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Chapter 8: Q. 55 (page 692)

Find the Maclaurin series for the functions in Exercises 51鈥�60
by substituting into a known Maclaurin series. Also, give the
interval of convergence for the series.
$\frac{1}{8 + x^{3}}$

Short Answer

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Most popular questions from this chapter

In exercises 59-62 concern the binomial series to find the maclaurin series for the given function .

\frac{1}{(1 + x)^{2}}

In Exercises 41鈥�48 find the fourth Taylor polynomial $P_{4} (x)$ for the specified function and the given value of $x_{0}$ .

$48. \sin 3 x, \frac{蟺}{6}$

In Exercises 23鈥�32 we ask you to give Lagrange鈥檚 form for the corresponding remainder, $R_{4} (x)$

$\cos x$

In Exercises 23鈥�32 we ask you to give Lagrange鈥檚 form for the corresponding remainder, $R_{4} (x)$

$\tan^{- 1} x$

Find the interval of convergence for each power series in Exercises 21鈥�48. If the interval of convergence is finite, be sure to analyze the convergence at the endpoints.

${鈭�}_{k = 0}^{鈭�} k! x^{k}$

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Find the Maclaurin series for the functions in Exercises 51鈥�60by substituting into a known Maclaurin series. Also, give theinterval of convergence for the series.18+x3

Short Answer

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Find the Maclaurin series for the functions in Exercises 51鈥�60
by substituting into a known Maclaurin series. Also, give the
interval of convergence for the series.
$\frac{1}{8 + x^{3}}$