8. How large should n be so that the trapezoidal and Simpson's approximations to e³t dt are within 000001 units of the actual value? 9. How large should n be to use Simpson's rule to approximate f sinx dx to within .00001 units of the actual value? If you used 10 subrectangles to approximate the value of the integral using Simpson's rule, give an upper bound for the error in the approximation.

8. How large should n be so that the trapezoidal and Simpson's approximations to e³t dt are within 000001 units of the actual value? 9. How large should n be to use Simpson's rule to approximate f sinx dx to within .00001 units of the actual value? If you used 10 subrectangles to approximate the value of the integral using Simpson's rule, give an upper bound for the error in the approximation.

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

8 only

8. How large should n be so that the trapezoidal and Simpson's approximations to fe³t dt are within
000001 units of the actual value?
9. How large should n be to use Simpson's rule to approximate f sinx dx to within .00001 units of the
actual value? If you used 10 subrectangles to approximate the value of the integral using Simpson's rule,
give an upper bound for the error in the approximation.

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