+ 18*u - 9. Let r be l(-7). Round r to the nearest 100.
3400
Let b(p) = 9716*p - 12. Suppose 22 = 4*q + 2*k, -5*q - k - 4*k = -20. Let f be b(q). Round f to the nearest ten thousand.
70000
Let w be (-1)/(-2)*(3 + -3). Suppose 2*l - 3*q + 8*q = -19, w = 4*q + 20. Suppose 14296852 + 53503148 = l*s. Round s to the nearest 1000000.
23000000
Let t = 1647 - 1646.97765. Round t to four decimal places.
0.0224
Let k = -179 + 50. Let m = k - -128.719. What is m rounded to two decimal places?
-0.28
Let h(j) = -10*j**2 + j - 10. Suppose -24 = -x + 2*f, 0*f = -x - 2*f + 4. Let i be h(x). Let k = i - -3256. Round k to the nearest 100.
1300
Let o(c) = -3*c**2 + c + 45. Let b(p) = 7*p**2 - 3*p - 90. Let n(d) = -2*b(d) - 5*o(d). Let l be n(0). Let z be l/(-10)*32/6. Round z to the nearest ten.
20
Let h = -824.0734 + 824. Round h to 3 dps.
-0.073
Let v be -336006 + 2 + -1 + 50/10. Round v to the nearest one hundred thousand.
-300000
Let d be (-27798)/2 + -4 + 4 + -3. What is d rounded to the nearest 1000?
-14000
Let u be ((-4)/1)/(-8)*8. Suppose 5*n + y = 10, 3*n - u*y = 6*n - 6. Suppose 0 = n*a + 3321630 + 678370. What is a rounded to the nearest 1000000?
-2000000
Let j = 214.2 - -471.9. Let h = 1720 + -2373. Let z = h + j. Round z to zero decimal places.
33
Let h = 24533 - 24729.62. Let t = -194 - h. What is t rounded to one decimal place?
2.6
Let w = 135 + -17. Let n = 83 - w. Let b = 35.0027 + n. Round b to three decimal places.
0.003
Let o = -642 + 642.0000712. Round o to five dps.
0.00007
Let v = -0.0527 - 296.9473. Let a = 0.05595293 - -296.94251707. Let k = v + a. Round k to four decimal places.
-0.0015
Let r(p) = 5 + 5 - p - 2 - 3. Let f be r(5). Suppose f = -3*u + 2*u + 490000. Round u to the nearest 100000.
500000
Suppose 70170 - 5964 = -29*t. What is t rounded to the nearest 1000?
-2000
Let l = -85.699 - -89.19976. Let o = l - 3.5. Round o to 4 dps.
0.0008
Let k = 4779.86 + 65.14. Let d = 4843.1044 - k. Let w = 1.9 + d. What is w rounded to three dps?
0.004
Let g = 314 + 777. Round g to the nearest 100.
1100
Let z = -1.21 - 89.79. Let b = 90.999785 + z. Round b to 5 decimal places.
-0.00022
Let k = -32.526 - -0.426. Let q = k - -33. Round q to the nearest integer.
1
Let y be 14/18 - 12/(-54). Let i(d) = -69000*d. Let a be i(y). Let b be 0 + (-9)/((-27)/a). Round b to the nearest ten thousand.
-20000
Let k be (139533*-1 - -1)*303/(-12). Let i = k - 2073183. What is i rounded to the nearest one hundred thousand?
1500000
Suppose -15*c + 50804 = -13*c. Suppose 0 = q - 4*q + 12. Suppose 47398 + c = q*a. Round a to the nearest 1000.
18000
Let p = -0.532669 - 83.461431. Let v = 15 + 69. Let c = v + p. What is c rounded to 3 dps?
0.006
Let n = -1.707 + 3.374. Let w = 0.013 + n. Round w to one dp.
1.7
Let b = 6.919 - -3.145. Let y = -13.1 + 23. Let d = b - y. What is d rounded to two decimal places?
0.16
Let t = 0.1267 - 0.13392. Round t to three dps.
-0.007
Let k(d) be the first derivative of d**3 - 11*d**2/2 + 2*d - 1. Let c be k(8). Let m = c - 72. What is m rounded to the nearest ten?
30
Let u = 11.2952 + -0.2052. Round u to 1 decimal place.
11.1
Let i = 10.50139 - 10.5. What is i rounded to four dps?
0.0014
Let y(g) = -g**2 + 14*g + 32. Let b be y(16). Suppose 0 = -5*s + 4*a - 2954992, b = 2*a + 6 - 2. What is s rounded to the nearest 100000?
-600000
Suppose -3*h + 682 = 130. Suppose 27*u = 29*u - h. Round u to the nearest ten.
90
Let d(p) be the first derivative of 507*p**4 - p**2/2 + p + 6. Let t be d(1). Suppose -h = 4*w - 14400, 5*h + t = -2*w + 9228. Round w to the nearest 1000.
4000
Let o = 0.01 + -0.098. Let f = 0.087993 + o. What is f rounded to 6 decimal places?
-0.000007
Let a = 3.7 - 7. Let b = a - -3.345. Let l = b + -0.0477. Round l to three dps.
-0.003
Let y = -0.11 - -35.11. Let n = -108.7136 - -73.724. Let l = n + y. What is l rounded to 3 decimal places?
0.01
Let r = 66949620.4000033 + -66949625. Let p = r - -4.6. What is p rounded to six decimal places?
0.000003
Let a = 0.249 + 0.021. Let c = -11.27 + a. Let m = 11.67 + c. Round m to 1 dp.
