 What is y rounded to the nearest 10?
30
Let a = 131.835209 - -8.164826. Let k = a + -140. Round k to five decimal places.
0.00004
Let t be (-112)/35*21040/(-64). What is t rounded to the nearest 10?
1050
Let a = 91.263 - 97.15. What is a rounded to 0 decimal places?
-6
Let p = -7.65 + 10.49. Let n = -0.0616 + 2.1136. Let s = p - n. What is s rounded to 1 dp?
0.8
Let u = -5697.08026 - -5697. Round u to 2 decimal places.
-0.08
Let b = -2356.926 + 2357. Let u = -0.1 + 0.104. Let m = b - u. Round m to 1 dp.
0.1
Let f = -635.9 - -122.5. What is f rounded to the nearest 100?
-500
Let s = -85648.1 - -38850.8. Let t = s + 46591.047. Let q = -206 - t. Round q to one dp.
0.3
Let k = -316 - 114. Let s = 107 + k. Let q = s + 323.00191. What is q rounded to 4 decimal places?
0.0019
Suppose 5*a = -14*x + 17*x + 283467, -5*x - 472482 = 4*a. Round x to the nearest 1000.
-94000
Suppose x = -4*s + 12, 5*s + x - 36 = 5*x. Suppose 0*v - 8 = -s*v. Suppose -5*u - 497000 = v*u. Round u to the nearest 10000.
-70000
Let w = 9.8 - -0.2. Let s = 10.2 - w. Let d = s - 0.1999957. Round d to six decimal places.
0.000004
Let y = -1459.02635 - -1459. Round y to two decimal places.
-0.03
Let z(t) = 199580*t**3 + 3*t**2 - 2*t - 6. Let g be z(2). Suppose o + 1596633 = 3*u + 2*o, -g = -3*u + 2*o. Let k = u - -177788. Round k to the nearest 100000.
700000
Let q(l) = 58*l - 3112. Let y be q(48). Round y to the nearest 100.
-300
Let q be 3/(-10) - (-33896)/(-80). Let m = -450 - q. Round m to the nearest one hundred.
0
Suppose 4*d - 33 = 5*a - 13, 4*a = 4*d - 20. Let o(i) = 120971*i + 145. Let b be o(d). What is b rounded to the nearest one hundred thousand?
600000
Let n = -1.354 - -0.124. Let l = n + -14.37. What is l rounded to the nearest 10?
-20
Let x = 1199 + -1199.583. Let h = 0.5830109 + x. What is h rounded to 5 decimal places?
0.00001
Let r = -474660 - -474716.0074. Let g = 91 + -35. Let k = r - g. Round k to 3 decimal places.
0.007
Let i = -19538.229 + 19518. Round i to the nearest 10.
-20
Let m = -3199225 - -1865700. Let b be -2*(-2)/5*m/(-82). Round b to the nearest 1000.
13000
Let u be (-8)/28 + (-30)/(-7) + 0. Suppose -3*n + 2*v - 138590 = 0, u*n - v + 3*v = -184810. Round n to the nearest 1000.
-46000
Let u = 67.7 - 77. Let k = -9.300063 - u. Round k to five decimal places.
-0.00006
Let y = -123903 - -123180.91. Let d = -716 - y. Round d to the nearest integer.
6
Let p = 4007 + -4007.000007952. Round p to 7 dps.
-0.000008
Let g = 608.436 - 607.3. Round g to the nearest integer.
1
Let i = 971.000008047 + -971. What is i rounded to 6 decimal places?
0.000008
Let n = -48.12 + 48.1199978112. Round n to seven dps.
-0.0000022
Let n = -409.6103 + 0.0103. Let p = n - -406.991. Let x = p + 2.49. What is x rounded to 2 dps?
-0.12
Let l = -7227 - -7354.22. What is l rounded to the nearest ten?
130
Let l be (-11 - 371630/56)/((-2)/8) - 1. Round l to the nearest one hundred.
26600
Let t = -58.2 - -125.2. Let d = -121 - -201.4. Let h = d - t. What is h rounded to the nearest integer?
13
Let o be 330/(-90) + 12797378/(-6). What is o rounded to the nearest 100000?
-2100000
Let w = 36 - 33. Suppose -w*f = 2*f - 20. Suppose f*m - m + 3200 = -4*u, -2*u - 1600 = 2*m. What is u rounded to the nearest 100?
-800
Let t = -125 + 23. Let r = 681 - 773.2. Let a = t - r. Round a to the nearest integer.
-10
Let d = 33.95023255 - 33.95. Round d to 6 dps.
0.000233
Let t be ((-1188)/15)/(5/(150/(-9))). Suppose 13*g = 17*g + t. Let x = -54 + g. Round x to the nearest 100.
-100
Let x = -2410 - -2410.1532. Round x to 2 decimal places.
0.15
Let v = -3459785880.459999493 + 3459786751.46. Let n = -871 + v. Round n to seven decimal places.
0.0000005
Let g = 0.193 - 0.1935126. What is g rounded to four dps?
-0.0005
Let c = 533395.828 - 534367. Let b = 973 + c. Round b to 1 decimal place.
1.8
Let z = -6150.4120417 + 6150.4. Round z to three decimal places.
-0.012
Let t = 38561.99976693 - 38562. What is t rounded to 5 dps?
-0.00023
Let h = 0.541 + -1.011. Let i = h + 0.4699627. Round i to six dps.
-0.000037
Let h = -8584416111 - -8584416400.00001044. Let t = -289 + h. What is t rounded to six dps?
