21. Suppose 4*h + k = h + 4*v, 11 = -3*h + 2*v. Is (-3)/h + 870/3 composite?
False
Let w be 1*1728/4 - 6. Suppose 4*z + 2*o + 0*o = 884, -2*z + w = 5*o. Is z a composite number?
False
Suppose 0 = -55*c + 25*c + 488370. Let p = c + -5608. Is p a prime number?
False
Suppose 0 = 3*k + 6544 + 12473. Let u = 9266 + k. Is u a prime number?
True
Let k(h) = -31339*h + 9. Let i be k(-3). Suppose 0 = 15*n - i + 37611. Is n prime?
True
Let w(c) = 4*c**3 + 4*c**2 + 8*c - 2. Let u be w(9). Suppose 8*n = 13*n - u. Let l = n - -399. Is l a composite number?
False
Let g = -205 - -110. Let q = g - -100. Suppose -5 = -i - 0, -3*z = -q*i - 4946. Is z a prime number?
True
Let g(a) = -7*a + 12. Let t be g(-4). Let p = -36 + t. Suppose 3*v - 2*v + p*f - 641 = 0, -3205 = -5*v + 2*f. Is v prime?
True
Suppose -2119214 = -88*b + 2708202. Is b prime?
False
Suppose 13*v + 16 = 12*v. Is 1647 + -3*v/12 prime?
False
Let k = -47 - -45. Is (-2)/(k/5) - 918/(-1) prime?
False
Let p = -26769 + 40538. Let y = p + -9688. Suppose h - 10 = -h, 0 = 2*r - 5*h - y. Is r a prime number?
True
Suppose 364*w - 286*w - 41730 = 0. Let b(x) = -882*x**3 + x**2 - x - 1. Let m be b(-1). Suppose -w + 3170 = 3*p + 2*d, 3*d = -p + m. Is p composite?
False
Let c(n) = 8823*n - 66. Let z be c(-4). Is -1*4/(24/z) prime?
False
Let b(z) = 1950*z - 667. Is b(24) prime?
True
Suppose -4*j - 4*m + 1729052 = 0, -j = 5*m + 142912 - 575199. Is j prime?
False
Suppose 7831 = 8*b - 18673. Let y = b - 2316. Is y a prime number?
True
Suppose -2*k = -5*j - 28, 3*j - 43 = -3*k - 1. Suppose -13*s = -k*s - 2813. Let t = -1926 - s. Is t a prime number?
True
Let u(f) = -44501*f + 31. Let i be u(-2). Suppose -3825 = 8*o - i. Is o a prime number?
True
Let r = -496290 + 753881. Is r a prime number?
True
Let u be (15/2)/(27/18) + 507. Let s = u - -665. Is s composite?
True
Let h(c) = -4379*c - 45. Is h(-4) a prime number?
True
Suppose -5*a + 39*j = 37*j - 63555, -63545 = -5*a + 4*j. Is a a prime number?
True
Suppose 4*t + 4*d = 20, -t - 3*t + 6 = -3*d. Let a(g) = 56*g - t - 352*g - 24*g. Is a(-1) a prime number?
True
Suppose 85602 + 65278 = -8*z. Is (1/4)/((-5)/z) a composite number?
True
Suppose -10384 = -4*a + p, 0 = -2*a - 4*p + 2456 + 2718. Suppose -8*d + 389 = -a. Is d prime?
True
Let n be (-3)/(-2) - (-2)/4. Let f = 1781 + -1200. Suppose 2*t - f = -t - n*h, -t + 195 = h. Is t a prime number?
True
Suppose -4*y + 218 = -526. Let p be y/9*(-2 + -13). Let q = -133 - p. Is q a composite number?
True
Suppose 0 = 5*x - 15 - 5, 2*p + 2*x - 24 = 0. Suppose -p*v = 1556 - 244. Let d = v - -661. Is d a prime number?
False
Let s be 2 - 2 - (6520 - -1). Let q = -4056 - s. Suppose q = v + 4*v. Is v composite?
True
Let h = 29 + -24. Suppose h*s - 46811 = -7821. Suppose 3*z = 3*v + 4680, v - 4*v - s = -5*z. Is z composite?
