5 - -23. Let w = m + -7.9936. What is w rounded to 3 dps?
0.006
Let v = -0.35 - 13.15. What is v rounded to the nearest integer?
-14
Let k = 6 - 6.09. Let l = -65309.9099989 + 65310. Let o = k + l. Round o to six decimal places.
0.000001
Let j be -2 - 0 - -5 - -1. Suppose 2360012 = j*d - 4*k, 0*k - k = 3*d - 1769997. What is d rounded to the nearest one hundred thousand?
600000
Let x = -22.75 - -24. What is x rounded to the nearest integer?
1
Let h = 22 + -22.09. Let q = h + -0.71. Round q to one dp.
-0.8
Suppose -i + 15 = 4*i. Suppose 0*u = i*u. Suppose -3*d + u*d = 4*k + 158, -5*k = -d + 207. What is k rounded to the nearest ten?
-40
Let w = -1.8 + 11.7. Round w to the nearest integer.
10
Let g = 44.00043 + -44. What is g rounded to four decimal places?
0.0004
Let n = -13.22 + 12.1. What is n rounded to the nearest integer?
-1
Let b = -17160.95 + 17955. Let v = b + -769. Let c = v + -24. Round c to 1 decimal place.
1.1
Let t = 381.97012 - 382. Let j = 11 - 11.03. Let k = j - t. Round k to 4 dps.
-0.0001
Let d(o) = -o - 6. Let v be d(-9). Let x be (648000/(-6))/(v/20). Round x to the nearest one hundred thousand.
-700000
Let y(m) = 1032*m**3 + 3*m**2 - m + 5. Let c be y(-4). Let s = c + 9991. What is s rounded to the nearest 10000?
-60000
Let r = -139 - -49. Let p = -6147253487.99999926 - -6147253578. Let y = r + p. Round y to 7 decimal places.
0.0000007
Let x = 13.7 - 13.6919. Let u = 2 + -2.02. Let i = u + x. Round i to 3 decimal places.
-0.012
Let m = 186.29 - 190. What is m rounded to the nearest integer?
-4
Suppose -5*d - 3850000 = -2*m + m, -3*m + 11550000 = -2*d. What is m rounded to the nearest one hundred thousand?
3900000
Let i = 921889497223640358 - 921889507221832946.99999969. Let h = 9998192649 + i. Let z = h - 60. Round z to 7 dps.
0.0000003
Let g = -10.5 - -4.4. Let a = g - -8.8. Round a to zero dps.
3
Let b = 259919977 - 259919818.000069. Let m = -159 + b. Round m to five dps.
-0.00007
Let n be (-1930)/(-8) + (-1)/4. Round n to the nearest 10.
240
Let n = 51 - 50.946. Let a = n + 26.946. Let m = a - 26.999945. Round m to five dps.
0.00006
Let d = -18183338 - -18183306.363996. Let m = d - -31.536. Let w = 0.1 + m. What is w rounded to five decimal places?
0
Let a = -32.004 - -0.004. Let g = a + 12. Let y = g - -14.3. Round y to the nearest integer.
-6
Suppose x - 2697 = 5*u, -3*u + 4*x - 2531 = -923. Round u to the nearest 100.
-500
Let o be -229*(1 + 1 + -3). Suppose h + o = 49. Round h to the nearest one hundred.
-200
Let m be (-4)/(-8) - 5571/(-6). Let j be (-9)/9 - 1*m. Round j to the nearest 100.
-900
Let a = -7.15 + 4.28. Let w = -1.528 + 0.068. Let i = a - w. What is i rounded to 1 dp?
-1.4
Let l = 41 - 40.969. Let h = -28.969 - l. Let i = h - -29.33. What is i rounded to 1 dp?
0.3
Let i = -1.6 - -1.599985. What is i rounded to five dps?
-0.00002
Let i = -6.13 - 0.07. Let d = 27.7 + i. Round d to zero dps.
22
Let t = -10278.9001 - -10278. Let z = t - -0.9. What is z rounded to three decimal places?
0
Let w(f) = f. Let c be w(2). Let x be (-296)/(-104) - (-2)/13. Suppose -c*s = x*s. What is s rounded to three dps?
0
Let w = 50.5 - 0.5. Let g = -58.9 + w. Round g to zero decimal places.
-9
Let g = -555158.0118 - -555074. Let v = g + 84. What is v rounded to three decimal places?
-0.012
Let t(a) = 2*a**3 - 2*a - 1. Let n be t(2). Let z = n + -7. Let x be (28/(-6))/(z/(-150)). Round x to the nearest ten.
180
Let p = -4063491 - -4063444.9999954. Let s = p + 46. Round s to six dps.
-0.000005
Let a = -7 - -11. Let m be ((-18)/(-21))/(a/210000). What is m rounded to the nearest 10000?
50000
Suppose m + 5*l = -14, 2*l + 8 = 2*m - 0*l. Let f be m + 2 - (-7 + 5). Suppose p - 12599999 = y, f*y - y - p = -50399999. Round y to the nearest one million.
-13000000
Let w = -0.3334 + 32.7534. Let r = w - 34. Round r to 1 dp.
-1.6
Let g = -1111.4819 - -1062.48137. Let l = -49 - g. What is l rounded to 4 decimal places?
0.0005
Let j = -4.8 + 2.9. Let x = j - -1.8999983. What is x rounded to 6 dps?
-0.000002
Let c = 13.311 - 23.302. Let d = -10 - c. What is d rounded to two dps?
-0.01
Let y = -435 + 395.7. Round y to the nearest ten.
