al places.
-0.0000005
Let r = 103 + -14. Let z = r + -89.156. Let o = z - -0.067. Round o to 1 dp.
-0.1
Let k(h) = 20*h + 263. Let u be k(-31). Let p be ((-71100)/7)/(51/u). Round p to the nearest 1000.
71000
Let k(m) = 3*m**3 + 63*m**2 + 31*m + 168. Let s be k(-29). Round s to the nearest 1000.
-21000
Let f = 5.05 - 9.19. Let i = -4.14000642 - f. Round i to 7 decimal places.
-0.0000064
Let n = 126.17 - 126.16991353. Round n to 5 decimal places.
0.00009
Let v = 162 - 186.4. Let q = 29 + v. Let d = q - 4.6000084. Round d to six decimal places.
-0.000008
Suppose -2187698000 = 318*q - 337*q. What is q rounded to the nearest 1000000?
115000000
Suppose 2*q = 3*z - 7*z - 24, 5*z + q = -24. Let x be (z - (6 + -6)) + 1*4. Let j be (x - -3) + (-7839997)/(-1). Round j to the nearest one million.
8000000
Let d = 14509.1 + -12686. Let h = d + -1983. What is h rounded to the nearest 10?
-160
Let o = -2246 + 1049. Let n = 1198.374 + o. Let j = -1.4 + n. Round j to 2 dps.
-0.03
Suppose 25884757 + 41690243 = 50*w. What is w rounded to the nearest 1000000?
1000000
Let l = -1.01 - 0.596. Let u = -0.504 - -0.38. Let p = u + l. What is p rounded to 1 decimal place?
-1.7
Suppose 0 = -7*x + 3*x - 1748. Suppose 17*a + 8811 + 1865 = 0. Let t = x + a. Round t to the nearest 100.
-1100
Let j = 625 - 602. Suppose -j*l + 4102 = -22*l. What is l rounded to the nearest one hundred?
4100
Let m(q) = 54127*q**2 + 10*q + 8. Let c(z) = z + 21. Let u be c(-22). Let o be 12/(-3) + u + 1. Let y be m(o). Round y to the nearest 100000.
900000
Let x = 2.793 + -0.213. Let w = x + -2.57999944. What is w rounded to seven decimal places?
0.0000006
Let o(a) = -12477*a + 5663. Let q be o(-81). Round q to the nearest ten thousand.
1020000
Let y = 28665294 + 222204706. What is y rounded to the nearest 1000000?
251000000
Let w = 2318.44360686 + -2318.2006. Let d = w - 0.243. Round d to six decimal places.
0.000007
Let w = 4.402 + -4.45948. What is w rounded to 2 decimal places?
-0.06
Suppose -4*c = -3*c + 134476. Let j = c - -95722. Let g be 16*10*(j - -4). Round g to the nearest one million.
-6000000
Suppose -w - 5*d = -9073, 3*d + 45477 = 5*w - 0*d. Suppose 140*b - w = 133*b. Round b to the nearest 10.
1300
Let c = -116679.53396 + 116776. Let r = -0.14396 - c. Let z = -90.1 - r. What is z rounded to 1 decimal place?
6.5
Let w be -2 + -3 + 5 + -12 + 52. Let k be (-20)/(-8)*22432/w. Round k to the nearest 100.
1400
Let i = 51843 + -51843.000023763. What is i rounded to 7 decimal places?
-0.0000238
Let i = 313491.1 + 2373614.9. Let d = i - 2687105.7689794. Let f = d + -0.231. What is f rounded to 6 dps?
0.000021
Let u(s) = 745616*s**2 - 11*s + 638117*s**2 - 2 + 27380*s**2. Let z be u(6). Round z to the nearest 1000000.
51000000
Let p = 0.3601 - 0.35961682. Round p to 5 dps.
0.00048
Let a = -186183.9729 + 186026. Let x = a - -157.9. Let l = 0.6589 + x. Round l to one dp.
0.6
Let z = 1274 - 1276.388. Let x = -0.132 + z. Round x to one dp.
-2.5
Let q = 3319.6808212 + -3321.351. Let k = -1.67 - q. What is k rounded to 5 dps?
0.00018
Let z = -3089.5 + 589.5. Let g = -2499.999998973 - z. What is g rounded to seven decimal places?
0.000001
Let m = -3.44 - -3.440006342. Round m to 6 decimal places.
0.000006
Let a = -8235.483457 + 2.439457. Let p = 8187 + a. Let w = -46 - p. What is w rounded to 2 dps?
0.04
Let a = -151.6743 + -0.0257. Let j = a + 152.781. Let t = j - 0.031. Round t to one dp.
1.1
Let g = -373 + 283.35. Let f = -90 - g. Let r = f + -0.93. Round r to one decimal place.
-1.3
Let n = -47 - -49. Let y be 5849999/((n/(-5))/((-24)/20)). Suppose -3*m + y = 5*x, 6*x - 2*x - 14039997 = -3*m. Round x to the nearest one hundred thousand.
3500000
Let b = 172 + -521. Let s = b - -377.6. Round s to the nearest 10.
30
Let i(u) = -10*u + 8. Let h be i(-7). Suppose 0 = h*t - 83*t + 26180000. Suppose 0 = -o + 5*o + t. Round o to the nearest 100000.
-1300000
Let r(y) = -966500*y - 25. Let q be r(-6). Let o = -8195975 + q. Round o to the nearest 100000.
-2400000
Let c = -14363 - -14363.000039185. What is c rounded to five decimal places?