False
Let w(h) = -22*h**2 + 15*h + 108. Let i be w(-11). Let n be 6/(-15) + (-17776)/10. Let u = n - i. Is u a prime number?
True
Let a = 18795 - -22616. Is a a composite number?
False
Let m = -238885 + 424584. Is m composite?
False
Let x(m) = -2*m**3 + 9*m**2 + 35*m - 8. Let n(p) = -p**3 + 4*p**2 + 18*p - 4. Let o(k) = -9*n(k) + 4*x(k). Is o(15) composite?
False
Suppose -2*r = 5*y - 8*y - 182, 4*r - 348 = -2*y. Suppose -54980 = 68*m - r*m. Is m prime?
True
Let q = -354 - -357. Suppose -5*o = q*d - 18401, -5 = -4*o + 11. Is d a composite number?
True
Is -9*(3 - 1305200/90) prime?
False
Suppose -3*q - 27 = -6*q + 3*u, -3*q + 5*u + 37 = 0. Let j be 54/(-351) + q/26. Suppose y + 3*c + 29 - 141 = 0, j = -3*c - 6. Is y prime?
False
Suppose 0 = -f - 6, 295*q - 2200523 = 290*q - 2*f. Is q composite?
True
Suppose -3*q + 34435 = -4*g + 7331, -45208 = -5*q - 2*g. Suppose 24119 = 3*t - q. Is t a prime number?
False
Let x(v) = 3*v + 219. Let i be x(-40). Suppose -4 = -q, -335 = 2*f + 5*q - 107. Let d = i - f. Is d prime?
True
Is -1*((2 - 1) + 126720/(-12)) prime?
True
Let i be 171/12 + 3/(-12). Let n(r) = 12*r + 26. Let c be n(i). Let g = -115 + c. Is g composite?
False
Suppose -137*i - 5551205 + 48754018 = 0. Is i a composite number?
False
Let p be ((-7)/(-2))/((-7)/182). Let r be 2 + (-16)/7 - 299/p. Is 54 + -1 - (4 - (r + -1)) a composite number?
True
Suppose -5*d + 81 = -0*n + n, 3*d = 0. Let j = 79 - n. Let z(r) = 130*r**2 + 4*r + 5. Is z(j) composite?
True
Let w = 122 + -115. Let j(q) = 20*q**3 + 10*q**2 - 3*q + 40. Is j(w) composite?
False
Suppose -37*j + 2264595 + 32884787 = 9*j. Is j prime?
False
Suppose 5*c = -5*d - 10, 3*d - 18 = -9*c + 14*c. Is 1 + 3404 - (-5 - c)*1 a composite number?
False
Let t(o) = -15*o + 37. Let b(x) = 4*x - 12. Let y(u) = -11*u + 36. Let a(l) = -8*b(l) - 3*y(l). Let h be a(6). Is t(h) composite?
False
Suppose -4*g + 479303 = 5*c, 253*c - 250*c = -g + 119824. Is g prime?
True
Suppose -6*c - 12 = -2*c, 0 = 2*g + 5*c + 3. Is ((-1895)/(-25) + 6)*(g + -1) prime?
True
Let c(s) = -s**2 - 30*s - 81. Let p be c(-27). Suppose -14*b = i - 10*b - 1645, p = -4*i + b + 6631. Is i a composite number?
False
Is (4 - 55/10)/(1*(-3)/82774) a composite number?
False
Let o(c) = c**3 + 21*c**2 + 2*c + 45. Let s be o(-21). Is (-132)/99 - (-9433)/s composite?
True
Let c = 424 + 3405. Is c prime?
False
Suppose -2315 = m - 2*m - 3*h, -3*m = 4*h - 6935. Let o = 4438 - m. Is o a composite number?
False
Suppose -3*j + 8*j + 2*b = 1278529, 0 = 2*j + b - 511410. Is j prime?
True
Let v(i) = i**2 + 23*i + 114. Let k be v(-6). Suppose k*n - 5*n = 6391. Is n a composite number?
