*-258. Let s = n - 1601. Is s a composite number?
False
Suppose 16*i + 148 = 372. Suppose -i*f = -68844 - 3830. Is f a composite number?
True
Let v(n) = 3*n**2 + 2 + 3*n - 2*n - 4. Let a be v(-2). Suppose a*u - 3407 = 3305. Is u a composite number?
False
Let d(n) = 128*n**2 + 13*n + 65. Let x be d(-7). Suppose -4*u + 52642 = x. Is u a composite number?
True
Suppose 0 = 161*t - 183*t + 40282. Is t prime?
True
Suppose 0 = -3*w + 4*q + 26081 + 17430, 29047 = 2*w + 3*q. Is w composite?
True
Suppose 32*m - 29*m - 2*g = 453854, 5*m = -g + 756406. Is m a composite number?
True
Let z(t) = -2*t**3 - 10*t**2 + 8*t - 6. Let v be (8/(-3))/(0 + 4/(-6)). Suppose -a - v*k - 24 = a, -k = -a - 6. Is z(a) prime?
False
Let s(g) = 0 + 1 - 2 + 2. Let a(q) = 123*q - 16. Let k(o) = a(o) - s(o). Is k(6) a composite number?
True
Suppose 0 = -3*b + 5*l - 1107, 12*b - 8*b = -5*l - 1476. Is (-1 - -3) + (74*b)/(-6) prime?
False
Let y = 107375 + -71694. Is y composite?
True
Let g = 602 - 600. Is (-5)/g*36658/(-5) composite?
False
Let j(q) = -q**3 - 45*q**2 - 43*q + 50. Let r be j(-44). Is ((-91329)/r - 1)/(25/(-50)) a prime number?
False
Let w(t) = t - 7. Let s be w(11). Suppose -2098 = -4*b + 5*y, s*b + 5*y = 19 + 2099. Let o = 1020 - b. Is o a prime number?
False
Suppose -7*a + 97216 = -2*a - 3*f, 0 = -f + 3. Is a prime?
False
Let v(a) = 1539*a - 9. Let q(f) = -7698*f + 45. Let x(g) = -5*q(g) - 24*v(g). Is x(7) a prime number?
False
Let x(u) = 2695*u + 153. Let d = -767 + 775. Is x(d) prime?
True
Suppose 0*g - 836 = 11*g. Let l = 306 - g. Is l composite?
True
Let y(l) = 11 - 4*l - 13 - 8 + 22*l. Let p be y(-6). Let s = -21 - p. Is s a composite number?
False
Let i = 140 - 129. Suppose 27 = 3*a + 2*o, 5 + 38 = 4*a + 5*o. Suppose -a*v = -i*v + 11708. Is v a composite number?
False
Suppose -19*b + 24690 = 74717. Let l = 51306 + b. Is l a prime number?
True
Is (-5 + 2)/((-1)/((-577628)/(-12))) a prime number?
True
Suppose 52*k - 32*k - 80 = 0. Suppose 5*m + 3*b - 29613 = k*b, -m - 4*b = -5931. Is m a composite number?
False
Suppose 0 = 5*u - 2*j - 874022, -4 - 20 = -6*j. Is u composite?
True
Suppose -17*g = -20*g - 9, -564932 = -2*q - 2*g. Is q a composite number?
True
Let r(a) = -66*a**2 - a - 26. Let b(w) = -132*w**2 - 3*w - 53. Let s(y) = 2*b(y) - 5*r(y). Is s(7) composite?
False
Suppose 71*q - 67*q = 0. Suppose 2*b - 1871 = 3*i + 5847, q = 5*b + 5*i - 19320. Is b a composite number?
True
Let k(i) = -3 + 4*i - 11*i + 5*i - 1101*i**2. Let r(b) = 1102*b**2 + b + 3. Let t(y) = 2*k(y) + 3*r(y). Is t(-2) a composite number?
False
Let p(o) = -45775*o**3 + 3*o**2 + 11*o + 21. Is p(-2) a composite number?
False
Suppose -3*l + 9*l = -74418. Let v = l + 25782. Is v a prime number?
