Prove that sin 10^(@) " sin " 50^(@) "...

Prove that `sin 10^(@) " sin " 50^(@) " sin " 60^(@) " sin " 70^(@) = .(sqrt(3))/(16)`

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To prove that \( \sin 10^\circ \cdot \sin 50^\circ \cdot \sin 60^\circ \cdot \sin 70^\circ = \frac{\sqrt{3}}{16} \), we will follow these steps: ### Step 1: Rewrite the expression We start with the left-hand side (LHS): \[ \text{LHS} = \sin 10^\circ \cdot \sin 50^\circ \cdot \sin 60^\circ \cdot \sin 70^\circ \] ...

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Prove that sin10^(@) sin 30^(@) sin 50^(@) sin 70^(@)=1/16

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The value of sin 10^(@) sin 30^(@) sin 50^(@) sin 70^(@) is

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Prove that (i) sin 70^(@) cos 10^(@) -cos 70^(@) sin 10^(@) =(sqrt(3))/(2) (ii) cos 50^(@) cos 10^(@) -sin 50^(@) sin 10^(@) =(1)/(2) (ii) cos 80^(@) cos 20^(@) + sin 80^(@) sin 20^(@) =(1)/(2) (iv) sin 36^(@) cos 9^(@) + cos 36^(@) sin 9^(@) =(1)/(sqrt(3))

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Prove that `sin 10^(@) " sin " 50^(@) " sin " 60^(@) " sin " 70^(@) = .(sqrt(3))/(16)`

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