 Is d(13) prime?
False
Let z = 32446 - -49815. Is z composite?
False
Suppose 8*u + 2235 = 23*u. Let o = -115 + u. Let b = 117 - o. Is b a composite number?
False
Suppose 7*s - 26 - 2 = 0. Suppose -2*u - s*x + 28716 = -5*x, 5*u + x - 71797 = 0. Is u composite?
True
Suppose a + 9 = -0. Let f be a/(-3) - (1 - (-4529 + -4)). Let t = f - -6752. Is t a composite number?
False
Let d(h) = -h**2 + h. Let p(g) = -10*g**3 + 28*g**2 - 8*g + 20. Let z(s) = -2*d(s) - p(s). Is z(9) prime?
False
Suppose -28*y + 541431 = -y. Is y composite?
True
Let w = -6812 + 3907. Let i = w - -5690. Is i prime?
False
Is (-980094)/(-15) + 48/(-80) a composite number?
True
Suppose 0 = o - 4*o + 3*n + 3, 2*o + 14 = -2*n. Let u be 2/o + ((-4940720)/(-15))/(-4). Is u/(-57)*3*(-2)/(-4) a prime number?
False
Is -27 + 11 - (-1728195)/3 prime?
True
Suppose 16450 = -7*q + 2*q + 5*g, 3*q = -4*g - 9842. Let s = -2237 - q. Is s a composite number?
False
Let u = 352875 - 234938. Is u a composite number?
False
Let z = -20 + 25. Suppose 9 = -3*h, -3*h - 1 = -y + z*y. Suppose 6 = -y*a, 4*j - 23 = a + 208. Is j a composite number?
True
Let b be (2952 - 1*-1)/(117/(-234)). Is 34/(-8) - -5 - b/8 composite?
False
Suppose 2*k - 1 = q, -5*k + 3*q = 2*q - 1. Suppose 3*i + 2*n - 11017 = 3*n, -i + 4*n + 3687 = k. Is i prime?
True
Let y(r) = -r**2 + 7*r + 35. Let i be y(10). Is (1263 - (i - 1))*1 prime?
True
Let r be 8/12 - ((-573)/(-9) - 1). Suppose -2*x + 4*x = 2. Is (r*(0 - x))/1 a composite number?
True
Suppose -55*c - 33644 = -107*c. Is c composite?
False
Let h(l) = 22*l + 9. Let z be (-3)/3*1 - -12. Suppose -z = 10*x - 11*x. Is h(x) a prime number?
True
Let z(c) = 7*c**2 - 2*c + 1. Let d be z(1). Let i(a) = -22*a**2 - 29*a + 1. Let y(j) = j**2 - 2*j + 1. Let t(s) = -i(s) + 6*y(s). Is t(d) a prime number?
False
Let z(j) = -36927*j - 24. Suppose 0 = -3*f + 2*s - 13, 2*s - 2 = 5*f + 13. Is z(f) a prime number?
False
Suppose -2*x - 264 = -5*q, 2*q + 0*q - 2*x - 108 = 0. Suppose 620015 = 3*b + q*b. Is b a prime number?
True
Is -2 + 283767 + 60/45 + (-40)/12 a composite number?
False
Suppose -2*u - 2*u = -20. Suppose -3*f = -u*k + 2*f + 25, 0 = 5*f. Is ((-10)/k)/(2/(-449)) a prime number?
True
Let k(w) = -734*w - 35. Let z be (-27)/(-63) + (-118)/14. Is k(z) composite?
True
Suppose 82*a = -5*j + 85*a + 478043, -2*a = -2*j + 191222. Is j a prime number?
False
Is 4/(-6) + (6 + -162131)*(-2)/6 a composite number?
True
Let r be (0 + 0)/(50/(-10)). Suppose r = u - 379 - 2768. Is u prime?
False
Let p(t) be the second derivative of 9*t**4/2 - 8*t**3/3 + 91*t**2/2 - 6*t - 12. Is p(-12) a prime number?
True
Let j be (1 - (-35)/(-2))*-2. Suppose -q + 992 = 3*a, 3*q - 1724 - 1264 = -5*a. Suppose j - q = -8*b. Is b composite?
