e number?
False
Let x be (-22)/(-18 - -7) - (-53362 + 1). Let z = x + -35740. Is z composite?
False
Let p(k) = -k**3 + 8*k**2 + 11*k + 21. Let z be p(9). Suppose -z*f + 41*f - 8176 = 0. Suppose f = 7*x - 3101. Is x prime?
False
Is 269454/27*(-63)/(-14) a composite number?
False
Let l = 52 + -53. Is l*((8*-2)/4 - 2149) a composite number?
False
Let i be (-4)/26 - (-2 - (-2350)/(-65)). Let w = i + -34. Suppose 5*z = w*t - 50, 0*t + 70 = 4*t + 5*z. Is t composite?
True
Let a(w) = 1391*w - 8932. Is a(21) prime?
False
Let g be 5/110*-2 - (-398)/22. Is (-17)/(765/g) - (-19947)/5 a composite number?
False
Suppose 3*s = 3*x - 27, -x + 5 = 5*s + 14. Suppose -37 = -x*y + 365. Is y a prime number?
True
Suppose 135*j - 2811637 = 106*j. Is j composite?
False
Let l(t) = -26977*t + 241. Is l(-8) a prime number?
False
Let w = 241 + -508. Is (396/54)/(0 - 2/w) a prime number?
False
Let u = -6 - -32. Suppose -18*t = u*t - 14564. Is t a prime number?
True
Let j be 18/21*(-42)/(-9). Let m be j + ((-2)/6)/((-1)/(-3)). Suppose -m*d + 2130 = 3*g, -3*g + 2*d + 3025 = 900. Is g composite?
False
Suppose 79*g + 302575 - 1993145 = 9*g. Is g a composite number?
False
Let z = -97 + 97. Is (4 - z) + -5 + 2438 a prime number?
True
Let j(u) = -5*u + 55834 - 74*u - 55942. Is j(-13) composite?
False
Let b(p) be the first derivative of 2*p**2 + 25 + 23*p - 1/4*p**4 - 2*p**3. Is b(-8) prime?
False
Suppose 5*t + 5*m = 13025, -2*m - 16707 = -5*t - 3654. Is t composite?
False
Suppose k + 69 = -s, 2*k + 2 = 4*k. Let o = -11 - s. Suppose -74*t - o = -75*t. Is t prime?
True
Let g be 18/5 + 24/60. Suppose 0 = -3*z + 5*m - 5, -4*z + 32 = -m + g*m. Let n(u) = 66*u**2 + 2*u - 5. Is n(z) composite?
True
Suppose 7630 = c - 3*g - 21159, -16 = -4*g. Is c prime?
False
Let n = 10952 + -4005. Is (n/(-2))/(5/30*-3) a prime number?
True
Suppose 0 = -3*n - 8 + 17. Suppose -1829 = -x + n*p, 25*x - 2*p = 22*x + 5459. Is x prime?
False
Is (-2)/6*(-24 + -997983) prime?
False
Suppose h + 8 = -2*i + 4*i, 4*i - 20 = 4*h. Suppose 3*k = -2*a + 5, i*a - 6*a = 4*k - 8. Is 14911/9 + a/18 prime?
True
Suppose -2*h + 151*j = 147*j - 632810, 3*h - 949183 = -2*j. Is h a prime number?
False
Suppose w - 28 = 5*w. Let x(t) = -3*t - 18. Let n be x(w). Suppose -4*d - 3*q = -2179, 0*q + 15 = n*q. Is d a prime number?
True
Is ((-5)/4)/((-110)/33096536) a prime number?
True
Suppose -5*y + 489 = -15736. Suppose -2*b + 10733 = 3*x, 3*x = -3*b + 7483 + y. Is x a prime number?
True
Suppose -21*d = 36*d - 446367. Is d composite?
True
Suppose -157*g + 6 = -156*g. Let c(v) = 7*v**2 - 32*v + 11. Is c(g) composite?
False
Suppose 11*m + 11116 + 3129 = 0. Let w be ((-24)/(-14))/((-6)/(-1365)). Let y = w - m. Is y prime?
False
Let s(m) = 9916*m + 4509. Is s(13) a prime number?
