(See) What is the smallest n that guarantees an error of less than 10^-4 when approximating ∫_1^2(1)/(x^2)dx with the Midpoint Rule? | E_M |≤
Question: What is the smallest n that guarantees an error of less than 10^-4 when approximating
\[\int\limits_{1}^{2}{\frac{1}{{{x}^{2}}}dx}\]with the Midpoint Rule?
\[\left| {{E}_{M}} \right|\le \frac{M{{\left( b-a \right)}^{3}}}{24{{n}^{2}}}\]
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