Register
(1−cos^2 x )·(1+tan^2 x)
5.2k views
3 votes
(1−cos^2 x )·(1+tan^2 x)

User Tom Woodward
by
5.6k points

1 Answer

5 votes

Answer:


(1-cos^2 x ).(1+tan^2 x) = tan^2x

Explanation:

Given


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

Required

Solve


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

In trigonometry;


1 - cos^2x = sin^2x

So, make substitution


(1-cos^2 x ).(1+tan^2 x) becomes


(1-cos^2 x ).(1+tan^2 x) = (sin^2 x ).(1+tan^2 x)

Also; in trigonometry:


1 + tan^2x = sec^2x

Make another substitution


(1-cos^2 x ).(1+tan^2 x) = (sin^2 x ).(sec^2 x)

Recall that
secx = (1)/(cosx)

So;


(1-cos^2 x ).(1+tan^2 x) = (sin^2 x ).(sec^2 x) becomes


(1-cos^2 x ).(1+tan^2 x) = (sin^2 x ).((1)/(cos^2 x))


(1-cos^2 x ).(1+tan^2 x) = (sin^2 x )/(cos^2 x)


(1-cos^2 x ).(1+tan^2 x) = ((sin x )/(cosx))^2

In trigonometry;


tan x = (sin x)/(cos x)


(1-cos^2 x ).(1+tan^2 x) = tan^2x

The expression cannot be further simplified

User Greg Kaleka
by
5.1k points
Ask a Question
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.

5.6m questions

7.3m answers

Other Questions

What is the value of x? (-4) - x = 5
1/7 + 3/14 equivalent fractions
185g in the ratio 2:3
(3x1,000,000)+(3x100,000)+(2x100) what is this number written in standard form?
The function h = -t2 + 95 models the path of a ball thrown by a boy where h represents height, in feet, and t represents the time, in seconds, that the ball is in the air. Assuming the boy lives at sea
Link Copied!