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Question -

Provethat:

sin2 2π/5– sin2 π/3 = (√5 – 1)/8



Answer -

Let us consider LHS:

sin2 2π/5 – sin2 π/3 =sin2 (π/2 – π/10) – sin2 π/3

we know, sin (90°– A) = cos A

So, sin2 (π/2 – π/10) = cos2 π/10

Sin π/3 = √3/2

Then the above equation becomes,

= Cos2 π/10 – (√3/2)2

We know, cos π/10 = √(10+2√5)/4

the above equation becomes,

= [√(10+2√5)/4]2 – 3/4

= [10 + 2√5]/16 – 3/4

= [10 + 2√5 – 12]/16

= [2√5 – 2]/16

= [√5 – 1]/8

= RHS

Hence proved.

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