 Let y = q - -0.0024. Round y to the nearest integer.
-9
Let k(o) be the third derivative of 2500*o**4 + 30*o**2 + 2. Suppose -5*j - 28 = -2*t + 4, -3*j - 4*t - 14 = 0. Let r be k(j). Round r to the nearest 10000.
-360000
Let c = 13062.999988629 - 13063. What is c rounded to six dps?
-0.000011
Let g = 6 - 2. Let q be 3*((-207)/27 - -8). Let j be ((q - g) + -2897)/(-1). What is j rounded to the nearest 100?
2900
Let z(p) = -p**3 - 9*p**2 - 3*p + 15. Let w be z(-8). Let r be (6*(-5)/w)/(4/10). Suppose -r*n = 136528 - 48928. What is n rounded to the nearest 1000?
-29000
Let i = 125 - 124.436. Let c = i - 0.88. Round c to 1 decimal place.
-0.3
Let l = -2103.2 + 2104.6154. What is l rounded to 1 dp?
1.4
Let d = 3381 - 3269.8. Round d to the nearest one hundred.
100
Let n = 84.6 - 84.59953676. Round n to 4 dps.
0.0005
Let i = -3971 + 3970.99999482. Round i to six decimal places.
-0.000005
Let w = -57.074 - -57. Let g = 60 + -63.226. Let r = w + g. Round r to 1 dp.
-3.3
Let y = 493729032.219998843 + -493729034. Let g = y + 1.78. Round g to seven decimal places.
-0.0000012
Let b = 41.7 - 25.8. Let g = b - 15.698. Let v = 0.1419 - g. What is v rounded to three dps?
-0.06
Let j = -472.0004275 - -472. What is j rounded to 5 decimal places?
-0.00043
Let a = -73041 - -72203.09. Let j = a + -2.09. Let w = j + 839.99999631. Round w to 6 decimal places.
-0.000004
Let s = 12554.64562 + -12555. What is s rounded to 1 dp?
-0.4
Let i = -0.1 - -154.1. Let u = -154.0087 + i. Round u to two decimal places.
-0.01
Let y = -27275332 + 27275028.001491. Let m = y - -319.29850508. Let u = m + -15.3. What is u rounded to 7 dps?
-0.0000039
Let o = -675 + 643. Let t = o - -31.99589. What is t rounded to four decimal places?
-0.0041
Let c = -149314 - -149332.5326. Let v = c - 18.7. What is v rounded to two dps?
-0.17
Let v(c) = -2*c**3 - 75*c**2 + 294*c + 65. Let r be v(-47). Round r to the nearest 10000.
30000
Let c = 309640.4 + -312476.549. Let r = -2835 - c. What is r rounded to 1 decimal place?
1.1
Let g = 6632.000063205 - 6632. Round g to 6 decimal places.
0.000063
Let x(y) = -67013*y**2 + 28*y + 60. Suppose 0 = -3*q - 0*q + 2*u + 70, -q = 5*u - 46. Let a be x(q). Round a to the nearest 1000000.
-45000000
Let b be ((-608)/12)/(-6*5/(-81000)). What is b rounded to the nearest ten thousand?
-140000
Let g(s) = 724996*s - 24. Let y = -114 + 108. Let a be g(y). Round a to the nearest 100000.
-4400000
Let j = -0.16019 + 0.00206. What is j rounded to two dps?
-0.16
Let h = -0.7834 - -0.1424. Let w = -0.276 + h. Round w to one decimal place.
-0.9
Let c = 7416 - 7415.97935. What is c rounded to three dps?
0.021
Let c be ((-272)/(-48))/(2/6). Suppose 0 = -2*p + c - 11. Suppose -319997 = w - p*t, 2*w - 3*t = -815762 + 175765. Round w to the nearest one hundred thousand.
-300000
Let j = -5483845750382.8000036 + 5483836734541. Let o = j - -9015838. Let p = o + 3.8. What is p rounded to 7 dps?
-0.0000036
Let s be (-4)/22 - 562428842/319. Round s to the nearest ten thousand.
-1760000
Let g = -923.65 - -831.5154. Let j = -92 - g. Let y = j - 0.0462. What is y rounded to 2 decimal places?
0.09
Let v = 0.5 - 3.5. Let x = -2 - v. Let c = x - 0.9999967. Round c to six decimal places.
0.000003
Let l = 14736 - 14736.0000006241. Round l to six decimal places.
-0.000001
Let v = -0.011 + -0.399. Let a = v + -69.59. Let f = 69.7 + a. What is f rounded to 2 decimal places?
-0.3
Let m = -185.30599 - -0.00599. Round m to the nearest ten.
-190
Let d = -11.3 - -68.3. Let a = d + -57.00055. Round a to 3 decimal places.
-0.001
Let i = -0.57854 - -0.578509499. What is i rounded to 6 decimal places?
-0.000031
Let r = -8.8 - -158.4. Let h = r + -149.640036. Let w = 0.04 + h. What is w rounded to five dps?
-0.00004
Let c = -0.141 + 0.2354. Let u = 2.0694 - c. Round u to 1 dp.
2
Suppose -1 = 3*m - 1. Suppose m = -5*p + 4*t + 15, -t - 17 = 2*p + 2*t. Let w be -3579 - (p/2)/(8/(-16)). What is w rounded to the nearest one hundred?
-3600
Suppose 0 = 4*m - 38 + 30. Let g be m/8*1806886*-2*-2. Suppose -216886 + g = 2*w. Round w to the nearest 100000.
