Let $I=(X, Y) \subset k[X,Y]$. show that $\mbox{dim}_k(k[X,Y] / I^n) = 1+2+...+n=n(n+1) /2 $
Here k is algebracally closed field. And $(X,Y) $ is ideal in polynomial ring $k[X,Y]$ generated by $ X, Y$. Actually I can't figure out how to find a basis practically. Please help.