 first derivative of -3*p**2 + 75*p + 11. Let z be t(13). Which is the fourth biggest value?  (a) 2/15  (b) z  (c) 0.3  (d) 2
b
Let s = 382/11 - 1877/55. What is the fourth biggest value in -1, -0.4, 7, -3, s?
-1
Let l = -2221.6 - -2225.6. What is the second biggest value in -0.3, 55, l, 5?
5
Let w = -164/255 + 66/85. What is the second smallest value in -1/7, w, -14.84?
-1/7
Let h = 0.18 - 0.26. Let t = -9.08 - h. Let n = 169 + -170. Which is the second smallest value?  (a) n  (b) -4  (c) t
b
Let p = 1005 + -1004.6. Let t be 10/(-12)*(5 + -11). Which is the second smallest value?  (a) 2  (b) -0.1  (c) p  (d) t
c
Let d = -4422 + 22111/5. What is the smallest value in 3/8, d, -7/5, -3/2?
-3/2
Let n(j) be the first derivative of -j**4/4 - j**3/3 + j**2/2 + 2*j + 79. Let y be n(0). Which is the smallest value?  (a) -7/12  (b) y  (c) 5
a
Let g = -3580.3 - -3580. Let v = 3.857 + 0.043. Let p = -0.1 - v. What is the smallest value in -2/13, g, p?
p
Let q = -5709 - -5706. Let k = -8 - -7.5. What is the second smallest value in q, -1.3, k?
-1.3
Let h = -136.425 - 0.975. Let q = 137 + h. Which is the second smallest value?  (a) -1/3  (b) 0.1  (c) -0.8  (d) q
d
Suppose 5*f - 41 + 31 = 0. Let r be (-2)/(20/15 - f). Which is the second biggest value?  (a) -1  (b) r  (c) 5.9  (d) -2
b
Let g = -101/6 + 46/3. Let p = -2/737 + -723/5159. What is the smallest value in 4/13, p, g?
g
Let s = -150 + 122. Let o be (8/s)/(4/(-14)). Which is the smallest value?  (a) -2/7  (b) o  (c) -0.5  (d) -4
d
Let g = -12.224 + 9.224. Which is the fourth smallest value?  (a) -5  (b) 4  (c) -2/7  (d) g
b
Let j be 498/27*45/(-10). What is the second biggest value in j, -7, -3?
-7
Let d = 0.048 - -0.115. Let j = d - 71.163. Let w = -70.8 - j. What is the third smallest value in 4/5, w, 1/9?
4/5
Let r = 24130 + -24135. Which is the second smallest value?  (a) 27/4  (b) r  (c) -1/8  (d) -7
b
Let o = -4270 + 4270.1. What is the second biggest value in 1, 0.8, -8, o, -2.1?
0.8
Let y = -3731 + 3728. What is the biggest value in -3/8, 3.2, -2/7, y?
3.2
Let i = 59.5 - 62. Let p be (-1)/(-6)*(0 + 3). Which is the second smallest value?  (a) p  (b) i  (c) 5
a
Let v = 17 + -5.8. Let m = v - 98.2. Let y = -86 - m. Which is the biggest value?  (a) 2/3  (b) -1/6  (c) y
c
Let j = -0.04 + 2.04. Let r = -1.2 - 0.8. Let v = 0.2459 - 0.1459. Which is the third smallest value?  (a) r  (b) v  (c) 0.2  (d) j
c
Let k = -2.59 - -2.49. Let r = 1.978 + 0.022. Which is the third biggest value?  (a) 5  (b) k  (c) -2  (d) r
b
Let f be (2/(-12))/(1/4). Let q(p) = 7*p**2 + 1609*p + 1608. Let n be q(-1). Which is the third biggest value?  (a) -5  (b) -0.3  (c) n  (d) f
d
Let f = -10161 + 10141. What is the biggest value in 2/11, 1, f, 1/4, -0.06?
