. Is b/14 + 20/(-35) composite?
False
Suppose -209 = b - p, -4*b + p - 477 = 368. Let x = -51 - b. Is x composite?
True
Suppose 47 = 3*l + 38. Is 9 - 7 - (-1 + l + -8209) a prime number?
True
Let l(v) = 2*v**2 + 18*v + 19. Let n be l(-8). Suppose -21163 = -n*r + 5*y, 0 = -r - 3*r + 2*y + 28236. Is r composite?
True
Suppose -x = -5 + 25. Let d = -18 - x. Suppose 391 = d*u + 5*k, 2*u - 3*u + 193 = 2*k. Is u a prime number?
False
Suppose -r - 3*o = -41869 - 80499, -122368 = -r - 4*o. Suppose 53*z - 919329 + r = 0. Is z a composite number?
True
Let a = 14522 - -43449. Is a a prime number?
False
Suppose -b - 2*b + 21 = 0. Let k(g) = 7*g**3 - 7*g**2 - 15*g - 19. Let q(a) = 6*a**3 - 7*a**2 - 15*a - 18. Let s(p) = 5*k(p) - 6*q(p). Is s(b) composite?
True
Let b = -8804 - -15402. Is b a prime number?
False
Let r = 2130 + -1052. Let h be (0 + 1)*1275/1. Suppose l = r + h. Is l composite?
True
Suppose 54*h - 773463 = 5504415. Is h prime?
True
Let f = -47181 - -245450. Is f composite?
True
Let h(w) = w**2 + w. Let l(z) = -z**3 - z**2 + 1. Let u(k) = -30*k**3 + 3*k**2 + 10*k. Let i(t) = -3*l(t) + u(t). Let q(a) = 6*h(a) - i(a). Is q(2) prime?
True
Let k be (-19 - -24) + (-1 + -3 - -2). Suppose -8*y + k*y = -4*s - 25019, 4*y = -2*s + 20010. Is y prime?
True
Let m(u) = 3*u**3 - 18*u**2 + 43*u + 3. Suppose -6*k - 91 = -13*k. Is m(k) composite?
False
Let i(j) = -j**2 + 11*j + 132. Let l be i(19). Let r be (-1)/(1 + 130272/(-130270)). Is 8*(r/l)/(-7) a composite number?
True
Let z be -4 + 7/(-2 + 1). Let c(l) = 8*l**2 + 4*l + l**2 - 13 - 23. Is c(z) a prime number?
True
Let s be 8004 - -1 - (-3 + 1). Suppose 10 = -4*z - l + 25, z - 7 = 3*l. Is s/119 + z/(-14) a composite number?
False
Is (5 - 4) + 5/(-6) - 20079650/(-60) composite?
False
Let b = 751908 + -412403. Is b prime?
False
Let g(i) = i + 20. Let l be g(-14). Suppose 0 = 5*n + 3*v - 29825, n + 23860 = 5*n + 4*v. Suppose -y - n = -l*y. Is y composite?
False
Let l(w) = 139*w - 139. Let i be l(2). Suppose 0 = -134*c + i*c - 31925. Is c prime?
False
Let y(g) = 210*g**2 + 4*g - 5. Let z be y(-3). Let x = -777 + -209. Let i = x + z. Is i composite?
False
Suppose 2*m + 2*p - 30 = 16, 45 = 3*m - 5*p. Let h(w) = 4*w**2 - 40*w. Let j be h(m). Suppose 1639 = 2*z - 3*f, -z + 5*f - j = -2*z. Is z composite?
True
Suppose -4*p + 158210 = -2*h, -2*p - 5*h + 36571 = -42528. Let k = p - 26731. Is k a composite number?
False
Let j = 3187 + -126. Suppose 11522 = 3*s - j. Is s a prime number?
True
Suppose -5*h + 30617 = -4*h. Suppose 5*a - h = 4*v, -5*a = -4*v + 2*v - 30611. Is a a composite number?
False
Suppose -5*j + 2*g - 392640 = 0, -4*g + 6*g = -j - 78540. Is (j/(-20))/(3/6) a prime number?
True
Let q = 976 + -150. Suppose -o - q = 2*a - 5*o, -2*o = -2*a - 826. Is -7 - a - ((-8)/(-2) - 1) prime?
