.00184
Suppose b + 14123186 + 3407829 = 3*f, -5*b + 4*f - 87655020 = 0. What is b rounded to the nearest 1000000?
-18000000
Let f = 4118.0908 + -4117. Round f to 2 decimal places.
1.09
Let d = 160956852 - 265826852. What is d rounded to the nearest one million?
-105000000
Let x = -14456 - 9313. What is x rounded to the nearest one thousand?
-24000
Let q = 42.7 - -40.81. Let r = 16.8 - 100.8. Let o = r + q. Round o to 1 dp.
-0.5
Let s be (0 - -8) + ((-20864146)/141)/(8/(-12)). Round s to the nearest one thousand.
222000
Let n = 11773113 - 11773718.99892. Let h = 606 + n. What is h rounded to 3 dps?
0.001
Let i = -30.27 - 586.33. Let g = i - -696. What is g rounded to the nearest 10?
80
Suppose -2*r + 32640000 = 6*r. Suppose -7*d = -15*d + r. Round d to the nearest one hundred thousand.
500000
Let u = -10366 - -10365.9986758. Round u to three dps.
-0.001
Let r = 236 + -282. Let m = -41963148.999994 - -41963103. Let i = m - r. Round i to five dps.
0.00001
Let v = 0.7242 + -0.383. What is v rounded to 1 decimal place?
0.3
Let s = 988.97665 - 989. Let k = 0.89 - 0.911. Let j = s - k. What is j rounded to 4 dps?
-0.0024
Suppose 8040009 = -13*o + 16*o. Let v be (-2)/4 + 60/24. Suppose 1339998 = 2*b + 4*a - v*a, 4*b - o = 3*a. Round b to the nearest 100000.
700000
Let f = -536.6 - -590. Let t = -53.39999322 + f. What is t rounded to 6 decimal places?
0.000007
Let y(o) = 17*o**2 - 13. Let v be y(7). Suppose -3*u = -2017 + v. Suppose -n - 9 = u. Round n to the nearest ten.
-410
Let t(v) = 43*v + 13. Let p be t(-19). Let r = 792 + p. What is r rounded to the nearest ten?
-10
Let b = 10291 + -10292.21546. Let f = -1.21 - b. Round f to 4 dps.
0.0055
Let v = 509 + -132. Let d = v - 376.99999815. What is d rounded to seven dps?
0.0000019
Let w = -3132827.16999676 - -3132827. Let c = 14 - 14.17. Let j = w - c. Round j to seven dps.
0.0000032
Let r = -154 - -150.39. Let s = r - -3.61387. Round s to 4 dps.
0.0039
Let y = 174 + -247. Let j = 39 + y. Let z = 34.76 + j. What is z rounded to 1 decimal place?
0.8
Suppose 3*m - q = -37011001, -3*m + 0*m - 37010997 = 3*q. Round m to the nearest 100000.
-12300000
Suppose -12298589 = 6*l - 1365467. Let b = -712187 - l. What is b rounded to the nearest one million?
1000000
Let i = -3613.46 + 3616. What is i rounded to one dp?
2.5
Let x = 93.09 + 71.85. Let k = x - 165. What is k rounded to 0 decimal places?
0
Let i = -20850.0104243 - -20850. What is i rounded to 5 decimal places?
-0.01042
Let p(y) = 2*y**2 - 9*y + 5. Let q be p(3). Let m be 13/(2*2/q). Round m to the nearest integer.
-13
Let r(c) = -107603*c + 19. Let s(i) = i**2 - 13. Let u be s(0). Let d be r(u). Suppose -5*a - d - 241142 = 0. Round a to the nearest ten thousand.
-330000
Let f = -63287.8074 + 63296. Let g = 0.075 + 8.125. Let s = g - f. Round s to 3 dps.
0.007
Let k = 368 + 74. Let m = -442.0000307 + k. Round m to 5 decimal places.
-0.00003
Let o = -48 - 205. Let m = o - -252.8088. Let b = m - -0.19. Round b to four decimal places.
-0.0012
Let x = 100.797 - -0.203. Let a = -100.9999739 + x. Round a to five dps.
0.00003
Suppose -13*l = -81 - 608. Suppose -60*b + l*b = 220500000. Round b to the nearest one million.
-32000000
Let m = 3525.2243 - 2.4243. What is m rounded to the nearest 1000?
4000
Suppose -4*m = 3*s - 106938, -m + 35646 = s - 4*m. Suppose -266584 = -4*o + 3*p, 266584 = 41*o - 37*o - 4*p. Let d = o - s. Round d to the nearest 100000.
0
Suppose 42 = -t - 2*t. Let z(y) be the third derivative of 285713*y**4/24 - 3*y**3 + 108*y**2 + y. Let h be z(t). What is h rounded to the nearest 1000000?
-4000000
Let i = -805 + 804.9493. Let q = 0.0273 - i. Round q to 2 dps.
0.08
Let y = 13503.1 + -9468.2. What is y rounded to the nearest 1000?
4000
Suppose -4*w + 6 = y - 6*w, 4*w + 8 = 0. Suppose 0*o = 2*m + o + 179199998, -y*o - 268799996 = 3*m. Round m to the nearest 1000000.
-90000000
Let n = 911 + 1772. Let o = n - 2733.405. Let y = o - -50. Round y to 2 decimal places.
-0.41
Let c = -5974 + 5974.10066. What is c rounded to two decimal places?
0.1
Let y be ((-10)/4)/(-3 + (-35)/(-14)). Suppose -41 = y*t - b, 8*t = 3*t + 4*b - 44. What is t rounded to the nearest 10?