-40
Let c = 143962 - 61736. Let o(y) = -36371*y**2 + 8*y + 9. Let i be o(-7). Let z = c + i. Round z to the nearest 1000000.
-2000000
Suppose -4*h - s - 6 = 0, -4*h - 3 - 11 = 5*s. Let g be ((-25)/(-20))/(h/76). What is g rounded to the nearest 10?
-100
Let y = 1535424 + -1535463.99954. Let l = 40 + y. Round l to 4 dps.
0.0005
Suppose -5*s = -1960 - 3415. Let v = s + -145. Round v to the nearest one hundred.
900
Suppose 3*a - a = 0. Let c(p) = -p**2 + p - 23958652. Let g be c(a). Let y = g + 14258652. What is y rounded to the nearest 1000000?
-10000000
Suppose 3*x = -2 + 20. Suppose -5*r + t + 25 = 0, x*t = 4*r + 4*t - 20. Let y be -105000 + -3 + -2 + r. Round y to the nearest 10000.
-110000
Let q = 10.83 + -11.3. What is q rounded to one decimal place?
-0.5
Suppose 11*o - 41300000 = 4*o. What is o rounded to the nearest one million?
6000000
Let n = -4.582 + 3.201. Let h = n - -0.041. What is h rounded to one decimal place?
-1.3
Let j = 0.04 - 0.03999949. Round j to 7 decimal places.
0.0000005
Let d = -1454955.9099933 - -1454956. Let b = 6 - 5.91. Let i = d - b. What is i rounded to six decimal places?
0.000007
Let l be (-1 - -200)*6/(-18)*3. Round l to the nearest ten.
-200
Suppose 10*b + 7*b = 13770. What is b rounded to the nearest 100?
800
Let n = -0.212 - 90.788. Let g = n + 175. Let f = -85.18 + g. Round f to 1 dp.
-1.2
Suppose 0 = 5*r - 4*w + 1140004, 3*w + 0*w = -2*r - 455997. Round r to the nearest ten thousand.
-230000
Let b = -0.21 + 0.2. Let d = -31.26 - -31. Let h = b - d. What is h rounded to one dp?
0.3
Let v = 65.8 - 19. Let b = v - 37. What is b rounded to the nearest integer?
10
Suppose 4602 = b - c, -5*b + 11119 = 2*c - 11877. What is b rounded to the nearest one thousand?
5000
Suppose 66929 = 2*x - q - 89480, -x + 5*q + 78209 = 0. Suppose x = 2*b + 2204. Round b to the nearest ten thousand.
40000
Let d = 2.302 - 0.102. What is d rounded to zero dps?
2
Let x = 137.879 + -138. Let z = x - -0.891. Let u = z + -0.7699918. What is u rounded to six dps?
0.000008
Let d = -22 + 16. Let o be 6/36 + (-3539999)/d. What is o rounded to the nearest one hundred thousand?
600000
Let n be (-2 + 0)*3/(-2). Let k = n - 3. Suppose g - 273971 = 3*x + 296025, -3*x + 4*g - 569984 = k. Round x to the nearest one hundred thousand.
-200000
Let h = 2.045 + -2.1. Let y = 0.0648 + -0.1277. Let l = y - h. Round l to 3 decimal places.
-0.008
Let w = 0.03 + -0.63. Let j = w + 3.6. Let f = j - 1.5. What is f rounded to zero decimal places?
2
Let k(i) = 3*i - 3*i**2 + 5 - 2 - 2 - 11 + 152*i**3. Let q be k(7). Round q to the nearest ten thousand.
50000
Let q = 0.09 + 0.15. Let s = q - 3.34. Round s to the nearest integer.
-3
Let p = 1914780 - 4924780. Round p to the nearest 100000.
-3000000
Let i = -1420.90949975 - -1436.9095. Let o = i + -16. What is o rounded to 7 dps?
0.0000003
Let d = -21 + 4. Let b = d - -17.0019. What is b rounded to 3 dps?
0.002
Let g(l) = -801*l - 7. Let u(h) = 801*h + 8. Let d(k) = 7*g(k) + 6*u(k). Let z be d(-1). Round z to the nearest 100.
800
Suppose -4*n + 33 = 5*l, -n + 2*l + 12 = 4*l. Let u(r) = -4 + n + 341844*r - 61845*r. Let s be u(-2). Round s to the nearest one hundred thousand.
-600000
Suppose 5*h - 2*s - 41194 = 0, -15 = -5*s - 0*s. Suppose -3*i - i = -h. Round i to the nearest one hundred.
2100
Suppose -2*y = -b + 3*y + 21990, 5*b + 4*y = 110008. Suppose -h - b = 3*h. Round h to the nearest one thousand.
-6000
Let j = -0.1 - 12.9. Let n = j - -21. Let q = 8.0000096 - n. What is q rounded to 6 dps?
0.00001
Let j = 3.2 + -1.3. Let a = j - -53.1. Let m = -54.47 + a. Round m to 1 decimal place.
0.5
Let q = 109.3 + -103. Let g = 1.3 - q. Let o = g + 5.0000005. What is o rounded to 7 dps?
0.0000005
Let z be (-12)/15*74875/(-10). Let t = -3290 + z. Round t to the nearest one thousand.
3000
Let x = -18813783.91 + 25414.91. Let n = x + 18788371.99999984. Let z = n - 3. Round z to seven decimal places.
-0.0000002
Let h(l) = -l**3 + 2*l**2 - 2. Let o be h(2). Let d be (0 + 750/3)*o. Round d to the nearest 1000.
-1000
Let o = 79099175.075758 - 79099023. Let z = o + -0.086858. Let v = -152 + z. 