is the second biggest value in -1/4, u, -2/7, v?
u
Suppose 6*i + 243 = -3*i. Let k = i + 21. Let c = -8.3 + 8. What is the second biggest value in -3, c, k?
-3
Let n = 5.1 + -5. Let y = -2.94 - -3.197. Let f = y + -0.057. What is the second biggest value in f, -0.18, -5/4, n?
n
Let o be (88/(-12))/(-11)*(-15)/(-2). Let d be 18/15 - 2 - 231/105. Which is the biggest value?  (a) -49  (b) d  (c) o
c
Let o = -281.1 - -305. Let s = o - 27.9. What is the fourth biggest value in -40, 2, s, 0.5?
-40
Let l = 53182/938035 - -12/26801. Let o be (2/(-22))/(6/(-12)). What is the second smallest value in -0.05, l, o, 0?
0
Suppose -2*m = s - 3, -5*m + 1 + 4 = 0. Let t = 5657 + -5657.21. Which is the second smallest value?  (a) s  (b) t  (c) 5/3
a
Let t be (6/(-72)*8)/6. Which is the smallest value?  (a) t  (b) -5  (c) -1/19
b
Let l(o) = o**3 - 7*o**2 + 3*o - 9. Let t be l(7). Suppose -11*h = -13*h - t. Let g = -172 - -170. What is the second biggest value in g, h, -0.3?
g
Let s be 1/(-10) - (-2)/4. Let t(q) = 41*q - 10*q**2 - 23 + 11 - 14*q + 6*q**2 - 28. Let u be t(5). Which is the third smallest value?  (a) u  (b) -14  (c) s
c
Let j be -42*20/(-700) - (-4)/5. What is the second smallest value in 11, -2, j?
j
Let j(d) = -d**2 - 5*d. Let n be j(-3). Suppose 0 = -n*z + 10*z. Let p = 63 + -65. What is the smallest value in p, 0.05, z, -4?
-4
Let y be (-10)/40 + 484/880. Which is the third smallest value?  (a) 1/9  (b) -0.1  (c) y  (d) 41
c
Suppose 5*v + 0*v = 5. Let q = -511.1 + 38.1. Let h = -473 - q. Which is the third smallest value?  (a) v  (b) 0.4  (c) h
a
Let l = -513 - -1981/4. Let a = l + 18. Let n(y) = 31*y - 32. Let g be n(1). What is the biggest value in g, 0, a, -3?
a
Suppose -3*w - 5*k = 35, -k + 25 = -5*w + 4. Let l = -71 + 76. Let n = 1.3 - 0.3. What is the second biggest value in l, n, w, 2?
2
Let u = -4 + 2. Let o = 7 + u. Let v = 19646 + -19651. Which is the biggest value?  (a) v  (b) -0.3  (c) o
c
Let k = 57 - 56.6. Let s = 2.79 - 33.04. Let y = s + 30. What is the second biggest value in y, -1, k?
y
Suppose 0 = 3*h - 8*h. Suppose 21*y - 14 = -98. Let g be (20/440)/(y/(-16)). Which is the second biggest value?  (a) -1/6  (b) h  (c) g
b
Let n be ((-6)/28 + (-82)/287)/(10/(-4)). Which is the smallest value?  (a) -2/5  (b) -2/39  (c) 0  (d) n  (e) 1/10
a
Let p = 237.7 - 239.7. What is the third smallest value in p, -0.09, -11/5, -0.4?
-0.4
Let l = -10541/7 - -1506. Which is the second biggest value?  (a) l  (b) -0.6  (c) 0
c
Let h = -1046 - -1045.7. Which is the smallest value?  (a) -2/97  (b) -2  (c) -6/11  (d) h
b
Let m = 382 - 381.5. Which is the biggest value?  (a) m  (b) -1/3  (c) 5  (d) -1
c
Let n = -11646 + 11650. What is the smallest value in n, 0.07, -103?
