 f(t) = 429*t + 66. Let y be f(9). Let c = -484 + y. Is c a prime number?
False
Suppose -x + 219 = -57. Is 5035/(-4)*-1 - (-69)/x composite?
False
Is (-102)/(-15) + (-30)/(-25) - -10255*5 a prime number?
True
Let x(y) = -3 - 31*y - 117*y**3 + 232*y**3 + 5*y**2 + 2 - 114*y**3. Is x(20) a prime number?
False
Is 398/3184 + 6*1066503/48 a composite number?
True
Let a(k) = 8*k**2 - 15*k - 5216. Is a(-153) prime?
True
Let d(z) = -16080*z - 847. Is d(-12) prime?
True
Suppose -3*j = 5*i - 452388 + 65375, 6*i = -24. Is j composite?
False
Suppose 186*r - 185*r + 3 = 0. Is 4/4 + (-28512)/r a composite number?
True
Suppose 5*s - 2 - 48 = 0. Suppose -4*k - l = -0*l - 9, -4*k - 2*l = -s. Suppose -k*x = 5*y - 9117, 4*y + 5*x + 0*x = 7297. Is y prime?
True
Suppose 33*y - 34*y = -41505. Suppose 17*c - y = 2*c. Is c a prime number?
True
Let f = 1 + 0. Suppose 2*o - 5 + f = 0. Is 1395 + (o - 6)*-1 prime?
True
Let c = -51637 + 221760. Is c prime?
True
Let v(h) = -2*h**2 + 5*h + 1. Let w be v(2). Let d be -4 - (4 - w - 5). Is 459 - (d + (-7 - -3)) composite?
False
Let u(o) = -143*o + 3208. Is u(3) composite?
True
Suppose 4*l + 7 = -2*p + 33, p = 4*l - 17. Suppose -d = l*o - 3*o - 2740, 0 = 4*d. Suppose -w - w = -o. Is w prime?
False
Suppose -3*o - 501 = -2*j, -2*j + 6*j = -3*o + 1011. Let z = j - 230. Is z a composite number?
True
Is -5 + -4994*101/(-1) a prime number?
True
Suppose 3*d - 5 = 3*g - 104, 0 = -3*g + 2*d + 102. Is ((-152568)/g)/((-2)/(2 - 1)) prime?
False
Suppose 8*x = -27 - 21. Is 1/(-2)*((-5 - x) + -7527) prime?
False
Suppose 393*f + 2979985 = 398*f. Is f a prime number?
False
Let b be (-3)/(6/(-10176 - 6)). Let h = -3454 + b. Is h composite?
False
Let v = 6959 + -3204. Suppose 0 = -9*n + 107602 + v. Is n composite?
False
Let d be (83178/(-12))/((-4)/(240/(-9))). Is (15/(-30))/(5/d) composite?
False
Let z be (-226 + 1)/(13/(-390)). Suppose 4*m - 6000 = 5*i + 7480, -2*m + z = -5*i. Is m composite?
True
Let a be (-11)/(-2*(4 + (-1365)/342)). Suppose 2274 = 2*w - 2*o, -4*o = w - a - 520. Is w composite?
True
Let v(w) = 4*w**2 + 4*w + 2. Let a be v(-4). Suppose 43*n - a*n = -34363. Is n composite?
False
Suppose 0 = 3*m + 9, -12 = 4*v - 0*m + 4*m. Is (24 - 29) + 16966 + v prime?
False
Let f(g) = -15*g - 32. Let b be f(-3). Suppose b*l - 8195 = 2*l. Is l prime?
False
Let u(o) = o + 6. Let q be u(-11). Is ((-4835)/q)/1 + 0 a prime number?
True
Let w be 26350 - (12 - 7 - -1). Suppose 72*z - 64*z = w. Is z a composite number?
True
Let a(i) = -92*i + 69. Suppose -9*v - 10*v = 361. Is a(v) composite?
True
Let v(u) = u**2 + 16*u + 25. Let g be v(-14). Let y(q) = -59*q**3 - 8*q**2 - 13*q - 3. Let t be y(g). Let l = t + -1108. Is l composite?
