I am sorry because I did not put any solid calculation to my question. However, I found a solution to the inequality:-
Originally,
q = q
If I introduce (1-a^2) at the LHS,
(1-a^2)q < q, since a < 1
Also, (1-a^2) = (1+a)(1-a),
Hence (1+a)q < q/(1-a)
Is that a solid proof...
Hello to everyone. This is my first time here so I hope I will not cause any unwanted trouble.
Straight to the problem. I have one inequality for which I would like to prove, but I do not know how. The inequality has the following form:-
(1+a)q < q/(1-a), where a < 1 and q can be any positive...