800000
Let d = -7590 - -7589.3369. What is d rounded to one dp?
-0.7
Let u = 60 - 60.1656. Let x = -0.0282 - u. Round x to three dps.
0.137
Let x = 10592034.499364 - 10592009. Let b = x + -25.5. Round b to four decimal places.
-0.0006
Let x = -1.14 - -1.071. Let f = -97.069 - x. Let n = 88.75 + f. Round n to the nearest integer.
-8
Suppose 5*r = a + 1397810, -39*a + 40*a = -3*r - 1397794. Round a to the nearest one hundred thousand.
-1400000
Let k = -133 - -23.1. Let u = 17.1 - k. Let a = -126.9999907 + u. What is a rounded to six decimal places?
0.000009
Let j = 2869.136 - 1553.32. Let q = j + -1315.77600124. Let x = -0.04 + q. What is x rounded to 7 dps?
-0.0000012
Let n be (5175/(-18)*20)/(1/1224). Round n to the nearest one million.
-7000000
Let o = 41205 - 44756.2. What is o rounded to the nearest 100?
-3600
Let t = -173.5 + 171.069. Let v = 0.211 + t. Let h = -2.21999887 - v. What is h rounded to 7 dps?
0.0000011
Let w = 105111 - 105110.999920813. Round w to six decimal places.
0.000079
Let y be (251766710/(-5))/((-1)/20*2). Suppose -163333420 + y = 9*r. Round r to the nearest one million.
38000000
Let p be (20 - 5)*(-1)/(-3). Suppose 0 = -5*s + 5, -p*r + 3*s - 29886358 = -0*r. Let l = r - 32822729. What is l rounded to the nearest 1000000?
-39000000
Suppose 28*k + 44*k - 61511 = 212017. What is k rounded to the nearest one thousand?
4000
Let s(l) be the first derivative of -139164*l**2 + 64*l - 759. Let q be -2*12*(-1)/(-2). Let v be s(q). What is v rounded to the nearest 1000000?
3000000
Let t = -192.75 + 150. Let v = 0.0851 + 5.3649. Let d = v + t. What is d rounded to zero dps?
-37
Let p = -2.722 - -2.52. Let b = p - -0.121. Let k = b - -0.08099927. What is k rounded to seven dps?
-0.0000007
Let b(d) = 89505*d**2 + 8*d - 18. Let s = -43 - -33. Let g be b(s). Let l = g - 5450402. Round l to the nearest 1000000.
4000000
Let i = -0.35 + -5.05. Let h = 242 - 196.5. Let g = h + i. What is g rounded to the nearest integer?
40
Let o = -174.888 + 9.568. Round o to the nearest 100.
-200
Let t = -0.257 - -0.0456. Let u = t - -0.182. What is u rounded to two decimal places?
-0.03
Let u = -639393899490.999999483 - -639393900667. Let q = u + -1176. What is q rounded to 7 decimal places?
0.0000005
Let u = -64.3 - -69. Let f = -509845 + 509840.30049. Let v = f + u. What is v rounded to four dps?
0.0005
Suppose 2*v = -1 + 11, 0 = 2*o + 4*v - 38. Let z be 36/324 - 284671/o. Round z to the nearest ten thousand.
-30000
Let q = 82795261.000613 - 82795296. Let c = q + 35. Round c to 5 decimal places.
0.00061
Let p = -1654.43 - -1662. Let b = 7.5700536 - p. What is b rounded to 6 decimal places?
0.000054
Let o = -22 - -22.029. Let c = 116.029 - o. Let p = c - 115.9851. What is p rounded to three decimal places?
0.015
Let d be (-15)/20 - 152159997/(-12). Suppose 2*l - f = -d, -f = -3*f - 2. Round l to the nearest one hundred thousand.
-6300000
Let k = -123.31 - -164.989. Round k to the nearest integer.
42
Let k = -29737 - -29737.000032218. Round k to six decimal places.
0.000032
Let c(k) = 27*k**3 - 2*k**2 + k. Let s be c(1). Suppose s*x - 16*x = 400000. Round x to the nearest 1000.
40000
Let l = -65571990 - -65576716.7903. Let j = l - 4727. Round j to 2 dps.
-0.21
Suppose 3*z + 2*s = -5 + 11, 4*s = -5*z + 10. Suppose 11*d - 9*d = -z*b - 3950, 0 = 2*b - 6. What is d rounded to the nearest one hundred?
-2000
Let m = 0.02675 + 0.00294. Let b = -0.0321 + m. Round b to 3 dps.
-0.002
Let x(d) = -d**2 + 3*d + 3. Let l be x(3). Suppose -3*z = -5*q + 9, -3*q + 1 = l*z - 14. Suppose -z*n - 3*n = -990. Round n to the nearest ten.
200
Let p = 41.1472 + -4.4652. Round p to zero decimal places.
37
Suppose -561*r = -592*r - 1511033. What is r rounded to the nearest 1000?
-49000
Let c be 2/3*(2 + (-1013)/1). Let y = c - -473. What is y rounded to the nearest ten?
-200
Let d(h) = -77786*h - 107. Let g be d(-7). Suppose -544380 = -4*n - j - 3*j, -j = 4*n - g. Round n to the nearest ten thousand.
140000
Let q = 39 - 4. Let s = 35.00294 - q. Round s to three dps.
0.003
Let h(m) = -35688*m**3 - 3*m**2 + 37*m - 24. Let r be h(-17). Suppose -13*v = -1212733624 + r. Round v to the nearest 1000000.
