Question
Download Solution PDFIf b sin θ = a, then sec θ + tan θ = ?
Answer (Detailed Solution Below)
Detailed Solution
Download Solution PDFGiven:
b sin θ= a
Concept used:
sinθ = Perpendicular/ Hypotenuse
secθ = Hypotenuse/ Base
tanθ = Perpendicular/ Base
Calculation:
bsinθ = a
sinθ = a/b
So, Perpendicular = a & Hypotenuse = b
(Hypotenuse)2 = (Perpendicular)2 + (Base)2
b2 = a2+ Base2
base2 = b2- a2
\(base = {√{b^2-a^2} }\)
secθ = Hypotenuse/ base= b/\({ √{b^2-a^2} }\)
tanθ= perpendicular/ base= a/\({ √{b^2-a^2} }\)
So, secθ+ tanθ = b/\({ √{b^2-a^2} }\)+ (a/\({ √{b^2-a^2} }\))
secθ + tanθ = (b+ a)/(\({ √{b^2-a^2} }\))
∵ (b + a) = √(b + a) × √(b + a)
⇒ secθ + tanθ = \( {√{(b+a)(b+a)} }\)/ \( { √{(b-a)(b+a)} }\)
secθ+ tanθ= \(√ {\frac{{b + a}}{{b - a}}} \)
Last updated on Jun 13, 2025
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