1527988 = 4*f, 0 = -o*f + 5*b + 3819980. Round f to the nearest 10000.
760000
Let r = 1755.3010468 + -1758.2811. Let b = r - -2.98. Round b to 6 decimal places.
-0.000053
Let x = -3869.025 + 2.025. Let g = 3866.96973 + x. Round g to two dps.
-0.03
Let r = 17.71 + -17. Let k = -1.26 + r. Let v = -0.54999886 - k. What is v rounded to seven decimal places?
0.0000011
Let y = -115.627 - -110.0783. Let d = y - -238.0387. Let n = 231 - d. Round n to 1 decimal place.
-1.5
Let t = 30 + -8. Let x = -33 + t. Let r = x - -10.04. Round r to one decimal place.
-1
Let c = 0.0037 + 661.9963. Let q = 213 - c. Let j = q + 449.0201. What is j rounded to 3 dps?
0.02
Let r = -0.166 + -87.834. Let g = r - -182. Let o = 93.9695 - g. Round o to 3 dps.
-0.031
Let z = 23789 - 23789.00022086. What is z rounded to 6 dps?
-0.000221
Let g = -34.7 - -167.7. Let l = 132.997952 - g. What is l rounded to four dps?
-0.002
Let q be 12/36 + 12/(-9). Let p be (-4 - q)/(-12) - (-12863988)/48. What is p rounded to the nearest 10000?
270000
Let j(o) = -178*o**2 - 30*o - 5342. Let h be j(106). Round h to the nearest 10000.
-2010000
Suppose 2*k - 7*k = 0. Suppose -y + 3 - 7 = 0, k = 3*z - 2*y - 35610008. Round z to the nearest one million.
12000000
Let o = -5.84 + 30.14. Let j = 12 + o. Let a = 34 - j. Round a to zero decimal places.
-2
Let d = 66 + -58. Suppose -5*o + 62996 = 2*l, l + 37802 = d*o - 5*o. Suppose -o = -3*f - 0*f. What is f rounded to the nearest one thousand?
4000
Let a(l) = l + 2198. Let f be a(-11). Round f to the nearest 100.
2200
Let l = 83908.399435 + -84142.4. Let a = 234 + l. Round a to 5 decimal places.
-0.00057
Let y = -0.34476 - -295.07476. Round y to 0 decimal places.
295
Let p = -1583167587 - -1583167465.999999025. Let l = 121 + p. Round l to seven dps.
-0.000001
Let v = -1632268 - -1632268.44705568. Let s = v + -0.447. Round s to six decimal places.
0.000056
Let z = -54 + 77. Suppose -15 = -8*c - z. Let i be ((-90)/3 + 2)*(-177499 + c). Round i to the nearest one hundred thousand.
5000000
Let a = 28549583.0000032 + -28549944. Let b = -361 - a. What is b rounded to six dps?
-0.000003
Let l = 0.73704 - -578.35296. Let a = -574 + l. What is a rounded to one decimal place?
5.1
Let g be 4/96*9 + (-9)/24. Let y(v) = -v. Let a(m) = 9*m + 494000. Let p(o) = a(o) + 2*y(o). Let f be p(g). Round f to the nearest 10000.
490000
Let r = 7900 + -7900.022. Let a = -1.013727 - -0.9917. Let z = a - r. What is z rounded to 5 decimal places?
-0.00003
Let q = -20038.9999869312 - -20039. What is q rounded to 7 decimal places?
0.0000131
Let l = -2024.036 + 2018. Let w = 0.124 - l. What is w rounded to the nearest integer?
6
Suppose -8*y - 8 = 40. Let c(f) = -f**3 - 5*f**2 + 5*f - 8. Let g be c(y). Let a be 369*g*(-2)/(-12). What is a rounded to the nearest ten?
-120
Let z be ((-1009840)/39)/(2/5700). Let r be (z/(-57))/(96/(-45) - -2). Round r to the nearest one hundred thousand.
-9700000
Suppose 3*f - 3*o - 4 = 5, -3*f + o + 3 = 0. Suppose -6*n + 3*n + 21420 = f. Round n to the nearest one thousand.
7000
Let v = 2800 + -2785.515. Round v to 1 decimal place.
14.5
Suppose -17*m + 22*m + 3*f + 4960262 = 0, -3*m - 2976142 = -2*f. What is m rounded to the nearest 100000?
-1000000
Let i = 1056 + -1058.29. Round i to one dp.
-2.3
Let m = -74 + -154. Let o = -505926.271 - -506154. Let h = m + o. What is h rounded to two decimal places?
-0.27
Let r = 3552.3516 - 3553. Round r to 1 decimal place.
-0.6
Let j = -338.32 + 333. Let p = j - 0.78. Let o = -6.133 - p. Round o to two decimal places.
-0.03
Let b be 10*6*(-5)/(-75). Suppose c = b*j + 848000, -c + j + 1071426 = 223426. What is c rounded to the nearest 100000?
800000
Let x = 0.0264 + -0.00997. Round x to two dps.
0.02
Let o = 270.9 + 825.1. Let g = -1168.7298 - -1.4298. Let y = g + o. Round y to the nearest ten.
-70
Let p = -0.00992 - -479.55992. What is p rounded to the nearest 10?
480
Let v = 123189 - 184400. Let c = v + 61210.966997. Let s = c - -0.033. Round s to six decimal places.
-0.000003
Suppose 0 = -5*t + y - 1097973, 0 = -2*t - 0*t - 5*y - 439173. Let f = t + 890594. Round f to the nearest ten thousand.
