Question

How do you multiply `3r ^ { 3} \cdot 2r ^ { 2} \cdot 3r`?

Answer 1

See the solution process below:

Explanation:

First, rewrite this expression as:

`(3 * 2 * 3)(r^3 * r^2 * r) = 18(r^3 * r^2 * r)`

Now, we can use these two rules for exponents to complete the multiplication:

`a = a^color(green)(1)` and `x^color(red)(a) xx x^color(blue)(b) = x^(color(red)(a) + color(blue)(b))`

`18(r^3 * r^2 * r) = 18(r^color(red)(3) * r^color(blue)(2) * r^color(green)(1)) = 18r^(color(red)(3)+color(blue)(2)+color(green)(1)) = 18r^6`

Answer 2

`3r^3*2r^2*3r=18r^6`

Explanation:

Multiply the constants normally and add the exponents.
Like this,

`color(red)(3r^3*2r^2)*3r`

`color(red)(6r^5)*3r`

`color(green)(6r^5*3r)`

`color(green)(18r^6)`