Question

How do you use pascals triangle to expand `(2s+1)^4`?

Answer 1

Combine the 5th row of Pascal's triangle with descending powers of `2` to find:

`(2s+1)^4 = 16s^4+32s^3+24s^2+8s+1`

Explanation:

Write out the 5th row of Pascal's triangle as a sequence:

`1`, `4`, `6`, `4`, `1`

Write out powers of `2` in descending order from `2^4` to `2^0`:

`16`, `8`, `4`, `2`, `1`

Multiply these two sequences together to get:

`16`, `32`, `24`, `8`, `1`

These are the coefficients of the powers of `s` in the expansion:

`(2s+1)^4 = 16s^4+32s^3+24s^2+8s+1`