Answer:
The rows of Pascal’s triangle are symmetric.
Step-by-step explanation:
Each row of Pascal's triangle is symmetric.
Clearly
nCr=nCn-r
since choosing r objects from n objects leaves n−r objects, and choosing n−r objects leaves r objects. This means that the coefficient of [tex]x^{r}[/tex] in the expansion of [tex](1+x)^{n}[/tex] is the same as the coefficient of [tex]x^{n-r}[/tex].
