How do you find the limit of $(sin(7 x)) / (tan(4 x))$ as x approaches 0?

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How do you find the limit of $(sin(7 x)) / (tan(4 x))$ as x approaches 0?

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Answer 1 · 2016-03-03T19:10:58

7/4

Explanation:

Let $f(x)=sin(7x)/tan(4x)$

$implies f(x)=sin(7x)/(sin(4x)/cos(4x))$

$implies f(x)=sin(7x)/sin(4x)*cos(4x)$

$implies f'(x)=lim_(x to 0){sin(7x)/sin(4x)*cos(4x)}$

$implies f'(x)=lim_(x to 0){(7*sin(7x)/(7x))/(4*sin(4x)/(4x))*cos(4x)}$

$implies f'(x)=7/4lim_(x to 0){(sin(7x)/(7x))/(sin(4x)/(4x))*cos(4x)}=7/4{lim_(x to 0)sin(7x)/(7x))/(lim_(x to 0)sin(4x)/(4x))*lim_(x to 0)cos(4x)=7/4*1/1*cos(4*0)=7/4*cos0=7/4*1=7/4$

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How do you find the limit of $(sin(7 x)) / (tan(4 x))$ as x approaches 0?

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How do you find the limit of (sin(7 x)) / (tan(4 x))(sin(7 x)) / (tan(4 x)) as x approaches 0?

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How do you find the limit of $(sin(7 x)) / (tan(4 x))$ as x approaches 0?