Proof

Assume on the contrary that it were not. This would mean that for all $\epsilon \in (0,\infty)$ there would for all $n \in \mathbb{N}$ be points $x_n,y_n \in K$ with $d_K(x_n,y_n) \lt 1/(n+1)$ but $d_Y(f(x_n),f(y_n)) \gt \epsilon$.

Since in compact metric spaces every sequence has a converging subsequence (here), it follows that there is a converging subsequences $(x_{n_k})_{k \in \mathbb{N}}$. Since $d_K(x_{n_k} y_{n_k}) \lt 1/(n+1)$ it follows that also $(y_{n_k})_{k \in \mathbb{N}}$ is a converging subsequence which converges to the same point:

But since continuous functions preserve limits of sequences, it would follow that

This however would contradict the assumption that $d_Y(f(x_k), f(y_k)) \gt \epsilon$. Hence we have a proof by contradiction.