). Which is the third biggest value?  (a) 2/3  (b) z  (c) r
b
Suppose -222 = 6*g - 234. Which is the fourth biggest value?  (a) -1  (b) 0.64  (c) -0.1  (d) g
a
Let r = -0.06 + 8.06. Let w = r - 9.5. Let q = 2266.6 - 2267.6. What is the second smallest value in q, w, 4?
q
Let r = 1634.1 - 1729. Let k = r - -2.9. Let m = k + 87. What is the second smallest value in -6, -0.3, m?
m
Let y = -0.1 - 0.4. Let i = 1137 - 797. Let j = i + -337. What is the second biggest value in j, -6/11, -0.4, y?
-0.4
Let t be (3 + -4)/(1*-2). Let y = 34603181/48015 - -9903/1067. Let v = -730 + y. What is the third smallest value in t, 4, v?
4
Let a = -23724.9 + 23726. What is the smallest value in -3, -2/5, a?
-3
Let i = 20052 + -20054. Which is the fourth smallest value?  (a) -0.4  (b) i  (c) -203  (d) -0.3  (e) -3/4
a
Let j(i) = -i**3 + i**2 + i + 5. Let g be j(0). Let k be (-23 - -19)*(3/(-8) - 0). Which is the fourth biggest value?  (a) g  (b) -96  (c) k  (d) 0.4
b
Let x(u) = 18 + 29*u - 17*u - u**3 - 21*u**2 + 15*u**2 - 52. Let h be x(-8). Which is the second biggest value?  (a) -3  (b) -1/4  (c) -0.1  (d) h
b
Suppose -2*l - 88 = -3*y - 3*l, -92 = -4*y + 5*l. Let o be (-10)/y + 8/(-4). Let r = o - -29/14. Which is the third biggest value?  (a) r  (b) 1  (c) 0.2
a
Let d = -1103 - -3308/3. Let b = 2 + -6. What is the smallest value in d, 3, b?
b
Let o = -0.74967 - -0.65967. Let d = 5 + -3. What is the third biggest value in o, d, -0.4?
-0.4
Let q = -53 + 211/4. Let j = -27 - -39.4. Let l = j - 1.4. Which is the third smallest value?  (a) l  (b) q  (c) 1  (d) -2
c
Let j = 0 - -0.2. Let q = -25174.1098 + 25177. Let m = -0.1098 - q. What is the second smallest value in 0, j, m, -0.1?
-0.1
Let k = 1511 + -1510.69. What is the second smallest value in -0.2, k, -1?
-0.2
Let i = 0.16 - -9.84. Let y = i + -13. Let q = -3.17 - 0.83. Which is the smallest value?  (a) -8  (b) y  (c) q  (d) 3
a
Let n = -111.021 - -6.021. Which is the second smallest value?  (a) 2/31  (b) -3/5  (c) n
b
Let u = -9378 + 9375. What is the second smallest value in 0.4, u, 17.5?
0.4
Let a = -0.579 - -0.079. Let u = -12 + 17. Let x be u/(1/((-1)/1)). What is the smallest value in a, -4, -0.3, x?
x
Suppose 12*v + 12 = 4*j + 9*v, 60 = 12*j - 3*v. Which is the second biggest value?  (a) -8  (b) 1/10  (c) -3  (d) j  (e) 5
e
Let t be (46/14766)/((-1)/(-9)). Which is the biggest value?  (a) -4/5  (b) t  (c) 2
c
Let x = -1.053 - -607.053. Let b = -605.5 + x. What is the third biggest value in -13, 3/5, b?
