3 - 13*j**2 + 13*j - 6. Let d be x(12). Let w = d - 8. Let a = 0.2 - -0.3. What is the second smallest value in -0.5, w, a?
-0.5
Let i be 23/(-12) - (-8)/12. Which is the smallest value?  (a) -0.2  (b) -1  (c) i
c
Let p be -3 + ((-55)/10 - -5)*-14. Let t = 0.3 - 0.1. Let k = -0.8 - t. Which is the third biggest value?  (a) k  (b) p  (c) -1/3
a
Let w = -0.093 + -11.307. Let l = 2.6 - w. What is the third smallest value in 0.5, 3, l?
l
Let g = -18 - -31. Let l = g + -9. Which is the second biggest value?  (a) 0.4  (b) -0.5  (c) l
a
Suppose -3*r - 3*g = -51, -10 = -2*r - g + 5*g. Suppose r*w = 8*w - 15. Which is the second smallest value?  (a) w  (b) 1/2  (c) 5
b
Let t = -4.08 - -0.08. Let f(o) = o**3 - o**2 + o - 2. Let d be f(2). Which is the second biggest value?  (a) d  (b) -2/9  (c) t
b
Let v be (25/4)/((-5)/(-40)). What is the smallest value in 0, v, -0.5?
-0.5
Let z(y) be the first derivative of y**4/4 - 4*y**3/3 - 3*y**2 + 5*y + 1. Let v = -9 + 14. Let r be z(v). Which is the biggest value?  (a) 0.3  (b) r  (c) -1
a
Let z = 28 - 28. What is the smallest value in z, -0.2, -6?
-6
Let a = 223/12 - 58/3. What is the smallest value in 0, -5, a?
-5
Let m be ((-21)/(-70))/((-6)/8). Suppose -3*q = -5*p + 7, 0 = -2*p + p + q + 3. What is the second biggest value in m, p, 2/3?
m
Let i = -1.7 + -0.3. Let s = i + 2. Let v = 0.2 - 0.1. What is the biggest value in v, -1/11, s?
v
Let l = -3 + 5. Which is the third smallest value?  (a) 3/2  (b) -3  (c) l
c
Let s = 5 - 1. Suppose -1 = 3*z - 4. What is the third smallest value in s, z, 3?
s
Let h = 14.5 + -15. Let r = -2.95 + -0.05. Let z = 0 + 0.2. What is the third biggest value in h, z, r?
r
Let h = -12 - -16. Let s = 0.3 - 0.2. Let b = -0.6 + s. What is the third smallest value in 1, b, h?
h
Let q = -0.082 + 0.482. What is the smallest value in 0.1, -0.1, q?
-0.1
Let u be 65/(-78)*(-6)/20. Which is the fourth smallest value?  (a) 2/3  (b) 5  (c) 1/5  (d) u
b
Let g = 5959853/90 + -66219. Let a = -17/10 + g. Let f be 1*(0 - 1) + 0. What is the second smallest value in 0, a, f?
a
Let j be (-5)/(-30) + (-3)/((-72)/5). Which is the third smallest value?  (a) -2/7  (b) j  (c) -5/6  (d) -1/4
d
Let o = -1.2 - -0.2. Let h = 8 - 1. Let q = h + -2. Which is the third smallest value?  (a) -0.2  (b) q  (c) o
b
Suppose -3*r + v = -v - 14, 0 = r - 4*v - 18. Which is the smallest value?  (a) r  (b) -9  (c) 1
b
Let d = -0.7 - -0.4. Which is the third biggest value?  (a) 2/3  (b) -0.1  (c) d
c
Let a = 111 - 107. What is the smallest value in 28, a, -0.3?
