Suppose -5*s + y = 0, 0 = -3*s + 8*s + 5*y. Suppose d + 4*u - 48 = s, -8*u - 61 = -2*d - 9*u. Is x(d) composite?
True
Is -30*(-18)/(-108) - (-1*5387 - -1) prime?
True
Suppose 14 = y - 4*k, 4*y + k + 4*k = -7. Is (-4419 + 6)/3*(-2)/y composite?
False
Let d(n) = -131922*n + 665. Is d(-9) a composite number?
True
Is 102896592/258*(-2)/(-16) composite?
False
Let c(d) be the second derivative of -3*d**5/20 - 25*d**4/12 - 47*d**3/6 - 19*d**2 - 6*d - 1. Is c(-21) a prime number?
True
Let h = -1279 - -3156. Let f = h - -3704. Is f a prime number?
True
Let d be ((-270)/(-12))/(-9)*4/5. Let b be ((-2)/8*d)/((-1)/86). Let y = -36 - b. Is y composite?
False
Let i = 33302 - -85665. Is i a composite number?
False
Is 1 + 1 - ((-348422)/212)/(3/510) a composite number?
False
Let a = 402 + 161. Suppose -a*m - 11811 = -566*m. Is m prime?
False
Let a be (-1)/(10/885)*(-1 + 3). Let l = 964 - a. Let j = l + -248. Is j a prime number?
False
Let r(a) = -a**2 + 24*a - 125. Let d be r(8). Suppose -55781 = -2*t - 3*s - 2*s, 3*s = d*t - 83640. Is t a prime number?
True
Suppose -3*a + 153*d - 148*d + 321879 = 0, -2*a + 214588 = -3*d. Is a prime?
False
Let g = 824843 - 455314. Is g a prime number?
False
Suppose 120*z = 71*z + 7084469. Is z prime?
False
Suppose 7*l + 195 = 3*l + y, -108 = 2*l - 4*y. Let c = 1591 + l. Is c prime?
True
Let q(f) = 3211*f**2 + 36*f - 14. Is q(3) composite?
True
Suppose -3*x + 21 = 4*d, 3*x - 6 = 4*d - 33. Is (-20944)/(-3) + d/9 prime?
False
Let j(g) = -g - 5*g**2 + 8*g**2 - 5*g + 2 - 3. Let l be j(-11). Suppose 7*v - l = 251. Is v a composite number?
False
Suppose 5*q + 25749 = 29*v - 27*v, -3*v = 5*q - 38561. Is -4*(-4)/32*v a prime number?
False
Let o be 6504/21 - ((-204)/28 + 7). Is o + (5/(-10))/(2/12) a prime number?
True
Is ((-245618)/(-4))/(36/(-24) + 2) composite?
True
Suppose m - 2*m + 1 = 0. Let v be (-6)/9*m - 40/(-6). Is (v/(-2))/(1/(-61)) + 4 a prime number?
False
Let l(j) = 22*j**2 + 4*j + 7. Let p be l(-4). Suppose t - 94 = p. Is t a composite number?
True
Suppose 1341 = 11*g - 518. Suppose 12*s - 25*s = -g. Is s a prime number?
True
Let b = 43589 + 31664. Is b a prime number?
True
Suppose -j + 2*z + 44 = 0, -6*z + 50 = j - 2*z. Let n = j + 275. Suppose 4*s = c + 2*s - n, -s = c - 330. Is c a prime number?
False
Suppose -113*c + 109*c - 621282 = -5*r, -2*c = -4. Is r composite?
True
Suppose 0 = 2*r, -2*s + 20266 = 387*r - 390*r. Is s composite?
False
Let w be ((-8)/6)/(83615/(-27867) - -3). Suppose 0 = 35*i - 37*i + w. Is i composite?
False
Let a(v) = 25*v - 110*v + 26*v**2 - 9*v**2 - 31 - 10*v**2 + 11*v**2. Is a(-32) a composite number?
False
Let k be 271*3 + (3 - 0). Let v = k - 342. Suppose 10*f - 4*f - v = 0. Is f composite?
False
Suppose 36*t = 14*t + 1166. Suppose t*d - 45*d - 6232 = 0. Is d prime?
