4  (c) y  (d) -1
b
Let m be (-1181)/(-4) - 8/32. Let g = -188 + m. Which is the second biggest value?  (a) 4  (b) g  (c) 1
a
Let g = -11241/4 + 2811. Which is the smallest value?  (a) g  (b) -0.2  (c) 0.5  (d) -0.07
b
Let n = -9228 + 9222. What is the smallest value in -10, -1/3, n, 11?
-10
Let t = -13910 - -13911.1. Which is the biggest value?  (a) 3  (b) -5  (c) -3/8  (d) 5  (e) t
d
Let b be (-5 - 66/(-18))/(22/99). What is the biggest value in b, 3, -0.1?
3
Let a = -0.331 + -0.669. Let d = -0.14 + 5.14. Let y = -0.5 - -1. What is the biggest value in -1/4, a, y, d?
d
Let m = -2.617 - -2.71. Let w = -0.193 + m. Which is the second smallest value?  (a) w  (b) 3/5  (c) 5
b
Let s = -0.4092 - 0.0648. Let x = s - -0.594. Which is the biggest value?  (a) 5  (b) x  (c) -2/3
a
Let w = 1081 - 888. Let b = w - 190. Let l = 0.4 - 0.3. What is the third smallest value in l, -0.06, b, -4?
l
Let t be 5/(-80)*(5 - 1). What is the smallest value in -247, 2/9, t, 4?
-247
Let z(j) = -j**2 - 22*j + 45. Let f be z(-21). Let d be (-15 - -18) + -2 + (-70)/f. What is the second smallest value in 0.2, d, 3?
0.2
Let k = 0.463092 + 0.036908. Let s = -1 - -1.3. Which is the second smallest value?  (a) -0.2  (b) s  (c) -0.02  (d) k
c
Let w = -47 + 52.2. Let j = w + -0.2. Let s = 135.8 - 135.8. What is the second smallest value in j, 0.05, -1, s?
s
Let n = 1.5 - 1. Suppose -4*q - 82 = 5*h - 10, 3*q + 74 = -5*h. Let f be ((h/(-20))/4)/(-2). Which is the second biggest value?  (a) f  (b) n  (c) -1  (d) -2/5
a
Let j = 274.41 + -274. Let l = j + -0.31. What is the third smallest value in l, 4, -1/2?
4
Let p = -536 + 536.406. Let z = p - -0.094. Which is the third smallest value?  (a) z  (b) 4  (c) -3
b
Let i(q) = -q**2 - 26*q - 164. Let l be i(-12). Let f = 10.93 - 11. Let v = f + -2.93. Which is the second smallest value?  (a) -3/4  (b) 3/2  (c) l  (d) v
a
Let n be ((-126)/28)/(6/2). Let k(j) = -j**2 - 13*j - 32. Let z be k(-9). Let h be 2 - 3/(3/z). Which is the smallest value?  (a) h  (b) n  (c) 2
a
Let d be 3805/476 - (-5 + 13). Let r = 485/1428 + d. Suppose 0 = -5*o + 9 + 11, 0 = w + 4*o - 26. What is the second biggest value in r, w, -4?
r
Let q = -0.14 + 0.1. Let g = 17821 + -17821. Which is the biggest value?  (a) -1/3  (b) g  (c) q
b
Let n = 8 + -8.05. Let w = n + -4.95. Let f be (-1 + (-33)/(-36))*(-183)/122. Which is the smallest value?  (a) w  (b) f  (c) 4  (d) 0
a
Let t = -2.1 + -4.4. Let w = t - 12.7. Let q = 19 + w. What is the second biggest value in 7/4, q, -3/4?
q
Let v = 1228.1 + -1228. Let g = -114 - -119. What is the biggest value in 5/6, v, g, 2/9?
g
Let j = -1302 + 1300.9. Which is the third biggest value?  (a) j  (b) 2  (c) 3/29
a
Let o = 73.9 - -126.9. Let i = o + -201. Let p = -0.2 - 0.3. Which is the smallest value?  (a) p  (b) i  (c) 2/9
a
Suppose -b + x - 86 = -3*x, x + 66 = -b. Let h be (-12)/(-10)*b/28. What is the biggest value in h, -4, -0.7?
