-3*j + 26, -3*j = 8*d - 4*d - 77. Is (2073 + 0)/(d - 16) a prime number?
False
Let s = 28 + -21. Suppose 0*g - 55433 = -s*g. Is g composite?
False
Let n(d) = -41*d**3 + 3*d**2 - 37*d - 52. Is n(-5) composite?
False
Let w be 250/(105/30 - (4 - 1)). Suppose w - 3632 = 3*t. Let s = t + 1675. Is s prime?
True
Let p = -1954 - -8249. Is p composite?
True
Let b = 6 - 2. Let f = -285 - -668. Suppose b*a + f = 1387. Is a prime?
True
Let r(w) = w**3 - 3*w + 3. Let x be r(2). Suppose x*h + 12876 = -3*d, 2*d - 6052 = 4*h + 4262. Let l = h + 4526. Is l a prime number?
True
Let w = -123 - -96. Let v(s) = s**2 + 17*s - 91. Is v(w) a composite number?
False
Suppose 0 = -38*v + 74*v - 51*v + 16859865. Is v a composite number?
True
Let q be (-42)/9*(-24)/28 + -4. Suppose 13*v - 328094 - 26195 = q. Is v composite?
False
Let n(v) = -2*v**3 + 7*v**2 + v + 1. Let k be n(3). Suppose 0 = -17*x - k*x + 124170. Is x composite?
False
Suppose 218*b - 33374586 = -76*b. Is b composite?
True
Suppose -2*u = -2*l - 12, 3*l + 2 + 18 = 4*u. Let h be (l/(-3))/((-14)/(-42)). Suppose -5*a + 4141 = 2*c - 3*c, -h*c = 4*a - 3332. Is a prime?
True
Let x(s) be the third derivative of -s**6/120 - s**5/30 + s**4/4 + 7*s**3/6 + 18*s**2. Let r be x(-6). Suppose -48*f + 47*f = -r. Is f prime?
False
Let d = 14 + -13. Let i be 1*d*(4 + 1). Suppose 670 + 1999 = 2*g - w, -i*w = 3*g - 4036. Is g a prime number?
False
Suppose 0*q + 4*q = -g + 3, 3*g + 9 = -3*q. Suppose q*f - 2679 - 1705 = 2*u, 4*f + 3*u = 8747. Is f composite?
True
Is (223910/(-3))/((-13)/15 - (-46)/230) a composite number?
True
Let t be (378485/(-1283))/(0/(-2) + (-1)/2). Let s(p) = -p**2 + 5*p + 3. Let x be s(6). Let k = t + x. Is k composite?
False
Let i(c) be the first derivative of 3*c**4/2 + 4*c**3 + 20*c**2 - 43*c - 38. Is i(15) a composite number?
True
Suppose 0 = -3*y - 37 + 52. Suppose -2*p - y*k = -12775, -3*p + 15*k = 11*k - 19151. Is p a prime number?
False
Suppose 0*k - 5*v = 4*k - 1, -2*v + 3 = -k. Let y be (-5228)/((-5)/4 - (-2 - k)). Suppose 6723 = -7*o + y. Is o a composite number?
False
Suppose -30 = -6*j - 18. Suppose d = p - 4, -j*d - 14 = -0*d - 4*p. Is (d/3)/(3/(-711)) a composite number?
False
Let n be (239 + -2)/(4/76). Let s = n - 2547. Let c = -1225 + s. Is c prime?
False
Let j(q) = 2*q - 26. Let x be j(10). Let b be 2/x - 9204/(-18). Suppose -2587 = -5*t + y, 3*t = 4*t + 3*y - b. Is t a composite number?
True
Let a(n) = 2*n**3 + 125*n**2 - 43*n + 1357. Is a(-63) a prime number?
True
Suppose u + 5*c = 10727, -13687 = -4*u - 5*c + 29221. Is u a prime number?
False
Suppose -3*n - 20 = -8*n. Suppose -2*l = -n*x - 4312 - 338, 3*l + 2*x - 6983 = 0. Is l a prime number?
False
Let n = -501442 - -888949. Is n prime?
False
Let w = 635556 - 306295. Is w a prime number?
