For the solution/answer of this question, we will use the double angle formula which can be derived as follows:
[tex] cos(2a)=cos(a+a)=cos(a)\times cos(a)-sin(a)\times sin(a)=cos^2(a)-sin^2(a) [/tex]
Now, the above expression can be simplified to:
[tex] cos(2a)=cos^2(a)-sin^2(a)=cos^2(a)-(1-cos^2(a)) [/tex] (Because [tex] sin^2a=1-cos^2a [/tex])
Therefore, we can further simplify it to:
[tex] cos(2a)=cos^2a-1+cos^2a=2cos^2a-1 [/tex] which is the proof which is required.
Thus, we have proved that:
[tex] cos(2a)=2cos^2a-1 [/tex]
Thus, this equality is true for all values of a.
