s?
-0.0000028
Let v = 12 - -231. Let q(s) = -9 - 6 - v*s - 22*s. Let o be q(5). What is o rounded to the nearest 100?
-1300
Let b be 2006/646 + 2/(-19). Suppose -29451 = -8*v + 3*v - z, b*z - 3 = 0. What is v rounded to the nearest 1000?
6000
Suppose 230*t = 40324909 + 44002661 - 27742970. Round t to the nearest 10000.
250000
Let l = -265.0000401 + 265. What is l rounded to four decimal places?
0
Let i = 330.97 - -7.03. Let x = i + -341.69. Round x to one dp.
-3.7
Let l = 12.9552 + -12.21. Round l to two dps.
0.75
Let g = -535.047 - -0.047. Let u = g - -535.0045. What is u rounded to 2 dps?
0
Let l = -0.252 - -4717.252. Let k = l - 4461.04. Let p = k + -261. Round p to zero decimal places.
-5
Let g = -32567 - -32592.523. Let n = -24.47 + g. Round n to two decimal places.
1.05
Let i = 2200497671.4 - -381489885.6. Let y = 2581987718.0000067 - i. Let v = y - 161. Round v to 6 decimal places.
0.000007
Let v = -2008 - 1851. Let j = -1370 - v. What is j rounded to the nearest 100?
2500
Let v = -8 - -17.8. Let x = -396156.17200122 - -396165.972. Let l = x - v. What is l rounded to seven decimal places?
-0.0000012
Let w = -12.3800006375 + 12.38. Round w to 7 dps.
-0.0000006
Let a = 210.00871491734 - 0.00868661734. Let u = a + -210. What is u rounded to five dps?
0.00003
Let t = 100.2 - 124. Let z = t + 23.800045. What is z rounded to 5 dps?
0.00005
Let l = -31829.796 + 31738. Let q = 92 + l. Let x = 0.048 - q. What is x rounded to two dps?
-0.16
Suppose 0 = 28*c - 29*c + 5. Suppose 5*m + 2*y - 5*y = 17, c*m - 23 = -3*y. Suppose 40000 = m*v - 3*v. What is v rounded to the nearest ten thousand?
40000
Let c = -32848.7 + 472828.7. Let o = c - 439970.10084. Let y = -9.9 + o. Round y to 4 dps.
-0.0008
Suppose 0 = -21817*c + 21757*c + 3022380. Round c to the nearest one thousand.
50000
Let p = -10933 + 10925.813. Round p to one decimal place.
-7.2
Let a = 728.6 - 842. Let g = a + 86. Round g to 0 decimal places.
-27
Let o = 61219532827.00000861 + -61219533144. Let g = o + 317. Round g to 6 dps.
0.000009
Let w = -2126 + 2126.5756. What is w rounded to two decimal places?
0.58
Let y = -2.3527 + 1.36. Round y to two decimal places.
-0.99
Let i = -628.9414 - -629. Let m = i + -0.0586674. Round m to six decimal places.
-0.000067
Let o = -84 - -89.3. Let i = -5.29962 + o. Round i to four dps.
0.0004
Let s = -9.08 - -34.08. Let p = 24.999999019 - s. What is p rounded to seven dps?
-0.000001
Suppose 14 = -x - 5. Let z(j) = -118*j - 50. Let f be z(x). Suppose r + 5772 = f. Round r to the nearest 100.
-3600
Let y = 1.431 - 1.4329416. What is y rounded to three decimal places?
-0.002
Let u = 18.87625 - -4.14745. Let p = -1 + 24. Let g = p - u. Round g to two decimal places.
-0.02
Let h = -37.722 + -21.7644. Let w = h + 59.4. Round w to three dps.
-0.086
Suppose 37*b - 130969043 = 2408710957. Round b to the nearest 1000000.
69000000
Let r = 0.9667 + 490.2333. Round r to the nearest ten.
490
Suppose f + f = -3*v + 3198, -4808 = -3*f + v. Suppose 1001 = -w - z - 1996, w + 2982 = 2*z. Let i = f + w. Round i to the nearest 100.
-1400
Let r = -0.0629 + -280.9371. Let n = r - -280.999904. Round n to 5 dps.
-0.0001
Let n = 1301.17895 - 1301. What is n rounded to 3 dps?
0.179
Let u = -17.2 - -17.119. Let x = 0.07764 + u. Round x to 3 decimal places.
-0.003
Let v = -12.161 + 12.1. Let u = -0.085 + v. Round u to 2 dps.
-0.15
Let u = -27.71 - -476.53. Let p = -449 + u. Round p to two decimal places.
-0.18
Let h = 54 - 54. Suppose h = g + 2*a + 11, 2*g - 5*a + 22 = -a. Let n = -62 - g. Round n to the nearest 10.
-50
Let q = 0.57 + -12.59. Let j = q + 12. Let y = 0.009 - j. Round y to two dps.
0.03
Let t = -0.0025 - 4.7475. Let m = 4.74156 + t. Round m to 3 dps.
-0.008
Let c = -5.4346 + 5.367254. What is c rounded to three dps?
-0.067
Let t = 0.5441 - 0.5485229. What is t rounded to 5 dps?
-0.00442
Let r = 66959.083374 + -66959. What is r rounded to 3 dps?
0.083
Let g = -29 - 5. Let n = -141.5 - g. Let o = -143 - n. What is o rounded to the nearest integer?
-36
Let k = 124.4711 + -0.3111. What is k rounded to the nearest 10?
