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Question
Find the absolute maximum value of f(x) = cos x + sin2 x, x ∈ [0, π].
Sum
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Solution
f(x) = cos x + sin2 x
f'(x) = –sinx + 2sinx·cosx
f'(x) = 0
–sinx + 2sinx·cosx = 0
sinx (2cosx – 1) = 0
sin x = 0 or 2cos x = +1
x = 0 or cos x = `1/2`
x = π or x = `pi/3`
f(x) = cos x + sin2 x
f(0) = cos 0 + sin2 0
= 1 + 0
= 1
`f(pi/3)=cospi/3+sin^2pi/3`
= `1/2+(sqrt3/2)^2`
= `1/2+3/4`
= `5/4`
f(π) = cosπ + sin2π
= –1 + (0)2
= 1
∴ The absolute maximum value is `5/4`.
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