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Calculus
Applications of Derivatives
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Use Newton's method to find the first 5 approximations of the solution to the equation \(\displaystyle e^{- x}= \frac{116 x^{3}}{125} - 6\) using \(\displaystyle x_0=1\).

Using the formula for Newton's method gives \begin{equation*}x_{n+1} = x_{n} - \frac{- \frac{116 x_{n}^{3}}{125} + 6 + e^{- x_{n}}}{- \frac{348 x_{n}^{2}}{125} - e^{- x_{n}}} \end{equation*} Using \(\displaystyle x_0 = 1\) and \(\displaystyle n = 0,1,2,3,\) and \(\displaystyle 4\) gives: \begin{equation*}x_{1} = (1.0000000000) - \frac{- \frac{116 (1.0000000000)^{3}}{125} + 6 + e^{- (1.0000000000)}}{- \frac{348 (1.0000000000)^{2}}{125} - e^{- (1.0000000000)}} = 2.7259160900\end{equation*} \begin{equation*}x_{2} = (2.7259160900) - \frac{- \frac{116 (2.7259160900)^{3}}{125} + 6 + e^{- (2.7259160900)}}{- \frac{348 (2.7259160900)^{2}}{125} - e^{- (2.7259160900)}} = 2.1124244927\end{equation*} \begin{equation*}x_{3} = (2.1124244927) - \frac{- \frac{116 (2.1124244927)^{3}}{125} + 6 + e^{- (2.1124244927)}}{- \frac{348 (2.1124244927)^{2}}{125} - e^{- (2.1124244927)}} = 1.9030263939\end{equation*} \begin{equation*}x_{4} = (1.9030263939) - \frac{- \frac{116 (1.9030263939)^{3}}{125} + 6 + e^{- (1.9030263939)}}{- \frac{348 (1.9030263939)^{2}}{125} - e^{- (1.9030263939)}} = 1.8789339106\end{equation*} \begin{equation*}x_{5} = (1.8789339106) - \frac{- \frac{116 (1.8789339106)^{3}}{125} + 6 + e^{- (1.8789339106)}}{- \frac{348 (1.8789339106)^{2}}{125} - e^{- (1.8789339106)}} = 1.8786314848\end{equation*}

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\begin{question}Use Newton's method to find the first 5 approximations of the solution to the equation $e^{- x}= \frac{116 x^{3}}{125} - 6$ using $x_0=1$. 
    \soln{9cm}{Using the formula for Newton's method gives
\begin{equation*}x_{n+1} =  x_{n} - \frac{- \frac{116 x_{n}^{3}}{125} + 6 + e^{- x_{n}}}{- \frac{348 x_{n}^{2}}{125} - e^{- x_{n}}}  \end{equation*}
Using $x_0 = 1$ and $n = 0,1,2,3,$ and $4$ gives:
\begin{equation*}x_{1} =  (1.0000000000) - \frac{- \frac{116 (1.0000000000)^{3}}{125} + 6 + e^{- (1.0000000000)}}{- \frac{348 (1.0000000000)^{2}}{125} - e^{- (1.0000000000)}} = 2.7259160900\end{equation*}
\begin{equation*}x_{2} =  (2.7259160900) - \frac{- \frac{116 (2.7259160900)^{3}}{125} + 6 + e^{- (2.7259160900)}}{- \frac{348 (2.7259160900)^{2}}{125} - e^{- (2.7259160900)}} = 2.1124244927\end{equation*}
\begin{equation*}x_{3} =  (2.1124244927) - \frac{- \frac{116 (2.1124244927)^{3}}{125} + 6 + e^{- (2.1124244927)}}{- \frac{348 (2.1124244927)^{2}}{125} - e^{- (2.1124244927)}} = 1.9030263939\end{equation*}
\begin{equation*}x_{4} =  (1.9030263939) - \frac{- \frac{116 (1.9030263939)^{3}}{125} + 6 + e^{- (1.9030263939)}}{- \frac{348 (1.9030263939)^{2}}{125} - e^{- (1.9030263939)}} = 1.8789339106\end{equation*}
\begin{equation*}x_{5} =  (1.8789339106) - \frac{- \frac{116 (1.8789339106)^{3}}{125} + 6 + e^{- (1.8789339106)}}{- \frac{348 (1.8789339106)^{2}}{125} - e^{- (1.8789339106)}} = 1.8786314848\end{equation*}
}

\end{question}

Download Question and Solution Environment\(\LaTeX\)
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HTML for Canvas 
