imal places?
-0.06
Let o be (-331200)/63*150/8*280. Round o to the nearest 1000000.
-28000000
Let c = 4.6 + -9. Let j = -4.40131 - c. Round j to 4 decimal places.
-0.0013
Let x = -509.467 - -510. Let a = x - 0.533000714. Round a to 7 decimal places.
-0.0000007
Let k = 0.039 + 0.921. Let j = 1 - k. Let a = j + -0.040014. Round a to 5 decimal places.
-0.00001
Suppose -3*z + 12 + 12 = 0. Suppose -4*t = 5*s - z*t - 150016, -4*s + 120008 = -2*t. What is s rounded to the nearest 100000?
0
Let n(t) = -9*t**2 + 3*t - 90. Let h be n(10). Round h to the nearest one thousand.
-1000
Let d(k) = k**2 - 13*k + 32. Let a be d(11). Suppose -a*c + 29410084 = -10689916. Round c to the nearest one hundred thousand.
4000000
Let d be (-1 + 9)*(-92388230)/(-8). Suppose 4*c + 32703977 = 2*r - 41206625, -5*r = 5*c + d. Let g = c - -34077649. What is g rounded to the nearest 1000000?
16000000
Suppose 12*c - 175201 - 36251 = 0. Suppose 4*d + 429595 = -5*l, -d - c = -4*l + 89783. What is d rounded to the nearest 10000?
-110000
Let d = -5 - -23. Let o = 17.962 - d. What is o rounded to 2 dps?
-0.04
Let a = -6974.3319318 + 6973.96. Let v = 0.372 + a. Round v to 5 dps.
0.00007
Let q = 1.463 - -0.047. Let d = -0.141 - -0.051. Let g = d - q. Round g to 0 decimal places.
-2
Let w = 625 + -627.69. Let f = w - -0.14. Round f to 1 dp.
-2.6
Let d = 0.095 + 60.905. Let b = -60.9999882 + d. Round b to six dps.
0.000012
Suppose -3*y - 5*v + 1722316 = -12773699, y - 4*v - 4831988 = 0. Round y to the nearest 1000000.
5000000
Suppose -n + 56442 + 16629 = 0. Let u = -136071 + n. Round u to the nearest ten thousand.
-60000
Let i = 119 - 60. Let p = -51.82 + i. Let b = p - 5.8. What is b rounded to one dp?
1.4
Let a = 0.2062454 + -0.206. What is a rounded to 4 decimal places?
0.0002
Let i = -264.4558963 - -263.01591. Let d = 1.44 + i. What is d rounded to six dps?
0.000014
Let h = -2.899965 - -2.9. Round h to five decimal places.
0.00004
Let p = -4521 + 4523.269. What is p rounded to one decimal place?
2.3
Let j = -502.77 + 481.9. Round j to the nearest integer.
-21
Let o = -652.46 + 632. Let p = o + -0.54. Let a = p + 20.99999967. Round a to 7 decimal places.
-0.0000003
Let z = -932 - -847. Round z to the nearest 10.
-90
Let p = 431622.0126 + -431724. Let m = -102.15 + 0.15. Let f = p - m. Round f to 3 dps.
0.013
Let x(a) = a**2 + a + 55. Let i be x(-16). Round i to the nearest 10.
300
Suppose -y + 1388 = -307. Round y to the nearest 100.
1700
Let d = -13.937 - -14.3. Let r = -5 + 5.35. Let m = d - r. What is m rounded to three dps?
0.013
Let z = 88.3565135 + -71.556477. Let b = -16.8 + z. Round b to six decimal places.
0.000037
Suppose 3*n = -3*r - 90612, 5*n - 71761 + 222753 = 2*r. Round n to the nearest 1000.
-30000
Let s = 25922894 - 46612894. Round s to the nearest 1000000.
-21000000
Suppose -3*a = -13*a + 60. Suppose -a*i = -911 - 1189. What is i rounded to the nearest one hundred?
400
Let d = 176.91 + -176. Let g = 0.9103 - d. What is g rounded to 3 decimal places?
0
Let p = -1101.0983 - -1101. What is p rounded to 2 decimal places?
-0.1
Let o = -1576 + 1840.8. Round o to the nearest ten.
260
Let p = 350.9637 - -0.0363. Let q = 21045133555.99999783 + -21045133907. Let c = p + q. What is c rounded to seven decimal places?
-0.0000022
Let d = 2991428 - 2991451.99994. Let c = 11.9 - -12.1. Let f = d + c. Round f to 4 decimal places.
0.0001
Let n = 32.58 - 31.8. Let c = -0.31 + 0.01. Let a = n + c. What is a rounded to one decimal place?
0.5
Suppose 5*w + 22 + 3 = -k, w + 5 = k. Suppose k*r - 7*r = -1554000. Round r to the nearest 10000.
220000
Let u = 86 - -11. Let s = u + -96.935. Round s to 2 decimal places.
0.07
Let d be -1 + 5/20*4. Suppose 5*w - 8 - 2 = d, -4*w - 283992 = -4*r. Round r to the nearest ten thousand.
70000
Let f(t) = -5315*t**3 - 5*t**2 - 6*t - 5. Let v be f(5). Let h = 439535 + v. Round h to the nearest ten thousand.
-230000
Suppose -22*v - 80539419 = -5541419. Round v to the nearest one hundred thousand.
-3400000
Let w = -144.888 + 146. Let n = w - 1. What is n rounded to two dps?
