9703. Let w = y + -8.6. Round w to five decimal places.
-0.00003
Suppose -4810 = 2*a + 2*n, -3*a + 3*n - 7180 = -n. Let z = -169 + a. Let v = z - -1449. Round v to the nearest 100.
-1100
Suppose 46 = k + 40. Let n be ((-208)/k)/(16/12000). What is n rounded to the nearest 10000?
-30000
Suppose q = 5*g - 76610, -g = 7*q - 2*q + 383102. What is q rounded to the nearest 10000?
-80000
Let g = 1.8 - 1.782. Let y = -3858.98133 - -3859. Let u = y - g. What is u rounded to 4 decimal places?
0.0007
Let b = -490 + 724. Let t = b + -127. Let o = 106.9999706 - t. Round o to 6 decimal places.
-0.000029
Let t = 13.3 + -28.5. Let x = t + -97.8. Let o = x + 112.99796. Round o to 3 dps.
-0.002
Let g = -23.96 + 24. Let t = -191.861 + 192. Let h = g + t. What is h rounded to 1 dp?
0.2
Let c be 4/26 - 4530538020/390. Let b = -16966764 - c. What is b rounded to the nearest 1000000?
-5000000
Let b = -1.3161 - -1.31645691. Round b to 4 dps.
0.0004
Let b = 512 + -510. Suppose 0 = d + 3*x - 5900000, 3*d - b*x = 4*d - 5900000. Round d to the nearest one million.
6000000
Let w(y) = 475205*y**2 + 12*y - 98. Let n be w(11). Let j be n/46 + (-7)/(-2). What is j rounded to the nearest one million?
1000000
Suppose -j = 2*z - 21381, -68*z = -33*z - 32*z. Let b(w) = 6353*w**3 - w**2 - 2*w + 3. Let q be b(2). Let y = j + q. Round y to the nearest 10000.
70000
Let n(q) = -q**3 - 10*q**2 - 30*q - 20. Let k be n(-4). Let o(w) = 19*w**2. Let y be o(1). Suppose 3 = -k*r + y, j + 3*r + 468 = 0. Round j to the nearest 100.
-500
Let q = -21 - -22. Let m be ((-2)/12)/q + (-105598)/12. Let y be m*2*-150*(-300)/45. What is y rounded to the nearest 1000000?
-18000000
Suppose 3*r + q = 64566000, 5*r - 43044000 = 3*r + 5*q. Round r to the nearest 100000.
21500000
Let h = -6610 + 6609.947952. Let z = -0.0521 - h. What is z rounded to 6 decimal places?
-0.000052
Let t = 3426.997815 - 3427. What is t rounded to 5 decimal places?
-0.00219
Let t = -215.976204 + 215.85. What is t rounded to three decimal places?
-0.126
Let n = -52.0440903 - -49.048881. Let u = 2.995 + n. What is u rounded to 5 decimal places?
-0.00021
Let m = 1988696.7451 + -1988479. Let f = m + -3.1151. Let d = 216 - f. Round d to 1 decimal place.
1.4
Let c = 52.86 + 2.14. Let a = -50.54 + c. What is a rounded to the nearest integer?
4
Let h = 239.8737 + -283.873704. Let j = 44 + h. Round j to five dps.
0
Let k = -165 + 174. Suppose -k*f + 5964 = -5673. What is f rounded to the nearest 100?
1300
Let m = -484.187 - -404.1. What is m rounded to the nearest ten?
-80
Let m = 0.2483 + -0.2123. Let c = -0.265 + 0.3. Let s = m - c. Round s to three dps.
0.001
Let o = -16.463 - -16.4. Let i = -0.06301474 - o. What is i rounded to six dps?
-0.000015
Let s = -404.996 + -438.1224. Let t = 843 + s. What is t rounded to 3 dps?
-0.118
Let a = 2667.399954079 - 2667.4. Round a to 6 decimal places.
-0.000046
Let p = -74 - -73.969. Let h = -517224 - -517223.9689997. Let b = h - p. What is b rounded to seven decimal places?
-0.0000003
Let u(i) = -i**3 + 16*i**2 - 13*i - 18. Let a be u(15). Suppose 0 = -6*y + a*y + 13657824. Let g = -363696 + y. What is g rounded to the nearest 1000000?
-3000000
Let d = -293211814.637 + 293210594.63698641. Let t = -1220 - d. What is t rounded to 6 dps?
0.000014
Let n = 1526376 - 808962. Let q = -12936 + -29650. Let a = q - n. Round a to the nearest one hundred thousand.
-800000
Let i = 1247.07 + -1247. Let j = 24 - 23.93125. Let s = j - i. What is s rounded to 4 dps?
-0.0013
Let r = 2.7 + -37.7. Let m = -73 - r. Let o = m - -38.0011. Round o to 3 dps.
0.001
Suppose 3*k = -5*s - 70, 4*k - 37 = s - 0*k. Let b be ((-10)/(-8))/(s/26656). Round b to the nearest 1000.
-2000
Let m = 4829 + -1469. Let d be (3 - (-10655)/(-10))*m. What is d rounded to the nearest one hundred thousand?
-3600000
Let m be (43352/(-12))/(12/(-2844)). Let r = m - 3034202. What is r rounded to the nearest one hundred thousand?
-2200000
Let b = -69 + 22. Let y = 50.92 + b. Let k = y - 4.6. Round k to the nearest integer.
-1
Let p be ((-3263357)/(-24) - (-10)/80)*15*1. What is p rounded to the nearest ten thousand?