0.00004
Let d = 2.265978 + -0.015678. Let f = d + 16.6437. Let k = f + -19. What is k rounded to 2 decimal places?
-0.11
Let j = -6518 - -6517.99990626. What is j rounded to six dps?
-0.000094
Let s = -15150 + 15150.0062376. Round s to four dps.
0.0062
Suppose 2*v - 2*x + 4500002 = 5*v, 7500002 = 5*v + 2*x. Suppose 9*k - v = -k. Round k to the nearest 10000.
150000
Let k = 38.2 - 38.200001226. What is k rounded to seven dps?
-0.0000012
Suppose 385*d - 449*d - 11023360 = 0. Round d to the nearest 10000.
-170000
Let d = -3746.29 + 3636. Round d to one dp.
-110.3
Let p be 125/(-3)*(15 + -506412 - 3). What is p rounded to the nearest 100000?
21100000
Let y be (-8 + -53 - -3)*226/(-4). What is y rounded to the nearest one thousand?
3000
Let w(u) = 27*u + 561. Suppose -15*x = -4*x - 2*x. Let k be w(x). Round k to the nearest one hundred.
600
Let y = 412080 - 161810. What is y rounded to the nearest 10000?
250000
Let t = -124.7 + 22.7. Let g = -67 - t. Let o = g - 34.99999945. Round o to seven dps.
0.0000006
Let a = -47180 - -46945.07. Round a to the nearest ten.
-230
Let f(q) = q + 10. Let v be f(-6). Suppose 0*w = v*w - 957372. Suppose 100657 = o - w. Round o to the nearest one hundred thousand.
300000
Let m = -148656459.9756 - -148690144. Let h = m + -33794. Let p = 110 + h. What is p rounded to two dps?
0.02
Let i = 36.916 - -0.084. Let n = -58 - i. Let u = 94.9999879 + n. Round u to six decimal places.
-0.000012
Let a = -44 - -49. Suppose 107072337 = 4*r - 3*b, -5*r + 162509150 - 28668725 = -a*b. Let z = -41268082 + r. Round z to the nearest one million.
-15000000
Let u = -11 - -11. Suppose 24*b - 12*b - 43440000 = u. Round b to the nearest one hundred thousand.
3600000
Let w = 11947 + -11946.73885. Round w to 2 dps.
0.26
Let g = 20.17 + -20.17013045. Round g to 6 decimal places.
-0.00013
Let a = -64.838 - -68.6. Round a to one decimal place.
3.8
Let k(t) = 169900006*t**3 - 7*t**2 + 1. Let y be k(1). What is y rounded to the nearest one million?
170000000
Let o be -1*(-6)/12*12. Let v be 147/(-51) - o/51 - 4129997. What is v rounded to the nearest one hundred thousand?
-4100000
Let p = -82.1 - 2.9. Let t = p - -84.999963. Round t to 5 decimal places.
-0.00004
Let y = -10676 - -10675.999643. Round y to 4 decimal places.
-0.0004
Let i = 20.997 - -0.003. Let t = -648036.3200004 - -648015.32. Let x = t + i. Round x to 7 decimal places.
-0.0000004
Let k = -21 - -22. Let u(q) = k - 6 + 28999*q + 4. Let d be u(-1). Round d to the nearest ten thousand.
-30000
Suppose 25 = 5*w - 5*y, -2*y + 13 = 3*w - 2. Let m(u) = 1281*u**3 - 4*u**2 - 3*u + 1. Let b be m(w). Suppose b + 66989 = v. Round v to the nearest 10000.
230000
Let c = -511578135 - -291637714. Let k = c - -219940321.999959. Let g = k - -99. Round g to five dps.
-0.00004
Let r = 295245 + -2679. Let p = -28434 - r. Round p to the nearest 10000.
-320000
Let h(r) = 166*r + 188*r + 29*r - 43*r - 246. Let y be h(7). Round y to the nearest one thousand.
2000
Let v(y) = -14935*y + 44. Let m be v(4). Let l = 248696 + m. What is l rounded to the nearest ten thousand?
190000
Let u = 52520.00145964 - 52520. What is u rounded to four decimal places?
0.0015
Let y = -8 - -12. Let n(b) = -800091*b + 4. Let k(l) = -800073*l + 4. Let o(c) = 5*k(c) - 4*n(c). Let m be o(y). What is m rounded to the nearest one million?
-3000000
Let q = 66869.5507 - 67216.62. Let a = 347 + q. Round a to two dps.
-0.07
Let y = -37229 + 37228.55166. Let u = 0.45 + y. Round u to 3 decimal places.
0.002
Let x = 368 - 550. Let c = 4.4633959 - -177.5357341. Let f = x + c. Round f to 4 dps.
-0.0009
Let f = -18693 - -18693.0061458. What is f rounded to 3 decimal places?
0.006
Let a = 0.057 + 0.03. Let j = -1.721 + 1.63. Let b = a + j. Round b to three dps.
-0.004
Let c = 0.009 - 7.009. Let z = 69472942 - 69472935.00000016. Let k = z + c. What is k rounded to 7 decimal places?
-0.0000002
Suppose 33*a = 15*a. Suppose -61*q + 52*q - 10359 = a. What is q rounded to the nearest one hundred?
-1200
Let w(k) be the third derivative of 531*k**5/10 - 3*k**4/8 - 5*k**3/6 + 17*k**2. Let i be w(5). Round i to the nearest ten thousand.
80000
Let c = -6.974677137 - -37.424663467. 