﻿ The integral 1 0 ex2 dx cannot be evaluated by finding an antiderivative. find a lower bound for the integer n to use for the trapezoidal , 08.11.2019 05:31, venancialee8805

# The integral 1 0 ex2 dx cannot be evaluated by finding an antiderivative. find a lower bound for the integer n to use for the trapezoidal rule in order to yield an error of no more than 10−5 for the approximation of the integral. you may want to use one of the following inequalities. if f (x) = ex2, then f " (x)≤ 6e and f iv(x) ≤ 76e for 0 ≤ x ≤ 1.   ### Other questions on the subject: Mathematics Mathematics, 21.06.2019 18:20, OinkFred
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The integral 1 0 ex2 dx cannot be evaluated by finding an antiderivative. find a lower bound for the...

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