Evaluate the following limit: _ x 4 f(x)-f ( 4 ) x- 4 , where f(x)= 2x

_ x 4 ( 2x- 2 ( 4 ) x- 4 ) [ given f(x)= 2x ] = _ x 4 ( 2x- 2 x- 4 ) 4 - 4 0, let x- 4=y = _ y0 ( 2 (y+ 4 )-1 y ) = _ y0 ( 2+2y )-1 y = _ y0 2y-1 y =- _ y0 1- 2y y =- _ y0 2 ^2y y =-2 ( _ y0 y )^2 [ _ 0 =1 ] =-2 0 =0

Evaluate the following limit: _ x 4 f(x)-f ( 4 ) x- 4 , where f(x…

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Question

Evaluate the following limit: $\lim\limits_{\text{x}\rightarrow{\frac{\pi}{4}}}\frac{\text{f(x)}-\text{f}\big(\frac\pi4\big)}{\text{x}-\frac\pi4},$ where $\text{f(x)}=\sin2\text{x}$

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Answer

$\lim\limits_{\text{x}\rightarrow{\frac{\pi}{4}}}\Bigg(\frac{\sin2\text{x}-\sin2\big(\frac\pi4\big)}{\text{x}-\frac\pi4}\Bigg)$ $\big[\because$ given $\text{f(x)}=\sin2\text{x}\big]$ $=\lim\limits_{\text{x}\rightarrow{\frac{\pi}{4}}}\bigg(\frac{\sin2\text{x}-\sin\frac{\pi}{2}}{\text{x}-\frac\pi4}\bigg)$ $\Rightarrow\text{x}\rightarrow\frac{\pi}{4}\Rightarrow\text{x}-\frac{\pi}{4}\rightarrow0,$ let $\text{x}-\frac\pi4=\text{y}$ $=\lim\limits_{\text{y}\rightarrow{0}}\Bigg(\frac{\sin2\big(\text{y}+\frac{\pi}{4}\big)-1}{\text{y}}\Bigg)$ $=\lim\limits_{\text{y}\rightarrow{0}}\frac{\sin\big(\frac\pi2+2\text{y}\big)-1}{\text{y}}$ $=\lim\limits_{\text{y}\rightarrow{0}}\frac{\cos2\text{y}-1}{\text{y}}$ $=-\lim\limits_{\text{y}\rightarrow{0}}\frac{1-\cos2\text{y}}{\text{y}}$ $=-\lim\limits_{\text{y}\rightarrow{0}}\frac{2\sin^2\text{y}}{\text{y}}$ $=-2\Big(\lim\limits_{\text{y}\rightarrow{0}}\frac{\sin\text{y}}{\text{y}}\Big)^2\times\text{y}$ $\Big[\because\lim\limits_{\theta\rightarrow0}\frac{\sin\theta}{\theta}=1\Big]$ $=-2\times0$ $=0$

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