-0.3
Let i = 3.6 + -0.6. Let v(o) = o - 2. Let g be v(-2). Suppose -8 = 3*u + 4*t, -5*u + 30 = -0*u - 2*t. Which is the second biggest value?  (a) g  (b) i  (c) u
b
Let h = -79/5 - -16. Let g(i) = i + 13. Let m be g(-14). Which is the biggest value?  (a) -3  (b) m  (c) h
c
Let t = -200.4 + 200. Let q = -0.07 + 0.37. Let x = -4/3 + 5/6. Which is the biggest value?  (a) t  (b) x  (c) q
c
Let d be 3/(-2)*(-5 + 1). Suppose -4*j - d - 14 = 0. Which is the second smallest value?  (a) j  (b) 0.5  (c) -0.4
c
Suppose 0 = 2*q + 7*n - 2*n + 25, 3*n + 15 = -4*q. What is the biggest value in 1, q, 2?
2
Let d be 6/(-498)*2/4. Let c be 6/21 - (-11330)/(-6972). Let g = c - d. What is the second biggest value in 0.1, 0.2, g?
0.1
Suppose 4 = -3*g - 11. What is the second biggest value in g, 3, -2/3?
-2/3
Let g be ((-9)/(-3))/3*-4. Let k(q) = 2*q + 0 + 5 + 1. Let w be k(g). Which is the third biggest value?  (a) -0.2  (b) w  (c) -1/6
b
Let h be 121/7 + 4/(-14). Suppose -2*l + h = d + 4*d, d = 3*l. Let i = -0.9 + -3.1. Which is the second smallest value?  (a) d  (b) -2  (c) i
b
Let z = 0.8 + -0.73. Let p = 0.13 + z. Which is the second biggest value?  (a) -3  (b) p  (c) -4
a
Suppose 0 = 6*s - 2*s. Let j be -2 - -3 - (1 - s). Let m = 0.6 + 0.4. Which is the third smallest value?  (a) j  (b) m  (c) 2/7
b
Let s be (-4)/(-14) - (-179)/(-14). Let y = -39 - -25. Let h = y - s. Which is the third biggest value?  (a) -5  (b) h  (c) -2/13
a
Let l(b) = b**2 - b. Let j be l(4). Suppose -3*x = -0*x + 5*w - 9, j = 4*x - w. Let y = 49/2 - 25. What is the third biggest value in 1, y, x?
y
Let l = 4 + -3.9. Let y = -6163/182 - -33/91. Let u = y + 35. What is the biggest value in -4, u, l?
u
Let z be 16/65 - (-2)/(-5). Suppose -4*v = 2*q - 2, -5*v - 33 = -3*q - 8. Suppose 3*b = -3*y - 12, y + y = q*b - 1. What is the smallest value in y, z, 1?
y
Suppose -6*p - 4 = 4*u - 4*p, 3*u = -2*p - 2. Which is the biggest value?  (a) 1/4  (b) 0  (c) u
a
Let o = 13 + -18.2. Let r = o - -0.2. Which is the third smallest value?  (a) r  (b) -1/3  (c) -2/11
c
Let y(r) = r**2 - 15*r + 14. Let m be y(14). Suppose -3*i + i - 6 = m. Which is the smallest value?  (a) 4  (b) i  (c) 3
b
Let i = -27163/14 - -1938. Let q = i + 12/7. Let g = 0.35 + 0.05. What is the biggest value in g, 3/4, q?
3/4
Suppose -3*v = -l + 4, l + 1 - 5 = 0. Suppose 3*u - 2*u - 21 = 4*k, v = -k - u - 4. Which is the third biggest value?  (a) -1/2  (b) k  (c) -1/4
b
Let n be -2 + ((-124)/(-24) - 3). Which is the second smallest value?  (a) 1/2  (b) -5  (c) n
c
Let d be (2/84)/((-2)/8). Let c = 1.7 + -2.4. Let v = 0.4 + c. What is the third smallest value in v, 0.3, d?
0.3
Let j = 0.3 + -0.2. Let s(x) = -x + 2. Suppose 4*m = 3*i - 32, 4*i + 4*m - 6 = 2*m. Let t be s(i). Which is the second smallest value?  (a) 3/7  (b) j  (c) t
b
Let t(o) = -2*o + 13. Let d be t(4). Let v be (8/14)/((-6)/3). What is the second smallest value in v, 0.3, d?