-13
Let q = -306752 - -613503/2. Let d = -4 - -2. Let s = -3 - d. What is the second biggest value in s, 0.3, q?
q
Let u = 0.58 + -0.21. Suppose 35*f = 2*f - 6*f + 117. Which is the second smallest value?  (a) u  (b) f  (c) -8
a
Let f = -23.3 + 23.8. Which is the smallest value?  (a) f  (b) -2/11  (c) 4  (d) -1/2
d
Let y = -12 + 11.65. Let k = y - -0.05. Let l = 5241 + -5241.4. Which is the second biggest value?  (a) -0.34  (b) k  (c) l
a
Let a = -480 + 2879/6. Let o = 345 - 342. What is the biggest value in o, a, 0.06?
o
Let r = -385.101 - -378. Let y = 0.101 + r. Let p(i) = -i**2 - 14*i + 5. Let a be p(-14). What is the second smallest value in y, 4, 3, a?
3
Let l = 55.6 + -55.293. Let o = 0.093 + l. Which is the smallest value?  (a) 0.12  (b) 0.3  (c) o
a
Let p = -1 - 2. Let y(f) = f**2 - 9*f + 12. Let q be y(8). Let n be q/8 + 10/(-36). What is the second smallest value in 2/11, p, n?
2/11
Let b be (3/(-30))/((-1)/(40/50)). Let p = 707/5 - 141. Let x = 24.6 + -25. What is the smallest value in b, -20, p, x?
-20
Let n = -4527 - -4531. Let i = -145 - -144. Which is the biggest value?  (a) i  (b) -2  (c) n  (d) 22
d
Let d = 29 - 212. Let r = d + 183. Let q(v) = -v**3 + 7*v**2 - 7*v + 8. Let s be q(6). What is the second smallest value in s, 0.2, r?
0.2
Let h = 174.62 - 174. Let y = -3.38 - h. Which is the second smallest value?  (a) 5  (b) -51  (c) y
c
Let v = -60.3 + 60. Let f be ((-1)/(-1))/(-25 - 385/(-14)). What is the second smallest value in 3/7, v, 5, f?
f
Let s = 0.3 + -0.7. Let u(a) = -a**2 + 129*a - 971. Let b be u(8). What is the smallest value in s, 31, b, 0?
b
Let g = 30 - 27. Suppose -4*j = -g*d - 244, d + 35 + 33 = 4*j. Let m = d + 88. What is the second biggest value in m, 1, 2/5?
2/5
Suppose 3*r = 4*p - 134, 0*r + p = -r - 40. Let h be (-26 + 20)/(2/(-33)). Let x = r + h. Which is the biggest value?  (a) -1/5  (b) 2  (c) x
c
Let s be 169 - 158 - (-64)/(-6). Which is the fifth smallest value?  (a) -1/3  (b) -0.2  (c) 0.1  (d) 1  (e) s
d
Let g(i) = -31*i - 56. Let n be g(0). Let p = n - -390/7. Which is the second smallest value?  (a) p  (b) 3  (c) 0.07
c
Let s = 17.1321 + -1.1321. Which is the third biggest value?  (a) s  (b) 1/2  (c) 4/11
c
Let q = -1.6 - 9.4. Let n = -2006/13 - -16087/104. Which is the fourth smallest value?  (a) n  (b) q  (c) -0.2  (d) 0
a
Let p(o) = -o**3 + 33*o**2 - 55*o - 16. Let v be p(12). Let q = v - 21104/9. Which is the third biggest value?  (a) q  (b) -0.3  (c) -0.1
b
Let a = 293 + -376.7. Let b = a + 84. Let l = 12 + -8. What is the biggest value in l, -3, b?
l
Let y = -26 + 4. Let r be y/99 - 1*(-4)/18. Suppose 5*q - 9 - 16 = r. Which is the fourth biggest value?  (a) -1/10  (b) q  (c) 4/7  (d) 3
a
Let k be ((-260)/(-30))/13 + 44/(-99). Which is the fourth smallest value?  (a) -3/4  (b) k  (c) 0.1  (d) -1/3  (e) 4
b
Let h be ((0 + -13)*2)/(-11 - -9). Suppose -9 = -16*j + h*j. What is the second smallest value in -3, j, 3/4?
