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## Algebra basics

### Course: Algebra basics>Unit 7

Lesson 2: Multiplying binomials

# Multiplying monomials by polynomials review

We use the distributive property to multiply monomials by polynomials. For example, 2x(3x+7) = 6x^2+14x. This article provides a brief review of the topic and gives you a couple of practice problems to try on your own.
In order to multiply monomials like 6, z, squared by polynomials like 7, z, squared, plus, 3, z, minus, 2, we need to apply the distributive property.

### Example

Simplify.
6, z, squared, left parenthesis, 7, z, squared, plus, 3, z, minus, 2, right parenthesis
This is a distributive property problem. How can we distribute start color #6495ed, 6, z, squared, end color #6495ed to each term inside of the parentheses?
This product is equal to 42, z, start superscript, 4, end superscript, plus, 18, z, cubed, minus, 12, z, squared.
Want to learn more about multiplying monomials by polynomials? Check out this video.

## Practice

Problem 1
• Current
Simplify.
minus, n, squared, left parenthesis, n, squared, plus, 5, n, plus, 6, right parenthesis

Want more practice? Check out this exercise.

## Want to join the conversation?

• When will I ever use this in my life?
• POLYNOMIALS USED IN EVERYDAY LIFE
POLYNOMIALS USED IN FINANCIAL PLANNING

Polynomials are applied to problems involving construction or materials planning. A polynomial equation can be used in any 2-D construction situation to plan for the number of materials needed.
USES OF POLYNOMIALS
Polynomials are a combination of several terms that can be added, subtracted or multiplied but not divided. They are one of the most basic algebraic operations, and many algebra students may wonder why they need to bother learning about them. While polynomials are in sophisticated applications, they also have many uses in everyday life.

SUMMARY
POLYNOMIALS USED IN MODELING
POLYNOMIALS USED IN CONSTRUCTION OR MATERIALS PLANNING

Some Other Uses
For people who work in industries that deal with physical phenomena or modeling situations for the future, polynomials come in handy every day. These include everyone from engineers to businessmen.
USES OF POLYNOMIALS
Polynomials can also be used to model different situations, like in the stock market to see how prices will vary over time. Business people also use polynomials to model markets, as in to see how raising the price of goods will affect its sales.
POLYNOMIALS USED IN EXPENSE BUDGETING
USES OF POLYNOMIALS

INTRODUCTION

POLYNOMIALS USED IN PHYSICS
POLYNOMIALS USED IN INDUSTRY

Hence, from the following, we observe that polynomials have various uses. People use polynomials in their everyday life. People use polynomials for modeling of various buildings and objects, used in industries, used in construction. They are even used in marketing, finance, stocks .etc. Polynomials are even used in various fields of science, such as physics, where we measure acceleration, or to express units of energy, inertia, or even in electricity .etc. In chemistry, polynomials are used in writing down the chemical equations .etc.

Polynomials are of great use to every person around.

Polynomials also are used in scientific problems, including gravitational acceleration problems. The polynomial equation needs to include the object's initial position, which is its distance from Earth's center, its initial velocity and its acceleration due to gravity, which is a constant figure. The accepted standard acceleration due to gravity is 32.17 feet per second squared. That is a basic formula, and many other aspects such as air resistance or air density are factored in by a scientist seeking a highly specific solution.
Polynomials can be used in financial planning. For instance, a polynomial equation can be used to figure the amount of interest that will accrue for an initial deposit amount in an investment or savings account at a given interest rate.
POLYNOMIALS ARE USED FOR VARIOUS PURPOSES IN LIFE. POLYNOMIALS ARE USED IN MODELLING, PHYSICS, INDUSTRIES, FINANCE, CONSTRUCTION, GRAVITATION, CHEMISTRY .etc.*

*USES OF POLYNOMIALS

Polynomials are useful when it comes to budgeting or expense planning. When you need to earn a given amount of money within a certain time period, polynomials can help you determine the exact amount of time you need to earn that amount. By predicting your expenses and knowing your rate of income, you easily can determine the amount of time you need to work.
Polynomials come up often in chemistry. Gas equations relating diagnostic parameters can usually be written as polynomials, such as the ideal gas law: PV=nRT (where n is mole count and R is a proportionality constant).

Formulas of molecules in concentration at equilibrium also can be written as polynomials.

Polynomials Used In Electronics
Electronics use many polynomials. The definition of resistance, V=IR, is a polynomial relating the resistance from a resistor to the current through it and the potential drop across it.

POLYNOMIALS USED IN EVERYDAY LIFE
Polynomials used in Chemistry
USES OF POLYNOMIALS
Polynomials are used in physics to describe the trajectory of projectiles. Polynomial integrals (the sums of many polynomials) can be used to express energy, inertia and voltage difference, to name a few applications.
POLYNOMIALS USED IN GRAVITATIONAL ACCELERATION
*https://prezi.com/yipjmwht42a5/polynomials-used-in-everyday-life/*
• What are some examples of where one would multiply binomials in everyday life?
• A basic example I can think of is calculating the area of something or making a formula to calculate the area of something that has unknown dimensions.
• I don't know why but this seems a piece of cake to me
• same
• Why was multiplying so much easier than adding and subtracting
• Maybe because you didn't have to pay much attention to the signs. With most of them gone it could have seemed a bit more simple.
• good luck yall this might seem easy but im sure it's going to turn hard later
• why do we do a lot steps, when we can use distributive property to solve it?
• This review is showing the distributive property
• Why would you want to expand it if you could leave it in it's simplified form?
• There are some operations, like differentiation, that are much easier when the polynomial is expanded out. Also, the expanded form is usually a more compact way to write the polynomial.
• seems alot of people forget to remember
x^1(x^2) is NOT x^2 NOT.
change equation by removing the perentheses and rewriting the quation.
x^1(x^2) = x^2 * x^1 = x * ( 2+1 ) = x^3.
• eh not really the more you practice it just becomes natural instinct
• this is so easy
• wow i got it right but said i got it wrong lmao