-0.7
Let v = -2.893245 + -0.021455. Let n = v - 0.0853. What is the smallest value in n, -0.032, 4?
n
Let w(f) = 3*f - 11. Let v be w(10). Suppose -22*h - 69 = -v*h. Let y = h - -20. Which is the third biggest value?  (a) -1  (b) y  (c) -25
c
Let m be 1/2*(-198 + 184). Which is the third smallest value?  (a) 2/421  (b) m  (c) 2/3
c
Let d = 6/1627 - -17879/4881. What is the biggest value in d, 0.5, -0.4, 0.13?
d
Let q = -2624 - -2627. Let s = 0.08 + -0.18. What is the fourth smallest value in -2, q, s, 2/7?
q
Let g = -0.98607 + -0.02013. Let o = -0.0062 - g. Which is the second smallest value?  (a) 0.12  (b) o  (c) -1/3
a
Suppose 7*i + 2*g - 18 = 5*i, 3*i + 2*g - 26 = 0. Let l = -219 - -223. Which is the second smallest value?  (a) 0  (b) i  (c) 5  (d) l
d
Let x = -79663/2 + 39831. Let z = -149/24 - -19/3. Which is the fourth smallest value?  (a) z  (b) 4  (c) 5  (d) x
c
Let o = 9.072 - 0.072. Let t = o - 9.3. What is the smallest value in t, -2, -1/2, 2/201?
-2
Let l = -31/381 + 1360/2667. Which is the smallest value?  (a) -2.2  (b) l  (c) 13/5  (d) 0.4
a
Let k = 489/785 + -35/157. Let x = 29/66 - -2/33. Which is the biggest value?  (a) -0.5  (b) x  (c) k
b
Let d = 1.2284 + -1.1352. Which is the second biggest value?  (a) 2/7  (b) 1  (c) d
a
Let w = 1 + -3. Let n be (159/(-15) - 0) + (-60)/150. Let g be n/2 - (-56)/14. What is the fourth smallest value in g, -3, w, -2/7?
-2/7
Let b be (-62)/(-6) - 1 - ((-5 - -29) + -16). What is the fourth biggest value in -1/8, 0.028, b, 0.5?
-1/8
Let c = -2.999 + -0.001. Let w = -196.76 + 197. What is the second smallest value in -1, c, w, 2?
-1
Let m = 218 + -20491/94. Let o = -85/846 - m. Which is the third smallest value?  (a) 4  (b) 5  (c) o
b
Let r = -17411/4212 - -542/81. Let q = 21/26 - r. Let a = -179 - -184. What is the smallest value in 4/5, a, q?
q
Let d = 4173 - 4171. Let x be ((-4)/(-6))/(12/(-198)). Let b = x + 4. What is the third biggest value in d, -3/7, b?
b
Let x = 2 + -1.5. Let h = 4 + -9. Let u = -3866 - -7731/2. Which is the third biggest value?  (a) 2/5  (b) u  (c) x  (d) h
b
Let p = 9055/3144 - 2/393. Let v = -115323/3416 - -2226/61. Let t = p - v. What is the second biggest value in -0.15, t, 0.4?
t
Let j(h) = h**3 - 9*h**2 - 5*h - 10. Let r be j(9). Let n = r + 53. Let w = 54/5 + -231/20. Which is the third biggest value?  (a) w  (b) -3  (c) n
b
Let h = 2380.211 + -2379. Let v = h + 0.379. What is the second smallest value in -1, v, 6/5?