3/4
Suppose -c + 2*a - 1 = 6, 4*c - 5*a = -22. Let p = -21.757 + 17.757. What is the third biggest value in c, p, -2, 3?
c
Let w = -3.328 - -3.028. Which is the third smallest value?  (a) 78  (b) w  (c) 1/3
a
Let z = -85 - -55. Let n = z + 29.5. Which is the second smallest value?  (a) 4  (b) n  (c) -4
b
Let u = -24.258 - -20.258. Let l(b) = -b**3 + 10*b**2 + b - 5. Let t be l(10). Let a = -1.8 + 2. What is the fourth biggest value in t, 1/9, a, u?
u
Let g = 429 - 1347. Let n = g - -888.04. Let k = 30 + n. Which is the third biggest value?  (a) k  (b) -5  (c) 0.4
b
Let a(v) = v**2 - 12*v + 26. Let i be a(15). Let k = -72 + i. What is the second biggest value in -4, 12, -6, k?
k
Let k be (-7)/(-16) + (-1)/4. What is the second biggest value in -0.2, -0.046, k?
-0.046
Let b = 5735/17367 + 18/5789. Suppose 0 = 5*k - 0*k - 85. What is the biggest value in 2, k, b?
k
Let y = 0.68357 + -0.28357. Let i = 10 - 10.2. What is the third biggest value in i, y, 5/4?
i
Suppose 3*v - 12 = 2*o + 4, -5*v - 3*o - 5 = 0. Let h = 868226 - 868227. What is the third smallest value in v, -1/3, -2/67, h?
-2/67
Let t(o) = o - 11. Let r be t(11). Suppose 3*w + w + 20 = r. Let h = 16.3 + -2.3. What is the second biggest value in h, w, -4?
-4
Let y = -1 - -5. Let o be (7/77)/(3/15). Let x = 4/33 - o. Which is the smallest value?  (a) 1/11  (b) y  (c) x
c
Let t = 0.0084 - 0.0084. Let h = 227 - 210. Which is the smallest value?  (a) h  (b) 3  (c) t
c
Let q = 78 - 117. Let o = 38.96 + q. Let x = -1.93 - -1.73. What is the third biggest value in x, o, -0.1?
x
Let x = 23 - 289. Let k = 261 + x. What is the third biggest value in -0.4, -3, k, -2/25?
-3
Let o = 12238 - 12243. Let b be 0 + -1 - 14/(-10). Let l(t) = t**2 - t + 1. Let a be l(0). What is the second smallest value in o, b, a?
b
Let j = 597.0093 + -597. Let r = -2.9907 - j. Which is the smallest value?  (a) r  (b) -0.1  (c) 26
a
Let z = 661 + -3302/5. What is the second smallest value in -2/13, 38, z, 5?
z
Let g = 5 + -4.73. Let d(t) = -t**3 + 5*t**2 - 10. Let n be d(5). Let q be (-5 + (-18)/(-4))*(0 + n). What is the second smallest value in -3, g, q?
g
Let s be 1/1*(-3 + 0). Let f = -13 - -15. Let n = -129/38 - -17/19. What is the smallest value in f, s, -3/4, n?
s
Let b = 34076 - 374856/11. What is the fourth smallest value in b, -2, 2, -1/8, 3?
2
Let d be ((-10)/(-9))/(14/63). Suppose 0 = d*q - 4*n + 3, 3*q - 5*n - 6 = 0. Which is the smallest value?  (a) -0.5  (b) -33  (c) q
b
Let x = -8982.7 - -8983. What is the biggest value in x, 148, -1?
148
Let u = -7143.15 - -7142. Let k = -0.46 - 0.39. Let y = k - u. What is the fourth smallest value in y, -1/9, -2/5, -5?
y
Let z = 14 + -13. Let w = -4.247 + 4.047. Which is the third smallest value?  (a) 2/15  (b) w  (c) z  (d) -1/4
a
Suppose 4*v = -18*v - 0*v. 