Question #d7c72

1 Answer
Euan S.
Aug 1, 2016

0

Explanation:

#csc(x) = 1/(sin(x))#

#cot(x) = 1/(tan(x)) = (cos(x))/(sin(x))#

#1/(sin(x)) - (cos(x))/(sin(x)) = (1-cos(x))/(sin(x))#

#lim_(xrarr0)(1-cos(x))/(sin(x)) = ?#

For L'hopital's rule to be available, need limit to be of indeterminate form.

#(1-cos(0))/(sin(0)) = (1-1)/0 = 0/0#

Hence condition is satisfied. We apply L'hopital's :

#lim_(xrarr0)(d/(dx)(1-cos(x)))/(d/(dx)(sin(x))) = lim_(xrarr0) (sin(x))/(cos(x)) = (sin(0))/(cos(0)) = 0/1 = 0#

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