False
Suppose 5*h - 11 = 4. Let x be 2 + 7/21*(-2 + 2). Suppose 0 = -5*f - 2*g + 3453, -x*g + 1 = h. Is f a composite number?
False
Suppose 3*m - 161 = 5*s, 2*s + 2*m - 14 + 88 = 0. Let u = s + 72. Suppose -41*q = -u*q - 1257. Is q a prime number?
True
Suppose 2*y + v - 17 = 3*y, 4*y = -4*v - 60. Let i be ((-8)/y)/(2/8). Suppose 4*d + 255 = 3*a, 4*a + d = i*d + 353. Is a prime?
True
Let t(a) = -16*a**2 + 21*a + 106. Let q(l) = 3*l**2 - 4*l - 21. Let k(c) = -11*q(c) - 2*t(c). Let z be k(5). Suppose 18478 = z*j - 6310. Is j prime?
True
Let z(w) = 5*w**2 + 155*w + 131. Let f = -111 - -60. Is z(f) prime?
True
Let w = -35 + 29. Let f be (-6267)/w*(-2)/(1/(-1)). Let v = f + -1332. Is v composite?
False
Let n(k) = 1723*k**3 - 10*k**2 - 14*k + 68. Is n(3) prime?
True
Let l(k) = 132*k**2 + 2*k + 13. Is l(17) prime?
False
Let t(h) = 3*h + 0*h**2 - 53*h**2 + 301*h**2 + 8 + 178*h**2. Suppose 3*d = -10 + 1. Is t(d) prime?
True
Let u(c) = c**3 + c**2 + 2*c + 239. Let k(a) = 3*a**2 - 6*a + 5. Let d be k(1). Let f be (2 - 0) + -2 - (2 - d). Is u(f) a composite number?
False
Suppose g - 73153 = 5*i + 49771, -3*i = -21. Is g composite?
True
Let z(q) = 6*q**2 - q + 2. Let v be z(4). Let w = v + -88. Suppose -3*h + w*h - 5673 = 0. Is h composite?
True
Suppose -20*z + 26*z = 3006. Suppose -z*i = -497*i - 3596. Is i prime?
False
Let i be (-2)/(-4)*28311*(-64)/96. Let z = 6992 - i. Is z a prime number?
False
Let x be (-6834)/(-24) + 6/(-8). Let u be 10/(-55) - (-1 + (-5288)/44). Let c = x - u. Is c composite?
False
Suppose -j + 5*h = -4*j + 3800, -j + 1290 = -3*h. Let d(l) = -l**2 + 2*l + 72. Let r be d(0). Is j/4 + 6*3/r prime?
False
Suppose 9*x - 307 = 4211. Let k = 1264 - x. Suppose 0 = -0*s - 6*s + k. Is s prime?
True
Suppose -y + 42 = 16. Suppose 0 = -30*j + y*j + 20564. Is j a composite number?
True
Let s(u) = -4790*u**3 + 2*u**2 - 18*u + 17. Is s(-5) prime?
False
Let d(y) be the second derivative of 7*y**4/12 + 5*y**3/3 - 7*y**2/2 + 2*y. Let a = -690 - -696. Is d(a) a composite number?
True
Let r(w) be the first derivative of -2*w**3/3 + w**2/2 + 6469*w - 26. Is r(0) a prime number?
True
Let a be ((-8)/(-32))/((-3 - -1)/(-16)). Suppose -22001 = 4*p + w - 160032, -2*w - a = 0. Suppose p = 12*v + 6512. Is v composite?
False
Suppose 0 = 4436*q - 4439*q + 15087. Is q a composite number?
True
Let k be (14/28)/((-2)/(-8)). Suppose -3*t = 5*o + 18671, -3*o - 5*t = -0*o + 11193. Is (o/16)/((-1)/k) composite?
False
Let n = 110 + -106. Suppose -n*h + 6447 = 3*p, 4*h - 8*h = 5*p - 10745. Is p prime?
False
Let g(m) = 5 - 7*m**2 + 5*m**3 - 4*m**3 + 9*m - 5*m**2 + 2*m**2. Let z be g(9). Suppose -25 = -f + 4*c + 148, z*f + 3*c = 773. Is f composite?
