How find this limit $lim_{xto+infty}frac{e^{-2x}(cos{x}+2sin x)+e^{-x^2}(sin{x})^2}{e^{-x}(cos{x}+sin{x})}$

Thursday, 16 October 2014

How find this limit $lim_{xto+infty}frac{e^{-2x}(cos{x}+2sin x)+e^{-x^2}(sin{x})^2}{e^{-x}(cos{x}+sin{x})}$

Find this limit.

$\lim_{x\to+\infty}\dfrac{e^{-2x}(\cos{x}+2\sin x)+e^{-x^2}(\sin{x})^2}{e^{-x}(\cos{x}+\sin{x})}$

This wolf can't have reslut. link

maybe this limit is not exsit? so how prove it?
Thank you

Answer

There are arbitrarily large $x$ at which our function is not even defined. And by taking $x$ close enough to $2n\pi+\frac{3\pi}{4}$ , we can make our function arbitrarily large positive or negative.

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Thursday, 16 October 2014

How find this limit $lim_{xto+infty}frac{e^{-2x}(cos{x}+2sin x)+e^{-x^2}(sin{x})^2}{e^{-x}(cos{x}+sin{x})}$

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real analysis - How to find $lim_{hrightarrow 0}frac{sin(ha)}{h}$

Thursday, 16 October 2014

How find this limit limxto+inftyfrace−2x(cosx+2sinx)+e−x2(sinx)2e−x(cosx+sinx)lim_{xto+infty}frac{e^{-2x}(cos{x}+2sin x)+e^{-x^2}(sin{x})^2}{e^{-x}(cos{x}+sin{x})}

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