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in Mathematical Logic
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$\lim_{x\rightarrow infinity } \frac{x+sinx}{x}$
in Mathematical Logic
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$\large lim_{x \rightarrow \infty}\; \frac{x + \sin\;x}{x} = 1 + lim_{x \rightarrow \infty}\;\frac{\sin\;x}{x}$

$\large lim_{x \rightarrow \infty}\;\frac{\sin\;x}{x} = 0$

So, $\large lim_{x \rightarrow \infty}\; \frac{x + \sin\;x}{x} = 1 +0 = 1$
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limx->infinity 1 +limx->infinitysinx/x   (by property lim(f+g)=limf+limg)

1+0  (since on putting infinity in numerator we get any finite number and putting in denominator we get infinity and dividing finite with infinite we get 0)

hence answer is 1

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it will give infinity by infinity which is a indertimnant form so aplly l hospital rule we will get

lim x→infinity 1 = 1          -----answer is 1
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