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Question
If f(x)=sin2x+sin2(x+π3)+cosx cos(x+π3)and g(54)=1, then (gof)(x)=
If f(x)=sin2x+sin2(x+π3)+cosx cos(x+π3)and g(54)=1, then (gof)(x)=
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Solution
The correct option is D 1
f′(x)=2 sinx cos+2 sin(x+π3)cos(x+π3)−sin x cos(x+π3)−cos x sin(x+π3)
= sin 2x+sin(2x+2π3)−sin(x+x+π3)
= 2 sin(2x+π3)cos(π3)−sin(2x+π3)=0
Since f′(x)=0 ⇒f(x)=k Where k is a constant.
And f(0)=sin20+sin2(π3)+cos 0 cos(π3)=54
Thus f(x)=54,∀xϵR.
Therefore, (gof)(x)=g[f(x)]=g(54)=1.
f′(x)=2 sinx cos+2 sin(x+π3)cos(x+π3)−sin x cos(x+π3)−cos x sin(x+π3)
= sin 2x+sin(2x+2π3)−sin(x+x+π3)
= 2 sin(2x+π3)cos(π3)−sin(2x+π3)=0
Since f′(x)=0 ⇒f(x)=k Where k is a constant.
And f(0)=sin20+sin2(π3)+cos 0 cos(π3)=54
Thus f(x)=54,∀xϵR.
Therefore, (gof)(x)=g[f(x)]=g(54)=1.
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