False
Let g be (-2)/(8/1446*21/(-434)). Suppose 3*a - g - 10220 = 0. Is a composite?
False
Let k = 3 + -5. Let q be -2 + 7 - (k - -2). Suppose 2148 + 2197 = q*d. Is d prime?
False
Suppose 144128 - 1596414 = -22*b. Is b composite?
True
Suppose -804811 = -3*i - 2*b + 348892, 4*b = -20. Is i a prime number?
False
Suppose -11*r + 45 = 1. Suppose 4*t - 112724 = z, r*t - 3*z - 112740 = 2*z. Is ((-2)/(-4))/(10/t) a composite number?
False
Let h(u) = -2*u + 21. Let v be h(3). Let s(c) = 1209*c - 254. Is s(v) prime?
True
Suppose -3427 = -2*g + s, -1603 = -3*g + 5*s + 3548. Let v = -1083 + g. Is v a prime number?
False
Let r = -46 + 51. Suppose o + 168 = -2*d + r*o, -d - 4*o = 78. Let p = -15 - d. Is p composite?
False
Let y be (1 + 3)/(-16) - 21/(-4). Suppose -11*g + 8*g + 6 = d, -3*d = -y*g + 10. Suppose -1474 = -g*i + 5*u, 0 = -5*i + i + 3*u + 2948. Is i prime?
False
Suppose -r - 4*j = 2, -2*r - 3*j = -12 + 16. Let q be (3 + 3)*(-2)/(-2). Is -4 + (1576/q - r/6) a composite number?
True
Let w be (-5 - 0)/5 + -1. Let r be 825/77 + w/(-7). Suppose 921 = r*q - 10*q. Is q a prime number?
False
Let s(o) be the first derivative of 7*o**6/180 + o**5/24 - o**4/3 - 6*o**3 + 23. Let j(w) be the third derivative of s(w). Is j(-5) a composite number?
False
Let u(v) = 1039*v**3 + 2*v**2 + 15*v - 35. Is u(3) prime?
True
Suppose -9*m = -3176 - 19. Let c = m - 24. Is c composite?
False
Suppose 3*p = -5*a + 351673, 3*a - 210999 = 31*p - 34*p. Is a composite?
True
Suppose 4*x - 21 + 1 = 0. Let f(t) = 7*t**2 + 2*t - 4. Let c be f(-5). Suppose -c = -2*h - x*h. Is h composite?
False
Let f be 5/5 - (0 - 3). Suppose -37 + 21 = f*g. Is g - 2/(4/(-1270)) a composite number?
False
Let o(r) = -2*r**2 + 8*r**3 + 7 - 8 - 9*r**3 + 12 + 15*r**3. Is o(5) a prime number?
False
Let v(r) = r**2 + 40*r - 78. Let n be v(2). Is (0 + (-40659)/9)*(-18)/n composite?
False
Suppose 3*b + 7*b = -1481770. Let g = b + 93479. Is g/(-18) - 16/(-72) a composite number?
True
Let m(w) = w + 7. Let i be m(-5). Let v be 3*(-35)/15 + 2130/5. Suppose 121 = -i*k + v. Is k prime?
True
Let y be (-20)/(-6) + (-4)/(-12)*-1. Let b be (-1)/(y/(-14)) + (-8)/12. Suppose -3*u = 2*q - 124, -b*u = 3*q - 0*u - 187. Is q a composite number?
True
Let j(t) be the first derivative of t**2 - 1/3*t**3 - 57/4*t**4 + 3*t - 11. Is j(-2) a prime number?
False
Let p = 83 + -81. Suppose -p*c + 44 = -u, c + 4*c + 3*u = 132. Suppose 0 = 18*z - c*z + 5802. Is z a prime number?
True
Let u = -19105 + 98766. Is u a prime number?
False
Let w(c) = 82*c - 53 - 44 + 76 + 60*c. Is w(2) a prime number?
True
Suppose -11*q + 256729 = -16522. Is q a composite number?
False
Is (54127606/156 - (-4)/(-12))*(3 + -1) prime?
True
Suppose 13*n - 6 - 7 = 0. Is (-1)/n*(-1190 - (2 + -5)) composite?
