Write the polynomial in descending order by the exponents of the x terms 8x^2+4-5ax^3+6a^2x
Determine the division problem whose quotient is shown.
x^2-2x-2+11x+2/x^2+2x+2
To write the polynomial in descending order by the exponents of the x terms, we need to arrange the terms from highest exponent to lowest exponent. Let's rearrange the given polynomial:
First, let's arrange the terms that involve x:
-5ax^3 + 8x^2
Next, let's include the terms that do not involve x:
6a^2x + 4
Finally, combining all the terms, we get the polynomial in descending order as:
-5ax^3 + 8x^2 + 6a^2x + 4
Therefore, the polynomial in descending order by the exponents of the x terms is -5ax^3 + 8x^2 + 6a^2x + 4.
To write the polynomial in descending order by the exponents of the x terms, you need to rearrange the terms so that the one with the highest exponent is written first. Here's the rearranged polynomial:
-5ax^3 + 8x^2 + 6a^2x + 4