0.3
Let d = 61/5 - 1047/85. Which is the third biggest value?  (a) 5  (b) -2  (c) d
b
Let z = 7 + -7. Which is the second biggest value?  (a) z  (b) -0.3  (c) 1
a
Let s = -8 - -9. Which is the second smallest value?  (a) -3  (b) s  (c) -5
a
Let f be (1 - (3 + -4))/(-1). Let d be (10/15)/(f/(-6)). Let a = 1 - 4. What is the second smallest value in 3, d, a?
d
Let p = 0.34 + -0.04. Let c = -10 - -5. Let d = 22 - 26. What is the third biggest value in p, c, d?
c
Let j = 216513/10 + -21620. Let l = -63/2 + j. What is the third biggest value in -0.4, l, 0.4?
-0.4
Let j be (-1 - (-20)/4) + 1. Let i = 6 + -4. Let p = 1 - 1. Which is the smallest value?  (a) i  (b) p  (c) j
b
Suppose -2*l = -4*l + 4. Suppose -2*n - l*n = 16. Which is the second biggest value?  (a) -1/3  (b) -2  (c) n
b
Let s = 0.35 + -19.35. Let z = s + 21. What is the second smallest value in 2/11, 13, z?
z
Let x = -1.61 + 0.31. Let l = x + 0.9. Which is the second smallest value?  (a) 0.5  (b) l  (c) -0.1
c
Let v = 55.9 - 56. Which is the fourth smallest value?  (a) -4  (b) -0.4  (c) -2/3  (d) v
d
Let q be (-12)/30 - 17/(-5). Suppose q*c = c. Suppose 2*o - 2 - 2 = c. What is the smallest value in 0, 0.3, o?
0
Let g = -60 + 65. What is the biggest value in -1/3, g, -5, -0.5?
g
Let m = 7.02 + -7. Let v = -4.98 - m. Which is the third smallest value?  (a) v  (b) -2  (c) -4
b
Let y = 22 + -20. Which is the third biggest value?  (a) 3  (b) -5  (c) -3  (d) y
c
Let x = 3.78 + 0.22. Which is the smallest value?  (a) 0.3  (b) x  (c) -2
c
Let s = -8 - -71/9. Suppose -4*o = -0*o - 12. Suppose o - 13 = 5*i. Which is the biggest value?  (a) 0.5  (b) s  (c) i
a
Let y be (9/21)/((-9)/(-6)). Which is the third smallest value?  (a) 0  (b) y  (c) -0.3
b
Let t = -7 - -2. Let l = 4.97 + t. Let r = l - 0.17. Which is the second biggest value?  (a) -3  (b) r  (c) -5
a
Let t = 3.8 + 0.2. Let w be (1/(-2))/((-1)/(-4)). Let v be w/(-7) + (-19)/(-7). What is the third smallest value in v, t, -2?
t
Let h = 0 + -5. Let x be -1 + (-2)/1 + 0. Let z be -2 - 20*x/27. Which is the smallest value?  (a) z  (b) h  (c) 1
b
Let g = 43.9 - 49. Let j = -5 - g. Which is the second biggest value?  (a) -1  (b) -0.4  (c) j
b
Suppose 0 = -2*t - 0*t + 12. Suppose -t*i + 2*i + 4 = 0. Suppose z = -2*z + 6. Which is the second biggest value?  (a) i  (b) z  (c) -2
a
Let u = -11 - -17. Let o be (-2)/(u + (0 - 1)). What is the third smallest value in -0.2, o, 0.5?
0.5
Let g = 0.02 + 14.98. What is the fourth biggest value in -3, g, -5, 4?
-5
Let s(u) = -u**2 - 7*u + 9. Let g be s(-8). Let p be 2/g*(-7)/(-14). Which is the second smallest value?  (a) -0.1  (b) p  (c) 0.4
c
Let o = 259/36 + -64/9. Which is the third smallest value?  (a) -1  (b) -4/5  (c) o  (d) -0.7
d
Let q = 241.08 + -237. Let x = q - 0.08. 