<p> <p>Use Newton's method to find the first 5 approximations of the solution to the equation  <img class="equation_image" title=" \displaystyle e^{- x}= \frac{116 x^{3}}{125} - 6 " src="/equation_images/%20%5Cdisplaystyle%20e%5E%7B-%20x%7D%3D%20%5Cfrac%7B116%20x%5E%7B3%7D%7D%7B125%7D%20-%206%20" alt="LaTeX:  \displaystyle e^{- x}= \frac{116 x^{3}}{125} - 6 " data-equation-content=" \displaystyle e^{- x}= \frac{116 x^{3}}{125} - 6 " />  using  <img class="equation_image" title=" \displaystyle x_0=1 " src="/equation_images/%20%5Cdisplaystyle%20x_0%3D1%20" alt="LaTeX:  \displaystyle x_0=1 " data-equation-content=" \displaystyle x_0=1 " /> . </p> </p>
HTML for Canvas
<p> <p>Using the formula for Newton's method gives
 <img class="equation_image" title=" x_{n+1} =  x_{n} - \frac{- \frac{116 x_{n}^{3}}{125} + 6 + e^{- x_{n}}}{- \frac{348 x_{n}^{2}}{125} - e^{- x_{n}}}   " src="/equation_images/%20x_%7Bn%2B1%7D%20%3D%20%20x_%7Bn%7D%20-%20%5Cfrac%7B-%20%5Cfrac%7B116%20x_%7Bn%7D%5E%7B3%7D%7D%7B125%7D%20%2B%206%20%2B%20e%5E%7B-%20x_%7Bn%7D%7D%7D%7B-%20%5Cfrac%7B348%20x_%7Bn%7D%5E%7B2%7D%7D%7B125%7D%20-%20e%5E%7B-%20x_%7Bn%7D%7D%7D%20%20%20" alt="LaTeX:  x_{n+1} =  x_{n} - \frac{- \frac{116 x_{n}^{3}}{125} + 6 + e^{- x_{n}}}{- \frac{348 x_{n}^{2}}{125} - e^{- x_{n}}}   " data-equation-content=" x_{n+1} =  x_{n} - \frac{- \frac{116 x_{n}^{3}}{125} + 6 + e^{- x_{n}}}{- \frac{348 x_{n}^{2}}{125} - e^{- x_{n}}}   " /> 
Using  <img class="equation_image" title=" \displaystyle x_0 = 1 " src="/equation_images/%20%5Cdisplaystyle%20x_0%20%3D%201%20" alt="LaTeX:  \displaystyle x_0 = 1 " data-equation-content=" \displaystyle x_0 = 1 " />  and  <img class="equation_image" title=" \displaystyle n = 0,1,2,3, " src="/equation_images/%20%5Cdisplaystyle%20n%20%3D%200%2C1%2C2%2C3%2C%20" alt="LaTeX:  \displaystyle n = 0,1,2,3, " data-equation-content=" \displaystyle n = 0,1,2,3, " />  and  <img class="equation_image" title=" \displaystyle 4 " src="/equation_images/%20%5Cdisplaystyle%204%20" alt="LaTeX:  \displaystyle 4 " data-equation-content=" \displaystyle 4 " />  gives:
 <img class="equation_image" title=" x_{1} =  (1.0000000000) - \frac{- \frac{116 (1.0000000000)^{3}}{125} + 6 + e^{- (1.0000000000)}}{- \frac{348 (1.0000000000)^{2}}{125} - e^{- (1.0000000000)}} = 2.7259160900 " src="/equation_images/%20x_%7B1%7D%20%3D%20%20%281.0000000000%29%20-%20%5Cfrac%7B-%20%5Cfrac%7B116%20%281.0000000000%29%5E%7B3%7D%7D%7B125%7D%20%2B%206%20%2B%20e%5E%7B-%20%281.0000000000%29%7D%7D%7B-%20%5Cfrac%7B348%20%281.0000000000%29%5E%7B2%7D%7D%7B125%7D%20-%20e%5E%7B-%20%281.0000000000%29%7D%7D%20%3D%202.7259160900%20" alt="LaTeX:  x_{1} =  (1.0000000000) - \frac{- \frac{116 (1.0000000000)^{3}}{125} + 6 + e^{- (1.0000000000)}}{- \frac{348 (1.0000000000)^{2}}{125} - e^{- (1.0000000000)}} = 2.7259160900 " data-equation-content=" x_{1} =  (1.0000000000) - \frac{- \frac{116 (1.0000000000)^{3}}{125} + 6 + e^{- (1.0000000000)}}{- \frac{348 (1.0000000000)^{2}}{125} - e^{- (1.0000000000)}} = 2.7259160900 " /> 