670000
Let o = -259 - -258.927. Let a = 0.07299276 + o. What is a rounded to six decimal places?
-0.000007
Let q be (32/6 - 3)*(0 + 3). Let g(i) = -14*i - 124*i**2 - 23 + 120*i**2 + 3320*i**3 + q. Let b be g(-8). Round b to the nearest one million.
-2000000
Let g = 5.2 - 4.895. Let w = g - 0.3050091. What is w rounded to 7 decimal places?
-0.0000091
Let s = 2523 - 2572. Let o = -70893446.000011 + 70893397. Let f = s - o. Round f to five dps.
0.00001
Let s = -0.51 - -0.5099942926. Round s to six dps.
-0.000006
Let g = 8.421 + -8.420949859. What is g rounded to five decimal places?
0.00005
Let h(n) = -n**3 - 11*n**2 - 9*n + 27. Let i be h(-10). Let t(x) = -17439*x**2 - 15*x + 126. Let b be t(i). Round b to the nearest 1000000.
-5000000
Suppose 4*a = t + 1240204, -6200995 = 10*t - 5*t + 5*a. Round t to the nearest one hundred thousand.
-1200000
Suppose -10*q + 163 = 33. Let f(t) = 6*t**3 + 15*t**2 - 10*t + 38. Let j be f(q). Let o be (j/3)/((-10)/15360). Round o to the nearest one million.
-8000000
Suppose 4*g - 30 = 182. Let z = g + -51. Suppose 2*b + 789994 = 2*l - 3*l, 4*b - 1580012 = z*l. Round l to the nearest 100000.
-800000
Suppose 0*b = -b - 2*o + 78, 2*b + 3*o - 159 = 0. Let t be -19*b + -1*1. Let z = 97 + t. Round z to the nearest one thousand.
-2000
Let v = -27989.999993309 + 27990. Round v to five dps.
0.00001
Let x = 1.12 - -9.92. Let a = 157 - 150. Let h = a - x. Round h to 1 dp.
-4
Suppose 6*b + 4*r = 39479420, 3*r - 3557838 = -b + 3022077. Round b to the nearest one hundred thousand.
6600000
Let a = 89673.483 - 89633. Let l = 40.549868 - a. Let f = l - 0.067. Round f to five decimal places.
-0.00013
Let x = 89127 + -89126.999951763. Round x to six dps.
0.000048
Suppose -25 = 5*b, -2*s + 8*b + 28 = 4*b. Suppose 5*n - 336499995 = j, s*j = -5*n + 9*j + 336499975. What is n rounded to the nearest 1000000?
67000000
Let c = -390.62 - 220.5. What is c rounded to the nearest 100?
-600
Let h = -14.461 + 51.446. Round h to 0 dps.
37
Let i(d) = -d + 10. Let u be i(-14). Suppose u*x - 20*x = 5040000. Suppose 2*c + 4*c + x = 0. Round c to the nearest one hundred thousand.
-200000
Let y = 192.57476 + -192.5. Round y to one decimal place.
0.1
Suppose 898*f - 899*f = 3*y - 161323015, -4*f - 5*y = -645292025. What is f rounded to the nearest 1000000?
161000000
Let k be (-2 + 83972/(-3))*(-58 + -2)/(-4). What is k rounded to the nearest one thousand?
-420000
Let q = -103638 - -111005.7. Round q to the nearest one hundred.
7400
Let m(o) = -218516*o - 28 - 295832*o - 485626*o + 2. Let u be m(1). What is u rounded to the nearest one million?
-1000000
Let q = -757 - -2675. Let i = -1937.17 + q. Let t = -17.4 - i. What is t rounded to 1 decimal place?
1.8
Let y = 528 - -7. Let q = y + -535.0000414. Round q to 5 dps.
-0.00004
Let l be -2 + (3 + 2 - -13). Suppose 4*m + z = m + 277, -4*z = -l. What is m rounded to the nearest integer?
91
Let u = 693165 + -693163.690403. Let p = u + -1.309. Round p to 4 decimal places.
0.0006
Let o = 62739.4465 + -62502.4. Let y = o + -0.0465. Let j = -256.4 + y. Round j to 0 decimal places.
-19
Let q = -97740 - -97740.000071309. What is q rounded to seven dps?
0.0000713
Let v = -126175 + 126094.541. Let b = v - 0.241. Round b to the nearest ten.
-80
Let b = 1378.81 - 1398.4239. Let f = -21.15 - -1.55. Let v = f - b. Round v to 3 dps.
0.014
Let l(b) be the first derivative of 3/2*b**2 + 8889/4*b**4 - 12 - 1/3*b**3 - 3*b. Let r be l(3). Round r to the nearest 100000.
200000
Let i = -0.153 + 190.153. Let z = i + -190.1078. Let g = z - -0.1. Round g to three decimal places.
-0.008
Let r = -5144.23 - -5144.229709021. What is r rounded to five decimal places?
-0.00029
Let n = -0.0764 + 3.1394. Let f = 1.143 + n. Let h = 0.006 - f. Round h to the nearest integer.
-4
Let t(a) = 179*a**3 + 11*a**2 - 35*a + 209. Let o be t(-13). What is o rounded to the nearest ten thousand?
-390000
Let i = -0.17 - 5.83. Let d = i + 10. Let z = d + -4.0009. What is z rounded to four dps?
-0.0009
Let c = -105.203 + 105. Let a = c - -0.1. Let d = 0.833 + a. Round d to 1 decimal place.
0.7
Let i = 202 - 198. Suppose 7*r = 2*r. 