36 = s, 5*s = 3*t + 20700000. What is t rounded to the nearest one million?
-7000000
Let i = -0.0702402 - -0.0703. Round i to six decimal places.
0.00006
Let t(n) be the second derivative of 287*n**4/12 + n**3/6 + 2*n**2 + 7*n. Let x be t(4). Round x to the nearest 1000.
5000
Let p = 48.768 - 48.9. What is p rounded to 2 decimal places?
-0.13
Let b(k) = -112747*k**2 - 2*k - 16. Let u be b(-2). What is u rounded to the nearest 100000?
-500000
Let f = -23429130064 + 23428544706.00007. Let l = f + 585352. Let z = 6 + l. Round z to five decimal places.
0.00007
Suppose -y = -75128295 + 18328299. Let u be 54/15 + -4 + y/(-10). Round u to the nearest one million.
-6000000
Let y = -5447790.7899045 + 5447333.79. Let c = -457 - y. What is c rounded to 5 dps?
-0.0001
Suppose 0 = -b + 53595981 - 6840826. Suppose 5244845 = 5*v - b. Round v to the nearest one million.
10000000
Let x(j) = 22*j**2 - 20*j - 10. Let i be x(16). Let r = i - 18302. Round r to the nearest ten thousand.
-10000
Suppose -4*p + 8900040 = -10*j, 2*j = 27*p - 29*p + 4449992. What is p rounded to the nearest 1000000?
2000000
Let k be (-96250)/1*7680/(-28). Suppose -7*g + 8*g = k. What is g rounded to the nearest 1000000?
26000000
Let q = -8734 + 8733.993633. What is q rounded to 3 decimal places?
-0.006
Let q = 2362 + -2323.066. Let j = 39 - q. Let a = j - 6.866. Round a to the nearest integer.
-7
Let z = -1252.51 + 1250. Round z to one decimal place.
-2.5
Let a(o) be the third derivative of 823*o**4/2 - 4*o**3/3 + 12*o**2. Let s be a(8). Round s to the nearest 10000.
80000
Suppose 4*f - l = -16, -5*f = -3*f - l + 6. Let p be (3 - 1) + 15/f. Let m be 5/((-20)/43204) - p. Round m to the nearest one thousand.
-11000
Let a = -3335.97169 + 3336. What is a rounded to three decimal places?
0.028
Let q = -99 + 84.4. Let n = q + 14.16. What is n rounded to one decimal place?
-0.4
Let y = 2645 + -2645.00001359. What is y rounded to 6 decimal places?
-0.000014
Suppose 10*x - 192764094 - 70235906 = 0. Round x to the nearest one million.
26000000
Let q = -12.005 - -12. Let o = q - 6.745. Let d = -0.35 - o. Round d to 0 dps.
6
Let d = -2.95442 - 2734.47558. Let v = d - -2737.224087. Let y = v - -0.206. Round y to 5 decimal places.
0.00009
Suppose -98 = 5*v + 2*v. Let h be 4969998/(-7) - (-4)/v. What is h rounded to the nearest one hundred thousand?
-700000
Let c = 1066 - 709. Let j = -155 + c. Let t = j + -202.99. Round t to 1 decimal place.
-1
Let n = 19926881 - -15723119. Round n to the nearest one million.
36000000
Let l = -196.156 + 196. Round l to 2 decimal places.
-0.16
Let j = -0.0516 - 0.9464. What is j rounded to one dp?
-1
Let p be (-174080)/1632*-7050*30/8. Round p to the nearest 1000000.
3000000
Let l = 0.31 + -0.3025. Let i = l - 0.02. Round i to three dps.
-0.013
Let y = 2112606808455.000000643 + -2112606807319. Let x = -1136 + y. Round x to 7 dps.
0.0000006
Let j = 1083 + -913.7. Round j to the nearest ten.
170
Let c = -13.3899952 + 13.39. What is c rounded to 6 dps?
0.000005
Let q be 8/3*(-6)/(-8). Let x be (4000/15)/(q/660). Round x to the nearest 10000.
90000
Let t = 18.2 - -56.8. Let u = t + -75.00000135. What is u rounded to 7 dps?
-0.0000014
Let v = -155.23 - -0.23. Let y = v - -70. Let l = 84.999947 + y. What is l rounded to five dps?
-0.00005
Let c = -131 + 136. Suppose 3*u = -0*a - c*a - 22200010, -5*a - 29600010 = 4*u. Round u to the nearest 1000000.
-7000000
Let o(l) = -l + 2. Let w be o(-5). Suppose -v - w = -3*s, 3*v + 9 = 5*s + 4*v. Suppose -1833 - 44767 = -s*y. What is y rounded to the nearest one thousand?
23000
Let h(q) be the third derivative of -675001*q**6/120 - q**5/20 - q**4/8 - q**3/3 - 45*q**2. Let y be h(-2). What is y rounded to the nearest 1000000?
5000000
Suppose 10 = 2*k, -2*k = -2*d + 18789760 + 610230. Round d to the nearest 1000000.
10000000
Let u(y) = 14 + 153*y**2 + 198*y**2 - 141*y**2 + 369*y**2 + 2*y. Let h be u(14). Let a = h - 57526. Round a to the nearest 10000.
60000
Suppose 5*k + 0*k = 3000000. What is k rounded to the nearest 100000?
600000
Let s = -815170 - -815243.9562. Let u = s + 19.9828. Let h = u + -94. Round h to 2 dps.
