What is g rounded to 4 decimal places?
0.0033
Let i(d) = -2483*d - 90. Let s be i(-10). What is s rounded to the nearest ten thousand?
20000
Let v = -522134521422146.0000026 + 522134436067256. Let y = v + 85354882. Let c = 8 + y. What is c rounded to 6 decimal places?
-0.000003
Let q = -1.765 + 1.8. Let y = -46.56 - -46.5949828. Let g = y - q. What is g rounded to six decimal places?
-0.000017
Let n = 34.2 + -13.6. Round n to the nearest integer.
21
Let h be 50/(-15)*6/5. Let x(c) = -708*c - 9. Let r be x(h). Let s = r + -4123. Round s to the nearest 1000.
-1000
Let q = 53 + -25. Let w = q - 31.3. Round w to 0 dps.
-3
Let w = 0 - 0. Suppose w*u = 4*u - 5*i - 115615, -4*u + 3*i + 115609 = 0. What is u rounded to the nearest 1000?
29000
Suppose -3*l - 4*r = r + 74, 2*l + 2*r = -44. Let x be l/(-3) - (-3 + 6). Suppose 0 = x*q - 0*q - 15, -2*b - 1035 = q. Round b to the nearest 100.
-500
Let t = 469 - 469.00001122. What is t rounded to 7 dps?
-0.0000112
Let c = 2320.99999858 - 2321. Round c to 6 decimal places.
-0.000001
Let a = -8211.9999 - -8225. Let r = 0.12 + -13.12. Let x = r + a. Round x to four dps.
0.0001
Let s = -2.56 + -0.04. Let o = s - -2.59964. Round o to four decimal places.
-0.0004
Let v = -0.016 - 0.082. Let k = 0.02 + v. What is k rounded to two dps?
-0.08
Let z = 6.3300129 - 6.33. Round z to six dps.
0.000013
Let g = 725.9 - 687. Round g to zero decimal places.
39
Let w = -127 + 142.8. Let o = w - 139.8. Let l = -124.000113 - o. Round l to five dps.
-0.00011
Let n = -22097.677 - -22258.6. Let w = n + -161. What is w rounded to two dps?
-0.08
Let z = 1864.0976 - 1864. Round z to 2 dps.
0.1
Let a = -51 - -55.2. Let s = 0.0081 - -3.9919. Let y = a - s. What is y rounded to the nearest integer?
0
Let f = 236 + 168. Let q = -655 + f. What is q rounded to the nearest ten?
-250
Let i = -15.69 + 0.69. Let y = -15.000045 - i. Round y to five dps.
-0.00005
Suppose 3*i + 841 = -2*f, 6*i = 4*i + 5*f - 548. What is i rounded to the nearest ten?
-280
Suppose 4*c - 2*c = -600. Suppose -4*x + 5*w + 8 = 0, 5*x = 7*w - 2*w + 5. Let s be ((-1)/(-2))/(x/c). Round s to the nearest ten.
50
Let d = 626346 - 626285.99984. Let w = d + -60. Round w to 5 dps.
0.00016
Let z(f) = -f**3 - 2*f**2 - 1. Suppose 4*b - 14 - 10 = 0. Let x be z(b). Let t = -445 - x. Round t to the nearest 10.
-160
Let k = 0.052411 + -0.0527. Round k to 4 dps.
-0.0003
Let c = -0.255 - -0.22. Let w = -3054 + 3053.96423. Let g = c - w. Round g to four decimal places.
0.0008
Let s = 78.1 + -77.242. Let c = 0.038 - s. Let r = 0.8200066 + c. What is r rounded to six dps?
0.000007
Let y = 2.44 + -2.667. Let g = 0.34 + -0.1. Let k = y + g. What is k rounded to 2 decimal places?
0.01
Let f = -248 - -214.98. Let a = f - -34. What is a rounded to the nearest integer?
1
Let p(f) = -21 + 59*f + 69*f + 41 - 26. Let y be p(-2). What is y rounded to the nearest 10?
-260
Let l(j) = j + 7. Let u be l(-4). Suppose 0 = -0*a - u*a - 1239000. Round a to the nearest ten thousand.
-410000
Let y = 88 - 96.25. Let b = 2 + 7. Let s = y + b. Round s to 1 dp.
0.8
Let i = -0.02604 - 8005.97396. Let p = 8006.040008 + i. Let w = -0.04 + p. What is w rounded to five decimal places?
0.00001
Let y = 740 + -840.6. What is y rounded to the nearest ten?
-100
Let a = -391 - -391.183. What is a rounded to two dps?
0.18
Let n = 179883 - 119968. Suppose 3*h = -6*w + 5*w - 59927, 0 = 3*h - 5*w + n. Let c = h + 49975. Round c to the nearest 10000.
30000
Let j = -51.329 - -0.529. Let q = j + 50.79777. Round q to three dps.
-0.002
Let j be 1 + 0 + (-20)/(-5). Let k be (3/j)/1*15. Let a(l) = 557*l**2 - 12*l - 9. Let q be a(k). What is q rounded to the nearest 10000?
50000
Let w = -161.27 - -29.17. Round w to the nearest 10.
-130
Let p be 8244/(((-6)/(-4) - -1) + -2). Suppose -3*l - 16508 = -2*b, -2*l = -5*l - 3*b - p. What is l rounded to the nearest 1000?
-6000
Let z = 743495099 + -517300416. Let v = -226194403.000131 + z. Let f = 280 - v. Round f to five decimal places.
0.00013
Let n(f) = f**3 + 9*f**2 + 12. Let i be n(-9). Suppose i*a = 3*a + 954. Round a to the nearest 10.
