 + 3*u = -85. Suppose b*v - 149 = 61. Suppose 0 = -9*y + v*y - 10770. Is y a prime number?
False
Let d(q) = -10*q + 35. Let c be d(3). Suppose c*p = 10*p - 18935. Is p a composite number?
True
Let k(v) = -27 - 3*v + 62 - 5. Is k(8) prime?
False
Let f = 60 - 45. Suppose 4 - 12 = 4*d, 3*y - 3*d = f. Suppose -10937 = -y*b + 3568. Is b a composite number?
True
Suppose 153*y - 190450532 = 7164652 - 3945795. Is y a prime number?
True
Let d be (-5)/((-40)/(-4))*(-5 - 1). Suppose -2*h - d = -h - 5*n, -h + 2*n = 0. Is 4/(-24) - ((-13454)/12 - h) a prime number?
True
Let r(z) be the second derivative of -2*z**3/3 - 6*z**2 + 12*z. Let m be r(-10). Let u = 149 - m. Is u composite?
True
Let x = 8547 + 9452. Is x a composite number?
True
Let o be (-6346)/(-8) - (70/5)/56. Let y = o + -374. Is y a prime number?
True
Let p(d) = 16*d - 15. Let t be p(11). Let g be (-9)/(45/(-10)) + -2. Suppose t = -g*h + h. Is h composite?
True
Let x(h) = 44*h**2 + 9. Suppose 32 = 11*j - 12. Let f be x(j). Let v = f + -244. Is v a composite number?
True
Let i = 7739455 + -3382948. Is i a composite number?
True
Let n = 250 + -479. Let b = 1364 + n. Is b prime?
False
Let j be (9 + (-13576)/24)*(-30)/2. Is j + -9*7/(-21) a prime number?
True
Suppose 3*t - 8 = 1. Suppose t*b - 16549 = -2650. Is b a composite number?
True
Is ((-10)/(-6))/(((-2040)/(-130716))/34) composite?
False
Is (-140)/6*6574/(-3) + (-29)/261 composite?
False
Is (-20)/50 - (-261773028)/220 a prime number?
False
Is ((208113/9)/(11/(-33)))/(-1) a prime number?
True
Suppose -750841 = 19*h - 1671059 - 2732133. Is h a composite number?
False
Suppose 0 = 2*m - 5*s - 59899, m + s - 13670 - 16276 = 0. Is m a composite number?
False
Suppose -59*z + 241091 = -40*z. Is z a composite number?
False
Let s(j) = 337*j**3 - 7*j**2 + 3*j - 1. Let p be s(2). Let c = p - 1420. Is c a prime number?
False
Suppose h - 15*h = -224. Let u be (-8)/3*(-12)/h. Is -5 + (739 - -2) + -1 + u prime?
False
Let a(c) = 5*c**2 - 20*c + 5. Let h be a(4). Suppose i + 967 = -2*p, -4*i + 2*p - h*p - 3873 = 0. Let k = 2068 + i. Is k prime?
False
Suppose 2*t - 1 - 9 = 0. Let u be ((-20)/4)/t + 5. Suppose 5*m - u*v - 467 = 15336, -3*v - 12643 = -4*m. Is m a prime number?
True
Suppose 230876 = -12*z + 2204528. Is z a composite number?
False
Suppose 0 = -i + 5628 + 17111. Is i a composite number?
False
Let k(f) be the second derivative of 19*f**4/3 + 7*f**3/6 + 5*f**2 + 4*f. Let u(t) = 39*t**2 + 3*t + 5. Let b(j) = -4*k(j) + 9*u(j). Is b(2) a prime number?
True
Suppose -3*n - 3*t + 18994 = -9452, -2*t = -4*n + 37922. Is n prime?
False
Is (-120436515)/(-75) - (-28)/35 prime?
False
Suppose -3*x - 22 - 8 = 0. Let q(d) = -31 + 7*d + 28*d**2 + 62 - 26. Is q(x) a composite number?
True
Let n be -3 + 2 - (-23792)/(-12)*-3. Let m = -320 + n. Is m a prime number?
False
Is (-2 - -3)*(7985/(-3))/(-5)*3 a composite number?
