the second smallest value?  (a) x  (b) t  (c) d
a
Suppose -x - 3*v + 20 - 6 = 0, v = 5. Let o be 4/(96/159) - 7. What is the third biggest value in x, -0.3, o?
x
Let a = 5.082 - 5.582. What is the fourth biggest value in a, 3, 0, -2, -204?
-2
Suppose -3*g = -3*v - 6, 4*v - 7 = 3*g - 10. Suppose -v*u = -3*p + 3, -2*p - 18 = -3*u - 6*p. Suppose 0*r - 4 = -r. What is the smallest value in u, -1/3, r?
-1/3
Let q(k) be the first derivative of k**4/4 - k**3/3 - 11*k**2/2 - 8*k - 9. Let n be q(4). Which is the smallest value?  (a) -1/7  (b) n  (c) 1/41  (d) -0.5
b
Let x = -5 - -8. Let i = 57696 + -57696.01. What is the second biggest value in -4, x, i?
i
Let s = 0.17 + 0.03. Let j = -27.75 - -27.55. Let l = 66 - 56. What is the third smallest value in j, s, l?
l
Let q = -8936 + 8940. Which is the third biggest value?  (a) q  (b) 5  (c) 19  (d) -16
a
Let p = 16454 + -16453.865. Which is the second biggest value?  (a) 0.5  (b) 2/7  (c) p
b
Let w = -9747 - -9746.68. Which is the fourth biggest value?  (a) 2  (b) -0.07  (c) w  (d) 4
c
Let m be 0 + -3 + 4 + -4 + 0. Let j be 106/(-182) + m/(-7). What is the third smallest value in j, -0.2, 2/45?
2/45
Let p be 9/104 + (-792)/1716. What is the second smallest value in p, -0.04, 3/2?
-0.04
Let o = -213.88 - 9.12. Let z = o - -224. What is the biggest value in 129, z, -0.2?
129
Let q = 41.918 + 12.082. What is the smallest value in q, 0.08, -8?
-8
Let h = -29.7444 + 0.0444. Let z = -75 + 45. Let u = h - z. Which is the third smallest value?  (a) -4  (b) u  (c) 1/4
b
Let u = 1.018 + -1.018. What is the biggest value in -2/23, -0.7, 0.18, u?
0.18
Let p be 50/15 + (-10)/(-6). Suppose 3*u - 3*x = -12, -u + 6 = -p*x - 10. What is the third smallest value in 0.1, u, -0.3, -4?
-0.3
Suppose -4*p - 5 = 2*y + 267, 5*y + 740 = 5*p. Let s be 8/(-6)*-20*(-27)/y. Let t = 15/2 - 53/6. What is the fourth biggest value in t, -5, s, 0.5?
-5
Let t = -53.72 - 0.28. Let h = t - -53.94. Let z(q) = -q**2 - 19*q - 22. Let y be z(-18). Which is the fourth biggest value?  (a) 4  (b) h  (c) 0.5  (d) y
d
Let f = 0.7 - -0.3. Let r = 0.066551 + -0.166551. Which is the biggest value?  (a) 0.13  (b) -0.5  (c) f  (d) r
c
Suppose 0 = 55*l - 53*l - 3*h - 67, 2*h - 94 = -4*l. Which is the second smallest value?  (a) -0.3  (b) l  (c) 1
c
Let a be -2*((-3)/15)/(16/(-40))*-3. What is the biggest value in -1.5, 23, a, -0.2, 0?
23
Let t = 1.41 + -0.9. Let v = 0.21 - t. Let w = v + -5.7. What is the smallest value in 0.4, 0.1, w?
w
Let u = 5.809 + -5.709. Which is the third smallest value?  (a) u  (b) -1/3  (c) -32  (d) 3
a
Let r = -35 - -59. Let f = 12.95 + -16.4. Let y = 7.45 + f. Which is the smallest value?  (a) y  (b) 1/4  (c) r
b
Let g = -271.8 + 272. Let h = -68 - -71. What is the second smallest value in h, g, 1?
