This short video serves as proof for the following mathematical statement:
1999F - Expected Median urged me to study modular arithmetic, specifically modular division. However, no document or video I found contained this proof, so I tried to prove it myself. It's not hard, so maybe that's why I couldn't find it, or maybe I didn't search well enough.
Anyway, often we are tasked with calculating a large number modulo $$$10^9 + 7$$$. For this, we need to perform some modular arithmetic tricks, but things get complicated when trying to perform division, like in the case of the binomial coefficient $$$\binom{n}{p}$$$. The reason for this is that when applying modulo to integers $$$a$$$ and $$$b$$$ such that $$$b \mid a$$$, there is no guarantee that $$$(b \mod m) \mid (a \mod m)$$$. So to actually calculate $$$\frac{a}{b} \mod m$$$, we need to use the Modular Multiplicative Inverse of $$$b$$$ as shown in the statement above.
We can easily find $$$b^{-1}$$$ using the Extended Euclidean Algorithm:
It makes more sense to prove that $$$(\frac{a}{b} \mod m = r_a \cdot r_b^{-1} \mod m)$$$ such that $$$(r_a = a \mod m)$$$ and $$$(r_b = b \mod m)$$$. However, I wanted to keep things simple. This can still be proven in a similar fashion.
SecondThread's video is great, it doesn't include this proof which I was looking for but I really recommend it.
Hope this helped! <3