If `cos^(-1)(6x)/(1+9x^2)=-pi/2+tan^(-1)3x ,`then find the value of`xd

1.	If `cos^(-1)(6x)/(1+9x^2)=-pi/2+tan^(-1)3x ,`then find the value of`xdot`
Answer» `cos^(-1)((6x)/(1+9x^2))=-pi/2+2tan^(-1)3x` `pi/2-sin^(-1)((6x)/(1+9x^2))=-pi/2+2tan^(-1)x` `pi-sin^(-1)((6x)/(1+9x^2))=2tan^(-1)3x` `pi-2tan^(-1)3x=sin^(-1)((2(3x))/(1+(3x)^2))` `pi-2tan^(-1)3x=sin^(-1)((2(3x))/(1+(3x)^2))` When `3x>=1,x>1/3` `x in(1/3,oo)`.

Discussion

`tan^(-1)[(cosx)/(1+sinx)]`is equal to`pi/4-x/2,forx in (-pi/2,(3pi)/2)``pi/4-x/2,forx in (-pi/2,pi/2)``pi/4-x/2,forx in (-pi/2,pi/2)``pi/4-x/2,forx in (-(3pi)/2,pi/2)`
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