Math, asked by kasinipooja2004, 10 months ago

if cosec A+cot A =K ,then prove that cos A k²-1/K²+1

Answers

Answered by PixleyPanda

2

Answer:

Step-by-step explanation:

cosec β + cot β = k

⇒1/sin β + cos β/sin β = k

⇒(1 + cos β) / sin β = k

⇒(1 + cos β) / √(1 - cos² β) = k

⇒(1 + cos β) / √(1 + cos β)(1 - cos β)= k

⇒√[(1 + cos β) / (1 - cos β)] = k

⇒(1 + cos β) / (1 - cos β) = k²/1

⇒[(1 + cos β) - (1 - cos β) ]/[(1 - cos β) + (1 + cos β) ] = (k²-1)/(k²+1)

(using the formula if \frac{a}{b} = \frac{c}{d}

then \frac{a-b}{a+b} = \frac{c-d}{c+d} )

⇒(2 cos β)/ 2 = (k²-1)/(k²+1)

⇒cos β = (k²-1)/(k²+1)

hope it helps

:)

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