ppose 0 = 4*x - 929493 + 11643053. Let m = -5945412 - x. Let t = -5667022 - m. What is t rounded to the nearest one million?
-2000000
Suppose -2*r - 1801584 = -4*q, -4*r + 5*q - 4575550 = -972370. What is r rounded to the nearest one hundred thousand?
-900000
Let k = -1.599996625 + 1.6. Round k to seven decimal places.
0.0000034
Let g = -1.83 + 1.2. Let i = g - -0.6299894. What is i rounded to six decimal places?
-0.000011
Let a = -1.557675704 + 275.229796104. Let o = 221.672127 - a. Let y = o - -52. What is y rounded to six dps?
0.000007
Let i = -31306078 + 31306144.000215. Let u = i - 66. Round u to 5 decimal places.
0.00022
Let z(o) = -o**3 + 17*o**2 + o + 28. Let j be z(16). Round j to the nearest 10.
300
Let v = 2.677001541 - 2.677. What is v rounded to seven decimal places?
0.0000015
Let z = -15 - -15.048. Let q = -7.552 - z. What is q rounded to 0 dps?
-8
Let g = 217.26 + -272.267. Let m = -55 - g. What is m rounded to 3 decimal places?
0.007
Let g(m) = -40124*m**3 + 3*m**2 - 8*m - 20. Let u be g(-2). What is u rounded to the nearest 10000?
320000
Let t = 0.2593 - 0.25925628. What is t rounded to five decimal places?
0.00004
Let d = 1.4 + -1.72. Let y = d + -18.68. Let z = 19.006 + y. Round z to 2 dps.
0.01
Let h = -104 + 106. Let a be h/1 + 2 + (-12814 - -10). What is a rounded to the nearest one thousand?
-13000
Suppose 0 = -8*z + 3*z + o - 15, 0 = 4*z + 4*o + 36. Let x be z/((-4)/(-3)) + -552. Let p be x/((-812)/(-800) + -1). Round p to the nearest 10000.
-40000
Let x = 17 + -7. Suppose 8000 = -x*z + 5*z. Let k be (z/12)/((-2)/3660). Round k to the nearest 10000.
240000
Suppose 0*w - 4*w - n - 279 = 0, 60 = -w + 3*n. Let h = w + -301. What is h rounded to the nearest one hundred?
-400
Let h = 137.0163 - 137. Round h to two decimal places.
0.02
Let w = 22.83 + -0.43. Let v = w - 20. Let l = v - 2.399982. Round l to five dps.
0.00002
Let v = 27.4 + -19.26. Round v to 1 dp.
8.1
Let c be (4/8)/(2/4). Let n be c*(-8)/(-12)*42. Suppose -25*u + n*u - 33 = 0. What is u rounded to the nearest integer?
11
Let z be -8*4/(-24)*3. Suppose 0 = d + 3*s - 0 - 6, 0 = 3*d - z*s + 8. Round d to the nearest one thousand.
0
Let u = 580.82 + -574. Round u to the nearest integer.
7
Suppose 269093 = 6*u - 2277079. Suppose 0 = 3*b - 49638 - u. Round b to the nearest 10000.
160000
Let r = -151.5 - -151.50000713. What is r rounded to six decimal places?
0.000007
Suppose -2*y + 4*u - 84056 = 0, 84052 = -2*y - 0*y + 2*u. Let g = -24624 - y. What is g rounded to the nearest one thousand?
17000
Let f = 20 + -47. Let j = 13644177 - 13644203.999943. Let r = j - f. Round r to five decimal places.
0.00006
Let r = 1.60500399 + -1.605. Round r to 6 decimal places.
0.000004
Let k = 0.06790935 - 0.0679. What is k rounded to six dps?
0.000009
Let w = 1.679 + -0.169. Let a = w + -1.4652. What is a rounded to three decimal places?
0.045
Let t = 195 - 193.916. Let a = -0.385 + t. Let v = a - 0.7. What is v rounded to three decimal places?
-0.001
Let u = -3.746 - -3.36. Let l = -0.4 - u. What is l rounded to two dps?
-0.01
Let f = -25 - -25.04. Let t = f - -1.55. Round t to 1 decimal place.
1.6
Let q = -546.1701044 + 194.3168301. Let a = q - -0.0022743. Let w = -352 - a. What is w rounded to two decimal places?
-0.15
Let l = -2 + 4. Let d(c) = 6*c - 2 - 11*c**l + 78*c**2 - 3 + 80*c**2. Let i be d(5). What is i rounded to the nearest 1000?
4000
Let s = -172 - -177.17. Round s to the nearest integer.
5
Let p = -105.79999064 - -105.8. Round p to 6 dps.
0.000009
Let u = -559 + 560.55. Round u to 1 dp.
1.6
Let k(n) = -8107*n**2 + 21*n - 4. Let d be k(2). Round d to the nearest ten thousand.
-30000
Let k = 2530 - 2571.38. Let u = 0.044 + 41.956. Let c = u + k. What is c rounded to one decimal place?
0.6
Let h(b) = -b**3 + 6*b**2 - b - 13. Let q be h(5). Suppose 3*f + 272 = q*f. Round f to the nearest ten.
70
Let r = 2216 - 2216.983. What is r rounded to one dp?
-1
Let b = -44 - -37.73. What is b rounded to 0 decimal places?
-6
Let z = 30 - 24. Let h be ((-28)/(-6))/(z/1152). Let m = h + -526. Round m to the nearest one hundred.
400
Let r be 362 + (-2 + -1)/3 - -4. What is r rounded to the nearest 10?
