 3*o + 2*o**2. Let g be c(-2). Let q be (-1709997 - g/(-2)) + -4. What is q rounded to the nearest 100000?
-1700000
Let u = -34.2 + 204.2. Let d = -155.9 + u. What is d rounded to the nearest integer?
14
Let d = 977.3199 - 977. What is d rounded to one dp?
0.3
Let n be (9579/(-4))/(24/(-64)). Let d = n - -7514. Round d to the nearest 1000.
14000
Let a = 383 - 383.0135. What is a rounded to two decimal places?
-0.01
Let i = -1149.9999373 - -1150. What is i rounded to five dps?
0.00006
Let s = -0.06 + -0.2. Let j = s - -0.81. Round j to 1 dp.
0.6
Let k be 2 + 20/(-16) - 169274/(-8). Round k to the nearest one thousand.
21000
Let s = 132206772 - 132206778.6999941. Let y = s + 6.7. What is y rounded to 6 decimal places?
0.000006
Suppose -o + 4*v - 160 = 0, -4*o + 6*v - 7*v - 708 = 0. What is o rounded to the nearest one hundred?
-200
Let v = -202.919 + 203. Let s = -0.115 + v. What is s rounded to two decimal places?
-0.03
Let t = 4.97810365 + -4.978. What is t rounded to six dps?
0.000104
Let b = -543 + 514.7. Let v = b + 22. Let t = 6.398 + v. Round t to two dps.
0.1
Let u = -128764 + 200264. What is u rounded to the nearest 10000?
70000
Let m(k) = -401249*k**2 + 3*k + 2. Let j be m(-2). What is j rounded to the nearest one hundred thousand?
-1600000
Let w = 15091192.8037042 + 2060611.6362839. Let j = 17151806 - w. Let g = j + -1.56. Round g to six dps.
0.000012
Let p = 318.4 - 3104.76. Let s = p + 2721. Let x = s - -68. Round x to 1 decimal place.
2.6
Let y = 872 + -583. Let t = y - 269.9. Round t to the nearest integer.
19
Let o be 42228046/(-230) - (2 - 33/15). Round o to the nearest 1000.
-184000
Let x be -4*22070*(-1)/(-8). Let b = -20035 - x. What is b rounded to the nearest 10000?
-10000
Suppose -3 = 2*o + 5. Let c be (o/6)/(5/15). Let u be c/7 - 363/(-21). What is u rounded to the nearest 10?
20
Let i(o) = -o - 159192. Let n be i(0). Let z = n - 1740808. Round z to the nearest 1000000.
-2000000
Let r = 3.786 - 1.519. What is r rounded to 1 decimal place?
2.3
Suppose 15 = 5*s - 3*i, 0 = -5*s + 2*i + 6 + 4. Suppose k = -s*k + 12. Let x be (-40)/((k/800)/3). What is x rounded to the nearest 10000?
-10000
Let v = -21 + 27. Suppose 4*p - v*p + 4 = 0. Suppose 5*d - 3*b = 150, 2*d - p*b - 60 = -6*b. Round d to the nearest 10.
30
Let u = -4.04 + 4.37. Let h = -4.99823 - -4.668297. Let j = h + u. What is j rounded to 5 decimal places?
0.00007
Let s = 1332 - 1332.03946. Let f = s - 0.30121. Let y = 0.34 + f. What is y rounded to four decimal places?
-0.0007
Let c = 1.106986879 - 1.107. What is c rounded to seven dps?
-0.0000131
Let j = -7.864 - -7.8639995169. What is j rounded to seven decimal places?
-0.0000005
Let b = -431996 - -431918.4283. Let n = -0.1283 + b. Round n to the nearest 10.
-80
Let y = -1758.7118 - -1759. What is y rounded to three decimal places?
0.288
Let x = 2.36 - -0.22. Let m = x - 2.5800147. What is m rounded to six decimal places?
-0.000015
Let s = -3667 + 21167. What is s rounded to the nearest one thousand?
18000
Let w = 95.00505 + -95. Let s = -0.005 + w. What is s rounded to four decimal places?
0.0001
Suppose 0*n + 3 = n. Suppose 37681 = -n*q - 4919. What is q rounded to the nearest 1000?
-14000
Let f(j) = 30 - 3*j**3 + 9*j - j - 19*j**2 - 39*j + 637*j**3. Let x be f(30). What is x rounded to the nearest one million?
17000000
Let z = 90569.277 + -90409. Let m = z + -145.2693. Let p = m - 15. What is p rounded to three dps?
0.008
Let w(u) = 6*u + 2. Let m be w(-1). Let b be (1 + m/(-12))/(2/2310). What is b rounded to the nearest 100?
1500
Let i = -64.411 - 0.389. Round i to the nearest ten.
-60
Let a = 1336 + -1335.8702. What is a rounded to three decimal places?
0.13
Let l = 8455.1919975 + -8469.192. Let u = l - -14. Round u to 6 dps.
-0.000003
Let b = 340 - 340.331. Let h = b - 0.098. Let q = -0.47 - h. What is q rounded to two dps?
-0.04
Let p = -0.23654 - -0.1846. What is p rounded to 3 dps?
-0.052
Suppose 4*l - 8*l = -2*y + 77979988, 2*y - 3*l - 77979991 = 0. What is y rounded to the nearest 1000000?
39000000
Suppose -3*g = -3*f + 21, 0*g + 16 = 3*f - 2*g. Suppose 5*n - 17 = -f. Suppose -n*y + 1428 = 4*m - 6*y, 1820 = 5*m + 5*y. Round m to the nearest one hundred.
