Please see below. Explanation: As \displaystyle\frac{{a}}{{b}}=\frac{{c}}{{d}} ............(1) adding \displaystyle{1} to both sides \displaystyle\frac{{a}}{{b}}+{1}=\frac{{c}}{{d}}+{1} ...

You made a small error when you solved the equation. You should have gotten a(a+b+d)=c(c+b+d) Note the c in c+b+d on the right. Can you take it from there? Added after the OP's edit : Now ...

It is given \frac{c}{d}=\frac{a}{b} from here we get 2bc=2ad and then ac+bc-ad-bd=ac+ad-bc-bd and this is (a+b)(c-d)=(c+d)(a-b) Can you finish?

You either have a typo or that is very false: Let a = c = e = \lambda = 2 and b = d = f = 1. Then you have \frac ab=\frac {a+c+e+\lambda}{b+d+f+\lambda} \iff \frac 21=\frac {2+2+2+2}{1+1+1+2} \iff 2 = \frac85 ...

Suppose that a \neq b, c\neq d, and b,d \neq 0. Then, \frac ab \neq 1. We are asked to assume that \frac ab = \frac cd. Now, we can do the following: \frac ab = \frac cd \implies \frac ab + 1 = \frac cd + 1 \implies \frac{a+b}b = \frac{c+d}d\\ \frac ab = \frac cd \implies \frac ab - 1 = \frac cd - 1 \implies \frac{a-b}{b} = \frac{c-d}{d}\\ ...

Let f(z) = \frac{az+b}{cz+d}. The key observation is \left(\begin{array}{ccc}a & b \\ c & d\end{array}\right) \left(\begin{array}{c}z \\ 1\end{array}\right) = \left(\begin{array}{c}az + b \\ cz + d\end{array}\right) = (cz+d)\left(\begin{array}{c}\frac{az + b}{cz + d} \\ 1\end{array}\right) = (cz+d)\left(\begin{array}{c}f(z) \\ 1\end{array}\right) ...