 rounded to three dps?
-0.001
Let c = -257 + 251.78. Let k = c - -5.21004. Let u = k - -0.01. What is u rounded to 5 dps?
0.00004
Suppose -4*m - h + 0 + 5 = 0, -5*m = 3*h - 1. Suppose 2*k + g = 3, g - 2*g = k + 1. Suppose m*x = k*x - 46000. Round x to the nearest 10000.
20000
Let z = -222 + 151. Let v = 9352989 - 9352917.99969. Let y = v + z. Round y to 4 dps.
0.0003
Suppose 5*c - 25 = 40. Let k = 18 - c. Suppose -4*p = p + k. What is p rounded to the nearest integer?
-1
Let o be 12/((-2)/(8/6)). Let r(f) = f**2 + 13*f + 11. Let v be r(o). Let g = v - -71. Round g to the nearest 10.
40
Let b(z) = -8*z + 5*z**2 + 0 - 4*z**3 + 0 + 7 - 2. Let c be b(5). What is c rounded to the nearest 100?
-400
Let c be (-1 - -7)/((-8)/(-4)). Suppose 2*n = -c*t - 5581946, 5*t = -4*n - 6177646 - 3125596. Let g = t + 3960650. What is g rounded to the nearest one million?
2000000
Let t = -13045848.100083 - -13045790.1. Let p = 62.7 - 4.7. Let d = p + t. What is d rounded to 5 decimal places?
-0.00008
Let c = 102 - 60. Let r = c + -45.4. Round r to the nearest integer.
-3
Let b = 0.01 - -5.99. Let f = b + -6.00052. Round f to four decimal places.
-0.0005
Let v = 1.11 - 1.24. Let b = 7 - 6.7. Let n = b - v. Round n to one dp.
0.4
Let i = 17.39 - 0.39. Let t = 17.000019 - i. What is t rounded to 5 dps?
0.00002
Let x be (-2 + 54/(-3))*-460000. What is x rounded to the nearest 1000000?
9000000
Let r = -127.1007 - -127.7906835. Let b = r - 0.69. What is b rounded to 6 dps?
-0.000017
Let h = 0.25 - 44.25. Let m = h + 43.9999979. What is m rounded to 6 dps?
-0.000002
Let v be (-2)/3 - (-49502)/3. Round v to the nearest one thousand.
17000
Let x = -109 - -132.6. Let t = -29 + x. Round t to the nearest integer.
-5
Let y = -23.1307 + 2.1117. Let l = y - -21. Let h = -6.919 - l. What is h rounded to the nearest integer?
-7
Suppose -s + 5 = 2. Suppose -3*r + 2*b - 2 = 0, 2*r = s*r - 3*b - 11. Let m be -2*13999994/r + 3. Round m to the nearest 1000000.
7000000
Let l = 16.7 + 0.3. Let m = -547.572 - -530.5. Let x = l + m. Round x to two decimal places.
-0.07
Let d = -4 + 4.3. Let f = -0.31 + d. Let n = f - -0.0022. What is n rounded to 3 decimal places?
-0.008
Let i = 0.25 - 1.19. Let c = 0.04 + i. Round c to the nearest integer.
-1
Let h = -0.01953 + 0.0224. What is h rounded to 4 decimal places?
0.0029
Let l(f) = 3*f + 4. Let y be l(-5). Let z be 140802/y - (-4)/22. What is z rounded to the nearest one thousand?
-13000
Suppose 2*p = 3*p + 3. Let w be 2/(-3) + 17699998/p. What is w rounded to the nearest one million?
-6000000
Suppose 0*n - 2*n = -520. Suppose -q + 68 = -2*x, x = -4*q + 6*x + n. Let u be 78000/(-1 - (-63)/q). Round u to the nearest one hundred thousand.
1600000
Let d = -0.0230182 - -0.023. Round d to 6 dps.
-0.000018
Let a = -6.758073 - -6.43529. Let x = a - -0.02278275. Let m = x - -0.3. What is m rounded to seven decimal places?
-0.0000003
Let v = 0.0682 + -0.665. Let b = v - -0.6. Round b to three decimal places.
0.003
Let t = -55 - -103. Round t to the nearest ten.
50
Let o = -23.567 + 3.679. Let c = -20 - o. Round c to two dps.
-0.11
Suppose -g + 3*g = 56. Suppose z + 22 = -4*z + 3*m, 4*z - 5*m + g = 0. Let h be ((-2010)/(-9))/(z/(-6)). Round h to the nearest one hundred.
700
Let f = 21052.540068 - 21052.9. Let i = f - -0.36. Round i to 5 dps.
0.00007
Suppose g + 1908 = 3*h, 0 = -3*h - 5*g - 723 + 2631. Let m be 2/(-7) - h/(-21). Let y be (-90)/(((-7)/m)/7). Round y to the nearest 1000.
3000
Let z = 807 - 204. Suppose 0 = -4*y + 3*f + z, 3*y - 455 = 4*f + f. Round y to the nearest 100.
200
Let o = 151.9 - 161. What is o rounded to 0 decimal places?
-9
Let c be (-72)/(-27)*3/2. Suppose 0 = t - c*w + 54000, t - 4*t - 162000 = 4*w. Round t to the nearest 10000.
-50000
Let o = -6 + 5.999923. Round o to 5 dps.
-0.00008
Let k = -351651595.69999989 - -351651598. Let g = 2.3 - k. What is g rounded to seven decimal places?
-0.0000001
Let z = 191641 - 314717. Let q = -123072.699948 - z. Let l = q - 3.3. Round l to five decimal places.
0.00005
Let k = 3 - 11. Let w = k + 3. Let s = w + 4.997. What is s rounded to three decimal places?