120
Let h = -1095.62 + 1039. Let o = h - -51.6. What is o rounded to the nearest integer?
-5
Let o = -69 + 93. Suppose o*l = 33*l - 87570. Round l to the nearest 1000.
10000
Let s = -15.162 + 27.21. Let p = s + 0.152. Let v = -12.1999897 + p. What is v rounded to six dps?
0.00001
Let d(a) = -332077*a + 1625. Let v be d(25). Round v to the nearest ten thousand.
-8300000
Let y = -26.823 - -26.5. Let o = -0.36 - y. Let l = 0.04113 + o. What is l rounded to 3 dps?
0.004
Let r = 0.097397 + -0.09448. What is r rounded to 4 dps?
0.0029
Let r = 711.479215 + -0.069215. Let g = 567.233 - r. Let x = g - -144. Round x to two decimal places.
-0.18
Suppose -3*h = -6*l + 7*l - 17045669, h - 17045677 = -l. Let r = -6145681 + l. Round r to the nearest one million.
11000000
Let w be (84/(-18))/((-2)/(-6)). Let f be ((-46)/161)/(2/w). Suppose -3*d - 312 = -5*o + 738, o - f*d - 210 = 0. What is o rounded to the nearest ten?
210
Let m = 138.993 - 138.3. What is m rounded to two decimal places?
0.69
Let d = -9866 - -41817. Suppose -6*q + 2*q - 3*x - d = 0, 6 = 2*x. Round q to the nearest 100.
-8000
Let t = 135 - 216. Let i = t + 83. Suppose i*k = 4 + 4, 3*w - 5*k - 116999980 = 0. Round w to the nearest 1000000.
39000000
Let r = -1957.7965584 - -1957.8. Round r to four decimal places.
0.0034
Let v(c) = -92*c - 77*c - 26*c + 55 - 92*c. Let k be v(33). Let b = -78584 + k. What is b rounded to the nearest 10000?
-90000
Suppose 18*b - 5533720 - 5483882 = 0. Suppose 0 = -17*j + 1127011 + b. What is j rounded to the nearest ten thousand?
100000
Let i = -328 + -226. Let w = -529.4 - i. What is w rounded to the nearest 10?
20
Let r(z) = -252*z**3 - 33*z**2 - 4129*z - 44. Let t be r(-68). Round t to the nearest 1000000.
79000000
Suppose -2*x = 4*p - 16, -21*p = 5*x - 23*p - 16. Suppose -v + 340003 = -x*c, -5*v = -12 - 3. Round c to the nearest one hundred thousand.
-100000
Let p = 198.7 + -199.651. Let a = p - -79.551. What is a rounded to the nearest integer?
79
Let c = -291.6968 + 309.7963648. Let m = -18.1 + c. Round m to five dps.
-0.00044
Let u = -5.775 - 0.225. Let a = 262.41936015 + -256.41936. Let n = u + a. Round n to six dps.
0
Let d = 190457 + -190457.089523. Round d to two dps.
-0.09
Let o = -341.79527 + 0.07527. What is o rounded to zero decimal places?
-342
Suppose q = 3*q - 8604. Suppose -2*u = -3*t - 76989, 4*u - t + 99062 - 253065 = 0. Let v = u - q. What is v rounded to the nearest 10000?
30000
Let n = 7.660673 - 7.6259. Round n to four decimal places.
0.0348
Let i = -855 + -108. Let k = 1044.4 + i. Round k to the nearest ten.
80
Let b = 6527 + -6526.9391. Round b to two decimal places.
0.06
Let c = 89 + -4.52. Round c to 0 dps.
84
Let t = -4969649402 - -4969649285.00000972. Let p = t - -117. What is p rounded to six dps?
0.00001
Let k = -442.98694 + 482.792. Let o = -27.9 - 11.9. Let p = k + o. Round p to 4 decimal places.
0.0051
Let f(x) = 36*x**2 - 5*x + 4. Let s be f(2). Let w be (s/6)/((-1)/(-46)). Let q be (w/6 + -3)*27/12. What is q rounded to the nearest one hundred?
400
Let q be -1*10 - (-19 - 1051)*1643. What is q rounded to the nearest one hundred thousand?
1800000
Let p = -5301108 - -5301108.06068554. Let t = p - 0.0607. What is t rounded to 6 dps?
-0.000014
Let s = 0.0627 + -0.06297702. Round s to 4 dps.
-0.0003
Let z(t) = t**3 + 18*t**2 + 12*t + 16. Let n be z(-17). Let j = n + -99. Suppose -j*a + 5*a = 37200. What is a rounded to the nearest one thousand?
12000
Suppose 3927297 = 9*b - 3155379. Let f = 198381 + b. Suppose 5*q + 3425345 = f. Round q to the nearest 100000.
-500000
Let z = -18285 - -18285.0123495. Round z to three dps.
0.012
Let u(z) be the first derivative of z**4/2 - 5*z**3/3 + 4*z**2 - 7*z + 17. Let g be u(6). Let v = g - 414. Round v to the nearest 10.
-120
Let d = -2216.614824317 + 1263.614824796. Let m = -953 - d. What is m rounded to seven decimal places?
-0.0000005
Let q = 12.511567 + -107.512077. Let b = 20 + 75. Let m = q + b. What is m rounded to 4 decimal places?
-0.0005
Let u = 904090 - 424336. Suppose 6*b - u = 126246. Round b to the nearest ten thousand.
100000
Suppose -67*z + 143*z = 68*z - 827280. Round z to the nearest 1000.