True
Suppose z + 123746 = 5*c, 5*c + 16*z - 18*z = 123747. Is c prime?
True
Suppose -21*u - 186352 - 382643 = 0. Let p = 39166 + u. Is p a composite number?
False
Let p(g) = 2*g**2 + 15*g + 18. Let w be p(-6). Let q be 77/22 + w + 1/(-2). Suppose 0 = -q*c + 545 + 1900. Is c composite?
True
Suppose -y - 184 = -3*c, -4*c - y = 4*y - 277. Suppose -g - 5*q + 7 = 0, 5*q - 2*q + c = 5*g. Is ((-6)/2 + -1)*(-1905)/g prime?
False
Let d(u) = 2*u + 11. Let z be d(2). Let n = 30 - z. Suppose 7044 = n*q - 3*q. Is q composite?
False
Suppose 65*m + 59883 - 3479728 = 0. Is m prime?
False
Let a(s) = -6*s**2 - 24*s - 14. Let w be a(-3). Suppose -3*o + w*u + 23225 = 2*o, 2*o + u = 9290. Is o a prime number?
False
Suppose -12*i - 21516 = -16*i. Is (-14 - -12)/((-6)/i) composite?
True
Let n(m) = -1657*m**2 + 4*m - 3. Let l be n(1). Let d = l - -2913. Is d prime?
False
Suppose 45*b = 57*b - 3362340. Is b composite?
True
Suppose -203888 = -2*v - 2*g, 54877 = 2*v + 4*g - 149009. Is v a prime number?
False
Let n(l) = -l**3 + 23*l**2 + 29*l + 19. Let y be 30/75*((1 - 1) + 55). Is n(y) composite?
True
Suppose -4*d + 42952 = 4*b, -2*d = 96*b - 98*b - 21480. Is d a composite number?
False
Is (108 - 106)*(-58894)/(-4) composite?
True
Suppose -87*u = -85*u + 2, 3*u = 2*i - 71197. Is i prime?
True
Let b(s) = 45662*s**2 + 16*s + 17. Is b(-2) prime?
False
Suppose 36*r + 28*r = 21*r + 5057531. Is r a prime number?
True
Let s(x) = x + 16. Let l(z) = 3*z - 15. Let d be l(0). Let n be s(d). Is n + 126 + 4 + 0 prime?
True
Suppose -2*c - 354*l + 75254 = -353*l, -3*l + 188135 = 5*c. Is c a composite number?
True
Let q = 915656 - 417013. Is q a prime number?
True
Let w(q) = q**2 - 24*q - 38. Let a be w(26). Let x(h) = 7*h**2 - 12*h - 1. Let y(s) = 1. Let c(j) = x(j) + 2*y(j). Is c(a) composite?
True
Suppose 4*z - 16 = 0, -5*z - 183257 = -3*j + 109670. Is j prime?
True
Let u = -618220 + 1049711. Is u composite?
True
Suppose 111 = 3*y + 5*b - 6*b, y - 5*b = 51. Suppose y*c - 195755 = -60791. Is c a composite number?
True
Let v = 55 - 73. Let o = v + 388. Suppose o = 15*w - 13*w. Is w a prime number?
False
Let l(o) be the third derivative of 11*o**5/12 - o**4/3 - 23*o**3/6 + 13*o**2. Let m be l(9). Let r = m - 1729. Is r a composite number?
True
Suppose 5*j - 3*v + 42 = 0, 3*v - 5 - 31 = 4*j. Is (0/(-3) - -10084)*j/(-8) prime?
False
Let p = 1516 + 1282. Is p composite?
True
Let p = 180 - 183. Is 3214*21/(-14)*2/p a prime number?
False
Let g(a) = 3*a + 21. Let o be g(-8). Let f = o + 1. Is (-79)/(-2 - 1 - f) a composite number?
False
Is (3 + (-25)/10)/(25/5907350) a composite number?
False
Let i(q) = -q**2 + 19*q - 29. Let v be i(17). Suppose -19*n + 23*n = -v*d + 36325, -5*n - 14563 = -2*d. Is d a composite number?
