me?
True
Suppose -6*x = p - 2955, 11508 + 444 = 4*p + 2*x. Is p a prime number?
False
Let b be 360/5*1246/(-6). Let v be (b/105)/((-1)/(-5)). Let j = v + 1101. Is j a prime number?
True
Suppose 5*w - 54*j - 396511 = -56*j, -4*j = 3*w - 237915. Is w composite?
False
Is (295999 + -15 + (-2 - -9))*2/2 composite?
True
Let q(p) be the third derivative of -71*p**6/60 - 4*p**5/15 - 7*p**4/4 + 5*p**3/6 + p**2 + 17*p. Is q(-4) prime?
False
Suppose -97407 - 24510 = -3*y - 2*z, 162542 = 4*y - 2*z. Is y prime?
True
Suppose 4*n + 25 = 5*j, -n - 2*j = j - 15. Let d(c) = -1 + 0*c + 2*c - 4*c + n*c + 12*c**2. Is d(-3) a prime number?
True
Let a be (-5604)/(-16) - 2/8. Let i be 8/(-68) - a/(-85). Suppose 2*l + i*d = l + 183, 5*l - 957 = d. Is l composite?
False
Let x be 144 - (1 - 0) - 2*2. Suppose 137*h + 12694 = x*h. Is h a prime number?
False
Let i = -617 - -619. Suppose 3*t + a - 13227 = 0, -i*t - 5*a - 5117 + 13935 = 0. Is t prime?
True
Suppose 116690 - 24482 = -3*r + g, 0 = 2*r + 2*g + 61464. Let t = -14090 - r. Is t composite?
True
Let a(g) = 204*g - 108*g + 540*g + 2 + 9. Is a(10) a prime number?
False
Let z(g) = g**2 - 8*g + 17. Let c be 112/42*(18/8)/1. Let h be z(c). Suppose 3*a - 2*a + 2*x = 53, 0 = -4*a - h*x + 203. Is a a composite number?
False
Let b be 5 - (3 + -9 + 5). Suppose 35268 = 5*i - i. Suppose 9*y - b*y = i. Is y a prime number?
True
Let a = 25 + -28. Let r be (a/4)/((-27)/72). Suppose p + 4*t - 2207 = 0, 0*p - 5*t - 4362 = -r*p. Is p a prime number?
False
Is (-39 + (-22 - -63))*329421/2 prime?
False
Let g(a) = a**2 + 6*a - 2. Let y be g(-8). Suppose 0 = y*f - 18*f. Suppose 3*d + 0*d - 483 = f. Is d a composite number?
True
Let b = 17930966 + -7223955. Is b a prime number?
False
Let a = -699286 - -1172039. Is a composite?
True
Let p = -6884 - -22015. Is p prime?
True
Is 120157*(3/18)/(11/66) composite?
False
Suppose -4*a + 89 = 3*x, a + 4*x = 4*a - 48. Suppose -a*l = -22*l + 13204. Suppose 2*v - l = -4*w, 11416 = 5*w + v + 3162. Is w prime?
False
Is 4/(-11) - 156208227/(-3597) composite?
False
Let q(c) = -6*c**3 + 15*c**2 - 111*c - 187. Is q(-37) composite?
False
Let p = 134430 - 55579. Is p composite?
True
Suppose 0 = 79*d - 106*d + 12104181. Is d prime?
True
Suppose -p + q = -349, 4*q = 2*p - p - 343. Suppose -52*f = -61*f + p. Is f composite?
True
Let p = -48 - -46. Let v = p + 7. Suppose v*g - 321 = 1664. Is g a composite number?
False
Suppose 37 = 3*k + 4*g, -6 + 23 = 3*k - g. Let f = k + -9. Is (536/32)/(f/(-16)) a prime number?
False
Is ((2516493/2)/(-17) - 7)*-2 a composite number?
True
Suppose 4*s - 4*k = 12892, 4*k = -8*s + 3*s + 16115. Let h = -296 + s. Is h prime?
True
Let a(x) be the third derivative of 17*x**6/24 - x**5/15 + x**4/4 + x**3/6 + 20*x**2. Let i be a(2). Let o = -186 + i. Is o composite?
