The set of values of x for which tan3x−tan2x1+tan3x⋅tan2x=1 is (where n∈Z)
A
{nπ+π4}
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B
{nπ+π6}
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C
{nπ+π3}
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D
ϕ
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Solution
The correct option is Dϕ We have, tan3x−tan2x1+tan3x.⋅tan2x=1⇒tan(3x−2x)=1⇒tanx=1 ⇒tanx=tanπ4⇒x=nπ+π4,n∈Z
But for this value of x, tan 2x is not defined.
Hence the solution set for x is ϕ.