-103
Let d = 301 - 625. Let t = d - -3243/10. Let p = -13/60 + t. What is the second smallest value in -15, p, 2?
p
Suppose 2*u - 3*u + 5 = 0. Let b = -0.032 + 26.732. Let w = b - 25.7. What is the second biggest value in 0, u, w?
w
Let d = -346 + 346.56. Let z = -1.06 + d. What is the third biggest value in z, 2, 24?
z
Let r(h) = -725*h + 1468. Let y be r(2). Which is the smallest value?  (a) 3  (b) -2/9  (c) -1/2  (d) y
c
Suppose -7*q + 21 = -14. Suppose 0 = p + 14*d - 12*d, 2*p = q*d. Let l be (-1 - (-13)/12)*2. What is the biggest value in 0.02, p, 4, l?
4
Let v = -0.35 - -0.3. Let a = -10772 - -10771.6. What is the biggest value in -0.1, a, v, 2?
2
Suppose -u - 17 = 10*f - 4*f, -4*f - 2*u - 18 = 0. What is the second biggest value in 10, -0.3, f, 0.02?
0.02
Let s = -510.0436 - -0.0436. Let o = -511 - s. Which is the third biggest value?  (a) o  (b) 2/21  (c) -5  (d) -1/4
a
Let t = 19119.2 + -19119. Which is the fourth biggest value?  (a) t  (b) 5  (c) 0  (d) -1.7
d
Let o = 0.05 + -0.05. Let r = 0.66 + -0.223. Let w = 41.563 + r. What is the second biggest value in o, 4, w?
4
Let z = 69 - 70. Let l be 1*z*(-11 - -35)/(-6). What is the third smallest value in -1/7, 0, l, -10?
0
Let l be 2/4 + 13131/18. Let j = l - 2194/3. Let q = 20.9 - 20. Which is the second smallest value?  (a) q  (b) j  (c) 3
a
Let o = 1045 - 1043. Which is the second smallest value?  (a) -3  (b) -4  (c) 1  (d) o  (e) 109
a
Let x = 21990 + -21990.0488. What is the second smallest value in x, -5, 3?
x
Suppose 20*y = 12*y + 16. Suppose 0 = y*z + 50 + 18. Let l be ((-17)/z)/((-1)/(-8)). Which is the third smallest value?  (a) 2  (b) l  (c) 0.8
b
Let k = -44.41 - -0.41. Let n = -10 + k. Let b = 57 + n. What is the biggest value in -4, -1/5, -2, b?
b
Let m be 7/((-84)/(-120)) - 14. Which is the smallest value?  (a) m  (b) -0.1  (c) 1/186  (d) 0.04  (e) 3
a
Let d = -168.5 - -168. Let u(w) = w**3 + w**2 - 378. Let t be u(0). Let y = t + 4155/11. Which is the third biggest value?  (a) d  (b) y  (c) -2/5
a
Let b = 2.5 + -2. Let g be (-233)/(-1398) - (-7)/3. What is the third smallest value in b, g, -3, -1?
b
Let n = -1596 + 17554/11. Let g = 62 - 249/4. Which is the third smallest value?  (a) -0.3  (b) n  (c) g  (d) -0.04
b
Let n = -21 + 25. Let w = n - -10. Suppose -5*u - 1 = -l, 19*l - 15*l = -16. Which is the biggest value?  (a) 2/7  (b) w  (c) -1/4  (d) u
b
Let p be (-1)/(-4) - (-1)/(-36). Let v be (-59)/(-236)*8/(-11). Let z = 32 - 36. Which is the third smallest value?  (a) 5  (b) v  (c) z  (d) p
d
Let k = 108 + -187. Let m = k - -83.2. Suppose 0 = 4*j + 2*o + 6, -2*j + 3*o + 9 = -0*o. Which is the smallest value?  (a) -0.5  (b) m  (c) j
a
Suppose 45 = 319*j - 310*j. Which is the second smallest value?  (a) -17  (b) -12/5  (c) j  (d) 3
b
Let m = -2/7699 + 15424/100087. Which is the second biggest value?  (a) 2  (b) -0.8  (c) -0.3  (d) -2  (e) m
e
Let w = -362 + 690. Let x = 333 - w. Which is the smallest value?  (a) x  (b) -8  (c) -1
b
Let n = 2.06 - 1.86. Let h = 0.7 - 0.58. Which is the second biggest value?  (a) h  (b) n  (c) 0.1  (d) -3
a
Let l be ((-24)/78)/(168/(-156)). Which is the third biggest value?  (a) l  (b) -14/13  (c) 5  (d) 0.4  (e) -2
a
Suppose -4*h = -2*p + 18, 5*h - 63*p = -67*p + 10. What is the third biggest value in -4, h, -5, -1/5?