1
Let v(q) = q**3 - 3*q**2 - q + 9. Let m be v(4). Let h be (m/(-1))/(0 + (0 - 2)). Let n = 277/26 - h. What is the biggest value in -0.06, -4, n?
n
Let r = -2.95 - 0.05. Let l(d) = -7*d**3 - 4*d**2 - 2*d + 11. Let k be l(3). Let q be 7 - (-2 + k/(-25)). What is the second smallest value in q, r, 4?
q
Let x = -842 - -841.7. Which is the biggest value?  (a) 0  (b) x  (c) -109
a
Let p = 20.896 - 20.696. What is the fourth smallest value in -4, 9.7, -3, p?
9.7
Suppose 36*t + 11*t - 10763 = 0. Let p = t + -224. Which is the fourth smallest value?  (a) 0.4  (b) -1  (c) p  (d) 1/6
c
Let y(p) = 9*p - 110. Let k be y(14). Let j be (-3)/5*k/48. Which is the third biggest value?  (a) 5  (b) j  (c) -9  (d) 1/3
b
Let p = -8993 + 8994. Which is the smallest value?  (a) p  (b) 2/5  (c) -1  (d) 0  (e) -4
e
Let b = -223 + 3793/17. Let l = 8.16 - 0.16. Let t = 5 - l. What is the biggest value in b, -34, t?
b
Suppose 39*m + 140 = 140 - 156. Which is the fourth biggest value?  (a) 7/3  (b) 0  (c) m  (d) -24  (e) 1/4
c
Let h = 3119 - 3118.6. Let v = -51.79 - -51. Let y = -0.01 + v. Which is the second smallest value?  (a) h  (b) -0.2  (c) y
b
Let y = 32.053 + -32. Let h = y + 0.047. What is the third smallest value in h, 0.15, 3?
3
Let f = 66.2 + -14.2. Let j = f + -51. What is the smallest value in -1/2, 5, j?
-1/2
Let h = -6.6 - -6.68. Let i = -0.06 - 1.94. Let z = -2 - i. What is the fourth biggest value in z, -4, -5, h?
-5
Suppose -26*k + 7*k + 35 + 60 = 0. What is the second biggest value in -3.3, -0.1, 0.1, -2, k?
0.1
Let t = 201 + -138. Let p be (-18)/t + -3*4/(-42). Let g be (p - -2)*(111/27 + -4). Which is the biggest value?  (a) 1  (b) 0.1  (c) g
a
Let k be (33/(-396))/(21/56). What is the third biggest value in 5, 3/65, k?
k
Let p(r) = r**3 + 26*r**2 - 58*r - 52. Let n be p(-28). Which is the third biggest value?  (a) -1  (b) -1/3  (c) n  (d) 5
b
Let f = -121670 + 121669.8. Suppose 2*j = -3*l + 131, -150 - 137 = -4*j - l. Which is the second biggest value?  (a) 0.4  (b) f  (c) j
a
Let q = -38 - -38.05. Let i = -8.05 + q. Let w = 11 + i. What is the second biggest value in w, 0, -4?
0
Let i = -9.24 + 15.91. Let u = i + -3.67. Which is the smallest value?  (a) u  (b) -1/115  (c) -2/7
c
Let u be -36*(-4)/(-1)*(-2)/(-12). Let n = 3 - u. Suppose 3 + n = 6*t. Which is the third biggest value?  (a) 0.1  (b) t  (c) -5  (d) -0.3
d
Suppose -5 + 241 = 59*m. Which is the second smallest value?  (a) -3/20  (b) 5/3  (c) m  (d) 2/19
d
Let b be (121/(-11) + 8)*1/3. Suppose -2*j + 0 - 4 = 0. What is the third smallest value in 5, -4, b, j?
b
Let g = 23.58 - 20.58. Which is the third biggest value?  (a) 0  (b) -1/5  (c) 5  (d) g  (e) 1/5
e
Let k = 5 - 9. Let i = 0.49901 + -60.49901. Which is the second smallest value?  (a) 4/3  (b) k  (c) i
b
Let u be 4*(-1)/(-8)*(27 + 1). Let t be 4*(-4)/(-40)*10/u. What is the third smallest value in -0.12, 3, t?