0.11
Let m = -5567 - -5543.29. Let w = 24 + m. Let v = w + -0.290052. Round v to 5 decimal places.
-0.00005
Let q = -614 + 373. Let z = 274 - q. Let t = z - 515.000217. What is t rounded to 5 decimal places?
-0.00022
Let r be ((-30630)/(-7))/1 - 12/(-42). Let n = 45624 + r. Round n to the nearest 1000000.
0
Let x = -0.7389 - -76.2089. Round x to the nearest 10.
80
Let d = 832.0000889 + -832. What is d rounded to five dps?
0.00009
Suppose -742263 = t + z, -2*z + 285959 = 3*t + 2512746. Let k = t + -7757739. Round k to the nearest one million.
-9000000
Let o = 270.052 - 270. Let d = -6336.92100146 - -6336.869. Let x = d + o. Round x to 7 decimal places.
-0.0000015
Let x = -402.9631 - 0.0369. Let w = x - -403.0529. Let y = w - 0.045. What is y rounded to 3 dps?
0.008
Let i = -1306.209 - -1307. What is i rounded to one decimal place?
0.8
Let i = 143 + -227. Let v = 64 - i. Let j = 133.1 - v. Round j to the nearest integer.
-15
Let h = 28385 - -3815. Round h to the nearest 10000.
30000
Suppose -7 = -2*o + 41. Let x = o - 22. Suppose x*l - 3552652 = -2*u - 15952660, 24800020 = -4*u - 5*l. Round u to the nearest 1000000.
-6000000
Let o = -0.013 - 0.053. Let j = -0.266 - o. Round j to the nearest integer.
0
Let m = 1791.01912 - 1791. Round m to two decimal places.
0.02
Suppose -18*y + 6747906 = -12087294. Round y to the nearest one hundred thousand.
1000000
Let v(y) = 58000*y**2 - y + 1. Suppose 7 = 5*d + 2. Let t be v(d). Round t to the nearest 10000.
60000
Let f = -4.03 + 4.3304. Let k = 15 - 14.7. Let v = f - k. What is v rounded to three decimal places?
0
Let d(i) = 4344*i**3 + 13*i**2 - 10*i + 7. Let g be d(19). Suppose -2*v - 2*u = g, -5*u = -3 + 18. Round v to the nearest 1000000.
-15000000
Let u = -5.280818 - -5.28. Round u to four decimal places.
-0.0008
Let u = 287.30002187 + -287.3. Round u to six decimal places.
0.000022
Let p = -0.03813 - 0.26997. Round p to two decimal places.
-0.31
Let r = -128.00003076 + 128. Round r to 5 dps.
-0.00003
Let t = -328.00301 + 328. Round t to four dps.
-0.003
Let z = 19.100691 - 19.1. What is z rounded to three dps?
0.001
Suppose 2380 = -o + 4*j, o + 0*j + 2390 = 2*j. Let v be -9 + 0/(-2) + 3/1. Let u be (470/v)/(2/o). Round u to the nearest 10000.
90000
Let f(b) = -15 - 7 + 1 - 3*b + b**2. Let r be f(7). Round r to the nearest integer.
7
Let o = 0.08 - 0.09. Let g = 0.002 + o. Let t = g - 0.0028. Round t to 3 dps.
-0.011
Let x = -16297937.92 + 16297943.658890374. Let b = 0.261108176 + x. Let r = b + -6. What is r rounded to seven decimal places?
-0.0000015
Let h(i) = 27199*i + 5. Let o be ((3 + -4)/(4/20))/(-1). Let n be h(o). Round n to the nearest ten thousand.
140000
Let d = 0.336 - 0.484. What is d rounded to 1 decimal place?
-0.1
Let b = -14 - -19. Suppose -b*t + 6781 = 2231. What is t rounded to the nearest one hundred?
900
Let b = 0.338 + 2.132. What is b rounded to one dp?
2.5
Let z = -835 - -849.56. What is z rounded to zero dps?
15
Suppose 57*p = 65*p + 480240000. What is p rounded to the nearest 1000000?
-60000000
Let z = 4.3 + -4.45. Let m = 61.834 + -62. Let b = m - z. Round b to two dps.
-0.02
Let h = -87924 - 482076. What is h rounded to the nearest one hundred thousand?
-600000
Let q = -24.5 - -150.5. Let u = q - 73. Let p = 53.27 - u. What is p rounded to one decimal place?
0.3
Let p be 2/(12/(-20675998)) - (-33)/(-99). What is p rounded to the nearest 100000?
-3400000
Let p = -410 + 265. Let o = p + 253. Let h = o + -108.0000081. Round h to six dps.
-0.000008
Let i(c) = 328056*c - 600. Let q be i(-25). What is q rounded to the nearest one million?
-8000000
Let g = 651489.502831 - 651485.6. Let s = 3.4816 - g. Let w = 0.421 + s. What is w rounded to 5 decimal places?
-0.00023
Let i = -1.56 + 0.36. Let z = i - -2. Round z to 1 dp.
0.8
Suppose 50*c + 209635 = 45*c - 3*z, -5*z - 125765 = 3*c. What is c rounded to the nearest one thousand?
-42000
Let t(d) = 2*d**2 - 6*d - 20. Let k be t(5). Suppose k = 2*y + 470716 + 25329284. What is y rounded to the nearest 1000000?
-13000000
Let g be 389/(3/8001*-3). Let c = g - -45821. What is c rounded to the nearest 100000?
-300000
Suppose 3*q - 140713613 + 21564965 = 0. Let j = q - 56516216. 