False
Let l(g) = 82*g**3 - 8*g**2 - 3*g + 13. Let m be l(6). Suppose -24*i + 22*i - 3*j = -m, -2*j - 17444 = -2*i. Is i composite?
True
Is 4*8/(-32) - -26982 composite?
False
Suppose 11*n - 19*n + 24 = 0. Suppose n*j = -2*t + t + 8, -3*j = 0. Suppose t*r - 3*r = 785. Is r a prime number?
True
Let k be (-2)/(-8)*2*6. Suppose -10 = -5*i - 2*d, 0 = k*i + 7*d - 4*d - 15. Suppose i = -u + 14 + 39. Is u a composite number?
False
Is -1*1*(12 + -13)*8703984/48 prime?
False
Suppose 6*x = 3*z - 879429, -18*x + 20*x = 2*z - 586286. Is z a prime number?
False
Let d(m) = 19*m - 14. Let q be ((-2)/(-4))/(4/16). Let l(h) = 76*h - 57. Let n(y) = q*l(y) - 9*d(y). Is n(-3) prime?
False
Let k(p) = 32370*p + 2513. Is k(12) a prime number?
True
Suppose 0 = 3*a + 4*z - 161 - 4, 0 = -3*a - 5*z + 162. Suppose 5*f + 61*v - 9741 = a*v, 0 = 2*f + v - 3896. Is f a composite number?
False
Let v(p) = 6165*p + 622. Is v(37) prime?
False
Let m = 67878 + -19645. Suppose -4*y - y + 48240 = -5*t, 5*y + 2*t - m = 0. Is y a prime number?
False
Let f(i) = -226*i**3 + 22*i**2 + 3*i + 8. Is f(-9) prime?
False
Suppose -4*v - 425538 = -2*d - 5898412, 0 = 5*v - 3*d - 6841090. Is v prime?
False
Is (-2268574450)/(-950) + 40 + 2/(-19) prime?
True
Let o = -95784 + 502807. Is o a prime number?
True
Let q be 7/((-49)/14)*-53. Suppose q*a = 109*a - 4011. Is a prime?
False
Let a = -21751 + 41004. Is a a composite number?
True
Let d = 389 + -384. Is (-6)/(-150)*d*2245 prime?
True
Let a(i) = -20*i + 15. Let k be a(5). Let w = -82 - k. Suppose w*c + 9359 = 10*c. Is c a prime number?
False
Is (-1)/((-26)/31698) - 362/2353 prime?
False
Suppose y = 2*a - 5, -7 = 5*a - 5*y - 22. Suppose -q - f + 7812 = q, 5*q - a*f - 19539 = 0. Is q composite?
False
Let r = 201 + -87. Is r/4*(-16)/(-24) a composite number?
False
Let b = 539464 + -374601. Is b a composite number?
True
Let d be ((-4)/(-2) - 3) + 4 + -1. Let y(b) = -89*b**2 + 200*b**2 + 334*b**2 + 1474*b**d. Is y(-1) a composite number?
True
Let f = -4880 + 3323. Let r = f + 3940. Is r prime?
True
Suppose -5*l - 126*y + 127*y + 1480662 = 0, -3*y = 21. Is l prime?
False
Suppose 18*t - 213*t = -4054791 - 5121714. Is t prime?
True
Let b = -54467 + 22237. Is b/(-11) + 15/(-9)*-3 composite?
True
Let v(r) = -16*r**3 - 55*r**2 - 59*r + 3. Is v(-17) a prime number?
True
Let b be (14 + -1)*(70 + -4). Let t be -10*(-6)/(-6) - -1349. Let c = t - b. Is c a prime number?
False
Let l be 27/((-8)/(6464/(-12))). Suppose -4*v = -16, v - l = -3*w + w. Is w composite?
False
Suppose 5*a - y = 191303, -2*a - 30577 + 107093 = -3*y. Is a a prime number?
True
Let d(u) = -252*u**2 - 3*u**3 + 288*u**2 + 4*u**3 - 72 - 41*u. Is d(-22) a prime number?
