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Question: Find the value of \(\cos \dfrac{\pi }{8}\). A) \(\sqrt{\dfrac{\sqrt{2}-1}{2\sqrt{2}}}\) B) \(\sq...

Find the value of cosπ8\cos \dfrac{\pi }{8}.
A) 2122\sqrt{\dfrac{\sqrt{2}-1}{2\sqrt{2}}}
B) 2+122\sqrt{\dfrac{\sqrt{2}+1}{2\sqrt{2}}}
C) 2+123\sqrt{\dfrac{\sqrt{2}+1}{2\sqrt{3}}}
D) 2+12\sqrt{\dfrac{\sqrt{2}+1}{\sqrt{2}}}

Explanation

Solution

Hint: In this question, we have to bring the given expression in the form of the cosine of a standard angle, whose cosine value is known. Thereafter, we can obtain the value of the given expression in terms of the cosine value of the standard angle (which is 45{{45}^{\circ }} in this case).
Complete step-by-step answer:
In this case, the expression to be evaluated is cosπ8\cos \dfrac{\pi }{8}. We should try to bring it in terms of the trigonometric ratios of one of the standard angles i.e. π2,π3,π4,π6\dfrac{\pi }{2},\dfrac{\pi }{3},\dfrac{\pi }{4},\dfrac{\pi }{6} whose trigonometric ratios are known. In this case, we notice that π8\dfrac{\pi }{8} can be written as π8=π2×4=12×π4\dfrac{\pi }{8}=\dfrac{\pi }{2\times 4}=\dfrac{1}{2}\times \dfrac{\pi }{4}.
We can now use the cosine of sum of angles rule
cos(x+y)=cos(x)cos(y)sin(x)sin(y)\cos (x+y)=\cos (x)\cos (y)-\sin (x)\sin (y)
We can take y=x in the above formula which gives the cosine of twice an angle x as
cos(2x)=cos2(x)sin2(x)=cos2(x)(1cos2x)=2cos2x1 cos(x)=1+cos(2x)2..................................(1.1) \begin{aligned} & \cos (2x)={{\cos }^{2}}(x)-{{\sin }^{2}}(x)={{\cos }^{2}}(x)-(1-{{\cos }^{2}}x)=2{{\cos }^{2}}x-1 \\\ & \Rightarrow \cos (x)=\sqrt{\dfrac{1+\cos (2x)}{2}}..................................(1.1) \\\ \end{aligned}
Thus, in this case we can take x=π8x=\dfrac{\pi }{8}. Then, 2x=π42x=\dfrac{\pi }{4}, using these values in equation(1.1), we obtain
cos(π8)=1+cos(π4)2.......................(1.2)\cos (\dfrac{\pi }{8})=\sqrt{\dfrac{1+\cos \left( \dfrac{\pi }{4} \right)}{2}}.......................(1.2)
Now, we also know that cos(π4)=cos(45)=12\cos \left( \dfrac{\pi }{4} \right)=\cos ({{45}^{\circ }})=\dfrac{1}{\sqrt{2}}. Using these values in equation (1.2), we get
cos(π8)=1+cos(45)2=1+122=2+122\cos (\dfrac{\pi }{8})=\sqrt{\dfrac{1+\cos \left( {{45}^{\circ }} \right)}{2}}=\sqrt{\dfrac{1+\dfrac{1}{\sqrt{2}}}{2}}=\sqrt{\dfrac{\sqrt{2}+1}{2\sqrt{2}}}
Therefore, the answer to this question should be option(B).
Note: In this case we should be careful to use the cosine of twice an angle formula because there are three formulas for cos of twice an angle and note that there should be an overall square root in the answer.