False
Let w(x) be the third derivative of x**5/30 + 31*x**4/24 + 89*x**3/6 + 61*x**2 - 3. Is w(22) a prime number?
False
Suppose -19*j = -21*j + 4*z + 593638, 5*j - 1484050 = z. Is j a prime number?
False
Suppose 3*q - 12 = 0, 6*n - 7*n + 44765 = -3*q. Is n prime?
True
Is (28/(-9))/(-14) - 3606458/(-18) a composite number?
True
Is (7 - 4)/(42/3200372) a prime number?
False
Let b = -2893 - -4932. Let d = b - -910. Is d a composite number?
True
Suppose 0 = 3*x - 367 - 506. Suppose g + 7*v - 295 = 4*v, 4*v - x = -g. Is g a composite number?
False
Suppose 0 = 2*p - 4*m + 6*m - 14, -2*p - 3*m = -16. Let g(n) = 102*n + 69. Is g(p) composite?
True
Let z(g) = 27*g**2 - 22*g + 656. Is z(-89) a composite number?
False
Let l be (5 + 3894/(-10))/((-3)/(-165)). Let d = -14363 - l. Is d composite?
False
Suppose -4*s = -5*a + 35, 2*a - 2*s + 7 - 21 = 0. Suppose -t - a*c + 2191 = -3*c, 2*t - 4368 = -c. Is t prime?
False
Let y = 346068 - 153415. Is y a composite number?
True
Suppose 108*h - 6193969 = 37*h. Is h prime?
False
Let a be 5/((-15)/6)*(-24 + 21). Let w(o) = 133*o**2 + 9*o - 8. Is w(a) composite?
True
Suppose 4*o - 11808 = 12128. Let z be (-10)/(4/22 - 1099/o). Suppose 5*n - z = -3*m, 3*n - m - 2711 - 567 = 0. Is n a prime number?
True
Suppose -1 = x, 2*x = -2*o - 0*x + 468. Let d = -2304 - -4038. Let l = d - o. Is l a composite number?
False
Let r(p) = 8956*p - 1125. Is r(5) composite?
True
Let p be -3 - (2 - 16) - 1. Suppose -p*q - 9*q + 14953 = 0. Is q prime?
True
Let j(z) be the third derivative of -z**6/60 + 2*z**5/15 + z**4/2 - 25*z**3/6 + 48*z**2. Is j(-9) composite?
False
Let y = 13048 + -7128. Let n be (-6)/4*((-176)/(-12))/(-11). Suppose -8*z + y = -3*z + 3*v, -5*z - n*v = -5925. Is z prime?
True
Let n(g) = -27*g + 61. Let t(o) be the second derivative of -o**3/6 + 14*o. Let a(h) = -n(h) - t(h). Is a(14) a prime number?
True
Suppose 25 = 5*u, -4*u + 105 = 5*n - 10. Suppose -13 = -2*p + 5*i, -5*p + 3*i + n = -p. Suppose 0 = 4*t - p, 4*w - 771 = 3*t - 178. Is w prime?
True
Let t(l) = -68*l - 23. Let o(k) = k**3 + 15*k**2 + 15*k + 9. Let f = 25 - 39. Let n be o(f). Is t(n) a composite number?
False
Suppose i - 32 = -20. Let j(g) = 968*g**3 - i - 4 - g + 14 + 2*g**2. Is j(1) a composite number?
False
Let o be ((-20)/(-4) - -1)*-2. Is -3*(-2512)/o*30/(-24) prime?
False
Suppose -12*f - 44 = -23*f. Suppose -4*k + 5*s + 2 = -1, f*s = 3*k - 2. Is (-22 + -3355)*(0 - 2/k) a composite number?
True
Suppose -m - 6*a + 3 = -2*a, 2*m = a - 3. Is (m/(-4) - 63/(-36))*89 prime?
False
Let a(n) = 13*n**3 + 2*n**2 + 2*n - 3. Let p be a(2). Suppose -25 = -5*z, 0 = 5*u + 5*z - 701 - 74. Let o = p + u. Is o composite?
False
Let t be (-1 - 1298/(-165)) + (-2)/(-15). Let p(n) = -8 + 505*n - 13 + 7. Is p(t) prime?