-0.06
Let m = 8453.966309 - 1276369.977609. Let i = 1267995 + m. Let k = i - 79. Round k to 3 dps.
-0.011
Let w = 44 - 47.8. Let o = 2 + w. Let d = o + 1.7974. Round d to three decimal places.
-0.003
Let i = 177 - 177.00000486. What is i rounded to 7 decimal places?
-0.0000049
Suppose 22*b + 4 = 20*b. Let p be (-200000 - (-2 - b))*(-2880)/(-20). What is p rounded to the nearest 1000000?
-29000000
Let p = 6.3869 + -6.36. What is p rounded to three decimal places?
0.027
Let k = -582766 + -180234. Round k to the nearest 100000.
-800000
Let o = -74881 - 21619. What is o rounded to the nearest 10000?
-100000
Let u = 10 - 8.7. Let w = u + -0.95. What is w rounded to 2 decimal places?
0.35
Let i be 528/14 + (-22)/(-77). Let n = 39 + i. Suppose -42 = t + 5*k, -3*t - n - 88 = 2*k. What is t rounded to the nearest ten?
-60
Suppose -3*z = 3, -4*i + 3*z - 13075 = -2*z. Round i to the nearest one thousand.
-3000
Let d = -1351235099756448 + 1351234799915681.5999919. Let m = 299840944.4 + d. Let l = 178 - m. Round l to 6 decimal places.
0.000008
Suppose -2*c - 52320 = 5*x, -130781 = 5*c + 3*x - 0*x. Suppose -2*g = -g - 12155. Let j = c + g. Round j to the nearest 1000.
-14000
Let g(c) = -25*c**2. Suppose -2*r - r = -6. Let u be g(r). Let a be 1410/(199/u + 2). Round a to the nearest 10000.
140000
Let f = -0.266 - -0.31. Let i = -0.136976 + 0.092949. Let c = f + i. What is c rounded to five dps?
-0.00003
Let k be -1 + 0 + (-180)/(-5). Suppose 4*b - v - 15 = 0, -5*b - 3*v + v = -k. Suppose -b*y + o = 3251, -5*y - o = 1755 + 1494. Round y to the nearest 100.
-700
Let m = -191.999998985 + 192. Round m to seven dps.
0.000001
Let d = -2.7 + 1.8. Let z = d - 3. Round z to the nearest integer.
-4
Let y = 0.076751 + -5.396651. Let a = 6.419725 + y. Let u = -1.1 + a. Round u to five dps.
-0.00018
Let z = -13 - -16. Let o = z - 2.9999983. Round o to six decimal places.
0.000002
Let i = -110 + 108.12. Let n = 1.8954 + i. Round n to three decimal places.
0.015
Suppose -62402 = -2*k + z, 0 = 3*k - 5*z - 46032 - 47578. What is k rounded to the nearest 1000?
31000
Suppose 0 = -3*i + 3*u - 1062, u - 6*u = 4*i + 1461. Let z = -10 + i. Round z to the nearest ten.
-370
Let z = 106 + -108. Let u be 8250001/(-5) - z/10. Round u to the nearest 1000000.
-2000000
Suppose 4*z + s = 165, -3*z - 4*s + 44 = -96. Suppose 4*k = -k - z. Let x be k - -11 - (-1306 + -1). Round x to the nearest one hundred.
1300
Let h = -30526 + 43296. What is h rounded to the nearest one hundred?
12800
Let t = -25356 + 25355.999987111. Round t to seven dps.
-0.0000129
Suppose 25*n - 21*n - 55709988 = -3*j, -3*n - 37140009 = -2*j. Round j to the nearest 1000000.
19000000
Let a = 440.5 - 623. What is a rounded to zero decimal places?
-183
Let s(w) = w**3 - w**2. Let n(j) = -242*j**3 - 11*j**2 + 4*j + 4. Let x(l) = -n(l) + 2*s(l). Let b be x(6). Round b to the nearest ten thousand.
50000
Let z(n) be the first derivative of n**4/4 + 11*n**3/3 + 8*n**2 + 26*n - 17. Let o be z(-11). Round o to the nearest 100.
-200
Let i = -1044 - -1043.998667. What is i rounded to four decimal places?
-0.0013
Let k = -4.36 + -0.2. Let l = -0.5 + 1.24. Let c = k - l. Round c to the nearest integer.
-5
Let z = 0.087206 - 1.287231. Let h = 0.13 - -1.07. Let i = h + z. Round i to five dps.
-0.00003
Let i = -671 + 451. Let x = 147 + i. Let u = 72.938 + x. What is u rounded to 2 decimal places?
-0.06
Suppose -110092488 = 2*v + 60107512. Round v to the nearest one million.
-85000000
Let t = 24.57 - -3.03. Let i = 27.777 - t. What is i rounded to 2 decimal places?
0.18
Let s = -13.85 + 14. Let k = -0.05 + s. Round k to zero decimal places.
0
Let i = -348264612 + 348264627.7000087. Let t = 18.4 - 2.7. Let j = i - t. Round j to 6 dps.
0.000009
Let w = 15 + -32. Let r = w - -20. Suppose -2*q - 276010 = 2*z, r*q - 2*z - 3*z = -413975. Round q to the nearest ten thousand.
-140000
Let s = -14033.9992307 + 14034. Round s to 5 decimal places.
0.00077
Suppose -u = 5*i - 13, u = -i + 2 - 1. Suppose -i*z = -n - 388, 2*z = 2*n - 5*n + 244. Round z to the nearest 10.
130
Let b = -836074040323274 - -836073995291680.9999993. 