I have tried a lot on solving this question, but i m unable to simplify the expression.
Find the total number of solutions of $2^{\cos x}=|\sin x|$ where $x\in[-2π,5π]$.
See the answer below for the OP's thoughts.
2026-04-07 23:02:11.1775602931
Number of solutions of $2^{\cos x}=|\sin x|$
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Sorry to bother you guys I finally did it myself
The graph of 2^cosx will cut |sin x| two times in interval of π , so total solutions will be 2×(5+2)= 14.