6/5
Let j = -33.14 - -33.1. Let o = -4.79 - -1.79. What is the smallest value in j, o, 2/11?
o
Let p be (-1)/(-7) - 7/49*-132. Let h be 50/225 - p/45. What is the second smallest value in h, 0.5, -2/7?
h
Let q be (-93)/310 + (-1)/(-2). Let k = 7.5 + -8. Let o = k + 1.5. What is the fourth smallest value in q, -6, -3, o?
o
Let u = -379/14 - -27. Let h = u - 11/42. Suppose -5 = -5*g - 2*m, 3*g - 3*m = 5*g - 2. Which is the smallest value?  (a) h  (b) g  (c) -9
c
Suppose 181 - 433 = -9*c. Suppose 56 = -14*t + c*t. What is the third biggest value in 4/9, -2/11, t?
-2/11
Let f = 2310 + -2308. What is the fourth biggest value in -2, f, -4/5, 0?
-2
Let f = 266 + -226. Let p be (1/2)/(f/32). Which is the third biggest value?  (a) 4  (b) p  (c) -53
c
Let l(p) = -2*p**3 - 9*p**2 - 15*p - 15. Let z be l(-6). Let n = z + -919/5. Which is the smallest value?  (a) 2  (b) 13  (c) 0  (d) n
d
Suppose -8*s - 2733 + 3101 = 0. Which is the third smallest value?  (a) 0.5  (b) s  (c) 0  (d) -0.2  (e) -1/6
c
Let z be ((-2)/(-4))/((-2)/(-56)). Let j = 88252 + -970774/11. What is the smallest value in z, -1/7, -2/15, j?
j
Let k = 6.7 - -6.3. What is the fourth biggest value in -5, 1/3, 11, k?
-5
Let l = -55 - -55. Suppose 4*d - 2*p - 16 = l, 3*d + d - 4 = -p. Let u be d/10 + (-26)/5. What is the second smallest value in 3/4, u, -3/4, 1?
-3/4
Suppose 0 = 4*w + 131 + 49. Let z be (27/(-15))/(w/(-15)). Which is the smallest value?  (a) -1  (b) z  (c) -0.2  (d) -8/11
a
Suppose 4*p = -5*u - 4, p + 5*u - 2 = -3. Let d be 2/(-3) - 12/9*p. Which is the biggest value?  (a) d  (b) -2/3  (c) -1/2
a
Let x = 69017 + -69013. Let q be 4/(-10) - (-2)/5. Let b = 2/637 - -1236/12103. What is the second smallest value in q, -4, x, b?
q
Let s = -358.9 + -58.1. Let o = s + 465.7. Let w = o + -49. Which is the smallest value?  (a) w  (b) 0  (c) -0.1
a
Suppose -17*q + 1150 = 6*q. Suppose -q = 8*n + 110. Let y = 7 - 5. What is the third biggest value in n, y, -2/15?
n
Let g(n) = -n**3 + 52*n**2 - 53*n + 98. Let v be g(51). Let c = -87 - -90.7. Let q = c - 4. What is the smallest value in q, 1/4, v?
v
Let j = -2574/817 + 140/43. Which is the biggest value?  (a) -0.1  (b) j  (c) 2
c
Let o = 526.6 + -521.6. Which is the smallest value?  (a) -0.01  (b) o  (c) -0.37
c
Let k = 7436 + -6107.3. Let j = 1328 - k. Let m = 110/3 - 37. What is the second biggest value in -3, m, j?
j
Let n = -2.136 + 6.136. What is the fourth smallest value in -0.1, n, -0.3, -27, 2/11?
2/11
Suppose 0 = 181*u - 191*u. Let m = -10 - -21. Let f = 9 - m. What is the second biggest value in u, f, -2/11?
-2/11
Let i be 754/(-39)*1 - -18. Which is the third smallest value?  (a) -0.3  (b) 15  (c) -3  (d) i  (e) -0.4
e
Suppose 0 = 2*f - 3*f. Suppose f = i + t - 1, 4*i + 3 - 8 = -5*t. Suppose -4*d + 16 = -i*d. What is the second biggest value in d, 0.4, 2/3?
2/3
Let c(u) = -u**2 - 7*u - 10. 