Compute trigonometric limit without use of de L'Hospital's rule <munder> <mo movablelimits

antennense

antennense

Answered question

2022-07-05

Compute trigonometric limit without use of de L'Hospital's rule
lim x 0 ( x + c ) sin ( x 2 ) 1 cos ( x ) , c R +

Answer & Explanation

Zackery Harvey

Zackery Harvey

Beginner2022-07-06Added 21 answers

We can solve in two steps fistly multipling both sides to x 2 and then to 1 + cos ( x ) and consider the fact lim x 0 sin ( x 2 ) x 2 = 1 we will get
lim x 0 ( x + c ) sin ( x 2 ) 1 cos ( x ) = lim x 0 ( x + c ) x 2 ( 1 cos ( x ) ) sin ( x 2 ) x 2 = = lim x 0 ( x + c ) x 2 ( 1 cos ( x ) ) ( 1 + cos ( x ) ) ( 1 + cos ( x ) ) = lim x 0 ( x + c ) x 2 1 cos 2 ( x ) ( 1 + cos ( x ) ) = lim x 0 ( x + c ) x 2 sin 2 ( x ) ( 1 + cos ( x ) ) = lim x 0 ( x + c ) ( 1 + cos ( x ) ) = 2 c

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