0.00001
Suppose 4*l - 2*u = 6*l + 3610, 4*u - 7244 = 4*l. Let r = 10912 - l. What is r rounded to the nearest 1000?
13000
Let u = -760.7963 - -351.818. Let n = -409 - u. What is n rounded to three dps?
-0.022
Let y = 31.962 + -32. Let i = y - -0.032. Let g = 0.005997 + i. What is g rounded to 6 decimal places?
-0.000003
Let o = 19.4 - 14.8. Let r = 4.60001783 - o. Round r to six decimal places.
0.000018
Let t = 598.9826 - 599. Let n = -1.6224 - t. What is n rounded to 1 dp?
-1.6
Suppose -25*k + 5*w - 11905 = -29*k, -6 = 2*w. What is k rounded to the nearest one hundred?
3000
Let b = -375.9682 - 0.0318. Let l = -242 - b. Let i = l - 134.704. Round i to one dp.
-0.7
Let k = -85807.264395 - -85807. Let t = -0.263 - k. What is t rounded to four dps?
0.0014
Let p be 42/11 - ((-45)/(-55) - 1). Let l be (19/(-38))/((-2)/p). Suppose -y - 5*n = -40 - l, 4*y - 4*n = 212. What is y rounded to the nearest 10?
50
Let x = 0.0655 + -52.8655. Let m = -52.80168 - x. Round m to four decimal places.
-0.0017
Let u(l) = 451007*l - 14. Suppose 2*c - 3*q - 13 = 0, 13 = 5*c - 10*q + 9*q. Let z be u(c). Round z to the nearest 10000.
900000
Let f = 173997 - 173245.347. Let h = f + -752. What is h rounded to one decimal place?
-0.3
Suppose 5*t - 80 = 5*g, -2*t - 5*g - 4 = -3*t. Suppose -28*i + 34830000 = -t*i. Round i to the nearest 1000000.
4000000
Let x = -5.752 + 5.7523408. Round x to 4 dps.
0.0003
Let s = -12727 + 12834.776. Round s to the nearest ten.
110
Suppose 5*n = 3*x - 3, -8 + 5 = 3*n - 3*x. Suppose -14*w - 2*w - 974400 = n. What is w rounded to the nearest one thousand?
-61000
Let g = 1504876.00075 + -1504694. Let s = g - 186. Let n = -4 - s. What is n rounded to four decimal places?
-0.0008
Suppose -8*a + 5*a + 1132800 = -19*a. Round a to the nearest ten thousand.
-70000
Suppose 3*x - 818191 = -3*p + 2*p, -2*x = 6. Round p to the nearest one hundred thousand.
800000
Let u = 44.9452 - 46.14. Let f = u + 1.101. What is f rounded to two dps?
-0.09
Let o = 1596440.4484 - 1597399. Let f = o - -959. What is f rounded to two dps?
0.45
Let u = 157052387 + -157052119.999751. Let v = 267 - u. Round v to 4 dps.
-0.0002
Let v(h) be the first derivative of 26134*h**3/3 - 4*h - 1. Let a be v(-2). Let r = a + 495468. Round r to the nearest one million.
1000000
Let b = -15385 - -15779.44. What is b rounded to the nearest integer?
394
Let w = -13537444842.99999983 + 13537444907. Let r = -64 + w. What is r rounded to seven decimal places?
0.0000002
Let o = -2.641512 + 2.647. What is o rounded to five dps?
0.00549
Let p = 1754378 - 992578. Round p to the nearest one hundred thousand.
800000
Let r = -0.1044 - -0.1044002392. What is r rounded to seven dps?
0.0000002
Let z = -0.76 - -35.76. Let c = z - 34.955. Let f = 0.075 + c. What is f rounded to 2 dps?
0.12
Suppose -3*x + 2*k - 2 = 0, 5*x = 2*k - 3*k + 1. Suppose x = -14*u + 104017432 + 111582568. Round u to the nearest 1000000.
15000000
Suppose -3824*b = -3826*b - 2*p + 33727790, 2*b = 3*p + 33727815. Round b to the nearest 1000000.
17000000
Let b = 1433.1 + -210.1. Let q = b - 1124.1. Round q to the nearest ten.
100
Let v = -2176184 + 1041884. Round v to the nearest ten thousand.
-1130000
Let y = 5382582857.799999065 + -5382582830. Let w = -27.8 + y. Round w to 7 decimal places.
-0.0000009
Let d = 876 + -876.3297. Let h = d - -0.0067. What is h rounded to 1 dp?
-0.3
Let p = 2.09 + -10.89. Let f = p + 2.5. What is f rounded to the nearest integer?
-6
Let x(t) be the third derivative of 23/6*t**3 + 0 + 0*t - 7/24*t**4 - 21*t**2 - 17/15*t**5. Let n be x(-7). What is n rounded to the nearest 100?
-3300
Suppose 199*a = -403*a + 81781098. What is a rounded to the nearest 1000?
136000
Let x = 1.7013 - 5.5015. What is x rounded to 1 decimal place?
-3.8
Let s = -13447.51 - -13428. Round s to the nearest 10.
-20
Let a = 481 - 477.5. Let x = a - 3.499135. What is x rounded to 5 decimal places?
0.00087
Let u(k) = 15268*k**2 + 68*k - 456. Let v be u(6). Round v to the nearest ten thousand.
550000
Let a = -1356 - -1354.778. Let z = a - -0.9. Round z to 2 dps.
-0.32
Let i be 16/(-2) - (-37 - -48393029). 