Find the value of $\sum_{r=0}^{10}\binom{20+r}{20} \binom{20-r}{10}$

Question

Find the value of $$\sum_{r=0}^{10}\binom{20+r}{20} \binom{20-r}{10}$$

I tried a lot but couldn't come up with answer. It looks like an extended version of the Hockey Stick identity. Something like this is given here but I could not understand it Summation of double choose functions. Can there be a more elementary approach