Let y = p + 291.139. What is y rounded to two dps?
0.14
Let m = -134132 - -373402. Round m to the nearest 100000.
200000
Let t = 327 + -501. Let d be 12*2/8 - t/1. Round d to the nearest 10.
180
Let v = -141.162 - -141. Let z = -419 + 418.98. Let s = z - v. What is s rounded to 2 decimal places?
0.14
Suppose 4*u - 1833449 = -3*c, 5*u + 964657 - 3256497 = 2*c. Let i = u + 157146. Let k = i + -385512. Round k to the nearest one hundred thousand.
200000
Let o = 3.54 - 3.62. Let r = 7.15 - 7.0842. Let a = o + r. Round a to three dps.
-0.014
Let k = 7808.037058152 - 0.896950152. Let r = k + -7807. Let w = 0.14 - r. Round w to five dps.
-0.00011
Let c = -619.1 + 81.1. Let t = c - -537.99601. What is t rounded to four decimal places?
-0.004
Let q be (-6606)/(-8) + 2/8 - 0. Let z = -435 + q. Round z to the nearest one hundred.
400
Let t(v) be the third derivative of 9*v**4 + 5*v**3/3 - 22*v**2 + 1. Let i be t(-15). What is i rounded to the nearest one thousand?
-3000
Let a = 961408.99985 - 961441. Let p = a - -32. Round p to four decimal places.
-0.0002
Let n = 2548 + -2553.7856. Let z = n + 5.74. What is z rounded to 3 decimal places?
-0.046
Let q = 71958 + -71957.99846174. Round q to 4 dps.
0.0015
Let k(h) = -29351*h**3 + 7*h**2 + 9*h - 14. Suppose -t - 18 = -4*m, 3 - 6 = 2*t + 3*m. Let i be k(t). What is i rounded to the nearest 100000?
6300000
Let g = 0.02066299 + -0.55917279. Let w = g + 0.1385275. Let x = w - -0.4. What is x rounded to 5 decimal places?
0.00002
Suppose 1679040 = 3*o + 33*o - 3*o. Round o to the nearest one thousand.
51000
Let q = -13.906 + 6.923. Round q to 1 dp.
-7
Let w = 17138.99999233 - 17139. What is w rounded to six dps?
-0.000008
Let q = 2.587287999 + -266.587303399. Let s = -264 - q. What is s rounded to 6 decimal places?
0.000015
Let a = -258277 + 258348.89085. Let j = 73.48084652 - a. Let b = j - 1.59. Round b to 7 decimal places.
-0.0000035
Let o = 5538575 + -5541067.2674. Let h = o - -2492. Round h to two decimal places.
-0.27
Let n(f) = 15*f + 260. Let z be n(-17). Let u be -8 + 77445 - (-5 + z - 3). Round u to the nearest one thousand.
77000
Let q be ((-130)/(-4))/5 + 1/(-2). Suppose 0 = q*g + 5924 + 4066. Let w = g + 796. Round w to the nearest one hundred.
-900
Let c = -7.107 - -1.037. What is c rounded to the nearest integer?
-6
Let r = 0.5422 - 0.5421820325. Round r to 7 decimal places.
0.000018
Let j = 506 - 273. Let f = 233.001704 - j. What is f rounded to 4 dps?
0.0017
Let o(f) = f**2 + 8*f + 9. Let t be o(-5). Let c(r) = 154800003*r + 30. Let v be c(t). Let d be v/18 + (-4)/6. Round d to the nearest 1000000.
-52000000
Let a = -26.14 + 31.61. What is a rounded to the nearest integer?
5
Let w = 13261.930254 + -13262. What is w rounded to two decimal places?
-0.07
Let y = -0.09588 + 0.1477. Round y to three decimal places.
0.052
Let t = -95 - -94.956. Let z = t + 50.044. Let s = 48.87 - z. Round s to one decimal place.
-1.1
Suppose -3*j - v = -5*v - 50, 5*j - v - 55 = 0. Let h(b) = b**3 + 6*b**2 - 4*b + 1. Let s be h(-3). Let f = s + j. What is f rounded to the nearest one hundred?
100
Let p = 39 + -6.74. Let o = -25.4 + p. What is o rounded to 0 decimal places?
7
Let g = -4 + 6. Suppose 9259598 + 4540394 = g*r. Suppose 5*f = -2*y + r, 2*y + 5520004 = -f + 5*f. Round f to the nearest 100000.
1400000
Let u = -0.837 - -0.95. Let y = 0.1308 - u. Round y to 3 dps.
0.018
Let d be -371*1*(-32 - -31). Let v = -651 + d. What is v rounded to the nearest one hundred?
-300
Let j = -498785776277448946.99999947 - -498785767423874735. Let o = -8853574174 - j. Let u = o + -38. Round u to seven dps.
-0.0000005
Let t = -75076222.913498661 + 75076223. Let o = 0.0865 - t. What is o rounded to seven decimal places?
-0.0000013
Let m = 988.929936891 + -988.93. What is m rounded to 6 decimal places?
-0.000063
Suppose 2*a + 4*o - 1343106 = -270106, -20 = -4*o. What is a rounded to the nearest one thousand?
536000
Let d = 576617.647866 + -576595.7. Let t = 21.95 - d. What is t rounded to 4 decimal places?
0.0021
Suppose -58*d = 58*d - 123*d + 450870000. Round d to the nearest one million.
64000000
Let z = -1635 - -1867.4. Let m = -2443 + 2235. Let l = m + z. What is l rounded to the nearest integer?