True
Let d be (7 - 138/18) + 16/6. Let y(i) = 1273*i - 39. Is y(d) a composite number?
True
Suppose 213*p - 61*p = 9999016. Is p prime?
False
Let r be (-7)/21*-6 - 0. Suppose r*n - 1450 = -116. Is n composite?
True
Let u(i) = 624*i - 17. Suppose 3*l + w - 37 = 0, -4*l + 2*w = 3*w - 48. Is u(l) a prime number?
False
Is 0/(-2) - 8 - (-32 - -24 - 218765) a prime number?
False
Let j = 3 - 7. Let k be (1796 + j - -1)*3. Suppose 38*a - k = 35*a. Is a composite?
True
Let r(p) be the third derivative of p**4/24 + 1057*p**3/6 - 6*p**2 - 6. Suppose -5*g = -0*g. Is r(g) prime?
False
Let g = 6 - 6. Suppose 4 = -0*l - 2*l - 2*o, -4*l - 13 = 5*o. Suppose -11368 = -4*v - 4*d, g*v + l*v - 8538 = d. Is v composite?
True
Let l = -210205 + 592842. Is l a prime number?
False
Suppose -n - 11 = -2*m, -2*m = 2*n + n + 1. Is ((-529)/n)/((112/(-21))/(-16)) a composite number?
True
Let a be 2 + 2 - (-7 + 7). Suppose -a*y = 0, 0*y + 3*y = 2*f - 2764. Is f a prime number?
False
Let u(y) = 5*y - 25 + 43 - 19*y - 11. Is u(-2) a prime number?
False
Let j(b) = -150*b - 6. Let a be j(-5). Let x = -116 + 119. Suppose -750 = -x*r - h, -3*h = -r + 4*r - a. Is r a prime number?
True
Let i(o) = 2*o**2 - 5*o - 9. Let p be i(-3). Suppose p = -9*w - 30. Is (-6404)/w + -5 + (-70)/(-15) composite?
True
Is (-307929)/((((-3)/(-15))/1)/((-5)/15)) prime?
False
Let k = 47 + -49. Let x be k/10 - (-145890)/75. Suppose -4*y = -x - 139. Is y composite?
False
Let p = -37886 + 70287. Is p a composite number?
False
Let r be 1/5 - 1*27/(-15). Suppose -r*w + 124 = 116. Suppose 0 = -2*m - 2*s + 338, -m + 2*s = -w*m + 507. Is m prime?
False
Let y(u) = u**2 - 9*u - 1. Let k(f) = f - 18. Suppose 2*p = i - 13, 5*i - i - p - 52 = 0. Let c be k(i). Is y(c) composite?
True
Suppose 5*o - 30 = 0, 29*i - 31*i + 2*o = -1404646. Is i prime?
True
Let k = -232170 - -460519. Is k a prime number?
False
Let r be 1816/(-6) + 1/(-3). Suppose 468 = 75*b - 84*b. Let j = b - r. Is j composite?
False
Suppose 0 = 71*b - 8334482 - 24223775. Is b prime?
True
Let n(x) = -18178*x - 571. Is n(-6) a composite number?
False
Suppose 323*v + 6901377 = 343*v - 4480523. Is v a composite number?
True
Let t = 11232 + -5708. Is (8 - -6)*t/8*1 a composite number?
True
Let p(v) = -312*v + 2. Let o be p(7). Let w(i) = -219*i. Let l be w(5). Let g = l - o. Is g a prime number?
True
Is 36/(-15) + 333338429/235 composite?
True
Let u(w) = -3*w - 2. Let s be u(-1). Let k(q) = 2*q**3 + 2*q - 1. Let c be k(s). Let v(m) = 1166*m + 7. Is v(c) composite?
True
Is 2309/(-9 - 30120/(-3345)) prime?
False
Let f = 1019944 + -623507. Is f a composite number?
False
Is 4*-1*(-23361)/12 prime?
False
Let s = 29 + -4. Let y = -684 - -712. Suppose -g = -y - s. Is g composite?
False
Let w(t) be the second derivative of t**5/20 - 11*t**4/12 + 11*t**3/6 - 17*t**2/2 + 2*t. 