er?
True
Suppose -40 - 100 = 14*b. Let d = b + 851. Let f = 2132 + d. Is f a composite number?
True
Is -24 + 22919 - (-9 + 1) prime?
False
Suppose -4*s + 3*p = -20, 0 = -2*s - p + 10. Let x be (-1)/s + 7098/(-35) + 4. Let d = x - -332. Is d a prime number?
False
Let g(k) = 3786*k + 1547. Is g(27) composite?
False
Let u(b) = 9*b + 20. Let r be u(-2). Suppose 0 = -3*z - 5*y + 15688, r*y - 6*y - 26085 = -5*z. Is z composite?
True
Let f(i) = -5*i**3 - 7*i**2 - 3*i + 4. Let b(v) = -v + 1. Let t(s) = 6*b(s) - f(s). Suppose 12*d + 192 - 252 = 0. Is t(d) composite?
False
Let w(v) = -19*v - 3. Let g be w(-1). Let m be (-2)/(-1) + g + -1. Suppose -m*r + 423 = -14*r. Is r prime?
False
Let m be (1 - -1*4) + 0. Let y = 138 + 26789. Suppose -5*v + 4*j = -y, -2*v + 8*j = m*j - 10775. Is v prime?
False
Suppose 1333050 = 50*y - 20*y. Is y a composite number?
True
Let i(y) = 46591*y**2 - 300*y + 36. Is i(5) a prime number?
True
Let p(d) = 279*d**2 + 4*d + 22. Is p(-8) a prime number?
False
Let q be -3 - 58 - (0 + -1 + 3). Let j = 66 + q. Is (-1 - 2)*(-83)/j a composite number?
False
Suppose 3*z = 2*z - 5*c - 16, 0 = -3*z + 5*c + 32. Suppose -5934 = z*p - 19058. Let j = p - 2220. Is j a composite number?
False
Let l = 39724 + 153369. Is l prime?
True
Let h = 2 + 1. Suppose 5*p - 3*s - 53 = 0, 5 = p - h*s - 8. Is -2 + (-1642)/(-14) - p/35 composite?
True
Let v(o) = -133*o - 25. Let r be -4 - (0 + -1) - (22 - 23). Let t be v(r). Let c = t + -96. Is c a prime number?
False
Suppose 0 = 2*l - 5*g - 586509, -2*l + 93126 = -3*g - 493385. Is l composite?
False
Let m = 98 - 92. Is m/((5/3946)/(-5)*-4) a prime number?
False
Is ((-540)/(-20) + -16)/((-2)/(-163454)) a composite number?
True
Let j(m) = 5726*m - 599. Is j(30) a prime number?
False
Let m = 588446 + -239025. Is m prime?
False
Let x = 9900 - 1237. Is x a composite number?
False
Is (-1280)/(-4000)*5/4*1146590/4 a composite number?
False
Suppose 0 = 3*f + 608 - 12437. Suppose f = 2*c - 30747. Is c a composite number?
True
Is (12949696/192)/(2/6) a prime number?
True
Let c(b) = 81*b**3 + 3*b**2 - 10*b + 74. Is c(4) prime?
False
Let z(a) = 19*a**3 - 2*a**2 + 13*a + 42. Let i be z(-10). Is ((-9)/36)/(2/i) a composite number?
False
Let s(d) = -d**3 + 16*d + 3. Let b be s(4). Suppose -b*p - 15 = -4*i, 2*i + 3*p + 11 + 4 = 0. Suppose -9*w + 11*w - 1028 = i. Is w composite?
True
Suppose o + 16 = -4*z, o - 5*z + 0 = 20. Suppose 0 = -8*f + 7*f - 3*l + 6838, 5*f - 3*l - 34172 = o. Is f a prime number?
False
Let i = -88540 - -138303. Suppose -6*t = t - i. Is t a prime number?
True
Let q(p) = 44*p**2 - 1238*p - 61. Is q(42) a prime number?
False
Suppose 2*s + 4*r + 75316 = -2*s, 5*s - 2*r = -94159. Let g = 13138 + s. Is (-4)/16 + g/(-4) a prime number?
