Given f(3x)−f(x)=x
Now replance xby 3x infinite times,
f(x)−f(3x)=3x
f(3x)−f(32x)=32x..
On adding, we get
f(x)−n→∞limf(3nx)=x(31+321+⋯+∞)
f(x)−n→∞limf(3nx)=x(1−3131)=2x
⇒f(x)−f(0)=2x
Given f(8)=7
so f(8)−f(0)=4
i.e. f(0)=3
∴f(x)=2x+3
Hence f(14)=10