400
Let c = 626.0000274 + -626. Round c to 5 dps.
0.00003
Suppose 25*k + 46634867 - 289634867 = 0. Round k to the nearest one million.
10000000
Let d = -0.0634 + 0.065275. Round d to four dps.
0.0019
Let r = -12 - -8. Let p be r/(-26) + (-67854)/(-39). Round p to the nearest one hundred.
1700
Let s = 0.0527 - 0.052124. Round s to 4 dps.
0.0006
Let f = -8 - -2.9. Let w = 938607.34 - 938602.2399977. Let h = f + w. What is h rounded to 6 decimal places?
0.000002
Let x = -22209 - -22209.020029. What is x rounded to 4 dps?
0.02
Let s = 7.6 - 7.9872. Let a = s + -0.5534. Let k = a + 0.92. What is k rounded to 3 decimal places?
-0.021
Let b = 14525 + -14525.6043. What is b rounded to two decimal places?
-0.6
Let u = 150302970.0000248 - 150302914. Let p = 56 - u. What is p rounded to six dps?
-0.000025
Let j = 18894 - 69014. Let u = j - -50119.889999. Let n = u - -0.11. What is n rounded to 5 decimal places?
0
Suppose y - 43908899 = 52891101. What is y rounded to the nearest one million?
97000000
Suppose 2*t - 5*s + 152 = 3*t, 2*t = -2*s + 304. Suppose 5*j + d - 7 + t = 0, j + 4*d + 48 = 0. What is j rounded to the nearest ten?
-30
Suppose 0 = 3*g + 5*h + 2, -4 = -2*g + 2*h. Let y be (-354)/(g*9/1500). What is y rounded to the nearest 10000?
-60000
Let g = -18 - -17.91. Let z = 0.013 + g. What is z rounded to two decimal places?
-0.08
Suppose -2*m + 3 = 15. Let t = -3 - m. Suppose -d + 279 = -4*h, 206 = -t*h + 5*d - d. Round h to the nearest one hundred.
-100
Let n = 1794 - 1793.9816. What is n rounded to 2 dps?
0.02
Let x = -0.084 - -0.034. Let z = x - -0.062. What is z rounded to three decimal places?
0.012
Let s = 1.1 + -31.1. Let w = s + 29.99968. What is w rounded to four decimal places?
-0.0003
Let h be (-15)/(55/(-10) - -4). Let z be h/(-10)*(-237 - 0). Round z to the nearest ten.
240
Let i = -76196.600033 - -76193.5. Let w = -6.1 + 3. Let b = w - i. Round b to 5 decimal places.
0.00003
Let z = 314 + -319.64. What is z rounded to zero dps?
-6
Let w(l) be the first derivative of 103*l**3 + 5*l**2/2 + 4*l + 48. Let k = -1 - 1. Let f be w(k). What is f rounded to the nearest one hundred?
1200
Let r = -15.83 + -0.17. Let c = -15.99994 - r. Round c to 4 decimal places.
0.0001
Let f = -0.14963 - -0.14955981. What is f rounded to five decimal places?
-0.00007
Let d = -6707284 - -6707604.9959. Let g = -0.0041 - d. Let m = -321.129 - g. What is m rounded to 2 decimal places?
-0.13
Let w = 425657 + -832657. Round w to the nearest 100000.
-400000
Suppose -r - 5*c = 4, 4*c = r + 5 + 17. Let z be (-62)/(-14) - (-6)/r. Let l(n) = -15*n**2 - 7*n + 8. Let q be l(z). Round q to the nearest one hundred.
-300
Let n = 299.0000562 - 299. What is n rounded to 5 decimal places?
0.00006
Let n = 0.532 - -30.668. Round n to the nearest 10.
30
Let k = 40097.06177 + -40096. Let s = k - 1.06. Round s to 4 dps.
0.0018
Let d = -436 + 436.00000974. Round d to 7 dps.
0.0000097
Suppose -5*g = -11 - 9. Suppose -4 = g*a + 3*u, 3*a + 1 + 2 = -5*u. Let b be (-200)/(2/(-310)*a). Round b to the nearest ten thousand.
-30000
Let u = 4.4 + -2.2. Let k = 18.8 + u. Let g = 21.15 - k. Round g to 1 decimal place.
0.2
Let w(x) = 82*x**2 - 7*x + 1. Let o be w(-11). Round o to the nearest 10000.
10000
Let m(f) = -f + 3. Let i be m(5). Let a(n) = 200001*n + 2. Let p be a(i). Round p to the nearest 100000.
-400000
Let h = -0.21 + 0.44. Let o = h - 21.23. Let c = 21.04 + o. Round c to one dp.
0
Let s = 1101089887.000411 + -1101090342. Let c = -455 - s. What is c rounded to 5 dps?
-0.00041
Let a = -0.08 + -2.92. Let m = 14 + a. Let y = -10.9999984 + m. Round y to 6 dps.
0.000002
Let n = 2296 + -2295.9996944. What is n rounded to five dps?
0.00031
Let n(s) = s**2 - 34*s - 80. Let l be n(27). What is l rounded to the nearest 10?
-270
Let c = 7 - 6.46. Let w = -0.6 + c. Let h = -0.04 - w. Round h to 2 decimal places.
0.02
Let g = -158.05 - -153. What is g rounded to zero dps?
-5
Let r(k) = 38*k**2 + 7*k + 38. Let v be r(20). Let l = v - -3422. Round l to the nearest one thousand.
19000
Let t = -376 + 269. 