110
Let s = 68.077 - 68. Round s to one dp.
0.1
Suppose -23 = 5*n + 12. Let h(t) be the second derivative of t**5/20 - 7*t**4/12 - 7*t**3/6 + 7*t**2/2 - 19*t. Let y be h(n). Round y to the nearest 100.
-600
Suppose p - 46*w - 12196 = -42*w, -4*p = 3*w - 48803. What is p rounded to the nearest ten thousand?
10000
Let y = 269 - 264. Suppose 12 = 5*f - 8. Suppose 1549990 = -5*g + 5*m, -y*g - m - f*m - 1550010 = 0. What is g rounded to the nearest 100000?
-300000
Let p = -24 + 20. Let u be (0 - p) + 3 + -1 + -115006. Round u to the nearest 10000.
-120000
Let s = 2 - 8. Let t = -988.6876 - -982.68760016. Let f = s - t. What is f rounded to 7 decimal places?
-0.0000002
Let l = 0.079 - 0.0790015. What is l rounded to six decimal places?
-0.000002
Let q = -0.311 + -2.069. Round q to the nearest integer.
-2
Let p = 62 - 142. Let f = p - -80.33. What is f rounded to 1 decimal place?
0.3
Let d = -1182.31 - -1177. What is d rounded to zero decimal places?
-5
Let x = -53318.000015 + 53319.5. Let u = -0.8 + -0.7. Let q = x + u. Round q to 5 decimal places.
-0.00002
Suppose 68202 - 20739 = 3*j. Suppose -2*q - 13594 = -2*t, -j = 5*q - 3*t + 18170. What is q rounded to the nearest 1000?
-7000
Let v = -293.92 - -297. What is v rounded to 1 decimal place?
3.1
Let l = -92 + -51. Let k = -142.842 - l. What is k rounded to 2 decimal places?
0.16
Let j = 175 - 175.0106. Round j to three decimal places.
-0.011
Let u = 18 - 15. Suppose -w = 2, -i + u*w + 33293 = 4833. Suppose -5*m + i + 26546 = -2*z, -4*z + 55000 = 5*m. Round m to the nearest ten thousand.
10000
Let b = -223456.599988 - -223463.6. Let h = 3.7 - 10.7. Let i = b + h. What is i rounded to 5 dps?
0.00001
Let g = -365.668 + 365. Round g to 1 decimal place.
-0.7
Let d(s) = 1716*s**3 + 14*s**2 + 19*s + 1. Let i(w) = w**2 - 17*w - 9. Let h be i(17). Let f be d(h). Round f to the nearest one million.
-1000000
Let k = 37240210 + -24670210. What is k rounded to the nearest one million?
13000000
Let k = -0.062 + -0.598. Let z = k - 0.1. Let y = -0.7600047 - z. What is y rounded to 6 decimal places?
-0.000005
Suppose -5*l - 3*m + 34 = -m, 3*l - 22 = -2*m. Let p(w) = 13*w**2 - l*w + 15*w + 3*w - 18*w**2. Let q be p(8). Round q to the nearest ten.
-220
Suppose -r = -5*q - 27, 6*r - 4*q = 3*r + 26. Let s = 116 - -134. Let g be (s*180)/(r/4). What is g rounded to the nearest 100000?
100000
Let m = 356.39 - 316.448. Let n = m - -0.058. Let t = n + -36.2. Round t to 0 dps.
4
Let f be (-2 + (3 - -205))/((-3)/195). What is f rounded to the nearest one hundred?
-13400
Let s = -32 + 10. Let w = -2.54790539 + 24.54791669. Let i = w + s. What is i rounded to six decimal places?
0.000011
Let f = -9 + 11. Let y be (-5)/5*(-7780906)/f. Let u = 2490453 - y. Round u to the nearest one hundred thousand.
-1400000
Let v = -853 - -853.4965. What is v rounded to one dp?
0.5
Let n = 0.13 - -93.87. Let r = n + 16. Let o = -109.9999927 + r. Round o to six decimal places.
0.000007
Let i = 4.42 + 2.892. What is i rounded to the nearest integer?
7
Let t = 456.32 + -449. Let m = t - 6.5. Round m to 1 decimal place.
0.8
Let z(v) = 5191*v**2 + 55*v - 364. Let b be z(8). What is b rounded to the nearest ten thousand?
330000
Let o = 38.7 - 36.11. What is o rounded to one decimal place?
2.6
Suppose 15*s = 7013090 - 31613090. What is s rounded to the nearest 100000?
-1600000
Let h = -364.0000945 + 364. What is h rounded to 5 decimal places?
-0.00009
Let r = 2.645 + -2.6455778. What is r rounded to five dps?
-0.00058
Suppose -2*f + 859995 = y, -5*f + 1367624 = y - 782371. What is f rounded to the nearest one hundred thousand?
400000
Let y = 286.00534 + -286. What is y rounded to four dps?
0.0053
Suppose 0 = h - 1, 3*p - 3*h - 17702 = -5*h. Round p to the nearest 100.
5900
Let q = -1.0808 + 0.1698. Let v = q + -0.039. Round v to 1 dp.
-1
Let m = -4607.711 - -4610. Let c = -2.35 + 0.15. Let n = c + m. Round n to 2 decimal places.
0.09
Suppose -9105 = 4*h + 5*f, 2*h - f + 4560 = -5*f. Let o = 4680 + h. Round o to the nearest one hundred.
2400
Let s = -8.739 + -5.28. Let i = -14 - s. What is i rounded to two decimal places?
0.02
Let x = -108.562793 - 9.436962. 