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Use the first five terms of the exponential series of e^x and a calculator to approximate e^0.2 to the nearest hundredth

Use the first five terms of the exponential series of e^x and a calculator to approximate e^0.2 to the nearest hundredth
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use the first five terms of the exponential series of e^x and a calculator to approximate e^0.2 to the nearest hundredth

User Stivlo
by
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1 Answer

3 votes

Solution:

Using the Maclaurin series;


e^x=1+x+(x^2)/(2!)+(x^3)/(3!)+(x^4)/(4!)+(x^5)/(5!)+...

Thus;


\begin{gathered} x=0.2; \\ \\ e^(0.2)=1+(0.2)+((0.2)^2)/(2!)+((0.2)^3)/(3!)+((0.2)^4)/(4!) \\ \\ e^(0.2)\approx1.22 \\ \end{gathered}

ANSWER: 1.22

User Cyrusmith
by
7.8k points
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