The question goes: Use the substitution t = π/4 -u to show that∫ ln(1+tan(t)) dt (for values of t between π/4 and 0) = πln(2)/8
My thoughts so far: du/dx = -1, -du=dx. By replacing t with π/4 - u the equation becomes -∫ ln(1+tan(π/4 - u)) du, using the trig identity it becomes -∫ ln(2/1+tan(u)) du.
This is as far as I got since I've been unable to integrate this function. Is there some way to manipulate the variables using various identities or is there something way obvious that I've not spotted?
I'm having a brain freeze so any help would be very much appreciated.
My thoughts so far: du/dx = -1, -du=dx. By replacing t with π/4 - u the equation becomes -∫ ln(1+tan(π/4 - u)) du, using the trig identity it becomes -∫ ln(2/1+tan(u)) du.
This is as far as I got since I've been unable to integrate this function. Is there some way to manipulate the variables using various identities or is there something way obvious that I've not spotted?
I'm having a brain freeze so any help would be very much appreciated.