1
Let u = -424.3 + 396. Let h = -28.3 - u. Let v = 0.34 + -0.3. Which is the second smallest value?  (a) -2/5  (b) h  (c) v
b
Let z be ((-6)/20)/(-4*162/(-27168)). Let w = z - -64/5. Suppose 0*n + 25 = 5*n - 5*t, 2*n + 3*t = 5. What is the second biggest value in n, 0.5, 0.2, w?
0.5
Let r = 0.024 - 178.024. Let d = r + 121. Let y = d + 57.11. Which is the third biggest value?  (a) 1  (b) -0.5  (c) y
b
Let h = -1969 - -1968.97. Which is the third smallest value?  (a) -2/9  (b) h  (c) -8
b
Let f = 46064/31 - 1486. What is the second smallest value in f, 4, 918?
4
Let m = -5485 - -5485. What is the smallest value in 2/13, 3.232, m?
m
Let s = 14 - 41/3. Let p = 9.01 - 8.9827. Let y = 2.9727 + p. Which is the second smallest value?  (a) y  (b) 0.5  (c) s
b
Let b(a) = 13*a**2 - 4*a - 39. Let o be b(5). Let w = -267 + o. What is the biggest value in w, 0, 1/3, 0.1?
1/3
Let t = -77.78 + 78. Let d be (162/(-15))/(22/10). Let c = 335/66 + d. What is the smallest value in t, 1, c?
c
Suppose 305 = -13*m - 2321. Let a = m + 604/3. What is the third biggest value in a, -1/5, 5?
a
Let t = -13 + 20. Let v = 27 + -29.4. Let x = -0.6 + v. Which is the third smallest value?  (a) t  (b) -2  (c) x
a
Let x = 13 - 12.8. Let o be (-202)/303*(-6)/(-10). Let j = 19 - 23. Which is the fourth biggest value?  (a) x  (b) j  (c) o  (d) -0.3
b
Let p = -168.17 - -168.1. What is the third smallest value in -4, p, 1/13?
1/13
Suppose x - 1261 = 2*v + 1932, 4*v - 3*x = -6385. What is the biggest value in 1, -0.3, v?
1
Let v = -14338.24 - -14340. What is the smallest value in -8, v, 0.4, -1?
-8
Let w = -86 - -87.32. Let n = -2.29 + w. Let m = n - -2.97. Which is the third biggest value?  (a) 1  (b) 15  (c) m
a
Let k = 0.33 - 0.43. Suppose -5 = -5*q - s, -5*q - 2*s - 5 = s. Let z be 2 + 112/(-22) + q. What is the biggest value in -1, z, k?
k
Let m = -426.0054 + 426. Let i = -1.9946 + m. Which is the second biggest value?  (a) -0.7  (b) -0.1  (c) -4  (d) i
a
Let y = -26980 - -26982. Which is the fourth smallest value?  (a) -2  (b) y  (c) 131  (d) 0.4
c
Let t = -3 - -3.2. Let l = 59647/1290 - 463/10. Let m = -26/43 + l. Which is the smallest value?  (a) t  (b) m  (c) 1  (d) -2/7
b
Let s be (0 - (-2)/(-56))/((-30)/(-3045)*29). Let j = -11 - -10.84. What is the smallest value in -3/4, j, s, -3?
-3
Let l be 8*(-2)/(-20) + 207/(-90). What is the third smallest value in l, 3, -4?
3
Let l = -1169 + 1169. Let t be (0 - 3) + (-12)/(-5). Which is the biggest value?  (a) 2/11  (b) 33  (c) l  (d) t
b
Let s = -509.6 + 510. Which is the smallest value?  (a) 0.1  (b) 4  (c) 63/11  (d) s
a
Let z = -895 - -900. Suppose 5*h = -3*r - 16, z*r = 6*h - 9*h - 16. Which is the third biggest value?  (a) h  (b) 4  (c) 7  (d) 1
d
Let z = -206.508 + 207. Let u = 475.092 + -475. Let s = z - u. Which is the biggest value?  (a) -1  (b) s  (c) -2/9  (d) 3
d
Let z be (-2 - (3 + (-3058)/253)) + -7. What is the biggest value in -15, z, -4?
z
Let a be (-4)/(-14) - 4675/6930 - (-2)/(-18). What is the fourth smallest value in 5, a, 1, -19, 6?