-0.003
Let a(m) = m + 4. Let x(t) = -t**2 + 3*t - 4. Let h be x(4). Let k be a(h). Let f be -680*(18/k - -2). Round f to the nearest one thousand.
2000
Suppose -2*y + 828 - 228 = 0. What is y rounded to the nearest ten?
300
Let i = 766 - 354. Let g = 487.8 - i. Let t = -68 + g. Round t to the nearest integer.
8
Let n = 21 + -32. Let p = -41 - n. Let v = p + 23.8. What is v rounded to the nearest integer?
-6
Let j = 0.9834 - 82.9514. Let z = -0.032 + j. Let u = z + 82.00000113. Round u to 7 dps.
0.0000011
Suppose 3*p - 10027798 = -4*z + 28890911, 4*p - 38918704 = -4*z. Let n = 249512 + -1479193. Let d = z + n. Round d to the nearest one million.
9000000
Let w = 2 + -2.071. Let p = -14.571 - w. What is p rounded to 0 decimal places?
-15
Let p = -217 + 213.54. Round p to 1 decimal place.
-3.5
Let d = -4.5 - -3.9. What is d rounded to one dp?
-0.6
Let t be 9/6*12/9. Suppose -2*c + t = -4, -5*l - 2*c - 174994 = 0. Round l to the nearest 10000.
-40000
Let d be (1 - -4) + -2 + 5. Let l = d - 6. Let i(f) = -95001*f**2 + 3*f - 2. Let k be i(l). What is k rounded to the nearest 100000?
-400000
Let t(h) = -1192*h**3 + 9*h**2 - 13*h - 4. Let j be t(4). Round j to the nearest 10000.
-80000
Let z = -0.286 - 145.714. Let k = 17 + z. Let w = -128.99999947 - k. Round w to seven decimal places.
0.0000005
Let c = 26.2518708 + 1.7480832. Let n = c + -28. Round n to 5 dps.
-0.00005
Let p(f) = -f**3 - 6*f**2 - f + 1. Let z = -1 + -5. Let u be p(z). Suppose -3*s + 778 = q, -u*q = -2*s - 3*q + 528. Round s to the nearest one hundred.
300
Let j = 30.1 + -29. Let c = -1.23 + 0.35. Let a = j + c. What is a rounded to one dp?
0.2
Let b be 0/(-1)*1/2. Let c(j) = -j**3 + j**2 + j + 1003. Let x be c(b). Let s = 403 - x. Round s to the nearest one hundred.
-600
Let r = -0.1 - -0.1. Let d = 0.024 + r. What is d rounded to 2 dps?
0.02
Let f(s) = 125067*s + 7. Let z be f(3). Suppose 3*n + 914792 = 4*n. Let q = z + n. Round q to the nearest 100000.
1300000
Suppose -2*a + 3*r = -74, 0*r + 3*r - 6 = 0. What is a rounded to the nearest one hundred?
0
Let f = -6.706 + -1.464. Let r = f - 2.53. What is r rounded to the nearest integer?
-11
Let y = -101.9999849 + 102. What is y rounded to 6 dps?
0.000015
Let p(q) = -q**3 - q**2 - 5. Let g be p(0). Let i be 5 + (g + 2 - 0). Let k be ((-560)/(-21))/(i/75000). What is k rounded to the nearest 100000?
1000000
Let g = 0.116999492 - 0.117. Round g to 7 decimal places.
-0.0000005
Let m = 76931.89994 + -76931. Let v = 0.9 - m. Round v to five decimal places.
0.00006
Let f(q) = 70000*q + 6. Let z = 10 + -3. Let y be f(z). Suppose -3*a = t + y, -2*t - 2*a = 3*t + 2450004. Round t to the nearest 100000.
-500000
Let o = 481.3025039 + -480.3325. Let h = 1.088 + -0.118. Let k = o - h. Round k to six dps.
0.000004
Let w = -2.281 + 2.3. Let n = 0.30129221 - 0.320292. Let c = w + n. Round c to 7 decimal places.
0.0000002
Let g(m) be the second derivative of 2366/3*m**3 + 2*m**2 + 0 + m. Let h be g(3). What is h rounded to the nearest 1000?
14000
Suppose 0 = -3*d + 5*d - 850. Suppose -4*h = 5*q + d, 3*q - 2*h + 202 = -31. What is q rounded to the nearest ten?
-80
Let g = 87 - 86.99999798. What is g rounded to 7 decimal places?
0.000002
Let g = 43943041.0000088 - 43943065. Let f = -7 - -31. Let d = g + f. What is d rounded to six dps?
0.000009
Let m = -50.57 + 47.5. Let o = m + -0.03. What is o rounded to zero dps?
-3
Let b = -42761.0001 + 42765. Let t = -4.05 + 0.05. Let n = t + b. What is n rounded to five dps?
-0.0001
Let c be (4 + -5)/(2/(-4)). Let s be ((-4)/(-6))/(c/(-249)). What is s rounded to the nearest ten?
-80
Let u = 22123.01 - 23625.693. Let f = u + 1502. Let c = f - -0.63. Round c to 2 dps.
-0.05
Let a(s) = -s**3 + 11*s**2 - 6*s + 6. Let i = 2 + 0. Suppose -6*u = -i*u - 28. Let p be a(u). What is p rounded to the nearest 100?
200
Let o = 0.4 + -0.39999963. What is o rounded to 7 decimal places?
0.0000004
Suppose 15 = -5*r - 0. Let t be ((-11)/r)/((-1)/(-9)). Round t to the nearest ten.
30
Let f = -1.6 + 1.19. Round f to the nearest integer.
0
Let c(g) = 1 - 38889*g**2 + 4 - 1. Let j be c(-6). Round j to the nearest one million.