False
Let z(u) = u**3 - 17*u**2 - 3*u - 12. Let x(o) = -o**2. Let j(c) = -2*x(c) - z(c). Suppose 0 = 4*b + 2*n - 5*n - 62, -66 = -4*b + n. Is j(b) a composite number?
False
Let r(o) = 3*o - 1. Let k be r(-3). Is (-5034)/k - ((-240)/50)/(-12) a prime number?
True
Suppose -91*f = -1719806 - 309221. Is f prime?
False
Is (-12)/15 + (-19524126)/(-170) prime?
True
Let m(x) = -3*x - 10. Let n be m(-5). Suppose -n*g + 3026 - 341 = 5*t, 2158 = 4*t + 2*g. Suppose -4*a + 390 + t = 0. Is a a composite number?
False
Let x(c) = 24*c**3 + 15*c - 9 - 14*c**3 + 18*c**2 - 9*c**3. Let z(i) = -3*i + 2. Let y be z(5). Is x(y) prime?
True
Is 62566746/2233 - (16/14 + -1) composite?
False
Suppose 18*l = -60*l + 11355006. Is l a prime number?
True
Is (-9)/((-18)/51482) - (-1 - -7) composite?
True
Let h = -16 - -18. Suppose -b = 5*j - 5537, -5*j - 5577 = -h*b + b. Is b a composite number?
False
Let m(k) = 35690*k**2 + 38*k - 121. Is m(4) prime?
False
Let o(h) = 271*h**3 - 11*h**2 + 7*h + 75. Is o(8) prime?
True
Let k(r) = 7*r**3 - 216*r**2 + 14*r - 167. Is k(56) prime?
True
Let f(r) = 1675*r**2 - 143*r - 711. Is f(-5) composite?
False
Suppose -r + p - 2 = 0, -4*p + 2 - 12 = 2*r. Is (2 - (-1514)/3)*3 + r composite?
True
Let h = 42210 + -12643. Is h a composite number?
False
Suppose -l + 2*h = -16, 0 = -5*l - 2*h + 18 + 62. Suppose 9 = -5*v - l, 2*v + 66 = 4*c. Let o(b) = 6*b**2 + 3*b - 17. Is o(c) composite?
False
Let v = 33620 + -15835. Is v composite?
True
Is (-1)/(((2 - -1)/12)/(87778/(-8))) a prime number?
True
Suppose 2*k - 155848 = -5*g, 5*k = 3*g + 111088 + 278563. Is k a composite number?
False
Suppose 4*c + 4422 = -2*c. Let g = 164 - c. Is g a prime number?
False
Let q(k) = 2612*k**2 - 2616*k**2 - 4 - 32*k**3 - 1 - 14*k**3 - 7*k. Is q(-4) a composite number?
False
Let c(z) = 55*z + 22. Let u(w) = 2*w**2 + 6*w - 11. Suppose -4*i - 36 = -4*r, r + 0*r + 21 = -5*i. Let q be u(i). Is c(q) composite?
True
Let c(r) = -r**3 + 9*r**2 - 12*r + 7. Let o be c(8). Let x be (-10)/o + 54/15. Is (-39)/52 - (-2543)/x prime?
False
Let x(a) = 7*a**2 + 17*a + 89. Let q(p) = -p**2 - 16*p - 4. Let w be q(-17). Is x(w) a composite number?
False
Suppose 0 = -17*c - 312358 + 3656343. Is c composite?
True
Is (-29094093)/(-135) + (-18)/30 + 3/(-15) prime?
False
Let w(n) = 14*n**2 + n + 3. Let x be w(-1). Let l be ((-22)/(-4) + -2)*x. Suppose -b = -41 - l. Is b prime?
True
Suppose -2368 = 2*h + 5*j, -2*h + 2328 = -4*h + 5*j. Is h/((-210)/51 - -4) composite?
True
Let l = 3474 - 1373. Let f = 898 + l. Suppose 0 = -4*x - n + f, -x = -2*x - n + 746. Is x prime?
True
Suppose 0 = 25*f - 11055497 - 6237228. Is f a prime number?
True
Let q(k) = -k**3 - 7*k**2 + 16*k**2 - 5*k**2 + 7*k - 3. 