False
Let r(u) = 2*u**3 + 266*u**2 - 56*u - 1271. Is r(-126) composite?
False
Suppose -4*f - 2308 - 476 = -2*d, -4*f - 4186 = -3*d. Suppose -52*z - d = -54*z. Is z a prime number?
True
Let i(l) = l**2 - 2*l - 22. Let x be i(-6). Let j = x + -22. Suppose -v = 4*o - 653, -j*o = -5*v - 0*o + 3385. Is v a composite number?
False
Suppose 446 - 58 = 4*g. Suppose -7*o + 190 = -g. Let h = 72 + o. Is h composite?
False
Suppose -5*m - 5*l - 15 = 0, 3*l + 12 = -5*m - l. Let i be m/(-6) - 376/(-1). Suppose -7*s = s - i. Is s a prime number?
True
Is 9/(-6)*((-2281599)/27 + -17) composite?
False
Suppose 115 = y + 319. Let k = 775 - y. Is k prime?
False
Let o(y) = 3405*y**2 - 2*y - 46. Let h be o(-4). Suppose -5*q - h = -5*z - 11202, -5*z = q - 43270. Is z composite?
True
Let u(p) = -1502*p**3 + 45*p + 218. Is u(-7) composite?
False
Suppose 636448 = 63*k - 632183. Is k prime?
False
Let v = 461 + -454. Suppose v*i = 5961 + 11560. Is i prime?
True
Suppose 4*l = -2*x + 41 - 5, 5*l - 3*x - 34 = 0. Let t be (-4)/l*2495*1*-6. Suppose 2*q - 17*q + t = 0. Is q prime?
True
Suppose 28 = -3*g - 5*o + 301, 98 = g + 4*o. Suppose -5*m - 51 - g = -j, -5*j - 2*m + 631 = 0. Is j a prime number?
True
Let p(w) = -672*w**3 - 10*w**2 - 83*w - 119. Is p(-10) composite?
True
Let z = 630 + -621. Suppose z*g + 65005 = 14*g. Is g prime?
True
Let s = -178 - -227. Suppose -172323 = 40*y - s*y. Is y composite?
True
Let c = -38 + 44. Suppose 3*k - 18232 = -5*y, 4*k - 18237 = -5*y + c*k. Is y prime?
False
Is (-16)/(-40)*-25 + -5 + 146644 prime?
False
Suppose 0 = 32*o + 31473 + 164367. Let u = o - -11591. Is u a prime number?
True
Let v(y) = 9343*y**2 + 13*y + 13. Let j be v(-1). Suppose 6280 = 17*t - j. Is t composite?
False
Let m(r) = -6*r**2 + 21*r - 27. Let t(x) = x**2 - 48*x + 0*x**2 + 47*x + 1. Let b(p) = -m(p) - 5*t(p). Is b(19) a prime number?
True
Is (-45)/120 + (-69)/(-24)*-3 - -240794 composite?
True
Let h be (88032/(-14))/((-3)/((-30)/(-4))). Suppose -3*m - 2*x + 7916 = -7804, 0 = -3*m - 3*x + h. Suppose -k + p + m = 4*k, -4*k + p + 4191 = 0. Is k prime?
True
Suppose -4339 + 692 = -v. Is v composite?
True
Suppose 245780 = c - 3*u, -3*c - 72*u = -71*u - 737370. Is c composite?
False
Suppose 4*y - 2*a = y + 607419, 2*y - 404945 = a. Is y composite?
False
Let h be 64/36 + 7/(-9) + 1. Let p = h - -2. Is 1970/15 + p/(-3) + 1 a composite number?
False
Suppose -848780 = 5*n - 3*l - 3592906, -n + 548824 = -l. Is n composite?
False
Let b(q) = 6*q - 16 - 10 + 25*q. Let v be 0 - (-9 - -1) - -1. Is b(v) composite?
True
Let y(j) = -26*j + 355793. Is y(0) composite?
True
Is 10*(19 - 8523645/(-150)) prime?
True
Let y(l) = -590*l + 99. Is y(-11) a prime number?
False
Suppose -2*m + 2*v - 4 = -16, -8 = -m - v. 