-4
Let o = 576 - 633.1. Let t = o + 57. Let d = 0.05 + 0.45. What is the third smallest value in -3/4, t, 0.03, d?
0.03
Let g = -52 + 46.12. Let x = -0.12 + g. Let a(j) = j**3 + 48*j**2 - 648*j + 59. Let n be a(-59). What is the second smallest value in -4/3, x, -1/9, n?
-4/3
Let y = 1564.7 - 1659. Let n = 105 + y. Let f = n + -11. What is the second smallest value in f, -0.1, -4/5?
f
Let d = -8134 + 8134.7. What is the third smallest value in 1, d, -0.86?
1
Let i = 7.84 - 59.94. Let u = i - -52. Which is the fourth smallest value?  (a) -0.5  (b) u  (c) 14  (d) 1
c
Let t = -247167/13 - -19013. What is the biggest value in -1, -1.19, 4, t?
4
Suppose 0 = -5*i - 5*c + 40, -10 = -3*i - 4*c + 11. Let s be (-7 + i)/((-2)/1). Let m be 1*11/s + 5. What is the second smallest value in -1/8, 27, m?
-1/8
Let k = -13.89 - -1.89. Let z = 8.84 - 6.84. What is the smallest value in z, -0.2, k, 5/3?
k
Let i = 0 + 0.006. Let w = 0.294 + i. Let t = -6 + 46. Which is the third smallest value?  (a) t  (b) 2  (c) w
a
Suppose 4 = -4*f, -8*f + 3*f = 5*x - 25. Let z be (-6 + x)/(-7 - -2). What is the third smallest value in 3/5, z, 1, 0.5?
3/5
Let y = 0.22 + 127.78. Let n = 132 - y. Let t be 0*(1/(-2))/1. What is the biggest value in n, t, -2?
n
Let x = 3.89 - 168.89. Let r = -158 - x. Which is the second smallest value?  (a) -1  (b) r  (c) 2  (d) 5
c
Let r = 8.526 + -8.326. Which is the second smallest value?  (a) 4  (b) r  (c) 3  (d) -1  (e) 8
b
Let r be 4*(-1 - 3357/2682) + 9. Which is the third smallest value?  (a) r  (b) -0.4  (c) -0.1
a
Let k = 7.796 - 7.786. Which is the third biggest value?  (a) -14  (b) -0.4  (c) k
a
Let z = -185.6 + 986.6. Let k = 797 - z. Let w be 1 - (-3)/4 - 2. Which is the fourth biggest value?  (a) w  (b) 3  (c) k  (d) -5
d
Let g = 0.1772 + 0.0228. Let p = 7 + -5. Let o be (-52)/(-78) - (-22)/(-6). What is the smallest value in g, 1/2, o, p?
o
Let x(y) = y**3 + 3*y**2 - 2*y + 3. Let v be x(-4). Let m = 50987 - 509871/10. Which is the biggest value?  (a) m  (b) -2/3  (c) v  (d) 1
d
Let t(r) be the first derivative of -2*r**2 - 21*r - 87. Let l be t(-5). Which is the third smallest value?  (a) l  (b) -0.1  (c) 3
c
Let z = -13.3 + 3.3. Let t = z + 9.6. 