The general solution of the equation tan5θ=cot3θ is given by
A
θ=nπ8−π16,n∈Z.
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B
θ=nπ8+π16,n∈Z.
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C
θ=nπ8+π8,n∈Z.
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D
θ=nπ8−π8,n∈Z.
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Solution
The correct option is B θ=nπ8+π16,n∈Z. Here, we can write the equation as: tan5θ=cot3θ⇒tan5θ=tan(π2−3θ)⇒5θ=nπ+π2−3θ,n∈Z⇒8θ=nπ+π2,n∈Z⇒θ=nπ8+π16,n∈Z Thus, Option b is correct.