True
Let v(p) = 60431*p**2 + 43*p + 361. Is v(-6) prime?
False
Suppose 7*o + 3228 = 9*o. Suppose o = 10*t - 1456. Is t prime?
True
Suppose -2*x - 128 = -138. Suppose x*v = 13708 + 777. Is v a composite number?
False
Is ((-228)/(-44) + (-6)/33)*(1 - -84532) a composite number?
True
Let h = 1457149 - 1031810. Suppose h = 40*k - 17*k. Is k a prime number?
True
Let z(g) = 1438*g + 15. Let q be (-1170)/(-135) - (-4)/(-6). Is z(q) a prime number?
True
Let f(a) = -36*a**2 + 5*a - 86. Let r be f(11). Is (3/9 - -1)*3 - r a composite number?
False
Suppose -3*t - 39 - 69 = -3*r, 4*r = -t - 36. Is 1 - (t - (30/5)/(-3)) composite?
True
Let l = -1123952 - -2416879. Is l prime?
True
Suppose 5*w = 3*s + 826, -s + 13*w - 266 = 16*w. Let y = 479 - s. Is y a composite number?
False
Suppose 0 = -5*p - 3*k + 74, 15*p = 10*p - 2*k + 76. Let d(r) = 62*r**2 + 33*r + 95. Is d(p) composite?
True
Let i(x) = -1739*x - 305. Is i(-12) composite?
False
Let p = -248 + 250. Is p/6*-3*6 - -38839 prime?
True
Let h(m) = 2*m**3 + 49*m**2 - 21*m + 95. Is h(-10) a prime number?
False
Let h(i) = i - 8 + 5 + 0*i - 2*i - 4 + 832*i**2. Is h(-4) a composite number?
False
Is (245/70)/((-14)/(-2289596)) composite?
False
Suppose -2*x = -6, x = 56*o - 60*o + 512591. Is o a composite number?
False
Suppose -5*n - 3*f + 43 + 84 = 0, 7 = n - 4*f. Let m(q) = -n*q**3 - 2*q**2 + 2*q**2 - 4*q + 1 + q. Is m(-3) a prime number?
True
Let z(x) = -32*x**2 + 21*x**2 + 13*x**2 + 3 - x**3. Let b be z(2). Suppose -i = -3*n - 3*i + 235, b*n - 229 = i. Is n composite?
True
Let z be -2 + (-54)/(-12) + (-10)/4. Suppose z = -2*m + 6*m - 13004. Is m composite?
False
Suppose y = -3*t - 41, -3*y + 5*y + 4*t + 84 = 0. Let l be y/(-198) - 112/18. Let f(a) = 40*a**2 + 9*a + 13. Is f(l) a composite number?
False
Let j = -137 - -154. Suppose -i + 103482 = j*i. Is i composite?
False
Suppose 0*k = -3*k - 6. Let g be 9/3 - 2*k. Suppose -g*f + 3*f + 1508 = 0. Is f prime?
False
Let o = 61951 + -41124. Is o prime?
False
Let z = 6375 - 23964. Let p = -2096 - z. Is p composite?
False
Let u(x) = 146*x**3. Let q be u(2). Let y = 1 + q. Is y prime?
False
Suppose 8*i - 110 = 19*i. Let u(p) = -2*p**3 - 9*p**2 + 7*p + 19. Is u(i) a composite number?
False
Is (-120 - -120) + (-4)/14 + (-629150)/(-14) prime?
True
Suppose -4*g + 32533 = -5*b, 4*g + b + 40640 = 9*g. Suppose -p + g = 2*q, 11*q = -2*p + 9*q + 16258. Is p composite?
True
Suppose -4*r = 3*d + 91, 0*d = 4*d + 5*r + 121. Let p = d + 34. Suppose -3*t + 2643 = 3*z, -1006 = -p*z + t + 3375. Is z a composite number?
False
Suppose 1118 = 13*b - 6916. Let u = 356 - b. Let j = 799 + u. Is j prime?
False
Suppose 3*w = x + 7004 + 808, -3*w - x = -7806. Suppose -w - 2063 = -i. Is i composite?
True
Let k = 4695 - 4689. Let a(u) = -u + 99*u + 1 - 2. Is a(k) prime?