False
Suppose -4*p = 39 + 109. Let i = -38 - p. Is -1*(i + 584/(-2)) a composite number?
False
Let a(w) = w**3 + w**2 - 2*w + 12234. Let s be a(0). Suppose -16*l + s - 4154 = 0. Is l a composite number?
True
Is (6132112/(-280))/((-4)/10) composite?
False
Is (126/(-28) - 0)/(3/(-585942)) - 8 prime?
False
Let z be (-167869)/(-629) + ((-64)/34 - -2). Let h = 195 + -23. Suppose -u + z = -h. Is u a composite number?
False
Let i be 194*(-2)/12*(-2 + -1). Let o = 95 - i. Is 2/(-7 + 5)*(o - 2861) composite?
True
Let l = 302828 + 47201. Is l a prime number?
True
Is 3194802809/1774 - 7/(-2) a prime number?
True
Suppose -58*f + 63*f = 17660. Suppose -w + 773 = 2*v - 991, -f = -2*w - 3*v. Suppose u - w = -3*u. Is u prime?
True
Suppose -40 = x - 9*x. Suppose x*f - 57725 = -0*v + 5*v, -4*f - 3*v + 46166 = 0. Let l = f - 7950. Is l a prime number?
True
Let z(q) = 318*q + 25. Let m(t) = -953*t - 76. Let c(h) = 4*m(h) + 11*z(h). Let d be c(13). Let s = -2124 - d. Is s composite?
False
Suppose -h - 4 = -3*v + 4, 8 = 2*v. Suppose -2*m + 2*y = -40106, -h*y - 60159 = -3*m - 3*y. Is m prime?
False
Let q(j) = -j. Let u(w) = -w**2 + 13*w + 34. Let f(m) = 3*q(m) - u(m). Let n be f(18). Suppose -5*i = -0*i + 10, n*h - 4336 = -3*i. Is h prime?
False
Let c(y) = y**3 + 16*y**2 - 37*y + 76. Let f be c(-34). Let a = -1103 - f. Is a prime?
True
Let s(t) = -1. Let a(z) = -5*z - 8. Let w(v) = a(v) + 5*s(v). Let p be w(-3). Suppose -4*u - 1554 - 291 = -g, u = -p*g + 3708. Is g a prime number?
False
Is 1/4*(214 - -89518) a composite number?
False
Let t be -2 + 52/24 + 3/(-18). Let h be 5*(-6)/(-15) + 1137. Suppose t = -2*u + u + h. Is u composite?
True
Suppose -2*y + 88 = q, 146 = -5*q + 2*y + 538. Is -22*(64/q - (-846)/(-20)) a prime number?
False
Let p = 24 - 19. Let l(o) = 26*o**2 + 29*o + 33. Let v be l(-19). Suppose u + v = p*u. Is u a prime number?
False
Let n(d) = -d**3 - 13*d**2 + d + 36599. Is n(0) prime?
True
Is 156007 - ((-40)/16)/(20/(-48)) a prime number?
False
Let v(q) = 1692*q**2 + 4*q + 5. Let h be v(-1). Let p = h - -1510. Is p a composite number?
False
Let j(z) = -z**3 - 6*z**2 + 9*z + 13. Let t be j(-7). Let f(a) = -11994*a**3 + a**2 + 3*a + 3. Is f(t) a prime number?
False
Let y(l) = -3*l**3 + 193*l**2 + l - 30. Is y(63) composite?
True
Let p = -64 + 66. Suppose -p*z - 3 - 9 = 4*j, -j - 5 = 0. Is (4 - 10/3)/(z/3054) prime?
True
Let q(k) = 3975*k + 1283. Is q(13) a composite number?
True
Suppose 4*l = 3*c - 3771, 12*l + 4*c + 4675 = 7*l. Let h be 6590/(-4) - 1/2. Let t = l - h. Is t prime?
True
Suppose 0 = -328*q + 323*q + 537205. Is q a prime number?
True
Let u = 0 - 0. Let i(c) = 5*c**3 - 5*c**2 - c - 1667. Let r(f) = f**3 - f**2 - 4. Let x(t) = -i(t) + 4*r(t). Is x(u) a prime number?
False
Let q = -35392 - -110139. Is q composite?
