Question

Question #37ae3

Answer 1

`0.`

Explanation:

Suppose that, `I=int_0^oolnx/(1+x^2)dx.`

We subst. `x=tany.:. dx=sec^2ydy.`

Further, `x=0 rArr y=0,"&, as "x to oo, y to pi/2.`

`:. I=int_0^(pi/2) (lntany/cancel(1+tan^2y))*cancel(sec^2y)dy, i.e.,`

`I=int_0^(pi/2)lntanydy.........(star^1).`

Now, we know that, `int_0^af(y)dx=int_0^af(a-y)dx....(R).`

We apply the Result R to `(star^1)"with "a=pi/2, &, f(y)=lntany.`

`:. I=int_0^(pi/2)lntan(pi/2-y)dy, or,`

`I=int_0^(pi/2)lncotydy...................(star^2).`

`:. (star^1)+(star^2) rArr 2I=int_0^(pi/2)lntanydy+int_0^(pi/2)lncotydy,`

`:. 2I=int_0^(pi/2)[lntany+lncoty}dy,`

`=int_0^(pi/2)[ln(tany*coty)]dy,`

`=int_0^(pi/2)ln1dy,`

`:. 2I=int_0^(pi/2)0dy=0.`

`rArr I=0.`

Enjoy Maths.!