*i = 2*d + 4, -10 = -5*i - d. Suppose 0 = 2*s - 4*k + 1448, s = -i*k + 95 - 831. Round s to the nearest 100.
-700
Suppose -w - 2*r = 3 + 5, 0 = 4*r + 20. Suppose 4*c = c, w*k + 3320 = 5*c. Round k to the nearest one hundred.
-1700
Let t = 225 + -570. What is t rounded to the nearest 100?
-300
Let d = -1.188687 - -1.188. Round d to 4 dps.
-0.0007
Let i = 0.2 + -5.7. Let p = i + 5.500067. Round p to five dps.
0.00007
Let r be (2 + 9/(-2))*(-1 - 1). Let g = -370 + 550. Suppose -l + g = -r*l. What is l rounded to the nearest 10?
-50
Let k = -5 - -1.5. Let u = -3.415 - k. Round u to two dps.
0.09
Let w = 8.6 + 150.4. Let z = 158.99559 - w. Round z to 4 decimal places.
-0.0044
Let j = -2365.34 + 2374. Round j to the nearest integer.
9
Let i(u) = -u - 5900000. Let d(f) = f**2 - 5*f - 24. Let y be d(8). Let v be i(y). What is v rounded to the nearest one million?
-6000000
Let l = -0.0595284 - 1578030.9404716. Let n = 1578032.100021 + l. Let k = n + -1.1. Round k to five decimal places.
0.00002
Let u = 0.02658 - 0.0295. What is u rounded to three decimal places?
-0.003
Let j = -5034 + 4494.8. Let x = 494 + j. Round x to the nearest 10.
-50
Let q = -3.1 - 8.9. Let g = 12.0000012 + q. What is g rounded to seven dps?
0.0000012
Let m = 185.999996574 + -186. Round m to seven dps.
-0.0000034
Let p = 218.12 + -185. Let a = -2.5 - -34.5. Let x = p - a. Round x to one dp.
1.1
Let f be 3/6 + 2/4. Suppose -f + 3 = -2*w. Let q(t) = -65*t. Let y be q(w). What is y rounded to the nearest 10?
70
Let s = -42.97036690394 - 0.02963250606. Let b = 43 + s. Round b to 7 dps.
0.0000006
Let d = 49.6 + -49.596736. What is d rounded to 4 decimal places?
0.0033
Let u = -0.05 - 1.35. Let l = u - 0.4. Let c = 0.3 + l. What is c rounded to zero dps?
-2
Let b = -2.56745 - -2.64. What is b rounded to 2 decimal places?
0.07
Let h = -304867709.49999991 - -304867708. Let w = -1.54 - -0.04. Let i = h - w. Round i to 7 decimal places.
0.0000001
Let c = 975845.40007 + -975850. Let k = c + 4.6. Round k to 4 dps.
0.0001
Let p(g) = 2388*g**2 + 3*g - 1. Let c(q) = q + 15. Let f = -10 + -2. Let k be c(f). Let y be p(k). What is y rounded to the nearest 1000?
22000
Let d = 3437889 - 7253666. Let k = d - -3815760.80079. Let q = 16.2 + k. What is q rounded to four decimal places?
0.0008
Let k = -311 - -310.401. What is k rounded to one decimal place?
-0.6
Suppose 14*v - 24 = 13*v. Let l be 28068/v - 2/(-4). What is l rounded to the nearest 100?
1200
Let z = 12 + -12.000049. Round z to 5 dps.
-0.00005
Let p(a) be the third derivative of 1/120*a**6 + 6*a**2 + 3/20*a**5 + 1/4*a**4 + 1/3*a**3 + 0 + 0*a. Let k be p(-6). Round k to the nearest ten.
70
Let s = 0.128 + -0.1280128. What is s rounded to 5 decimal places?
-0.00001
Suppose -14*v = -5*v + 621000. What is v rounded to the nearest 10000?
-70000
Let m = -0.0886 + 126.1886. Let y = -135 + m. Let v = -9 - y. What is v rounded to zero decimal places?
0
Let k be (-5)/((-180)/44 + 4). Let y be 4/(-10) + (-2040478)/k. Round y to the nearest one thousand.
-37000
Let t = -31 - -44.4. Let h = t - 189.4. Let y = 153.2 + h. What is y rounded to zero decimal places?
-23
Let i = 23097.01643661 - 23104.5988. Let x = -76.58235169 - i. Let s = x - -69. What is s rounded to 6 decimal places?
0.000012
Let b(r) be the second derivative of 5*r**5/4 - r**4/6 + r**3/2 - 14*r. Let i be b(2). Round i to the nearest ten.
200
Let k = 2423 - 2972. Round k to the nearest one hundred.
-500
Let s = -123404.000025 - -123401. Let a = 0.3 + 2.7. Let r = a + s. What is r rounded to 5 dps?
-0.00003
Let s = 0.15 - 20.15. Let f = s + -3. Let k = f + 23.0000053. What is k rounded to six dps?
0.000005
Let k = 0.077 + -1.337. Let n = k + 1.437. Let m = 0.1912 - n. Round m to three dps.
0.014
Let d = 35 - 36.8. Let q = d + 1.852. Round q to 2 dps.
0.05
Let a = -12056.4 - -12061.7947. Let z = 0.2 - -5.2. Let f = z - a. What is f rounded to 3 decimal places?
0.005
Let v = 0.163 + -0.255. What is v rounded to three dps?
-0.092
Let g = 257.89 - -12.01. Let b = g + -257.09. Let o = 0.39 + b. What is o rounded to the nearest integer?
13
Let o = -726 + 731.98. Round o to zero dps.
