Let f(z) = e. It can be shown by direct computation that f" (z) < 76e on the interval [0, 1]. Using this information and the appropriate error formula, how large should n be so that the Simpson's Rule approximation to fo'e dz is accurate to within 0.00001? (Your answer must be a whole number.) it n) = 19

I am having trouble with the attached calculus question and don't know how to solve it.

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Let f(x) = e*". It can be shown by direct computation that f(4 (x) < 76e on the interval [0, 1]. Using this information and the appropriate error formula, how large should n be so that the Simpson's Rule approximation to o' et dx is accurate to within 0.00001? (Your answer must be a whole number.) {\it n} = |19