?
0.02
Let y = -116720.9900014 - -116721. Let t = y - 0.01. What is t rounded to 6 dps?
-0.000001
Let z = -64360.199906 + 64364. Let n = -3.8 + z. What is n rounded to five dps?
0.00009
Let m be -5*2/((-20)/6). Suppose m*w + 4719991 = a + a, 9440006 = 4*a + 2*w. Suppose 3*u = -u - a. What is u rounded to the nearest one hundred thousand?
-600000
Let w(x) = 10*x**2 + x - x - 1. Let s be w(1). Suppose s*y - 4*y = 16500. Round y to the nearest one thousand.
3000
Let m = -1020 + 540. What is m rounded to the nearest 100?
-500
Let r = 29.71901 - 29.919. Let z = r - -0.2. Round z to four decimal places.
0
Let a = 89 + -88.9862. Round a to two decimal places.
0.01
Let d = 25.811 + -26.1. Round d to one dp.
-0.3
Let t = 9 + -9.4. Let a = 35194.399998 - 35194. Let k = a + t. Round k to 6 decimal places.
-0.000002
Let h = -0.067 + -0.473. Round h to 1 decimal place.
-0.5
Let u = -52.09 + 52.13738. Let y = u + -0.0167. Let p = y - 0.03. Round p to four dps.
0.0007
Let x = -150 - -155.94. Let m = x + 0.06. Let a = m - 5.95. Round a to 1 decimal place.
0.1
Let i(z) = 2666670*z - 10. Let l be i(3). What is l rounded to the nearest one million?
8000000
Let r be 14/(-21) + (-32)/6. Let k(p) = p**2 + 7*p - 2. Let j be k(r). Let w be 38000001/(-4) - 2/j. What is w rounded to the nearest 1000000?
-10000000
Let f = 10.027 - 18.02. Let r = 8 + f. What is r rounded to three dps?
0.007
Let p = -0.19 - -8.19. Let a = 18066.276 + -18074.275983. Let v = a + p. What is v rounded to five decimal places?
0.00002
Let r(a) = 184140*a**2 - a - 1. Let y be r(-1). Suppose 3*k + y = -2*k. Let w = 683172 - k. What is w rounded to the nearest one hundred thousand?
700000
Let t(v) = -v**2 - 1. Let j(b) = -4694*b**2 + 6*b + 14. Let p(k) = j(k) + t(k). Let l be p(7). Round l to the nearest 100000.
-200000
Let q be 8/(-12) - (-34)/6. Suppose 1799975 = -4*o - 5*a, q*o - 5*a + 2250025 = -0*o. What is o rounded to the nearest 100000?
-500000
Let m = 55.63 + 1.37. Let k = 57.066 - m. Round k to two dps.
0.07
Let v = 0.9 - 0.4. Let c = v + -0.4. Let f = c + -0.3. What is f rounded to one dp?
-0.2
Let y = -15 + 6. Let t = 9.28 + y. Let g = t - -6.32. Round g to the nearest integer.
7
Let v = 141.12972 - 148.129737. Let h = 7 + v. Round h to 5 dps.
-0.00002
Let b = -13 - -13.0000044. What is b rounded to six decimal places?
0.000004
Let i(f) = -3*f**2 - f**2 + 436 - 2*f**2 + 7*f**2 + f. Let q be i(0). Suppose -5*w - q - 169 = 0. Round w to the nearest 10.
-120
Let d(s) = 0*s + 5 + 11*s - 4*s**2 + 3*s**2. Let a be d(8). Round a to the nearest ten.
30
Let d(v) = 1750*v**2 + v + 10. Let k be d(-10). Let o be (1 - 37)*k/1. Round o to the nearest 1000000.
-6000000
Let s be (-128 - -8)*7/(-3). Round s to the nearest one hundred.
300
Let p = 8096 + -13186. Let r = p - 1010. Round r to the nearest 1000.
-6000
Let t = -18817322 + 18817315.9999988. Let n = t + 6. Round n to 6 dps.
-0.000001
Let i = 357 - 657. Round i to the nearest one hundred.
-300
Suppose j - 35903 = q, -4*j - 71788 = 2*q - 0*j. Round q to the nearest one thousand.
-36000
Let f(l) be the first derivative of 1 - 5/2*l**4 - 2*l - 2/3*l**3 - 2*l**2. Let s be f(4). What is s rounded to the nearest one hundred?
-700
Let v = 3.3 + -4. Let h = v + 0.1. Let b = h + 0.59. What is b rounded to two dps?
-0.01
Let h = -0.05 - 4.95. Let y = 4.9887 + h. What is y rounded to 3 dps?
-0.011
Let y = -81.845 - -82. Round y to 1 dp.
0.2
Let j(m) = -m**2 + 8*m. Let s be j(8). Let l(t) = -t**2 - 1060. Let g be l(s). Round g to the nearest 100.
-1100
Let z = 1996.6549 - 2004.654903. Let b = z - -8. Round b to 6 decimal places.
-0.000003
Let k(g) be the first derivative of 4*g**3/3 - g**2/2 - 3. Let z be k(1). Suppose -z*j = 83458 - 227458. Round j to the nearest ten thousand.
50000
Let f = 105 + -105.053. Let a = -47.947 + f. Let o = 48.082 + a. Round o to two dps.
0.08
Suppose -4*h - 7*n + 217985 = -4*n, 3*n = -2*h + 108985. Round h to the nearest 1000.
55000
Let x be (-5 - 6) + 4/2. Let d = -5 - x. Suppose -d*r + 3*r - 3699996 = 5*l, 3*l - r + 2220004 = 0. Round l to the nearest one hundred thousand.
