Section 4: Dividing Polynomials

It is important that you watch the video first.

Dividing a Polynomial by a Monomial

In a previous section, you learned how to divide a monomial by a monomial by applying rules of exponents.

For example, $rules of exponents$ .

Division can be checked by multiplying: 2x ^.5x²= 10x³.

In division, the number that is being divided is called the dividend, the number that is dividing into a number is called the divisor, and the answer to a division problem is called the quotient.

To divide a polynomial by a monomial, we divide each term of the polynomial by the divisor. (12x⁴ – 3x² + 6)(-3x) can be divided as follows:

$divide each term example$

In this case the quotient is $quotient$

Example 1. Find each quotient.

$example 1$

Solution.

a) Apply the rules of exponents and subtract the exponents

$solution 1a$

b) Divide each term of (15x3 – 8x2 + 6x – 14) by (-5x2):

$solution1b$

Dividing a Polynomial by a Binomial

To divide a polynomial by a binomial, we use a procedure similar to long division.

$Dividing a Polynomial by a Binomial a$

We know that (2x – 7)(x + 4) = 2x² + x– 28. This implies that (2x² + x – 28) ÷ (x + 4) = 2x – 7. We can use long division, just like the example shown above with whole numbers, to illustrate the division process.

$Dividing a Polynomial by a Binomial b$

Find the first term of the quotient by dividing the first term of the dividend by the first term of the divisor:

$Dividing a Polynomial by a Binomial c$

$Dividing a Polynomial by a Binomial d$

We need to subtract terms under the dividend and then carry down the last term and repeat the process.

$Dividing a Polynomial e$

Here we can subtract and see that we have zero left as the remainder. The quotient is 2x – 7.

$Dividing a Polynomial f$

It is important to have the division set up properly before beginning. Each term in the divisor and the dividend must be listed in descending order. It is also helpful to fill in any missing terms using a coefficient of zero. The example below illustrates this.

Example 2. Divide the polynomial: (8x³ – 27) ÷ (x – 3)

Solution.

Set up the division problem, filling in the missing terms using zeros as the coefficients.

$solution 2a$

Find the first term of the quotient by dividing the first term of the dividend by the first term of the divisor:

$solution 2b$

$solution 2c$

We need to subtract terms under the dividend and then carry down the next term and repeat the process.

$subtract terms$

Find the second term of the quotient by dividing 24x² by the first term of the divisor: $solution2 e$

$solution 2 f$

Subtract terms under the dividend and then carry down the last term. Then repeat the process.\

carry down last term

$solution 2 g$

Find the third term of the quotient by dividing 72x by the first term of the divisor: $solution 2 h$

$third term$

Here we can subtract and see that we have –243 left as the remainder. The quotient is 8x² + 24x + 72.

$243 left$

We can also express the results of this division in the form

$quotient$

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