False
Suppose a - 11 = -p, -2*a + 3*p = -22 + 10. Suppose -3*j - a = 0, c = j + 483 + 2227. Is c a prime number?
True
Let h = 76 - -446. Suppose 0 = -4*q + h + 306. Let m = q - -5300. Is m prime?
True
Let i be 3 - (1 + 0 + 12). Let o be 5/i - 2/(-4). Suppose -5*j = 4*t - 6445, o*j - 6450 = -5*j - 3*t. Is j prime?
False
Let a be 6*(-3)/(-24)*(-48)/(-12). Let r(u) = 588*u + 26. Let j be r(a). Suppose 2*o - 4*o + j = 0. Is o a composite number?
True
Suppose 2*w + 3472 = 4*x + 108810, 0 = w + 2*x - 52665. Is w a composite number?
False
Let f(t) = -t**3 + 65*t**2 + 59*t + 130. Is f(31) prime?
False
Let f(d) = -16*d + 307. Let w be f(19). Suppose -y = -1050 - 17. Suppose -q - 1398 - y = -w*h, -4*q - 1650 = -2*h. Is h composite?
False
Let j = -30401 - -88120. Is j a composite number?
False
Let w(i) = -2*i + 18. Let b be w(-24). Suppose -64*x + b*x = 7366. Is x prime?
False
Suppose 0*l = -6*l + 78. Let w = -66 + l. Is 6/(6/w)*-5 a prime number?
False
Suppose -332 = -2*o + 128. Let t be (o/(-15) - -2)*6. Let c = 207 + t. Is c composite?
False
Let q = -90 - -169. Suppose -m = q - 319. Let n = 187 + m. Is n a prime number?
False
Suppose -3*j - 1 = -166. Let w(l) = -1 + 0*l**3 - j*l - 8*l**2 - l**3 + 43*l. Is w(-10) prime?
False
Suppose 30*y - 339504821 = -137*y. Is y prime?
False
Let i(t) = 22*t**2 - 6*t + 4. Suppose -2*m - p = 3 + 12, -15 = m + 2*p. Let f be i(m). Suppose f = 3*r - n - 4*n, 2*r - n - 401 = 0. Is r a prime number?
False
Suppose -12*p - 972 = -4452. Is 1/5 - (-1056412)/p prime?
True
Let n = 190 - -1081. Is n prime?
False
Suppose 0 = k - 4*b - 83228 - 162239, 5*k - 1227395 = 5*b. Is k prime?
False
Let t be (0 + 0)*(-14 + 13). Suppose t*j - 2*j - 3548 = -4*x, 0 = -5*x - 4*j + 4461. Is x prime?
False
Suppose 14 = -15*z + 22*z. Suppose -14558 = -z*f - 5*w, 4*f = -2*w + 7*w + 29176. Is f composite?
True
Let b be (0/(2 + -7))/(-2). Suppose -4*m = 4, 3*c - m - 11965 - 621 = b. Is c a composite number?
True
Suppose 55*n - 46*n - 18 = 0. Is (-5 - (-2121)/14)*(48 - n) prime?
False
Let c(i) = 105*i**2 - 8*i + 15. Let t(z) = z**2 + z - 2. Let p(l) = c(l) - 5*t(l). Is p(6) a prime number?
True
Let h(g) = 998*g**2 - 4*g - 2. Let m = -28 + 26. Let v be h(m). Suppose -7*q + 13621 = -v. Is q a prime number?
False
Let v = 433861 + -275810. Is v a prime number?
False
Suppose 0 = s - 2*o - 62411, -34*o + 249609 = 4*s - 35*o. Is s a prime number?
True
Let u = -11172 + 15855. Suppose -58*r - u = -61*r. Is r composite?
True
Let o(m) = 24*m**3 + 1 + 2*m**2 + 4*m + 417*m**3 + 9*m**3. Let v(k) = -450*k**3 - 2*k**2 - 3*k. Let i(p) = -2*o(p) - 3*v(p). Is i(1) a prime number?
False
Suppose -21*n = -4*n - 68. Suppose 3*h - n*k - 19657 = 0, 3*h = -k - k + 19633. 