Question

If cos(α)=4/5 and we know that α∈(270˚; 360˚), how much is cos(α/2)?

Answer 1

`cos(alpha/2)=-(3sqrt(10))/10`

Explanation:

Using the identity:

`cos^2(x/2)= 1/2(1+cosx)`

`cos(alpha/2)=sqrt(1+cosalpha)/sqrt(2)`

If `cosalpha=4/5`

`:.`

`cos(alpha/2)=(sqrt(1+4/5))/sqrt(2)=(sqrt(9/5))/sqrt(2)=(3/sqrt(5))/sqrt(2)=-(3sqrt(10))/10`

Note:

Cosine is negative because `alpha/2` is in the III quadrant and `alpha` is in the IV quadrant.