Solveeit Logo
Login

Question

Question: Prove that: \(2\sin \left( \dfrac{5\pi }{12} \right)\sin \left( \dfrac{\pi }{12} \right)=\dfrac{1}...

Prove that:
2sin(5π12)sin(π12)=122\sin \left( \dfrac{5\pi }{12} \right)\sin \left( \dfrac{\pi }{12} \right)=\dfrac{1}{2}

Explanation

Solution

Hint:In this given question, we can use the transformation formula for the product of trigonometric ratios of two angles to sum of trigonometric ratios of the two angles. The formula is as follows: 2sinAsinB=cos(AB)cos(A+B)2\sin A\sin B=\cos (A-B)-\cos (A+B), where we can take A equal to 5π12\dfrac{5\pi }{12} and B equal to π12\dfrac{\pi }{12}. This way we can simplify the Left Hand Side (LHS) and put the required values of the trigonometric ratios to get the asked proof.

Complete step-by-step answer:
In this solution to the provided question, we will use the following transformation formula to simplify the LHS and get it equal to the RHS:
2sinAsinB=cos(AB)cos(A+B)........................(1.1)2\sin A\sin B=\cos (A-B)-\cos (A+B)........................\left( 1.1 \right)
So, let us get to the RHS from the LHS as follows:
LHS=2sin(5π12)sin(π12)LHS=2\sin \left( \dfrac{5\pi }{12} \right)\sin \left( \dfrac{\pi }{12} \right)
Using equation (1.1) in this, where A is equal to 5π12\dfrac{5\pi }{12} and B is equal to π12\dfrac{\pi }{12}, we get
=cos(5π12π12)cos(5π12+π12)=\cos \left( \dfrac{5\pi }{12}-\dfrac{\pi }{12} \right)-\cos \left( \dfrac{5\pi }{12}+\dfrac{\pi }{12} \right)
=cos(4π12)cos(6π12)=\cos \left( \dfrac{4\pi }{12} \right)-\cos \left( \dfrac{6\pi }{12} \right)
=cos(π3)cos(π2).....................(1.2)=\cos \left( \dfrac{\pi }{3} \right)-\cos \left( \dfrac{\pi }{2} \right).....................\left( 1.2 \right)
Now, as we know that π\pi corresponds to 180{{180}^{\circ }}. So, π3=1803=60\dfrac{\pi }{3}=\dfrac{{{180}^{\circ }}}{3}={{60}^{\circ }} and π2=1802=90\dfrac{\pi }{2}=\dfrac{{{180}^{\circ }}}{2}={{90}^{\circ }}.
Putting these values in equation (1.2), we get
LHS=cos(π3)cos(π2) =cos60cos90 \begin{aligned} & LHS=\cos \left( \dfrac{\pi }{3} \right)-\cos \left( \dfrac{\pi }{2} \right) \\\ & =\cos {{60}^{\circ }}-\cos {{90}^{\circ }} \\\ \end{aligned}
Now, we know that cos60=12\cos {{60}^{\circ }}=\dfrac{1}{2} and cos90=0\cos {{90}^{\circ }}=0, so
LHS=120=12=RHSLHS=\dfrac{1}{2}-0=\dfrac{1}{2}=RHS
Therefore, we arrive at the required condition of LHS=RHS.
Hence, we proved that 2sin(5π12)sin(π12)=122\sin \left( \dfrac{5\pi }{12} \right)\sin \left( \dfrac{\pi }{12} \right)=\dfrac{1}{2} .

Note: We must be careful while using equation 1.1, that is 2sinAsinB=cos(AB)cos(A+B)2\sin A\sin B=\cos (A-B)-\cos (A+B), as here the subtraction of the cosine of the sum of the angles is done from the cosine of the difference of the angles, instead of the case of sine where the sine of the difference of angles is subtracted from the then sine of the sum of the angles to get twice of the product of cosine and sine of the first and the second angles respectively, that is 2cosAsinB=sin(A+B)sin(AB)2\cos A\sin B=\sin \left( A+B \right)-\sin \left( A-B \right).So,students should remember the trigonometric transformation formulae for solving these types of questions.