Given: f(yx)=f(y)f(x)
And we know that, if f(yx)=f(y)f(x) then f(x)=xn.
So, differentiating the function we get,
f′(x)=nxn−1 and given f′(1)=2024.
Hence, on comparing we get, n=2024
⇒xf′(x)=x×2024x2023
⇒xf′(x)=2024x2024
⇒xf′(x)−2024x2024=0
⇒xf′(x)−2024f(x)=0