Question: Consider the integral approximation T20 of 0 to 6 2e^(-x/4)dx Find the error bound for T20 without calculating TN using the result that Error(TN )

Consider the integral approximation T20 of 0 to 6 2e^(-x/4)dx

Find the error bound for T20 without calculating TN using the result that Error(TN ) < (M(b-a)^3) / 12N^2 where M is the least upper bound for all absolute values of the second derivatives of the function 2e^(-x/4) on the interval [a,b].

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