Find the minimum value of `4^sin^(2x)+4^cos^(2x)`. – InterviewSolution

InterviewSolution

1.	Find the minimum value of `4^sin^(2x)+4^cos^(2x)`.
Answer» Using A.M `ge` G.M. we have `(4^("Sin"^(2)x) + 4^("cos"^(2)x))/(2) ge sqrt(4^("Sin"^(2)x), 4^("cos"^(2)x))` `:. 4^("sin"^(2) x) + 4^("cos"^(2) x) ge 2 sqrt(4^("sin"^(2)x + "cos"^(2)x))` `implies 4^("sin"^(2)x) + 4^("cos"^(2)x) ge 2 sqrt(4^(1))` Hence, the minimum value of `4^("sin"^(2)x) + 4^("cos"^(2)x)` is 4.

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