, 0 = 2*u - l*s - 44. Is u composite?
False
Let b(g) = 3*g**3 - 8*g**2 - 2*g + 8. Let d be 10 + (2/1 + -8)/2. Is b(d) composite?
False
Let c(v) = 6*v**2 + 31*v + 4. Suppose -9*m - 12 - 123 = 0. Is c(m) a prime number?
False
Let d(q) = -4*q**2 - 28*q - 90. Let t(z) = 2*z**2 + 14*z + 45. Let w(l) = 2*d(l) + 5*t(l). Is w(14) a prime number?
False
Suppose 0 = k + 2*r - 202 + 70, 0 = k - 2*r - 144. Suppose a + 2*a = k. Is a a composite number?
True
Let x(g) = -g**3 + 16*g**2 - 14*g - 13. Let n be x(15). Let j be ((-8)/12)/(n/(-6)). Suppose -4*o + 2*o = -z - 751, 726 = j*o + 4*z. Is o composite?
False
Suppose 137155 = 20*l - 134965. Is l composite?
True
Suppose -2*a = -3*w - 53, 5*a - 105 = 9*w - 7*w. Is (a/(-38))/(1/(-4434)) a composite number?
True
Suppose h + 106 = -3*h + 2*r, -h + r = 29. Let g = 38 + -26. Is (-5586)/h - (-3)/g composite?
False
Let g(y) = 6*y - 4. Let k(i) = 5*i - 3. Let c(w) = -4*g(w) + 5*k(w). Let p(m) = 3*m**2 - 4*m - 3. Let t(r) = 6*c(r) + p(r). Is t(4) prime?
True
Let h(r) = -r**2 + r + 1. Let o be h(0). Is (4 + -2 - -1676) + o prime?
False
Let n(f) = -15*f - 42. Let c be n(-16). Suppose -5*j = 3*r - c, 2*r - 29 = 4*j + 125. Is r prime?
True
Suppose -2 + 28 = -2*j. Let f be 2 + 4 + j + 1. Is (10 - f) + 2 + 1 composite?
False
Suppose -122 = 4*v - 6*v. Let d = v - 30. Suppose u - d = 127. Is u prime?
False
Let p(g) = -20*g**2 - 10*g + 9. Let j be p(-9). Let y = j - -2282. Let r = -150 + y. Is r a composite number?
True
Let k be (5/3)/(3/9). Suppose -k*p + 5190 = 745. Is p prime?
False
Let c(b) = 7*b**3 - b - 1. Let j(i) = -i**3 - 5*i**2 - 6*i - 4. Let y be j(-4). Is c(y) a composite number?
False
Suppose 53355 = 54*h - 51*h. Is h composite?
True
Let n = -45 + 80. Suppose 38*a - 1923 = n*a. Is a prime?
True
Suppose t + 5*n = 2*n + 8558, 0 = -4*t - 2*n + 34262. 