Question

If `y = tan^-1((ax - b)/(bx + a))`. Then how will you prove that `dy/dx = 1/(1 + x^2)`??

Answer 1

We have:

`y = tan^(-1)( (ax-b)/(bx+a) )`

Using `d/dx tan^(-1)x = 1/(1+x^2)`, along with the chain rule we have:

`dy/dx = 1/(1+((ax-b)/(bx+a))^2) * d/dx((ax-b)/(bx+a))`

`" " = 1/(1+((ax-b)/(bx+a))^2) * ( (bx+a)(a) - (ax-b)(b) ) / (bx+a)^2`

`" " = 1/(((bx+a)^2+(ax-b)^2)/(bx+a)^2) * ( a(bx+a) - b(ax-b) ) / (bx+a)^2`

`" " = (bx+a)^2/((bx+a)^2+(ax-b)^2) * ( a(bx+a) - b(ax-b) ) / (bx+a)^2`

`" " = 1/((bx+a)^2+(ax-b)^2) * ( a(bx+a) - b(ax-b) )`

`" " = ( a(bx+a) - b(ax-b) )/((bx+a)^2+(ax-b)^2)`

`" " = ( abx+a^2 - abx+b^2 )/(b^2x^2+2abx+a^2+a^2x^2-2abx+b^2)`

`" " = ( a^2 +b^2 )/(a^2+a^2x^2+b^2+b^2x^2)`

`" " = ( a^2 +b^2 )/(a^2(1+x^2)+b^2(1+x^2))`

`" " = ( a^2 +b^2 )/((a^2+b^2)(1+x^2))`

`" " = 1/(1+x^2)` QED