False
Let r = -4509 - -2026. Let p = 28446 + r. Is p prime?
False
Let r = 84 + -79. Suppose -16 = -r*p + 3*a + 1876, 0 = -4*a + 4. Is p prime?
True
Let s(p) be the first derivative of 13*p**4/4 + p**2 - 8*p + 11. Let o be s(6). Suppose o = 4*n + 608. Is n composite?
True
Suppose -118*m = -20145643 + 3105617. Is m a composite number?
False
Let q = 69108 + -24691. Is q a composite number?
False
Let o(h) = -h**3 + 13*h**2 + h - 13. Let u be o(13). Let q be (u/(-1))/(4 - 3). Suppose -z - 3*z = -16, -5*v + 2*z + 2597 = q. Is v a prime number?
True
Let u = -350 - -356. Suppose -20792 = -4*y - 2*c, 3*y - u*c - 15589 = -10*c. Is y prime?
False
Let k(w) = 2*w**3 + 26*w**2 + 6*w - 22. Let n be k(-16). Let d = n - 9623. Is d/(-4) - (-7)/(-28) a prime number?
True
Suppose -5*y + 60 = 5*m, -24 - 1 = -5*y + 2*m. Suppose 7816 = y*p - 3*p. Suppose 2*z - 5*i + p = 4*z, -5*i = 4*z - 3888. Is z a composite number?
False
Let b be (-4)/(-6)*6*(-44)/(-8). Let i be (-136)/b - (-6)/33. Is 555 - -1 - ((-18)/i + -4) prime?
True
Suppose -28*n = -29*n + 3431. Is (n + 12/6)/1 composite?
False
Let r = 1158 + 6743. Is r a prime number?
True
Let s(j) = 3*j**3 - 2*j**2 + 2*j + 4711. Is s(0) a composite number?
True
Suppose 11*h + 2*h = 7956. Suppose 5*n - 4*g - 9501 = 0, h = -5*n - g + 10118. Is n composite?
False
Let i(k) = -30*k - 273. Let q be i(-9). Is 632 + (q/3 - -2) composite?
True
Let u be (-240)/(-25) - 9 - 114/(-10). Suppose -u*h = -4*h - 23416. Is h a prime number?
True
Is (34 - -17)*6927 - (-12 + 0) prime?
False
Suppose v - 84*i - 285118 = -87*i, 0 = 3*v - 2*i - 855387. Is v a composite number?
True
Let f(c) = 6295*c + 1. Let r be f(2). Suppose -19*g + r = -690. Is g a composite number?
True
Let v(o) = -373*o**2 + 4272*o**2 - 3 + 880*o**2 - 4*o + 16. Is v(2) prime?
True
Let u be -3 + -75*(3 - 26). Suppose -5*t + 2602 = -x, 886 = 5*t + x - u. Is t a prime number?
True
Suppose -5*o + 4*f = -183840, -6*o + 2*o = -4*f - 147068. Suppose -6*g = -10*g + o. Is g composite?
True
Suppose -3*x - 3*t + 27 = -6, 4*x - 30 = 3*t. Suppose 0 = x*v + 11546 - 99143. Is v prime?
True
Let h be 11608 + (4 + 31)/7. Suppose 2*u + 65 - h = -2*i, 4*u - i - 23121 = 0. Is u a composite number?
False
Let d(f) = 133*f**2 + 17*f + 15. Let n be d(-6). Let t = n + 1078. Is t a composite number?
False
Let x = -149628 - -641101. Is x a prime number?
False
Suppose -21*d = -13*d + 7144. Let x = d - -1534. Is x a composite number?
False
Suppose 0*l = -4*l - u + 29, -2*u + 37 = 5*l. Let b(t) = -6 - 3 + 175*t + 0 - l. Is b(3) prime?
True
Let i(j) = -j + 2. Let a be i(0). Suppose 5*r + 15485 = -2*g, -3*r + a*g = -0*g + 9307. Let y = r - -5768. Is y prime?
False
Let l be (-4 + -503)/(42/(-28)). Let c = l - -57. Is c composite?
