Question

Find the 9th term in the expansion of (3x-y÷3)^12?

Answer 1

`T_{9}\ =\ \frac{55x^4y^8}{9}`
``

Explanation:

``
The `\ \ (r+1)\ th\ \` term of an expression `\ \ (a+x)^n\ \` by using binomial theorem can be found by the general term formula:

`T_{r+1}\ =\ ((n),(r))a^{n-r}x^r`

``

Here, we are required to find the `\ \ 9th\ \` term, so put `\ \ r=8\ \` in the above stated formula to get:

`T_{8+1}\ =\ ((12),(8))(3x)^{12-8}(y/3)^8`

`T_{9}\ =\ \frac{12!}{8!(12-8)!}\cdot(3x)^4(y/3)^8`

``

Simplify to get:

`T_{9}\ =\ \frac{55x^4y^8}{9}`

``

That's it!