Section 10.16 : Taylor Series
3. Find the Taylor Series for \(f\left( x \right) = {{\bf{e}}^{ - 6x}}\) about \(x = - 4\).
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Start SolutionBecause we are working about \(x = - 4\) in this problem we are not able to just use the formula derived in class for the exponential function because that requires us to be working about \(x = 0\).
Show Step 2So, we’ll need to start over from the beginning and start taking some derivatives of the function.
\[\begin{align*}{n = 0:} & & f\left( x \right) & = {{\bf{e}}^{ - 6x}}\\{n = 1:} & & f'\left( x \right) & = - 6{{\bf{e}}^{ - 6x}}\\{n = 2:} & & f''\left( x \right) & = {{\left( { - 6} \right)}^2}{{\bf{e}}^{ - 6x}}\\{n = 3:} & & {f^{\left( 3 \right)}}\left( x \right) & = {{\left( { - 6} \right)}^3}{{\bf{e}}^{ - 6x}}\\{n = 4:} & & {f^{\left( 4 \right)}}\left( x \right) & = {{\left( { - 6} \right)}^4}{{\bf{e}}^{ - 6x}}\end{align*}\]Remember that, in general, we’re going to need to go out to at least \(n = 4\) for most of these problems to make sure that we can get the formula for the general term in the Taylor Series.
Also, remember to NOT multiply things out when taking derivatives! Doing that will make your life much harder when it comes time to find the general formula.
Show Step 3It is now time to see if we can get a formula for the general term in the Taylor Series.
In this case, it is (hopefully) pretty simple to catch the pattern in the derivatives above. The general term is given by,
\[{f^{\left( n \right)}}\left( x \right) = {\left( { - 6} \right)^n}{{\bf{e}}^{ - 6x}}\,\,\,\,\,\,n = 0,1,2,3, \ldots \]As noted this formula works all the way back to \(n = 0\). It is important to make sure that you check this formula to determine just how far back it will work. We will, on occasion, get formulas that will not work for the first couple of \(n\)’s and we need to know that before we start writing down the Taylor Series.
Show Step 4Now, recall that we don’t really want the general term at any \(x\). We want the general term at \(x = - 4\). This is,
\[{f^{\left( n \right)}}\left( { - 4} \right) = {\left( { - 6} \right)^n}{{\bf{e}}^{24}}\,\,\,\,\,\,n = 0,1,2,3, \ldots \] Show Step 5Okay, at this point we can formally write down the Taylor Series for this problem.
\[{{\bf{e}}^{ - 6x}} = \sum\limits_{n = 0}^\infty {\frac{{{f^{\left( n \right)}}\left( { - 4} \right)}}{{n!}}{{\left( {x + 4} \right)}^n}} = \require{bbox} \bbox[2pt,border:1px solid black]{{\sum\limits_{n = 0}^\infty {\frac{{{{\left( { - 6} \right)}^n}{{\bf{e}}^{24}}}}{{n!}}{{\left( {x + 4} \right)}^n}} }}\]