6
Let p(h) = -h. Let n(b) = 3*b + 12. Let v(r) = n(r) + 6*p(r). Let c be v(5). Let d be 1*46*c/(-6). Round d to the nearest ten.
20
Let w = -0.112 - -0.032. Let y = w + 0.07999967. What is y rounded to seven decimal places?
-0.0000003
Let g(p) = 457*p + 4. Let a = -6 + 4. Let o be g(a). Round o to the nearest 100.
-900
Let d = -1522435728.0000113 + 1522435820. Let q = -92 + d. Round q to 6 decimal places.
-0.000011
Let l = -51797.2 + 51507.931. Let g = -289 - l. What is g rounded to two dps?
0.27
Let u = -0.189 + 191.189. Let k = u + -188.77. Round k to zero decimal places.
2
Let d = -0.336 - -0.204. Round d to one dp.
-0.1
Let c(n) = n**3 - 5*n**2 + 5*n - 5. Let j be c(5). Let a be (45/25)/(6/j). Let z be -3*(-2)/a + -1641. What is z rounded to the nearest 100?
-1600
Let d(r) be the third derivative of 9657*r**4/8 - 11*r**3/3 + 4*r**2. Let f be d(6). Suppose 4*q = -f - 286196. Round q to the nearest 10000.
-120000
Let n = 4312.84 + -4335.8359. Let m = n + 23. Round m to three decimal places.
0.004
Suppose 3*l - l + 80 = 4*f, 4*f - 5*l - 80 = 0. Suppose f*t - 17*t + 480000 = 0. Round t to the nearest ten thousand.
-160000
Let u = -31.066 - -31. Let m = 0.033 + u. What is m rounded to 2 decimal places?
-0.03
Let j(c) = 75*c**3 + 5*c**2 - 11*c + 7. Let a be j(-11). Let y = -329092 - a. Round y to the nearest one hundred thousand.
-200000
Let h = -222 - -381.6. Let s = h - 144. Round s to the nearest integer.
16
Let t = 2720 - 2719.7597. Let x = 0.0373 - t. What is x rounded to two decimal places?
-0.2
Let s = -218833214.43035 - 3465.56965. Let c = 218836685.56000257 + s. Let o = 5.56 - c. Round o to 7 dps.
-0.0000026
Let h = -0.076467186 + 0.07646. What is h rounded to 7 dps?
-0.0000072
Let a = 55.38 - -0.62. Let y = a + 10. Let x = 65.9999796 - y. Round x to six dps.
-0.00002
Let x = 17 - 16.93. Let g = x + -0.069996. Round g to five dps.
0
Let q = -371.999275 + 372. What is q rounded to 4 decimal places?
0.0007
Let w = -138.941 + 139. Let u = w + 25.941. Let y = 25.79 - u. What is y rounded to one decimal place?
-0.2
Let j = -5.6 - 1.4. Let p = -7.14 - j. Let c = -0.140004 - p. Round c to 6 decimal places.
-0.000004
Let l = 35.22 + -35.0593. Round l to two decimal places.
0.16
Let f = -2285.18764713 - -2520.1876453. Let o = 235 - f. What is o rounded to seven dps?
0.0000018
Let w = 1784378 - 1784382.700019. Let s = 10.7 + -6. Let u = s + w. What is u rounded to five decimal places?
-0.00002
Let n(r) = -4*r - 2. Let k be n(-6). Suppose s - 4*w + 26 = 0, k = 5*s + 3*w + 83. Let j be (-29698)/(-3) + s/(-21). What is j rounded to the nearest 1000?
10000
Let d = 0.06807 - 0.066. Round d to 4 dps.
0.0021
Let o = 132 - 133.09. Let w = o - -1.090187. Round w to 5 decimal places.
0.00019
Suppose 37*w - 89*w + 274768 = 0. Round w to the nearest one thousand.
5000
Suppose -20 = -5*j + 2*j + 5*r, -3*r - 13 = -2*j. Suppose -2*g = -h + 38999997, 0 = -j*g - 2*h - 3*h - 97500015. Round g to the nearest one million.
-20000000
Suppose 0 = k - 0*k. Let s = -5 - -9. Suppose k = 4*f + s, -4*t - 4*f - 350004 = t. What is t rounded to the nearest 10000?
-70000
Let z(y) = y + 3. Let q be z(2). Suppose q*j = -175980 + 445980. What is j rounded to the nearest 10000?
50000
Let d(c) be the third derivative of -c**4/24 - c**3 - c**2. Let v be d(-6). Suppose -q + 6000000 = -v*q. What is q rounded to the nearest one million?
6000000
Suppose 20 = -4*z, -3*z = -3*x + 2*z + 586. Suppose 3*g - 2*g = -125. Let m = g + x. What is m rounded to the nearest 10?
60
Let g = -0.887 + 20.939. Let h = g - 20. Round h to 2 dps.
0.05
Let b(y) = -46828*y + 4. Let z be b(-10). Let q be 4854896/32 + (-1)/(-2). Let d = q + z. What is d rounded to the nearest one hundred thousand?
600000
Let s = 2.13 + -1.9. Let m = s - 12.23. Let g = -12.000051 - m. What is g rounded to five dps?
-0.00005
Let u = -2492.45 + 2590. Let m = u - 97. What is m rounded to one decimal place?
0.6
Let w(t) be the second derivative of 8*t**2 + t + 3/2*t**3 + 29/12*t**4 + 0. Let j be w(-8). What is j rounded to the nearest one thousand?
2000
Suppose 0 = -3*a - 0*a + 6, 5*o - 4*a = 65212. 