False
Suppose 5*l + 359756 = 9*l. Is l composite?
False
Let q(i) = 3359*i + 55. Suppose 4*j - 6*y - 30 = -4*y, -2*j + 19 = 3*y. Is q(j) a prime number?
True
Is (-6)/5 - ((-9769914)/45 - -10) - 7 composite?
True
Let z(h) = 1935*h**2 + 58*h - 417. Is z(8) composite?
False
Let f(v) = -v**3 - 15*v**2 - 2*v - 28. Let g be f(-15). Suppose -4784 = -g*z - 1122. Is z a composite number?
False
Let q(j) = -j**2 + j + 4. Let x be q(-2). Let s be x - (3 + -4) - -720. Suppose -3*p + s + 1978 = 0. Is p a composite number?
True
Let v(w) = -7*w**2 - 37 - 18*w + 11*w + 43*w**2 - 4*w**2. Is v(12) prime?
False
Let y = 39 + -16. Suppose -2*k + 21 = y. Is k*(-3 - (0 + 116)) prime?
False
Is 23/(644/24) - 11508893/(-77) prime?
False
Suppose 0 = -332*c + 203*c + 2580. Let j be (-2126)/(-4) + (-2)/4. Let s = j + c. Is s a composite number?
True
Let l(s) be the first derivative of 26*s**3/3 + 27*s**2/2 + 4*s - 47. Is l(-9) composite?
False
Let v be 16/(-56) + 624/(-21). Let f be (-4520)/v + 4/(-6). Suppose f + 149 = g. Is g a composite number?
True
Let v = -47 + 50. Let y be (44/v)/((-54)/(-1053)). Let o = 1944 - y. Is o a composite number?
True
Let z = 62 + -56. Suppose -5*v - 565 = -u, z*u - 3*u = -3*v + 1767. Is -2 + (-25)/(-10) - u/(-2) a prime number?
True
Let c(i) = -3864*i**3 + 11*i**2 - 6*i + 12. Is c(-5) a composite number?
False
Suppose -4586 = -2*f - 2*j, -f + j - 4*j = -2289. Let i = 21686 + f. Is i a prime number?
True
Let f(r) = -r**2 - 1. Let x(l) = -8*l**2 + 16*l + 9. Let q(j) = -6*f(j) - x(j). Let p = -19 + 32. Is q(p) a prime number?
False
Let a be (-1)/((24/20)/6) + -125. Is (a/20)/(1 - 4606/4604) prime?
False
Let a = 14657 - -17824. Suppose 9837 + a = 6*g. Is g composite?
True
Let n(f) = -118*f**2 + f + 13. Let y be n(-7). Let t = 12449 + y. Is t composite?
False
Let x be -17637*(10/2)/(-15) - 2. Suppose -105*u + 96*u + x = 0. Is u prime?
True
Is 460 + 84 - 1*9 a composite number?
True
Suppose h + 4*t + 2620 = 0, 0*t + 5*t = 4*h + 10585. Let f = h - -4106. Is f composite?
True
Let t be (-533)/(-65) + 3/(-15). Is (-74009)/(-52) + (-2)/t composite?
False
Suppose 12*d + 107756 = 406053 + 263939. Is d a prime number?
True
Let q = 454 + -450. Suppose 3*z - 19768 = o, -8*o + 26361 = q*z - 13*o. Is z a prime number?
False
Let t(y) = -7*y - 1. Let z be t(3). Let x be 1/3 + -926*(-170)/51. Let g = x - z. Is g a composite number?
False
Let q = -28 - -19. Let u(t) = -t**3 - 9*t**2 + 3. Let l be u(q). Suppose -l*z + 8*z + 3*d - 633 = 0, 5*z + d - 641 = 0. Is z a composite number?
True
Let a be (-1 - 4)/((-2)/((-4)/(-1))). Suppose -1098 = -a*k + 512. Is k prime?
False
Suppose 671 = f - 5*s, f = -s + 4*s + 671. Suppose -2*g - 137 = -f. Suppose -3*m = -3*y - g, -3*y = 4*m - 285 - 71. Is m prime?
True
Let c = -960114 - -2428501. 