 <img class="equation_image" title=" x_{2} =  (2.7259160900) - \frac{- \frac{116 (2.7259160900)^{3}}{125} + 6 + e^{- (2.7259160900)}}{- \frac{348 (2.7259160900)^{2}}{125} - e^{- (2.7259160900)}} = 2.1124244927 " src="/equation_images/%20x_%7B2%7D%20%3D%20%20%282.7259160900%29%20-%20%5Cfrac%7B-%20%5Cfrac%7B116%20%282.7259160900%29%5E%7B3%7D%7D%7B125%7D%20%2B%206%20%2B%20e%5E%7B-%20%282.7259160900%29%7D%7D%7B-%20%5Cfrac%7B348%20%282.7259160900%29%5E%7B2%7D%7D%7B125%7D%20-%20e%5E%7B-%20%282.7259160900%29%7D%7D%20%3D%202.1124244927%20" alt="LaTeX:  x_{2} =  (2.7259160900) - \frac{- \frac{116 (2.7259160900)^{3}}{125} + 6 + e^{- (2.7259160900)}}{- \frac{348 (2.7259160900)^{2}}{125} - e^{- (2.7259160900)}} = 2.1124244927 " data-equation-content=" x_{2} =  (2.7259160900) - \frac{- \frac{116 (2.7259160900)^{3}}{125} + 6 + e^{- (2.7259160900)}}{- \frac{348 (2.7259160900)^{2}}{125} - e^{- (2.7259160900)}} = 2.1124244927 " /> 
 <img class="equation_image" title=" x_{3} =  (2.1124244927) - \frac{- \frac{116 (2.1124244927)^{3}}{125} + 6 + e^{- (2.1124244927)}}{- \frac{348 (2.1124244927)^{2}}{125} - e^{- (2.1124244927)}} = 1.9030263939 " src="/equation_images/%20x_%7B3%7D%20%3D%20%20%282.1124244927%29%20-%20%5Cfrac%7B-%20%5Cfrac%7B116%20%282.1124244927%29%5E%7B3%7D%7D%7B125%7D%20%2B%206%20%2B%20e%5E%7B-%20%282.1124244927%29%7D%7D%7B-%20%5Cfrac%7B348%20%282.1124244927%29%5E%7B2%7D%7D%7B125%7D%20-%20e%5E%7B-%20%282.1124244927%29%7D%7D%20%3D%201.9030263939%20" alt="LaTeX:  x_{3} =  (2.1124244927) - \frac{- \frac{116 (2.1124244927)^{3}}{125} + 6 + e^{- (2.1124244927)}}{- \frac{348 (2.1124244927)^{2}}{125} - e^{- (2.1124244927)}} = 1.9030263939 " data-equation-content=" x_{3} =  (2.1124244927) - \frac{- \frac{116 (2.1124244927)^{3}}{125} + 6 + e^{- (2.1124244927)}}{- \frac{348 (2.1124244927)^{2}}{125} - e^{- (2.1124244927)}} = 1.9030263939 " /> 
 <img class="equation_image" title=" x_{4} =  (1.9030263939) - \frac{- \frac{116 (1.9030263939)^{3}}{125} + 6 + e^{- (1.9030263939)}}{- \frac{348 (1.9030263939)^{2}}{125} - e^{- (1.9030263939)}} = 1.8789339106 " src="/equation_images/%20x_%7B4%7D%20%3D%20%20%281.9030263939%29%20-%20%5Cfrac%7B-%20%5Cfrac%7B116%20%281.9030263939%29%5E%7B3%7D%7D%7B125%7D%20%2B%206%20%2B%20e%5E%7B-%20%281.9030263939%29%7D%7D%7B-%20%5Cfrac%7B348%20%281.9030263939%29%5E%7B2%7D%7D%7B125%7D%20-%20e%5E%7B-%20%281.9030263939%29%7D%7D%20%3D%201.8789339106%20" alt="LaTeX:  x_{4} =  (1.9030263939) - \frac{- \frac{116 (1.9030263939)^{3}}{125} + 6 + e^{- (1.9030263939)}}{- \frac{348 (1.9030263939)^{2}}{125} - e^{- (1.9030263939)}} = 1.8789339106 " data-equation-content=" x_{4} =  (1.9030263939) - \frac{- \frac{116 (1.9030263939)^{3}}{125} + 6 + e^{- (1.9030263939)}}{- \frac{348 (1.9030263939)^{2}}{125} - e^{- (1.9030263939)}} = 1.8789339106 " /> 
 <img class="equation_image" title=" x_{5} =  (1.8789339106) - \frac{- \frac{116 (1.8789339106)^{3}}{125} + 6 + e^{- (1.8789339106)}}{- \frac{348 (1.8789339106)^{2}}{125} - e^{- (1.8789339106)}} = 1.8786314848 " src="/equation_images/%20x_%7B5%7D%20%3D%20%20%281.8789339106%29%20-%20%5Cfrac%7B-%20%5Cfrac%7B116%20%281.8789339106%29%5E%7B3%7D%7D%7B125%7D%20%2B%206%20%2B%20e%5E%7B-%20%281.8789339106%29%7D%7D%7B-%20%5Cfrac%7B348%20%281.8789339106%29%5E%7B2%7D%7D%7B125%7D%20-%20e%5E%7B-%20%281.8789339106%29%7D%7D%20%3D%201.8786314848%20" alt="LaTeX:  x_{5} =  (1.8789339106) - \frac{- \frac{116 (1.8789339106)^{3}}{125} + 6 + e^{- (1.8789339106)}}{- \frac{348 (1.8789339106)^{2}}{125} - e^{- (1.8789339106)}} = 1.8786314848 " data-equation-content=" x_{5} =  (1.8789339106) - \frac{- \frac{116 (1.8789339106)^{3}}{125} + 6 + e^{- (1.8789339106)}}{- \frac{348 (1.8789339106)^{2}}{125} - e^{- (1.8789339106)}} = 1.8786314848 " /> 
</p> </p>