2040000
Suppose -4*h - 2*y = h + 409232847, -245539721 = 3*h - 2*y. Let m = h - -53946571. What is m rounded to the nearest one million?
-28000000
Suppose -4*t = -4*z + 52, 10 + 5 = -t - z. Let w be (2/4 + 0)/(t/168). Let r = w - -66. Round r to the nearest one hundred.
100
Suppose 5*l + 24*g - 18*g + 60095 = 0, -4*g - 12005 = l. Round l to the nearest one thousand.
-12000
Suppose 106*q - 102*q = -226568. What is q rounded to the nearest ten thousand?
-60000
Let q = -1450 + 1470.97. Let w = -0.0004 + -1.2296. Let x = q - w. What is x rounded to 0 decimal places?
22
Let u = -182.15 + 183. Let l = -0.85000065 + u. What is l rounded to 7 decimal places?
-0.0000007
Let c = -79 - -80.14. Let r = c - 5.84. Round r to zero decimal places.
-5
Let w = -602.94 + 609.4. Let h = -2.7734 - 0.0566. Let c = w + h. Round c to zero dps.
4
Let z = 26.7 - 11.4. Let r = z + 67.7. Let w = 83.0000415 - r. What is w rounded to six decimal places?
0.000042
Let w = 13455 + -13455.84647. What is w rounded to three decimal places?
-0.846
Let k = -1649.006 - -285.536. Let v = k + 1399. Round v to zero decimal places.
36
Let a = -435 - -493.8. Let j = a - 128. Let v = 69 + j. Round v to 1 decimal place.
-0.2
Let r(w) be the second derivative of 4*w**3 - 3*w**2 + 33*w. Let o be r(-6). Let k be (-10401 - -1)*o/4. Round k to the nearest one hundred thousand.
400000
Let j = 10.6928 + -9.3. What is j rounded to 2 dps?
1.39
Let l = -9.21 + -0.99. Let m = l - 25.8. Let w = m - -36.00239. Round w to four decimal places.
0.0024
Suppose -32*m = -2*m - 1710. Suppose 64*h - m*h = 6923. Round h to the nearest one hundred.
1000
Let u = -3123 - -3123.001631. What is u rounded to three dps?
0.002
Let o = -6.2977 + 6.646. Let r = 36.8353 - 36.9. Let g = r - o. Round g to 2 dps.
-0.41
Let d = -40699.999974547 - -40700. Round d to six decimal places.
0.000025
Let q = -61293 + 61631.67. Round q to 0 decimal places.
339
Suppose 0 = 54*j - 49*j - 23540. Suppose -3531 = -3*m - 3*i, -4*m + j = -0*i - 4*i. What is m rounded to the nearest one hundred?
1200
Let y = -11.0306 + 1.0306. Let m = 302.7 - 283. Let h = m + y. What is h rounded to zero decimal places?
10
Suppose 3*j - 9 = 0, 44*x = 39*x + 2*j - 11. Let u(p) = -2159*p**3 + 28*p + 29. Let m be u(x). Round m to the nearest 1000.
2000
Let o = -973.0984 + 973. Round o to 3 decimal places.
-0.098
Let o = 15.41 - 191.21. Let s = -25.8 - o. Let z = s + -150.000073. What is z rounded to 5 decimal places?
-0.00007
Let m = -460.483 + 454.1. Let t = 7.017 + -7. Let y = m - t. What is y rounded to the nearest integer?
-6
Let s = 56 + -53. Let f be (-9 + 52128 + 6)*640/s. What is f rounded to the nearest 100000?
11100000
Let g = -9842 - -9839.7479. What is g rounded to one dp?
-2.3
Suppose 4*f + 0*b = -b - 3, f = 5*b - 27. Let i be 3*f/15 - 1773856/(-140). Round i to the nearest 1000.
13000
Suppose -38*t = -z - 36*t - 90066, 90048 = -z + 5*t. Round z to the nearest 100.
-90100
Let m = -3753 - -3753.10427. What is m rounded to 3 dps?
0.104
Let l(b) = 32760*b + 1030. Let c be l(16). What is c rounded to the nearest 10000?
530000
Let u = -0.6958 - 0.7042. Let r = 2335 - 2336.4015. Let n = r - u. Round n to four decimal places.
-0.0015
Let p = -380818.39603 + 380820. What is p rounded to 2 decimal places?
1.6
Suppose 0 = -2*s + 28458 + 790248. Suppose 5*o = -4*q - 23605336, -2*o + 2*q = 9032767 + s. Let u = o + 8321064. Round u to the nearest one million.
4000000
Let h = 391871 + -392221.994. Let d = h + 351. What is d rounded to two dps?
0.01
Let s = -31555 - -31698.19. Let j = s + -1.19. Let n = j + -142.0085. Round n to two decimal places.
-0.01
Let a = -27789587 - -27789772.0000184. Let i = a + -185. What is i rounded to six dps?
0.000018
Let c = 56.4053 - 0.1053. Let p = 13.3 - c. Let s = p + 42.99982. What is s rounded to 4 decimal places?
-0.0002
Suppose 94347 = 3*b + 3*n, 24*b + 597396 = 43*b + 4*n. What is b rounded to the nearest 100?
31400
Let w(i) = -1338409*i + 13. Let h be w(-10). Let q = h + 86820. Suppose 0 = -5*u + 121970923 - q. Round u to the nearest 1000000.
22000000
Let m be 254*((-2968)/84)/(2/(-3)). Let a = -9103 - -25091. 