24
Let c = -33 - -43. Suppose -5*q + 10*q = c. Suppose y + 2*i - 691 = i, -q*i = y - 692. Round y to the nearest one hundred.
700
Let q = 9273 + -9274.7806. What is q rounded to 1 dp?
-1.8
Let j(q) = 81051*q**2 - 36 + 21*q - 13*q + 82593*q**2 + 77490*q**2 + 55534*q**2. Let l be j(3). What is l rounded to the nearest one hundred thousand?
2700000
Let v = -0.424 + 6.544. Let y = 18.54 - v. Round y to the nearest integer.
12
Let i(b) be the first derivative of -215149*b**2/2 + 2*b + 29. Let j be i(-2). Round j to the nearest 10000.
430000
Let n = 166 - 183. Let b = 4943 + -4960.012. Let w = n - b. Round w to 2 dps.
0.01
Let g = 28.57 - 1.07. Let v = -0.02 - 50.38. Let b = v + g. Round b to the nearest integer.
-23
Let g = 0.14 - 0.046. Let n = -12.294 + g. Round n to the nearest 10.
-10
Let z = 10491 - 26791. What is z rounded to the nearest 10000?
-20000
Let m = 16834 + -16834.000024278. What is m rounded to 5 dps?
-0.00002
Let m = -5148 + 5155.036. What is m rounded to one decimal place?
7
Let z = 273 + -272.9904. Let t = -0.4144 - z. What is t rounded to 1 decimal place?
-0.4
Suppose -151026904 = -19*s + 260607355. Suppose 0 = -31*x + 678935039 + s. What is x rounded to the nearest one million?
23000000
Let q = 2068.4945662 - 2073.5947. Let p = 5.1 + q. Round p to 5 decimal places.
-0.00013
Let i = -4770392.00000105 - -4770379.7. Let c = 12.3 + i. What is c rounded to 7 decimal places?
-0.0000011
Let v be 184/(-56) + 4/14. Let j(x) = -x**2 - 4*x. Let g be j(v). Suppose i - g*i = 890000. Round i to the nearest 10000.
-450000
Let w = 49321108 - 49320880.9999936. Let u = w + -227. What is u rounded to seven decimal places?
0.0000064
Let b = -395.434 + 395. Let l = b - -0.034. Let k = l - -0.45. Round k to one decimal place.
0.1
Suppose -10273395 - 11216605 = -7*s. Suppose -k + 0*k = s. Round k to the nearest 100000.
-3100000
Let s = 1 - 1296. Let w = s + 1294.8878. Round w to 2 decimal places.
-0.11
Let u = -20979.9544 + 20973. Let y = u + -0.3476. Round y to 1 decimal place.
-7.3
Let w = -6532 - -6574.59. Let y = 0.41 + w. Let c = 43.000208 - y. What is c rounded to four decimal places?
0.0002
Let c(t) = -27481*t**2 - 8*t + 6*t - 8 + 21*t. Let w be c(11). What is w rounded to the nearest one million?
-3000000
Let k = -2.001 - 1049.999. Let b = 1052.003228 + k. What is b rounded to 4 decimal places?
0.0032
Let z = -3329370 - 1109630. Round z to the nearest one million.
-4000000
Let d = 234 - 249.7. Let q = d + 15.384. Let y = -0.3317 - q. What is y rounded to 2 dps?
-0.02
Let h(m) = -4251*m**2 + 9*m - 18. Let d(q) = -5*q + 7. Let a be d(0). Suppose -a*t = -21 - 21. Let c be h(t). What is c rounded to the nearest ten thousand?
-150000
Let u = 315.54 - 315.5375854. Round u to three dps.
0.002
Let u = 931.0269 + -922.85. Let x = u + -0.0969. What is x rounded to the nearest integer?
8
Let r = 0.75665434 + -1.1517413. Let d = r + 0.15008795. Let t = -0.245 - d. Round t to seven dps.
-0.000001
Let s(u) = 6 + 6*u - 10*u + 8*u - 2*u. Let f be s(-2). Suppose 5*t - d - 42871 + 126368 = 0, 2*d + 33406 = -f*t. What is t rounded to the nearest one thousand?
-17000
Let t = 743621 - 743621.723201. Let o = t + 38.027381. Let k = -37.3 + o. Round k to three decimal places.
0.004
Suppose -2*t + 13 = 1. Let f be 15*t*(-36088)/16 + -5. What is f rounded to the nearest 10000?
-200000
Let z(x) = x**3 - 16*x**2 - 39*x + 62. Let l be z(18). Let v(y) = 97*y**2 - 3*y + 31. Let t be v(l). Round t to the nearest 1000.
6000
Let i = 4.3472 + -4.3533834. Round i to five decimal places.
-0.00618
Let q = 3.0418 + -3.0418220476. Round q to 6 dps.
-0.000022
Suppose -f - 21799 = -5*a + 6586, 4*a - 56800 = 2*f. What is f rounded to the nearest 1000?
-28000
Let a be -20 - (-32)/4 - -1774. What is a rounded to the nearest 1000?
2000
Suppose -3*k = 5*g - 80739, -18*g + 13*g + 134585 = 5*k. What is k rounded to the nearest 100?
26900
Let q be 3 + (-1 - 6) + -44217 - -1. What is q rounded to the nearest 100?
-44200
Suppose 6 = -2*d + 26. Suppose 0*p + 2*t = 3*p - 5, -d = -5*t. 