True
Suppose -41 = 16*y + 55. Is (-6)/(-8)*(-37768)/y composite?
False
Suppose 14*q - 28 = 7*q. Suppose -q*t - 7 = -35. Is (-6)/(16/(-8)) + 58*t a composite number?
False
Let b(d) = -2053*d + 1085. Is b(-96) a composite number?
False
Let s(p) = -p**2 + 7*p**2 + 8*p + 14 - 8*p**2. Let u be s(7). Let k = u - -155. Is k a prime number?
True
Let s(c) = 2*c**3 + c - 1. Let j be s(-1). Let t = -11 + j. Let z(u) = -u**2 - 31*u - 19. Is z(t) a prime number?
False
Suppose 3*q = 0, -3*h - 2*h = -3*q - 25. Suppose -5*t = h*s + 16341 - 6281, -5*t = -5. Let y = -1022 - s. Is y a prime number?
True
Suppose -253*w + 369883 = -164*w - 569868. Is w a prime number?
True
Let i(s) = 2*s - 114. Let p(t) = -t + 116. Let g(c) = 5*i(c) + 6*p(c). Is g(13) composite?
True
Let u = 20909 - 13985. Let x be (-1)/(1 + 6/(-4)). Suppose 3*o - 2*a + 3*a = u, x*o = -4*a + 4606. Is o composite?
False
Is (74/(-185))/((-4)/(-123745)*4/(-8)) a composite number?
False
Suppose -m + 61389 = v, m - 2*v = 30144 + 31260. Is m composite?
True
Let j be 3311 + 9/(54/(-12)). Suppose 16*x = 17*x - j. Is x composite?
True
Suppose -22*d + 13695 = -19*d. Let k = -3204 + d. Is k composite?
False
Suppose -6*h = -4164 - 45258. Let x = h + -5722. Suppose 685 = 2*k - b - 330, -5*k = 2*b - x. Is k prime?
False
Suppose 132*u - 88*u + 13248725 = 69*u. Is u a composite number?
True
Suppose -13*u - 14*u + 4769292 = 17*u. Is u prime?
False
Suppose -50 + 20 = -5*j + 2*v, 0 = j + 3*v + 11. Suppose 3*r = 2*q - 122, -j*q + 2*r + 264 = r. Is q prime?
True
Suppose 38*f - 17384 = 46*f. Let r = f - -5662. Is r a prime number?
False
Suppose -s - 1816 = 133. Let b = 2778 + s. Is b composite?
False
Suppose -34*d + 53*d = -57*d + 47584588. Is d a prime number?
True
Suppose 26*s - 848739 = 462727. Suppose 5*v = -26*n + 29*n - s, 2*n - 33628 = 3*v. Is n composite?
True
Suppose -26*t + 48 = -108. Is (3474/12)/(t/112) - 5 a composite number?
False
Let v be -1 - -1 - (76 - 0). Let q = -74 + 299. Let m = q + v. Is m a composite number?
False
Let i be ((-2 - 22)/12)/((-4)/28698). Suppose -88*j - i = -91*j. Is j a prime number?
True
Let a = 151800 - 68201. Is a composite?
True
Let r = 1190 + -25. Let t = 8496 - r. Is t prime?
True
Let v = 36 + -104. Is ((-128418)/v)/((-3)/(-2)) prime?
True
Suppose z = -5*x + 3*x - 2085, -8405 = 4*z - 5*x. Let y = 72 - z. Is y prime?
False
Let g(s) = 143*s**2 - 5*s - 1941. Is g(62) a prime number?
True
Suppose 7*y + 10 = 5*n + 5*y, 0 = 2*y + 10. Suppose -3*h - 251 - 229 = n. Let g = 541 + h. Is g prime?
False
Let y = 384571 - 81858. Is y a composite number?
True
Is -30 + 35 + ((-4)/(-26) - (-646046)/13) prime?
False
Let u(y) = -y + 5. Let g be u(0). Suppose q - 354 + 3220 = 3*h, 5*h = -g*q + 4810. Suppose 5*x = 8*x - h. Is x prime?
False
Let c(b) = 23*b**2 + 9*b + 45. 