Question

Question #c070f

Answer 1

Using the double angle formulas and combing the fractions and simplifying the algebra

Explanation:

to prove
`sec(2x)+tan(2x)=(1+tan(x))/(1-tan(x))`

take LHS

`sec(2x)+tan(2x)= 1/cos(2x) +2tan(x)/(1-tan^2(x))`

`=1/(cos^2(x)-sin^2(x))+2tan(x)/(1-tan^2(x))`

Divide every term of the first fraction by `cos^2(x)`

=`(1/cos^2(x))/(cos^2(x)/cos^2(x)-sin^2(x)/cos^2(x))+2tan(x)/(1-tan^2(x))`

`=sec^2(x)/(1-tan^2(x))+2tan(x)/(1-tan^2(x))`

`=(1+tan^2(x))/(1-tan^2(x))+2tan(x)/(1-tan^2(x))`

`=(1+2tan(x)+tan^2(x))/(1-tan^2(x))`

`=(1+tan(x))^2/((1-tan(x))(1+tan(x))`

cancelling a `(1+tan(x))` bracket

`=(1+tan(x))/(1-tan(x)`

as required.