True
Let n(k) = 24*k**2 + 32*k + 5. Let v be (6/4)/(2/84). Suppose -v = 11*u + 3. Is n(u) composite?
False
Let i = 68946 + 15961. Is i a composite number?
True
Suppose -2*f = -7 + 15. Let m be 2*(1 + 11)/f. Is ((-10)/15)/(m/27981) prime?
True
Let c be -1*(12/(-12) - (1 + -2)). Suppose c*o + 2*s + 578 = 2*o, o = 3*s + 295. Suppose -4*f + 5*q - 58 = -610, o = 2*f - 5*q. Is f composite?
True
Let w(r) = -r**2 + r. Let j be w(1). Suppose j = 2*b + m + 4, 4*b + 5*m = 2*b - 12. Is b*(-3)/(6/4) + 512 a prime number?
False
Suppose -889 - 1445 = -2*d. Let h = d - -10. Is h prime?
False
Is 1 - -102577 - (-94 + 85) a prime number?
True
Suppose -3*z + 2*c + 60131 = 0, 1658*c - 1657*c - 80149 = -4*z. Is z a prime number?
False
Let w(f) = 161*f + 78*f - 4 + 110*f. Is w(5) composite?
False
Let g be (-4 + (9 - 24/6))*13. Suppose -20*y + g*y = -150899. Is y composite?
False
Is 1 + (71872 + -1 - (3 - 0)) prime?
False
Is ((-115)/10*4)/(0 + (-2)/1499) a composite number?
True
Let p(k) = 3*k**2 - 16*k - 16. Let o(s) = s**3 + 8*s**2 - 8*s + 24. Let b be o(-9). Is p(b) prime?
True
Let p(t) = -t**3 - 9*t**2 - 4*t - 167. Let s be p(-32). Suppose 13*u = -607 + s. Is u composite?
True
Suppose 0 = -4*q + 4*k + 165936, -122702 - 43235 = -4*q + 3*k. Is -6 + 1/(5/q) + -4 composite?
False
Suppose -16 = 3*h - 5*h. Let v = h - 10. Is ((2 - v) + 0)*(-14)/(-8) a prime number?
True
Let o(d) be the second derivative of 41*d**3/6 + d**2 - d. Let k(j) = -42*j - 2. Let q(g) = -4*k(g) - 3*o(g). Is q(13) composite?
False
Let u(w) = w**2 + 20*w + 39. Let r be u(-18). Let j(o) = 2*o**2 - 4*o + 5. Let i be j(r). Suppose -10*p = -i*p + 127. Is p composite?
False
Suppose -3*r - 7970986 = -5*s, 0 = 5*s - 10*r + 13*r - 7971004. Is s composite?
True
Suppose 11*v = 2*v + 1215. Suppose 0 = v*w - 139*w + 3460. Is w a prime number?
False
Is (2/6*-2047077)/(3/(-1)) a composite number?
False
Suppose -6*u + 384 = -18*u. Is (0 - -2)/(u/(-18192)) composite?
True
Let w(o) = 591*o - 128. Is w(5) prime?
False
Suppose -d + 13229 + 5243 = -10714. Is d a prime number?
False
Suppose -95 = -4*m - 75. Let r(g) = g + 1. Let z(x) = 2*x - 9. Let b(q) = 2*r(q) + z(q). Is b(m) composite?
False
Suppose 18*p - 2150 = -112*p - 85*p. Let u(o) = o**2 + 7*o - 4. Let s be u(-7). Is p/45 + s/(36/(-8521)) a composite number?
False
Suppose r + 5*b = 12037, -2*r + 24096 = 5*b - 6*b. Suppose -6*p - 4830 = -2*t - 2*p, -5*t + 3*p + r = 0. Is t composite?
True
Suppose -3*f + 2*z + 43 = 0, 6*z + 75 = 5*f + 2*z. Let a be 1 - (f/(-4) - 1/4). Is 2/((-460)/(-904) - 2/a) a prime number?
False
Is (12 - (3 - -63143))*((-4)/2)/4 a prime number?
True
Let p = -17622 + 39025. Is p a prime number?
False
Suppose -1294286 = -4*o - 3*x, 5*o - 1701281 = -3*x - 83428. 