Math, asked by balwinderbhuller356, 5 months ago

obtain perpendicular form of equation of St. line from given values of p and alpha: p=4, alpha=45°​

Answers

Answered by Anonymous
2

Answer:Use normal form,

x Cos α + y Sin α = p .......(1)

p= 4 and α = 15⁰

Cos 15 ⁰ = Cos ( 45⁰ - 30⁰ )

=> Cos 45⁰ Cos 30⁰ + Sin45⁰ Sin30⁰

=> (1/√2) (√3/2) + (1/ √2) (1/2)

=> (√3 +1) / 2√2

Sin 15 ⁰ = √[1- Cos² 15⁰]

=> √ [ 1- (√3+1)²/〈2√2〉²]

=> √[ 1 - (3+ 1 +2√3)/8]

=> √[(8 - 4 - 2√3)/8]

=> √[ (4 - 2√3)/8]

=> √[4 -2√3] ÷ 2 √2

put Sin 15⁰ ,Cos 15⁰ , & p=4 in equation (1)

x [ Cos 15 ] + y [ Sin 15 ] = 4

x [ (√3 + 1 ) ] + y [ 4 - 2√3] = 4 * 2 √2

x [ (√ 3 + 1 ) ] + y [ 4 - 2√3 ] = 8 √ 2

Step-by-step explanation:

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