3
Let g be (-146)/511*14/(-120). What is the fourth smallest value in g, 0.2, 5, -3/19?
5
Let t = 181 + -180. Which is the third smallest value?  (a) -1  (b) -4  (c) t  (d) 6  (e) -2
a
Let i = -798.1 + 798.5. What is the biggest value in i, -4/637, 2, 3?
3
Let i = 359/12 - 30. Let g = 0.012921 - 2.012921. Which is the second smallest value?  (a) g  (b) i  (c) 5/4  (d) 3/8
b
Let p = 122.94 + -129.94. Which is the second biggest value?  (a) p  (b) -1  (c) -2  (d) 1  (e) -11
b
Let q = 0.0866047 + 0.0133953. Let z = -0.3 - 0.2. What is the second biggest value in q, -2/11, 2/3, z?
q
Let p = -1548 - -1551. Suppose 0 = -70*w + 67*w - 6. Which is the third biggest value?  (a) w  (b) -5  (c) 3/4  (d) p
a
Suppose 2*m + 39 = 67. Let j be ((-9)/m)/((-75)/(-100)). What is the fourth biggest value in 0.03, j, -1/2, -0.3?
j
Let l be (11/7 - 1)*-1. Suppose 5*m - f = 22 + 41, -21 = -3*m - 5*f. Let x be m/(-14) - (-474)/553. What is the smallest value in 0.1, l, x?
l
Let x = 427 + -426.1. Let n = -0.13 - -5.13. Let b = n + -4.8. What is the second smallest value in b, 1/4, x?
1/4
Let i = -20 + -103. Let z = i - -122. Which is the fourth biggest value?  (a) z  (b) -3/5  (c) -5  (d) 2/7
c
Let w = 161 - 160. Let y = 87 - 86.5. What is the smallest value in y, 64, w?
y
Let w = 2.3 + -2.1. Suppose 304*a = 306*a - 3*q - 6, 0 = -4*q + 24. What is the fourth smallest value in 0.4, 4/9, w, a?
a
Let m = 5.6 - 6. Let j = -440 - -439.9413. Let d = 0.4587 + j. What is the third biggest value in m, d, -8?
-8
Suppose 13*m = -208, -12 = -341*n + 337*n + 2*m. Suppose 0 = -3*f - 9 - 36. What is the second biggest value in 3, n, f?
n
Let g = 0.3892 + 0.0108. What is the smallest value in g, -84/11, -0.5?
-84/11
Let z = 1046 - 1045.9. What is the fourth smallest value in 0, z, -2, -94?
z
Let o = -26.8 - 49.2. Let s = o + 76.01. Which is the third biggest value?  (a) 11  (b) s  (c) 0
c
Let x = -3.05 + 2.95. Suppose -34*l + 20 = -39*l. Which is the fourth smallest value?  (a) x  (b) 0  (c) -14  (d) l
b
Let z = 0.1527 - -9.5173. Let k = 8.67 - z. What is the biggest value in 4, 1, k?
4
Let w = 0.0229 - 0.1329. What is the fourth smallest value in 0.3, 2, 5, w?
5
Let t = -4317.2 - -4316.9. Which is the third smallest value?  (a) -2.4  (b) 2/3  (c) t  (d) -0.2  (e) 19
d
Suppose -2*j = -5*t - 5*j + 9, 4*t - 4*j - 20 = 0. Which is the fourth biggest value?  (a) t  (b) -45/7  (c) 1  (d) -0.5  (e) 3/7
d
Let b = 2.72 + 114.28. Let y = b - 118. Suppose -2*k = -5 - 1. What is the fourth smallest value in k, 0.03, 0.5, y?
k
Suppose -3 = -3*s - 6. Let f be (s/21)/(5/15). Let p = -2282 - -11407/5. 