2tan x/1+tan2 x= sin(2x)

Starting with the left side of the equation, we have:

2tan x / (1 + tan^2 x)

Using the identity tan^2 x = 1 - cos^2 x, we can rewrite the denominator as:

2tan x / (1 + (1 - cos^2 x))

Simplifying further:

2tan x / (2 - cos^2 x)

Next, we can use the identity 1 - cos^2 x = sin^2 x to rewrite the denominator again:

2tan x / (2 - sin^2 x)

Now, let's focus on the right side of the equation:

sin(2x)

Using the double angle identity for sine, we have:

2sin x cos x

We can rewrite this as:

2sin x (1 - sin^2 x)

Now, equating the left and right sides of the equation:

2tan x / (2 - sin^2 x) = 2sin x (1 - sin^2 x)

Cross-multiplying:

2tan x (1 - sin^2 x) = 2sin x (2 - sin^2 x)

Expanding both sides:

2tan x - 2tan x sin^2 x = 4sin x - 2sin^3 x

Adding 2tan x sin^2 x to both sides:

2tan x = 4sin x - 2sin^3 x + 2tan x sin^2 x

Rearranging terms:

2tan x - 2tan x sin^2 x - 4sin x + 2sin^3 x = 0

Factoring out a common factor of 2sin x:

2sin x (tan x - tan x sin^2 x - 2 + sin^2 x) = 0

Taking out a common factor of sin x from the second term in parentheses:

2sin x (tan x - tan x sin^2 x - 2 + sin^2 x) = 0

Simplifying the second term:

2sin x (tan x - tan x sin^2 x - 2 + sin^2 x) = 0

2sin x (tan x - 3tan x sin^2 x - 2) = 0

Now, we can set each factor equal to zero:

sin x = 0 or (tan x - 3tan x sin^2 x - 2) = 0

The equation sin x = 0 has solutions x = 0, π, 2π, etc., which are the x-intercepts of the sine function.

To solve the second factor:

tan x - 3tan x sin^2 x - 2 = 0

We can factor out a common factor of tan x:

(tan x)(1 - 3sin^2 x) - 2 = 0

Now, we can use the identity sin^2 x = 1 - cos^2 x to substitute for sin^2 x:

(tan x)(1 - 3(1 - cos^2 x)) - 2 = 0

Simplifying:

(tan x)(1 - 3 + 3cos^2 x) - 2 = 0

(tan x)(-2 + 3cos^2 x) - 2 = 0

Expanding:

-2tan x + 3tan x cos^2 x - 2 = 0

Rearranging terms:

-2tan x + 3tan x cos^2 x = 2

Factoring out a common factor of tan x:

tan x (-2 + 3cos^2 x) = 2

Now, we can divide both sides by (-2 + 3cos^2 x):

tan x = 2 / (-2 + 3cos^2 x)

Therefore, the solutions to the equation tan x - 3tan x sin^2 x - 2 = 0 are x values such that:

1) sin x = 0 (x = 0, π, 2π, etc.)

2) tan x = 2 / (-2 + 3cos^2 x)

These are the solutions to the original equation 2tan x / (1 + tan^2 x) = sin(2x).