5
Let b = -18.1 + 18. Let j = 1353 + -9469/7. Let g = 30.86 + -31. What is the third smallest value in b, g, j?
j
Let k = -388.04 - -388. Which is the smallest value?  (a) 80  (b) 3/5  (c) k
c
Let v = 0.155 + 6.845. Let y be (-3 + -9)*(28/(-16))/7. Which is the third smallest value?  (a) v  (b) 1/5  (c) y
a
Let x = -73/6 + 2327/192. Let r = 23/192 - x. Let v = -0.3 - 0.2. What is the third smallest value in -0.1, r, v?
r
Let c = 2.8 - 3. Let n = 260 - 258. Suppose 0 = n*v - 79 + 87. What is the biggest value in c, 1, -0.1, v?
1
Suppose l - 3*q + 4*q + 11 = 0, -15 = -5*q. Let g = l - -9. Let f be g/((-55)/6)*(-15)/(-45). What is the smallest value in -1/3, 2/13, f?
-1/3
Let h = 0.077 + -0.377. Let z be (-130)/(-14) - (-4)/(-14). Suppose -2*p - p - 3 = 3*l, -z = l + 5*p. What is the third smallest value in l, 5, 0.4, h?
l
Let q = 4983 + -4983. Which is the second biggest value?  (a) q  (b) 80  (c) 2  (d) -3/8
c
Suppose r = -o + 7, -9*r + 3*o - 31 = -14*r. Let i = -1 - -0.2. What is the smallest value in r, 4, -0.5, i?
i
Suppose -2*m + 9 = n, 0 = 23*m - 28*m + 25. Which is the second biggest value?  (a) n  (b) -4  (c) -199
b
Let s be ((-30)/(-28))/(-3)*(-848)/3180. Which is the third smallest value?  (a) -1/6  (b) 0.19  (c) s  (d) -5  (e) 2
c
Let a = -6319 - -6322. What is the fifth smallest value in a, -3, 3/2, -298, -1/7?
a
Let l = 68 + -71. Let i = 8.95638 - -0.04362. What is the third biggest value in 6/13, i, l, -1?
-1
Let k = 13.4142 - 0.0142. Which is the biggest value?  (a) -0.3  (b) -3/4  (c) k  (d) 3
c
Let l = -42709 + 42706. Let p(y) = y**3 + 5*y**2 + 3*y + 6. Let h = -1 - 4. Let k be p(h). Which is the second biggest value?  (a) k  (b) 0.2  (c) l
c
Let h = -3.126 - -4.126. Which is the smallest value?  (a) h  (b) -0.5  (c) 0.259
b
Let c = -11544212/19 - -607415. Let x = c - -175. Suppose -4*w + 5*g + 24 = 0, 3*w + 17 = -7*g + 2*g. What is the biggest value in x, w, -4?
w
Let i = -4470 + 4465. What is the smallest value in 0.3, 0.4, -0.1, i, 0?
i
Let f = -31985 - -31984.8. Which is the third biggest value?  (a) -5  (b) f  (c) -11  (d) -84
c
Let q = -0.41 - -0.01. Let t = 14 + -9. Let m = 4419 + -4376. Which is the third biggest value?  (a) q  (b) m  (c) t
a
Let z be 26 + -25 - (3/(-4))/(6/(-4)). What is the third smallest value in 2, 2/15, 31/5, z?
2
Let p = -250 + 148. Let d = 104 + p. Which is the biggest value?  (a) d  (b) -5  (c) -0.2
a
Let p = -19 - -22. 