True
Suppose -5*b + 13512 + 19198 = 0. Suppose -a + b = -2919. Is a a composite number?
False
Suppose 8*v + 28313 + 43767 = 0. Let o = v + 14511. Is o a composite number?
False
Let q = 654 + -650. Suppose -q*c + 2*c = b - 25912, 2*c - 3*b = 25904. Is c prime?
False
Let d(t) be the first derivative of 2/3*t**3 - 8*t**2 - 12 - 7*t. Is d(-16) a composite number?
False
Let z(q) = 2865*q**2 - 309*q - 1871. Is z(-6) prime?
True
Let j(g) = -g**3 - 4*g**2 + 2*g - 10. Let r be j(-5). Suppose -2856 = -a + 4*t, r*a - 5*t = 4*a + 2861. Suppose -6*k + 10*k = a. Is k a prime number?
True
Suppose 14007 - 75528 = -w. Is w a composite number?
True
Let v(k) = -k**3 - 18*k**2 + 2. Let z be v(-15). Let f = 4032 + z. Is f prime?
True
Let m(t) = t**3 + 6*t**2 + 7*t + 12. Let q be m(-5). Let c = 1 + q. Suppose 0*x = -c*x + 105. Is x prime?
False
Suppose -8*b + 13231 = -3969. Let c(h) = -b*h**2 + 2144*h**2 + 7*h**3 + 3*h + 3*h. Is c(7) a prime number?
False
Is -3919*(-2724)/16 - 155/(-124) composite?
False
Let s be (-5)/((-40)/6)*4. Suppose -j + v + 2932 = 2*j, -j = s*v - 984. Suppose 2417 = 5*i + 2*x, 2*x + j = 2*i - 0*x. Is i a prime number?
False
Suppose -4*v + 5*n = -11956, 2*n + 1285 = 5*v - 13643. Let d be 1 - (-3)/((-2)/(-2)). Suppose -s - 2*s + d*l = -2245, -3*l = -4*s + v. Is s composite?
False
Let d(x) be the second derivative of x**4/12 + x**3/3 - x**2 + 9*x. Let i be d(2). Suppose -4*k - 1654 = -2*w - i*k, w = k + 831. Is w prime?
True
Let s = 28982 - 2780. Suppose 0 = -3*z - 4*l + 39343, -11*z + 9*z + s = -4*l. Is z a prime number?
True
Suppose -9*j + 496 + 25946 = 0. Let h = j - 2079. Is h composite?
False
Let l(m) = -1673872*m - 1431. Is l(-1) composite?
False
Let u(d) = 480*d - 73. Let o be u(4). Let c = 579 + o. Is c a prime number?
False
Let g be (-25)/(-45)*6 - 3/9. Is 1/((-18025)/(-24028) + g/(-4)) prime?
True
Let k = 37476 - 14423. Is k a composite number?
False
Let a be ((-128)/(-20))/((-3)/(-75)). Let z = a - 65. Is z composite?
True
Suppose 6 - 3 = t. Suppose 0 = -t*y + 9 - 0. Suppose 0 = -2*l - 3*p + 1261, -y*l + 2*p - 5*p = -1890. Is l a composite number?
True
Let i(d) = d**2 - 17*d + 1. Let h be i(19). Suppose 2375 = 2*u - h. Is u composite?
True
Let c(d) = 1882*d - 343. Is c(16) prime?
False
Let u = -1830 - -1835. Suppose 35639 + 35119 = 2*m. Is m/81 + u/((-90)/(-4)) prime?
False
Suppose 4*d = 2*u - 26, 23 - 3 = -4*d. Suppose q - 5904 = -5*l, 5*q + u*l - 8589 = 20909. Is q a composite number?
True
Is 9 - 20697/2*(-1288)/21 a composite number?
False
Let m = -601 + 606. Suppose -5*k - m*g = -7*k + 48451, 24224 = k - 3*g. Is k composite?
True
Let u be (-30)/(-1)*((-14420)/(-42))/1. Suppose 6*f - u = f - 5*r, -f = 4*r - 2051. Is f composite?
False
Suppose -96703 - 117095 = -2*l - 5*d, 3*d = l - 106877. Is l prime?