False
Let o be 5 + (-7)/(0 - 7). Suppose 11*s + o*s = 23885. Is s a prime number?
False
Suppose 29*p + 53*p = 25*p + 1375581. Is p a prime number?
True
Suppose 0 = 18*h - 64570 + 166972. Let k = h + 8142. Is k a prime number?
False
Suppose -5127431 = -59*c - 1212958. Is c composite?
False
Suppose 5*v = 3*a + 9 + 7, 0 = 3*v - 5*a - 16. Suppose b + v*l - 104 = 0, 5*l - 128 = -5*b + 377. Suppose 105 + b = h. Is h a prime number?
False
Let p = 13828 + -4541. Is p composite?
True
Let k(q) = -1884*q**3 - q**2 - 2*q - 2. Let x be k(-1). Let t = -606 + x. Is t composite?
False
Let b = 425415 - 119416. Is b a prime number?
True
Suppose 3*a + 4*d - 144461 = 0, -4*a + 192617 = 4*d - d. Is a a prime number?
False
Suppose 0 = 22*b - 332 + 90. Suppose b*c - 183226 = -23*c. Is c composite?
True
Let w be (-3 - -3) + (-3 + -1 - 8). Let g be (45/6)/(w/(-16)). Is 235/g*-2*-3 a prime number?
False
Suppose 11*j + 48406 = 295928. Suppose -5*m + j = -v + 4*v, -14993 = -2*v + 5*m. Is v a prime number?
True
Let v(h) = h**2 - 17*h - 314. Let o be v(19). Let s be 2*38*50/8. Let y = o + s. Is y prime?
True
Is (3933101/(-134))/((-3)/6) prime?
False
Suppose -2*b - l + 98377 = 0, 56 = l + 53. Is b prime?
False
Let z(q) = q**2 + 2*q - 41*q**3 - 5 + 2*q**3 + 2*q**2 - 8*q**3. Let p be (((-70)/(-25))/7)/(4/(-20)). Is z(p) a prime number?
True
Let l(s) be the second derivative of -s**3/3 + 15*s**2/2 - 14*s. Let u be l(10). Is (-6)/3 + (-2045)/u a prime number?
False
Let t = 4190 - 3633. Is t a prime number?
True
Suppose 4*t + b = 217076, 5*t + 14398 = 4*b + 285743. Is t composite?
False
Suppose -2*a - 81015 = -7*a + 884450. Is a prime?
True
Let x = -31083 + 50630. Is x composite?
True
Let x(w) = w**3 - 112*w**2 - 217*w + 297. Is x(133) composite?
True
Suppose -10 = -2*s + 12. Suppose 0 = -r + s*r - 40. Suppose -r*a = b - 1889, 0 = b + 3. Is a a composite number?
True
Let k(a) = 120*a + 191. Suppose 1271 - 1286 = -v. Is k(v) a prime number?
False
Suppose 0 = -1218*u + 1177*u + 15088369. Is u prime?
False
Suppose 4*x - 4915720 = -m, 25*x - 29*x + 5*m + 4915744 = 0. Is x composite?
True
Suppose 5*j + 5*j = -12890. Let b = j + 2248. Is b a composite number?
True
Let r be 644/40 + 3/(-30). Suppose -5*j - 4*q = -r, -2*j - j + 16 = -4*q. Suppose -3*p - 2693 = -j*f, 2*f - 1330 = -0*p - 4*p. Is f composite?
True
Is 94*((-1490)/(-4) + 24 + -18) a composite number?
True
Suppose -6*t + 826 = -90236. Let n = t - 4772. Is n a composite number?
True
Let j = -284 + 287. Is 1*((3 - j) + 4589) prime?
False
Let v(o) = 63*o**2 + 7*o + 10. Let i be v(-3). Let m = i - 1257. Is m*(-3)/(-3)*-1 prime?
True
Let b(z) = z**2 + 2*z - 19. Let d(i) = i**3 - 11*i**2 + 2*i - 6. Suppose -h - 11 = -22. Let o be d(h). Is b(o) a prime number?
True
Suppose -634763 = -3*q + 2*p, 5*q