-10
Let h = 0.105 + 0.407. Let c = -9.827343 + 9.31506. Let u = c + h. Round u to five dps.
-0.00028
Let f = 20385.0328 + -20410. Let l = 0.1272 + f. What is l rounded to 0 decimal places?
-25
Let n = 54 + -54.151. Let g = 378 - 377.716. Let y = g + n. What is y rounded to two decimal places?
0.13
Suppose 5*k + 4*q + 13381 = -12366, 0 = -4*k + 3*q - 20641. What is k rounded to the nearest 100?
-5200
Suppose -7273018 = -4*o + 7127018. Suppose 2*u = -3*m - o, 4*u + m + 5756162 = -1443841. What is u rounded to the nearest 1000000?
-2000000
Let c = -16 + -253. Let w = 25548 + -25812.46. Let t = c - w. Round t to 0 dps.
-5
Let z(c) = -9*c**2 + 65*c + 5. Let l(v) = -8*v**2 + 64*v + 5. Let a(o) = -6*l(o) + 5*z(o). Let m be a(9). Round m to the nearest 10.
-290
Let g = -18 - -14.9. Let f = 1333630 + -1333626.900124. Let c = f + g. Round c to five decimal places.
-0.00012
Let f = -1172.7 - -1172.699989037. What is f rounded to six decimal places?
-0.000011
Let i = -3.53647 + 3.747. Round i to two decimal places.
0.21
Let u = -0.33 - -0.3. Let n = 6484.42 - 6484.39000038. Let w = n + u. Round w to 7 dps.
-0.0000004
Let m = 0.5691312 + -0.571. Round m to four dps.
-0.0019
Let h = -0.503 + 0.141. Let r = h + 0.35764. Round r to four dps.
-0.0044
Let l = 0.02184 + -909.52184. What is l rounded to the nearest one hundred?
-900
Suppose u + 97 = -5. Let j = -106 - u. What is j rounded to the nearest ten?
0
Let m = -84431.553 + 84300. Let c = m + 1.153. What is c rounded to the nearest 10?
-130
Let k = 89 + 307. Let c = 393.1 - k. Round c to 0 dps.
-3
Let s = 371.8 + -372.8083. Round s to 1 dp.
-1
Let g = -0.16765 - -0.16764884961. What is g rounded to 7 decimal places?
-0.0000012
Let a = 0.144882 + 1.279508. What is a rounded to three decimal places?
1.424
Suppose -97*s + 9146000 = -80*s. What is s rounded to the nearest 1000000?
1000000
Suppose 0 = -10*o - 2*o + 72. Suppose -641568 = 5*g - o*g. Let q = -1196568 + g. Round q to the nearest 10000.
-560000
Let k = 9286.999914135 + -9287. What is k rounded to 5 decimal places?
-0.00009
Let p(a) be the first derivative of -4*a**3/3 - 7*a - 170. Let c be p(-5). What is c rounded to the nearest 100?
-100
Let n be (1 + 23401)/(6 + (-23352)/3894). Suppose -s - 3*a = n, 30375796 = 2*s - 6*s - 2*a. Let v = s - -10823949. What is v rounded to the nearest 100000?
3200000
Let i(n) = -32*n**3 - 66*n**2 + 2*n + 352. Let m be i(53). What is m rounded to the nearest one million?
-5000000
Let l = 13.1 + 147.9. Let z = -161.02929 + l. What is z rounded to 3 dps?
-0.029
Let d = 48.44790625 + -2838.44973325. Let u = d - -2790. What is u rounded to 4 dps?
-0.0018
Let w = -35641725.000304 + 35641484. Let u = w - -241. Round u to 4 decimal places.
-0.0003
Let w(u) = u**3 + 17*u**2 + 14*u + 159. Let z be w(-13). What is z rounded to the nearest one hundred?
700
Let u = -3.32 - 25.08. Let t = 0.4 + u. Let x = t + 27.99557. What is x rounded to 4 decimal places?
-0.0044
Let t = -47474 + 18474. Round t to the nearest one hundred thousand.
0
Let k = -6 - 125. Let l = 131.0535 + k. Round l to 2 decimal places.
0.05
Let r(b) = 4*b + 67. Let l be r(-16). Suppose 2*x - 3*y = -145585, -l*x = x - 3*y + 291185. Round x to the nearest ten thousand.
-70000
Let f = 3758 + -2125. Let l = -1632.99998631 + f. Round l to 7 decimal places.
0.0000137
Let t(n) = n**2 - 77*n + 8. Let p be t(34). Let r = p - -2634. Round r to the nearest 100.
1200
Let y = -553 + 553.413. Let c = 0.412999492 - y. What is c rounded to seven decimal places?
-0.0000005
Let q be 0 - (16/6)/((-4)/48). Suppose 5*h + 3*h = q. Let m be 4 + (-21880)/(-6) - h/6. Round m to the nearest 100.
3700
Let s = -1703 + 1785.3. Let m = s + -81.737. Round m to two dps.
0.56
Let h = -8547 + 8175.8. What is h rounded to the nearest 10?
-370
Let a = -233 + 340. Let l = -221.6 + 327.38. Let r = l - a. Round r to 1 dp.
-1.2
Suppose 0 = -10*n + 8*n + 48. Suppose -10*v + n*v = 7602000. What is v rounded to the nearest 10000?
540000
Let v = -10789.87 + 10711. What is v rounded to the nearest 100?
-100
Let r = -9.07 + 10.6. Let p = r - 292.53. 