False
Let g(z) = -2*z**3 - 8*z**2 + 11*z + 3. Let q be g(-7). Suppose q = -3*n - 1847. Let a = n + 1312. Is a prime?
False
Suppose 9*u = 71044 + 51059. Is u a composite number?
False
Let s = 143 - 57. Let t(u) = -u**3 - 13*u**2 - 16*u + 3. Let k be t(-12). Let o = s - k. Is o composite?
True
Suppose -40 = -3*q - 13. Is (q - -12)*1/((-9)/(-5127)) a prime number?
False
Suppose 7*q = -16283 + 19977 + 70968. Is q prime?
False
Let r be -8*4/40*(-45)/6. Let u(s) = s**3 - 8*s**2 + 10*s + 8. Let w be u(r). Is -4 + ((-181544)/(-36) - w/36) a prime number?
True
Let b = -13 - -167. Suppose 5*j - 60 = -a, 5*j - b = -4*a + 26. Is (a/32)/((-1)/(-28)) a prime number?
False
Let m(d) = 12*d - 83. Let q be (-6 - -4)/(1/(-8)). Is m(q) composite?
False
Let h be (-1)/(-4) + 6/16*4026. Suppose h = 10*j - 2600. Is j prime?
False
Suppose 2*c - c - 5*r - 29 = 0, 5*c + r - 15 = 0. Let j(o) = -16*o**3 - c + 3*o + 4 - 11*o - 5*o**2. Is j(-3) composite?
True
Let k = 35 - 33. Suppose -k*s = -4*s + 5*o - 31, -3*s = -o + 79. Is s/(-70) - 1463/(-5) a prime number?
True
Let y(p) = p**2 - 23*p + 26. Let n be y(22). Suppose 4*x - 2235 = 5*v, 2*v - 366 = -n*x + 1904. Is x composite?
True
Suppose -21*h + 67 = 256. Is (13218/h)/(13/((-234)/12)) prime?
True
Suppose -69*u + 97*u = -103*u + 1813433. Is u a prime number?
False
Let h(g) = 15*g - 31. Let d be h(3). Let x = d + -9. Suppose 15 = x*p, 5*w = -p + 2042 + 591. Is w a prime number?
False
Let o be 7 + 16669 - (3 - -5). Suppose o - 2615 = 13*w. Is w a prime number?
False
Suppose -5*j + 504436 = 3*k, 0 = 4*k + 4*j - 7*j - 672649. Is k a composite number?
True
Let k = 127430 - -65531. Is k a prime number?
True
Suppose 2*p - 3*i + 707 = 0, 6 = -4*i - 14. Let n = p + 615. Is n composite?
True
Let b = 26475 + 39526. Is b a prime number?
False
Let i = 49479 + -34370. Is i composite?
True
Let w be 6*-1*(-3 - (-42)/18). Suppose 4*l + l + 193 = v, -3*l - 721 = -w*v. Is v prime?
False
Suppose -53*z + 24 = -41*z. Suppose 5*t - 4*k = 19945, -3*t - 5*k + 3960 = -z*t. Is t prime?
False
Let s = -1269 - -658. Suppose -21*b + 19*b = -2*f + 1804, -2*f - 3620 = 4*b. Let i = s - b. Is i prime?
True
Suppose -6*q - 18862 = 15974. Let z = q + 8265. Is z a prime number?
True
Suppose 14437 + 20513 = 2*a. Suppose t + 9 = 4, 4*f - a = -t. Suppose 9*s = f + 7879. Is s a prime number?
True
Let k(w) = -15*w - 6. Let c be k(0). Is (14 + 62/(-4))*62164/c a composite number?
False
Let t = -110 - -156. Let i(g) = 128*g**2 - 67*g - 1. Let j be i(2). Let o = j - t. Is o a prime number?
True
Let a(s) = -s**3 - 4*s**2 + 2*s + 8. Suppose -1 = 4*o + 3*z, 5*o - 4*o - 6 = -2*z. Let l be a(o). Suppose 2*q + q - 3831 = l. Is q a prime number?
True
Suppose p = -3*b + 117, 5*b - 61 = 3*b + 5*p.