False
Suppose 4*v = p + p - 8, p - 4*v + 4 = 0. Suppose -13*d + 33 - 7 = 0. Suppose d*u - 4*h - 4 - 30 = 0, 4*h - p = 0. Is u composite?
False
Let s = -2 - -5. Let n be 758*(-3)/(-6) + s. Suppose 7*m = 6*m + n. Is m composite?
True
Let r(d) = d**3 - 113*d**2 + 244*d - 541. Is r(112) a composite number?
False
Suppose 3*n + v = 116312 - 18245, -n = -2*v - 32689. Is n a composite number?
True
Is ((-6236178)/(-390))/(4/20) a composite number?
True
Suppose -191861 = -q - 2*s, 1392992 - 433687 = 5*q + 2*s. Is q prime?
True
Let o(d) = -27*d**3 + 14*d**2 - 7*d - 29. Is o(-7) a prime number?
True
Let m(r) = 29*r + 3. Let u be m(4). Let f(h) = 38*h - 8. Let p be f(4). Let j = u + p. Is j a composite number?
False
Let p = 23294 + -10221. Let v = p - 7154. Let y = v + -3800. Is y prime?
False
Suppose 0 = 149*s - 157*s + 18912. Suppose 1745 = 7*c - s. Is c a composite number?
False
Suppose 0 = 37*x + 2541311 - 44821248. Is x composite?
True
Let j = 24635 + 29462. Is j prime?
False
Suppose 14*n - 5351507 - 1839063 - 448404 = 0. Is n prime?
True
Suppose -4*k + 3*g + 107447 = 0, -9786 - 97660 = -4*k + 2*g. Is k composite?
False
Let p(h) be the third derivative of 455*h**4/8 + 8*h**3/3 + 20*h**2 + 4*h. Is p(3) a composite number?
False
Let c be -1 - -5 - (-10 + 10). Let f be 473/99 - c/(-18). Is (f/2 + 3)*14 prime?
False
Suppose 3*d = 5*f - 370232, -2*f + 27328 + 120768 = 2*d. Is f a composite number?
False
Let y(g) = 165*g - 2. Let h(d) = -d**3 - 24*d**2 + 23*d - 49. Suppose -25 = j - 3*t, 0 = -2*t + 3*t. Let f be h(j). Is y(f) composite?
False
Let m be 4/((-20)/19915) - -6. Let z = -1806 - m. Is z composite?
True
Suppose 3*i = r - 4397, -9*r - i - 13223 = -12*r. Is r composite?
False
Let s(j) = j + 968. Let w be s(0). Suppose w = n + 3*n. Suppose -x - 3*a = -139, -2*x = -0*x - 3*a - n. Is x composite?
False
Let c = 10 - 9. Let a be 316/10 - 18/(-45). Is c/4 + 25496/a a composite number?
False
Let z(c) = -c**3 - 1. Let y(k) = 16*k**3 + 13*k**2 + 74*k - 14. Let d(j) = -y(j) - 5*z(j). Is d(-8) a prime number?
False
Suppose 6864346 = 18*w - 1016469 - 8130743. Is w a prime number?
False
Suppose 12*s = 3*h + 8*s - 285909, 5*h + 5*s = 476585. Is h a prime number?
True
Let s be (-7306 + 1)*(2 + -1 + 1). Let b = 24121 + s. Is b prime?
True
Is (218749 - -103) + (11 - 0) a composite number?
True
Suppose i + 3*g - 22869 = 7*g, -2*i = -3*g - 45773. Is i a prime number?
False
Suppose 20 = -2*k + 4*k + 4*r, 25 = 5*r. Let m(j) = 2*j + 4*j**2 - j**2 + k - 5 + 34*j**3 - j**3. Is m(3) a prime number?
True
Let p(r) = 8*r - 10 - 25 + 72 + 66. Is p(-10) composite?
False
Suppose -2*m + 2*p + 89113 = 5*p, -3*p + 222814 = 5*m. Is m prime?
False
Suppose -8*t + 9 = -31. Suppose -t*a + 19324 + 17641 = 0. Is a a prime number?
True
Suppose -22*l + 848 = -13518. Let w = -346 + l. Is w composite?
