Question

How do you use the binomial theorem to expand and simplify the expression `(a+6)^4`?

Answer 1

`a^4 + 24a^3 + 216a^2 + 864a + 1296`

Explanation:

The binomial theorem states that

`(a+b)^n = ((n),(0)) a^n b^0 + ((n),(1)) a^(n-1) b^1 + ((n),(2)) a^(n-2) b^2 + ... + ((n),(n)) a^0 b^n`

`((n),(r))` is a combination read as "`n` choose `r`".

`((n),(r)) = color(white)I_nC_r = (n!) / (r! (n-r)!)`

To expand `(a+6)^4`, substitute `a=a, b=6,` and `n=4` into the formula.

`(a+6)^4 = ((4),(0)) * a^4 * 6^0 +((4),(1)) * a^3 * 6^1 + ((4),(2)) * a^2 * 6^2 + ((4),(3)) * a^1 * 6^3 + ((4),(4)) * a^0 * 6^4`

`=1 * a^4 * 1 + 4 * a^3 * 6 + 6 * a^2 * 36 + 4 * a^1 * 216 + 1 * 1 * 1296`

`=a^4 + 24a^3 + 216a^2 + 864a + 1296`