Multiplying Polynomials (original) (raw)

Last Updated : 27 Apr, 2026

Polynomial multiplication is the process of multiplying each term of one polynomial by every term of another polynomial.

Multiplying-Polynomials

Steps to Multiply Polynomials

  1. Multiply each term of one polynomial with each term in the other polynomial.
  2. Add exponents of same variables
  3. Combine like terms

Types of Polynomial Multiplication

There are different types of polynomial multiplication based on the number of terms:

1. Multiplying Polynomials with Like Bases

To multiply the polynomial in which we have the same variables, we multiply the polynomials using the exponent rules:

For example, multiply the polynomials 3x5 and 5x.2

(3x5)(5x2) = (3 · 5)(x5 · x2) = 15(x5+2) = 15x7

2. Multiplying Polynomials with Different Variables

Polynomials with different variables are multiplied together by

For example, multiply the polynomials 3x5 and 5y.2

(3x5)(5y2) = (3 · 5)(x5 · y2) = 15x5y 2

3. Multiplying a Monomial by a Polynomial

To multiply a polynomial and a monomial, we need to multiply each and every term of the polynomial with the monomial.

For example, the product of 5x and (5x2 + 2x + 6)

5x (5x2 + 2x + 6) = (5x × 5x2) + (5x × 2x) + (5x × 6) = 25x3 + 10x2 + 30x

4. Multiplying a Polynomial by a Polynomial

To multiply two polynomials, we need to multiply each and every term of one polynomial with each and every term of the other polynomial.

For example, the product of (5x2 + 2x + 6) and (x2 + 2x + 3)

(5x2 + 2x + 6) × (1x2 + 2x + 3)
= (5x2 × 1x2) + (5x2 × 2x) + (5x2 × 3) + (2x × 1x2) + (2x × 2x) + (2x × 3) + (6 × 1x2) + (6 × 2x) + (6 × 3)
= 5x4 +10x3 + 15x2 + 2x3 + 4x2 + 6x + 6x2 + 12x + 18
= 5x4 +12x3 + 21x2 + 18x + 18

5. Multiplying a Monomial by a Monomial

Two monomials are easily multiplied. We should follow the following steps to multiply the monomial.

For example, multiply the polynomials 20x5y and 3xy.2

(20x5y)(3xy2) = (20 · 3)(x5y · xy2) = 60(x5+1)(y1+2) = 60x6y3

6. Multiplying a Binomial by a Binomial

Two binomials can be multiplied using the distributive properties. The distributive property of the algebra is (a + b) · (c + d) = (a · c) + (a · d) +( b · c) +( b · d)

Using this property we can easily multiply two binomials.

For example, multiply (3x + 4y)(5x2 + 2xy)

(3x + 4y)(5x2 + 2xy) = (3x)(5x2) + (3x)(2xy) + (4y)(5x2) + (4y)(2xy) = 15x3 + 6x2y + 20x2y + 8xy2 = 15x3 + 26x2y + 8xy2

7. Multiplying Binomials by Box Method

The box method (or area model) is a visual way to multiply polynomials, particularly binomials. It helps organize calculations and makes it easy to combine like terms.

**Steps to Multiply Binomials using the Box Method

For example, multiply (2x + 2) (x + 2x)

\begin{array}{|c|c|c|}\hline \times & 2x^{2} & + 2\\\hline x & 2x^{3} & 2x \\ \hline +2x & 4x^{3} & 4x \\ \hline \end{array}

Combine like terms: 2x3 + 4x3 + 2x + 4x = 6x3 + 6x

Thus, (2x2 + 2) (x + 2x) = 6x3 + 6x

Solved Examples

**Example 1: Find the product of (3x2 + 1x + 2) and (1x2 + 2x + 1)

(3x2 + 1x + 2) × (1x2 + 2x + 1)
(3x2 × 1x2) + (3x2 × 2x) + (3x2 × 1) + (1x × 1x2) + (1x × 2x) + (1x × 1) + (2 × 1x2) + (2 × 2x) + (2 * 1)
3x4 + 6x3 + 3x2 + 1x3 + 2x2 + 1x + 2x2 + 4x + 2
3x4 + 7x3 + 7x2 + 5x + 2

**Example 2: Find the product of (5xy + 1) and (2z + 3)

(5xy + 1) × (2z + 3)
(5xy × 2z) + (5xy × 3) + (1 × 2z) + (1 × 3)
10xyz + 15xy + 2z + 3

**Example 3: Find the Product of (3xyz) and (2x + 6)

(3xyz) × (2x + 6)
(3xyz × 2x) + (3xyz × 6)
6x2yz +18xyz

**Example 4: Find the product of (−a3b) and (2ab3)

(−a3b) × (2ab3) = -2a4b4

**Example 5: Find the product of (xy + 2y) and (a + b)

(xy + 2y) × (a + b)
(xy × a) + (xy × b) + (2y × a) + (2y × b)
axy + bxy + 2ay + 2by

Practice Questions

**Question 1: Multiply 2x2 and 3xy.

**Question 2: Multiply (3x2 – 5y) and (4x – y).

**Question 3: Multiply (x + 2y) and (3x2 − 4xy + 5).

**Question 4: Multiply (xy – 3) and (2x2 – 9y).