True
Let j be (5/10)/((-16)/(-271232)). Suppose 0 = 4*z - t - 10175, j - 3384 = 2*z - 2*t. Is z a prime number?
True
Let h be (-2)/10 + 1334/(-5). Let o be ((-6)/(-9) + -2)*h. Suppose -o = -5*b + b. Is b a prime number?
True
Let g(x) = -9 - 7 - 3*x**3 + 6 + 6*x**2 + 3*x**2 + 11*x. Is g(-9) a prime number?
False
Let j(k) = k**2 + 8*k + 3. Let h be j(-7). Let r be (-1)/(h/(-3 - 1)). Is (-2)/(-4) - r - 41954/(-44) a prime number?
False
Suppose -2968*d - 4589466 = -3010*d. Is d a composite number?
True
Suppose -w + 4*u - 3*u + 2280 = 0, -4*u - 6833 = -3*w. Is w a prime number?
True
Let w = 225049 + -154778. Is w composite?
False
Let o(n) = 1095*n**2 - 10*n - 33. Let q be o(-4). Let z = -10488 + q. Is z a prime number?
True
Suppose 3*x = -2*m - 24799, 12*m + 2*x + 49586 = 8*m. Is (m + (-2 - -6))*-5 prime?
False
Is ((-706070)/20)/((-24)/48) composite?
False
Let c = 653454 - 164257. Is c prime?
True
Suppose 4*d = 139 - 95. Is ((-445)/15)/(d/(-33)) a prime number?
True
Let a(g) = -2 + 32*g - 12*g + 17*g + 8. Suppose -h = -u + 6, 2*h - 4 = -2. Is a(u) a composite number?
True
Suppose 4787 = -d + 3*n, -13*n + 9*n = -4*d - 19124. Let w = 133 - d. Is w composite?
True
Let f = 141 + -139. Suppose -f*n + 10648 = -3*x, 0 = 7*n - 9*n + 4*x + 10646. Is n a prime number?
False
Suppose 3*y - 15421 = 4*g, 0 = -y - 2*g + 6*g + 5127. Is y prime?
True
Suppose 15*k + 108*k - 6098692 = -k. Is k prime?
False
Is (-377284)/6*((-1)/(22/(-143)) - 11) prime?
False
Let v(f) be the second derivative of 9/4*f**4 + 1/20*f**5 + 0 + 7/2*f**3 - 21*f + 2*f**2. Is v(-23) composite?
False
Is (-18324790)/(-990) + (-8)/9 a composite number?
True
Suppose -12*b + 72614 = s - 13*b, -5*s = b - 363088. Is s a prime number?
True
Let z(u) = -22*u**3 + 28*u**2 - 2*u - 161. Is z(-11) a composite number?
False
Let f = -7797 - -12029. Let t = f + -2559. Is t prime?
False
Let b(j) = j**2 - 8*j + 17. Let k be b(6). Suppose 10 = -k*v, 5*p - v = 7*p - 5636. Is p composite?
False
Suppose -21*z + 58*z - 65854973 = -6*z. Is z prime?
False
Let c(d) = -10228 + 461*d + 170*d + 10231. Is c(8) a composite number?
False
Let z be 40379/11 - (-17)/((-935)/(-10)). Suppose 1447 = 6*v - z. Is v a composite number?
False
Suppose 2 = z - 2*g, -4*g - 8 = 2*z + 4. Is (2 + 0)*(-295)/z composite?
True
Let x(z) = z**3 - 6*z**2 + 6*z - 6. Let m be x(5). Let g(n) = 396*n + 3. Let r(o) = -791*o - 6. Let d(v) = -5*g(v) - 2*r(v). Is d(m) a prime number?
False
Let y(t) = 2*t**2 + 7*t - 5. Let x be y(-6). Let n(h) = -7*h - x + 2*h - h. Is n(-16) a prime number?
True
Let v(q) = 306*q - 87. Let s be v(30). Suppose -4*j = -0*f + 3*f - s, 3*f = 4*j + 9117. Is f a prime number?
False
Suppose 5*l = 3*l. Suppose -21*w + 20*w + 2 = l. 