-700000
Let z = 0.0082569 - 0.0083. Round z to six dps.
-0.000043
Suppose 0 = 5*z + 213 + 92. Let h be 5/(-1 + z/(-62)). What is h rounded to the nearest 100?
-300
Let h(z) = -1460*z. Suppose 4*v + v = 0. Suppose 2*g - w + 5 = v, 3*w - w + 10 = 0. Let x be h(g). What is x rounded to the nearest one thousand?
7000
Let y = 2.2 - 2.199899. What is y rounded to 5 dps?
0.0001
Let c = -40814 - -69850. Let w = -13036 + c. Suppose 5*l = l - w. What is l rounded to the nearest 10000?
0
Let p = 12398 + -12480.33. Let l = -83 - p. What is l rounded to one dp?
-0.7
Let f = -7 + 7.4. Let t = f + -0.455. Let s = -0.004 + t. What is s rounded to 2 decimal places?
-0.06
Let w = 9.7575 - 7.853. Let x = 1.9 - w. What is x rounded to 3 dps?
-0.005
Let y = 1583 + -1582.99353. Round y to four decimal places.
0.0065
Let h(s) = 823*s**3 - 5*s**2 - 9*s + 16. Let i be h(8). What is i rounded to the nearest 10000?
420000
Let r = 78.114 - 78. What is r rounded to 2 dps?
0.11
Let k = 61.68 - -23.59. Let l = k - -8.13. Let y = -80 + l. What is y rounded to the nearest integer?
13
Suppose 0 = -0*g - 4*g + 2*f - 12, 0 = 3*g + f + 9. Let w be 67/(124/(-40) - g). Round w to the nearest one hundred.
-700
Let c(v) = 4*v**3 + 7*v**2 + 2*v + 1. Let f be c(-5). Let s = f + 111. What is s rounded to the nearest 10?
-220
Let h(q) be the second derivative of q**4/12 + 4*q**3/3 + q**2/2 - 2*q. Let f be h(-8). Let n be (19 + 1)/(f/(-310000)). Round n to the nearest 1000000.
-6000000
Let t = -153 + -86. What is t rounded to the nearest 10?
-240
Let c = 17 + -17.9. Let t = -0.972 - c. What is t rounded to two dps?
-0.07
Let a = -38.78 + 2.38. Let q = a - 129.6. Let t = 166.0079 + q. Round t to three dps.
0.008
Suppose 5*d = 2*q + 9158038 - 1758038, 2*q + 7400000 = 4*d. Round q to the nearest 1000000.
-4000000
Let m = -25.44 + -3.46. What is m rounded to the nearest integer?
-29
Let m = 567.739 + -628.7496. Let z = 0.2 - 61.2. Let b = z - m. What is b rounded to 3 dps?
0.011
Let b = 6523936 - 14153906. Let i = b - -11529970. What is i rounded to the nearest 1000000?
4000000
Let j = 2 + -8. Let r = j + 6.00000001. Round r to seven decimal places.
0
Let a be ((-5423)/(-2))/(4/32*-4). Suppose 0*u = u - 1523. Let v = a + u. Round v to the nearest 1000.
-4000
Let b = 3 + 0. Suppose 5*l + 3*d + 23647 = -129853, 0 = -b*l - 4*d - 92100. What is l rounded to the nearest 1000?
-31000
Let j = -66.71 - -66. Let v = -0.22 + j. Round v to one dp.
-0.9
Let b = 0.3 - 0.8. Let z = b + 0.50000146. What is z rounded to 7 decimal places?
0.0000015
Let w = 59.7083 + 0.2717. Let u = w + 0.22. Let m = -67 + u. What is m rounded to the nearest integer?
-7
Let i be ((-2)/(-3))/((-2)/3). Let m be (10/(-6) - i)*-1005. What is m rounded to the nearest 100?
700
Suppose 0 = -5*l - s + 27, -5*s + 4 + 6 = 0. Let g be (-2)/l + 796/(-10). What is g rounded to the nearest 100?
-100
Let r = -10.8 + -2.2. Let v = r - -13.00104. What is v rounded to four decimal places?
0.001
Let v = 196755214 - 196755205.1000051. Let m = 8.9 - v. What is m rounded to six decimal places?
0.000005
Suppose -3*d + 128000 = d. Round d to the nearest ten thousand.
30000
Let g = -1.82 - 0.85. Let p = -1.892 - -0.112. Let q = g - p. What is q rounded to one dp?
-0.9
Let d = 0.5 - -2.5. Let x = -2.945 + d. Let h = x - 0.05529. Round h to 4 decimal places.
-0.0003
Let x = 165779.3681926582 + 15.2118135418. Let d = x + -165790.38. Let o = -4.2 + d. What is o rounded to six dps?
0.000006
Let w = 75.95 - 80. What is w rounded to 1 dp?
-4.1
Let b(a) = -2*a - 3. Let o be b(-3). Let w be ((-36)/(-3))/o + 2. Suppose 4*j - w*j = 180. What is j rounded to the nearest one hundred?
-100
Let q = -0.27 + 16.27. Let l = 16.00000002 - q. What is l rounded to 7 dps?
0
Let y = -2737878 - -1814438. Let q be (-23 + -1)/(6/(-30860)). Let r = y + q. Round r to the nearest one million.
-1000000
Suppose -4760 = 2*z + 2*u, 5*u = -5*z + 3*u - 11900. Round z to the nearest 1000.
-2000
Let y = 9.7247765 + -19.7247784. Let k = y - -10. What is k rounded to six decimal places?
-0.000002
Let k = 21 - 38. Let b = -16.97 - k. What is b rounded to 2 decimal places?
0.03
Let o = -10.03 + 10. 