370
Let d = -0.17 + -2.03. Let c = -5.1 - d. Round c to zero decimal places.
-3
Let i = 2.108 + 0.978. What is i rounded to one decimal place?
3.1
Let p = -58602 + 133769. Suppose p = b + 14095. Suppose 2*s + b = -28928. Round s to the nearest ten thousand.
-50000
Let l = -4.61 - -4.60999951. What is l rounded to 6 decimal places?
0
Let a = -93.2 + 2.2. Let w = a + 91.00715. What is w rounded to 4 decimal places?
0.0072
Suppose 5*k + 7*h = -167900035, 3*h = -2*k + 6*h - 67159985. Round k to the nearest one million.
-34000000
Suppose b - 5*b = -40. Suppose 7*d - b - 11 = 0. Suppose 0 = -l - d*i + 222 + 688, 5*l - 4550 = 2*i. Round l to the nearest 100.
900
Let c = 2.51239 - -16.487514. Let j = 19 - c. What is j rounded to 5 decimal places?
0.0001
Let n = 19.284 - -0.566. Let q = n + 0.15. Let c = q + -19.963. Round c to two decimal places.
0.04
Let a = -0.3418 + 0.0878. Round a to 1 dp.
-0.3
Let f = -5.58 - -5.579995864. Round f to 7 decimal places.
-0.0000041
Let j = 1217.72 - 1403. Let r = j + 169.5. Let f = -16 - r. What is f rounded to one dp?
-0.2
Let c = 501634234.9999947 - 501634263. Let v = c - -28. What is v rounded to six dps?
-0.000005
Let v = 401 + 1298. Round v to the nearest 1000.
2000
Let g = -0.0403996 - -55.0369996. Let j = g - 55. Round j to three decimal places.
-0.003
Let t be 39/(-2)*(-12)/(-18). Let x(k) = -4*k**2 - k - 23. Let o be x(t). Round o to the nearest 100.
-700
Let l = 7541.9996773 + -7542. Round l to five dps.
-0.00032
Let g = -58 - -82. Let o = g + -44. Let k = -19.976 - o. Round k to 2 decimal places.
0.02
Let m = -47 - -2. Let i = 10 + m. Let d = 34.99926 + i. Round d to 4 dps.
-0.0007
Let g = 54.91 - 59. Let v = -0.45 + g. Round v to 1 decimal place.
-4.5
Let w = 0 + 4. Suppose 0 = -w*p + 31 + 249. Let t = -160 + p. Round t to the nearest one hundred.
-100
Let j = 15 - 12. Let w(s) = -1275*s**3 + 9 + 3 - 15*s**2 + j - 16*s - 5. Let q be w(-15). Round q to the nearest one million.
4000000
Let a = -399 - -398.246. Round a to one dp.
-0.8
Let t = 7584 + -7583.99991742. Round t to six dps.
0.000083
Suppose -20*g + 11*g - 20871 = 0. Round g to the nearest 100.
-2300
Let s = -164.17 - -146.4. Let d = s - -18. Let u = d + -0.158. What is u rounded to two decimal places?
0.07
Let j(n) = 5117*n**3 - 4*n**2 - 2*n - 7. Let x be j(-5). Let z = x - -439722. What is z rounded to the nearest one hundred thousand?
-200000
Let f be (-6)/(-30)*10 + -4233002. Round f to the nearest 100000.
-4200000
Let o(y) = -y**2 - 330000. Let p be 4 + 3 + 0 + -7. Let g be o(p). Round g to the nearest 100000.
-300000
Let q(p) = -221371*p**3 + 7*p**2 - 17*p + 5. Let b be q(3). What is b rounded to the nearest 1000000?
-6000000
Let o = 0.285 - 0.134. Let m = -0.479 - o. Let p = m - -0.63000053. Round p to 7 dps.
0.0000005
Let b = -2.2482 + 2.26. What is b rounded to 3 dps?
0.012
Let m = 550875.25 - -954.75. Let g = 551825.000176 - m. Let v = g - -5. What is v rounded to five decimal places?
0.00018
Suppose 0*y - 31 = -5*v + 3*y, 3*y = -5*v + 19. Suppose 3*k = 0, 2*j + 2140000 = 3*j - v*k. What is j rounded to the nearest one hundred thousand?
2100000
Let p = 2122 + -2122.000003455. Round p to seven decimal places.
-0.0000035
Let l = 1518.9 + -551.8. Round l to the nearest 10.
970
Let b be ((-2)/4)/((-2)/(-28)). Let a = 8 + b. Let u be a + -4 + 0 + -77. Round u to the nearest one hundred.
-100
Let d(g) = 40004*g - 22. Let n be d(5). Suppose -5*h + 15 + 0 = 0. Suppose 4*a + 399994 = -h*s, -2*a + 0*s - n = s. Round a to the nearest 100000.
-100000
Let i = 82 - 116.6. Let m = 34.59779 + i. Round m to 4 dps.
-0.0022
Suppose 4*k - o = 9*k - 43, 12 = 4*o. Suppose -3*b = -3*x - 38977 - 34517, 4*x - k = 0. What is b rounded to the nearest 1000?
25000
Let b be 8 + 1 - (7017 + -12). What is b rounded to the nearest 1000?
-7000
Suppose -38*r = -21*r + 9996000. Round r to the nearest ten thousand.
-590000
Suppose 2*y - 6 = -2, -5*y = j - 17. Let u be 1 - (j + -3) - -3853. What is u rounded to the nearest one thousand?
4000
Let a = -120234.0017 - -120257. Let q = -22.989 - 0.011. Let c = q + a. 