Advertisements
Advertisements
Question
Prove the following:
`(1 + tan θ)/sin θ + (1 + cot θ)/cos θ` = 2(sec θ + cosec θ)
Theorem
Advertisements
Solution
tan θ = `sin θ/cos θ and cot θ = cos θ/sin θ`
LHS = `(1 + sin θ/cos θ)/sin θ + (1 + cos θ/sin θ)/cos θ`
= `((cos θ + sin θ)/cos θ)/sin θ + ((sin θ + cos θ)/sin θ)/cos θ`
= `(cos θ + sin θ)/(sin θ.cos θ) + (sin θ + cos θ)/(sin θ.cos θ)`
= `((cos θ + sin θ) + (sin θ + cos θ))/(sin θ.cos θ)`
= `(2(sin θ + cos θ))/(sin θ.cos θ)`
LHS = `(2 sin θ)/(sin θ.cos θ) + (2 cos θ)/(sin θ.cos θ)`
LHS = `2/cos θ + 2/sin θ`
sec θ = `1/cos θ` and cosec θ = `1/sin θ`
LHS = 2 sec LHS = + 2 cosec θ
LHS = RHS
shaalaa.com
Is there an error in this question or solution?
Chapter 18: Trigonometric identities - Exercise 18A [Page 424]