0.7
Let f = -16.405 - -0.305. Let w = f + 27. Round w to the nearest integer.
11
Let c(b) = -b**2 + 7*b + 0*b**3 + 2 - 2*b**2 - 3*b**2 - b**3. Let s be c(-7). Suppose 0 = -a - s*a. What is a rounded to 0 dps?
0
Suppose 3*g - 6*g + 45 = 0. Suppose -48*f - 35 = -55*f. Let v = f - g. Round v to the nearest 10.
-10
Suppose -3*m + 560 = 2*u, -3*u + 461 = 5*m - 381. Let c = 404 - u. Round c to the nearest 100.
100
Let d = 27 + 22. Let f = 2942444748 + -2942444698.99999941. Let k = f - d. Round k to 7 decimal places.
0.0000006
Let a = -53178 + 9454. Let l = a + 44097.49. Let y = -372 + l. Round y to one dp.
1.5
Let h = -0.01 + 0.04. Let p = 3.48366 + -3.454. Let q = p - h. Round q to four dps.
-0.0003
Let v = -763 + 762.4728. Let q = -4.0948 + v. Let h = q + 0.022. What is h rounded to 0 decimal places?
-5
Let r = 779438 - 545238. What is r rounded to the nearest one hundred thousand?
200000
Let z be (-8 - -1 - -2)*78294/(-15). Let g = z + 29902. What is g rounded to the nearest ten thousand?
60000
Let o = 12.988 - 10.32. Round o to one decimal place.
2.7
Suppose g = q + 38020, -g + 6*g = -4*q + 190109. Let z = 101721 - g. Round z to the nearest 10000.
60000
Let p = 13.61 - 13.61859. Round p to three decimal places.
-0.009
Let a = -0.2172 - -0.215. What is a rounded to three dps?
-0.002
Let a = 0.007 - -0.03. Let l = 0.0371 - a. What is l rounded to five decimal places?
0.0001
Let p = 5097644115125032 + -5097644071389596.17999973. Let s = p - 43735436. Let d = -0.18 - s. Round d to seven decimal places.
-0.0000003
Let r(z) = -43*z**2 + 8*z + 60. Let k be r(-7). What is k rounded to the nearest one hundred?
-2100
Let h = 115.00163 + -115. Round h to 3 dps.
0.002
Suppose 4*l - d = -3*d + 765198, -5*d + 573895 = 3*l. Round l to the nearest 100000.
200000
Let q(n) = -1305*n - 37. Let o be q(4). Let i = o + 11257. Round i to the nearest 10000.
10000
Let x = -1132.63 - -1127. What is x rounded to one dp?
-5.6
Let w = -39 - 30. Let s = 720852 + -720783.0158. Let y = w + s. Round y to 3 decimal places.
-0.016
Let a be 45566/14 - (-56)/196. Round a to the nearest 100.
3300
Let n = 2411.999997981 + -2412. What is n rounded to 7 decimal places?
-0.000002
Let q be (-39 + 40)*11/1. Let h = -1 - -4. Let m = q - h. What is m rounded to the nearest 10?
10
Suppose -4*j - 34 - 282 = 0. Let a be (1 - j)/((-4)/(-5650)). What is a rounded to the nearest 10000?
110000
Let m = -0.23 + -0.054. Let b = -1.474 - m. Let i = b - -0.42. Round i to one dp.
-0.8
Let g = 2163 + -2163.00002462. Round g to 6 decimal places.
-0.000025
Suppose 2*y = 5*s + 2056015, -2*y - s = 4*s - 2055985. What is y rounded to the nearest ten thousand?
1030000
Let i = -2.07 + 0.07. Let o = 0.18314 + 1.816906. Let c = o + i. Round c to 5 dps.
0.00005
Let a = 4.5175 - 0.0275. Let g = -1.04 + a. Let y = 3.6 - g. Round y to one decimal place.
0.2
Let x = -2.47 + -0.13. Let o = -134766787 - -134766789.60000164. Let p = x + o. What is p rounded to 7 decimal places?
0.0000016
Let s = -21901 - -10051. What is s rounded to the nearest one hundred?
-11900
Let b = -146259.937 + 146385. Let c = 125 - b. Round c to 2 decimal places.
-0.06
Let k = 446.849899 - 413.84989. Let h = -33 + k. Round h to six dps.
0.000009
Let p = -30.9 - -31.855. Round p to 2 dps.
0.96
Let d = 1.9549 - 0.3879. Let z = -0.063 - d. Let q = z + 1.6299901. What is q rounded to 6 decimal places?
-0.00001
Let q = -102.941 + 103. Let n = -0.5931 + 0.53. Let u = n + q. Round u to 3 decimal places.
-0.004
Let l = 77 - 74. Suppose 0 = -5*d + l*a + 15006, -a + 6006 = 2*d - 4*a. What is d rounded to the nearest one thousand?
3000
Let h = 11.467 + -0.455. What is h rounded to the nearest integer?
11
Let t = -29296738964.99999757 + 29296738670. Let p = t + 295. Round p to 7 decimal places.
0.0000024
Let z = 101724717594 + -101724528907.299972. Let d = z + -188686. Let y = d - 0.7. What is y rounded to five dps?
0.00003
Let g = 274.043 + -274. What is g rounded to three dps?
0.043
Let y = 172962377.0000011 + -172962366. Let x = -11 + y. Round x to seven dps.
0.0000011
Let b = 66973823.54000023 + -66973823. Let j = b - 0.54. Round j to 7 dps.
0.0000002
Let c be (-3)/(-2)*50/(-15). Let d(p) = 62004*p + 20. 