How do you prove $tan(pi/4 + theta) - tan(pi/4 - theta) = 2tan2theta$ ?

Question

17850 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2018-04-19T14:07:50

$LHS=tan(pi/4 + theta) - tan(pi/4 - theta)$

$=(tan(pi/4) + tantheta)/(1-tan(pi/4)tantheta) -( tan(pi/4) -tan theta)/(1+tan(pi/4)tantheta)$

$=(1+ tantheta)/(1-tantheta) -( 1-tan theta)/(1+tantheta)$

$=((1+ tantheta)^2 -( 1-tan theta)^2)/(1-tan^2theta)$

$=(4tantheta)/(1-tan^2theta)$

$= 2tan2theta$

Answer 2 · 2018-04-19T14:30:54

We know,

$color(blue)(tan(A±B)=(tanA±tanB)/(1∓tanAtanB)=> tan(A±B)*{1∓tanAtanB}=tanA±tanB)$

So,

$(tanunderbrace((π/4+theta))_color(blue)text(A)-tanunderbrace((π/4-theta)_color(blue)text(B)))$

$= tan(cancel(π/4)+theta-cancel(π/4)+theta)*{1+tan(π/4+theta) tan (π/4-theta)}$

Again applying, $color(blue)(tan(A±B)=(tanA±tanB)/(1∓tanAtanB)=> tan(A±B)*1∓tanAtanB=tanA±tanB)$

$=tan(2theta){1+(tan(π/4)+tantheta)/(1-tan(π/4)tantheta)×(tan(π/4)-tantheta)/(1+tan(π/4)tantheta)}$

We know,

$tan(π/4)=1$

So,

$=tan(2theta){1+cancel((1+tantheta))/(cancel((1-tantheta)))×(cancel((1-tantheta)))/(cancel((1+tantheta)))}$

$=2tan2theta$

$=RHS$

hence, proved! :)

How do you prove tan(pi/4 + theta) - tan(pi/4 - theta) = 2tan2thetatan(pi/4 + theta) - tan(pi/4 - theta) = 2tan2theta?