The number of solutions of tan3x-tan2x1-tan3xtan2x-1 is

Tan3x tan2x1+tan3xtan2x=1 ⇒tan(3x 2x) = 1 ⇒tan x nbsp; =1 ⇒ x = nπ+π4 Therefore, nbsp; 2x = 2nπ+π2, 3x = 3nπ+3π4 So, nbsp;tan 2x=tan(2nπ+π2)=tan(π2) nb ...

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Byju's Answer

Standard XII

Mathematics

General Solution of Trigonometric Equation

The number of...

Question

The number of solution(s) of $\frac{tan 3 x - tan 2 x}{1 + tan 3 x tan 2 x} = 1$ is

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Solution

$\frac{tan 3 x - tan 2 x}{1 + tan 3 x tan 2 x} = 1 \Rightarrow tan (3 x - 2 x) = 1 \Rightarrow tan x = 1 \Rightarrow x = n π + \frac{π}{4}$
Therefore,
$2 x = 2 n π + \frac{π}{2}, 3 x = 3 n π + \frac{3 π}{4}$
So, $tan 2 x = tan (2 n π + \frac{π}{2}) = tan (\frac{π}{2})$
As $tan 2 x$ is not defined, so the given equation has no solution.

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The number of solution(s) of tan3x−tan2x1+tan3xtan2x=1 is

tan3x−tan2x1+tan3xtan2x=1⇒tan(3x−2x)=1⇒tanx=1⇒x=nπ+π4 Therefore, 2x=2nπ+π2, 3x=3nπ+3π4 So, tan2x=tan(2nπ+π2)=tan(π2) As tan2x is not defined, so the given equation has no solution.

The number of solution(s) of $\frac{tan 3 x - tan 2 x}{1 + tan 3 x tan 2 x} = 1$ is