You wish to estimate e^x where |x|<2. The Lagrange error terms suggests that you use a Taylor polynomial at 0 with degree n . What is the least value of n ? I know that the Mclaurin series of e^x is just 1+x+x^2/2!+... but I'm not familiar with the "Lagrange error term"

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You wish to estimate e^x where |x|<2. The Lagrange error terms suggests that you use a Taylor polynomial at 0 with degree n . What is the least value of n ? I know that the Mclaurin series of e^x is just 1+x+x^2/2!+... but I'm not familiar with the "Lagrange error term"

Mathematics
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Estimate suggests linear approximation, is there more info to the question?

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