False
Let d = 401 - 554. Let p = 638 + d. Is p composite?
True
Let w = -410989 - -616800. Is w a composite number?
True
Let x(h) = h + 8. Let q be x(-3). Let l(i) = i - 5. Let j be l(7). Suppose -j*v - 410 = 3*t - 2751, 0 = q*t + v - 3897. Is t prime?
False
Let q(b) = -621*b + 184. Let l = 346 - 349. Is q(l) a composite number?
True
Let c be ((-24)/1)/(4/(-432)). Let v = -1410 + c. Let g = v + -715. Is g a prime number?
True
Let i be 3 + 0 + 4 + 3515. Suppose 0 = 12*a - 6*a - i. Is a a prime number?
True
Let p(h) be the second derivative of 21*h - 37/2*h**2 - 229/6*h**3 + 0. Is p(-6) prime?
False
Suppose -g - 131469 = -2*f + 78384, 4*f - 5*g = 419703. Is f prime?
False
Suppose -3*v + 2*w = -6, -2 = -2*v + 3*w + 7. Suppose -2*u - 3*s + 60367 = 3*u, v = 2*s - 8. Is u a prime number?
True
Let a(u) = u**3 + 7*u**2 + 10*u + 11. Let g be a(-4). Suppose g*q = 9*q + 103010. Is q prime?
True
Let t be 2 - (2 - (4 + -3)). Let a be (-1 + t)*(-2)/(-4). Suppose a*n + n = 3*p + 94, -4*n = p - 389. Is n composite?
False
Suppose 0 = -2*i + 3*i - 2409. Suppose 5*k - 3*m - 181 = 106, 111 = 2*k - 5*m. Suppose -61*d + k*d = -i. Is d a prime number?
False
Let h be (-142)/26 - 264/(-572). Is 198935/25 - 6/(-75)*h composite?
True
Suppose -2*a + 2653 = 831. Let b be (-15)/(-6)*20/25. Is (a - -2)/(2/b) composite?
True
Suppose 5 = g, -3*t = 3*g - 59 - 37. Let d = t + -19. Is 364/2 + -3 + d prime?
False
Let p be -943 - ((-5 - -1) + 2). Let h = p - -2134. Is h composite?
False
Let o be ((-2 - -2)/(-1))/((-738)/(-246)). Let i = -3 + 5. Suppose i*q + o*q = 1486. Is q a prime number?
True
Suppose 0 = -n - x + 3, 10*x = -n + 5*x + 7. Is n/(30564/30556 + -1)*1 prime?
True
Suppose 7710038 - 1550750 = 64*w - 2462216. Is w prime?
False
Is ((-8)/112 - (-3343245)/42)*1 composite?
False
Let p(o) = -2509*o - 5. Let d be p(-2). Suppose 13*w - d = 4*w. Is w a prime number?
True
Suppose -4*p = 5*n - 2489985, -3*n + 1493978 = -0*n + 5*p. Is n a prime number?
False
Let r(y) = -39*y + 1095. Let b be r(33). Let t be (-2)/1 + 312/(-1). Let h = b - t. Is h a composite number?
True
Let o(h) = -1315*h - 5. Let y(j) = -657*j - 2. Let a(n) = 6*o(n) - 13*y(n). Is a(9) prime?
False
Is (24155 - 5) + (-10 - -11) a composite number?
False
Suppose 3*p + 3*z - 70353 = 0, p - 25902 + 2467 = -3*z. Is p a composite number?
False
Let l = -58087 + 149418. Is l composite?
False
Let l be 0 + -1*(1 + 1)*142. Let c = 928 + l. Suppose -f - c = -2005. Is f composite?
False
Suppose -5*h + 2*y + 8 = -7, 5*y = 25. Suppose h*a + 4677 = 8*a. Is a prime?
True
Let a(d) be the first derivative of 29*d**4/2 - 5*d**3/3 + 13*d**2/2 - 3*d + 7. Is a(5) prime?
True
Let l(j) = -52*j**3 - 8*j**2 + 8*j + 39. Let z be l(-3). Let f = z + 131. 