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Trigonometric Identity Involving Secant And Tangent

Introduction to Trigonometry II - Concepts

Trigonometric ratios of Complementary Angles

Trigonometric Identity Involving Sine And Cosine

Trigonometric Identity Involving Secant And Tangent

Trigonometric Identity Involving Cosecant And Cotangent

Trigonometric Identities

Class - 10th CBSE Subjects

Concept Explanation

Trigonometric Identity Involving Secant And Tangent

Trigonometric Identities: The trigonometric identities are equalities which are true for every value appearing on both sides of the equal sign An equation involving trigonometric ratios of an angle is called a trigonometric identity, if it is true for all values of the angle(s) involved. These identities are useful whenever expressions involving trigonometric ratios are to be simplified.

Trigonometric Identity Involving Secant And Tangent: The identity can be expressed as

$sec^2;theta - tan^2;theta = 1$

Let us try to prove these identities and use it further to simplify the various trigonometric expressions

In $large Delta ABC$ , right -angled at B according to the pythagoras theorem we have

$AB^{2}+BC^{2}=AC^{2}$ (1)

Proof For The Identity: Let us now divide (1) by $large AB^{2}$ . We get

$frac{AB^{2}}{AB^{2}}+frac{BC^{2}}{AB^{2}}=frac{AC^{2}}{AB^{2}}$

or, $left (frac{AB}{AB} right)^{2}+left (frac{BC}{AB} right)^{2}=left (frac{AC}{AB} right)^{2}$

i.e., $(1)^{2}+(tan ;A)^{2}= (sec;A)^2$

i.e., $sec^{2}A-tan^{2}A=1$

This is true for all A such that $0^{circ}leq Aleq 90^{circ}$ . So, this is a trigonometric identity.

Illustration: Simplify the expression:

$frac{sin Theta -2 sin^3Theta }{2 cos^3Theta -cos Theta }$

Solution: We will simplify the expression using trigonometric Identites

$frac{sin Theta -2 sin^3Theta }{2 cos ^3Theta -cos Theta }$ = $frac{sin Theta (1-2 sin^2Theta )}{cos Theta (2 cos ^2Theta -1)}$

$=tan;Theta left (frac{1-2(1-cos^2Theta )}{2 cos^2Theta -1} right)$

$=tan;Theta left (frac{1-2 +2cos^2Theta )}{2 cos^2Theta -1} right)$

$=tan Theta left (frac{2 cos^2Theta -1}{2 cos^2Theta -1} right)$

$=tan Theta$

We have, $sec^2; A =1 ; + ; tan^2 ; A =1;+; frac {1}{cot^2; A} = frac {1 +cot^2 ; A}{cot^2;A}$

$Rightarrow ;;;;; sec ; A =frac {sqrt {1+cot^2 ; A}}{cot ; A}$

Sample Questions

(More Questions for each concept available in Login)

Question : 1

$1 + tan^2;theta =$
A. $cosec^2Theta$	B. $sec^2Theta$	C. $sin^2;theta$	D. $tan;theta$
Right Option : B
View Explanation

Chapters

Polynomial I

Polynomials II

Pair of Linear Equations I

Pair of Linear Equations II

Real Numbers I

Real Numbers II

Coordinate Geometry I

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Introduction to Trigonometry I

Introduction to Trigonometry II

Surface Area and Volume I

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Areas Related to Circles

Some Applications of Trigonometry

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