Why does the sixth row go 1, 6, 15, 20, 15, 6, 1?

1 Answer
Daniel L.
Sep 5, 2015

There are at least 2 ways of prooving it.

Explanation:

As I wrote you can calculate the elements of Pascal's Triangle in at least 2 ways:

1) Directly from the definition.

Each row consists of numbers: (""_0^n), (""_1^n),..., (""_n^n), where:

(""_k^n)=(n!)/(k!*(n-k)!

2) You can construct in graphically:

First row consists of a single number 1.
Second row consists of 2 numbers 1
In all other rows first and last numbers are 1, others are the sum of the 2 numbers in the row above.
The picture shows 10 rows of the triangle.

![www.matematyka.plwww.matematyka.pl)

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