In this section you will:
The computer monitor on the left in [link] is a 23.6-inch model and the one on the right is a 27-inch model. Proportionally, the monitors appear very similar. If there is a limited amount of space and we desire the largest monitor possible, how do we decide which one to choose? In this section, we will learn how to solve problems such as this using four different methods.
An equation containing a second-degree polynomial is called a quadratic equation. For example, equations such as
and
are quadratic equations. They are used in countless ways in the fields of engineering, architecture, finance, biological science, and, of course, mathematics.
Often the easiest method of solving a quadratic equation is factoring. Factoring means finding expressions that can be multiplied together to give the expression on one side of the equation.
If a quadratic equation can be factored, it is written as a product of linear terms. Solving by factoring depends on the zero-product property, which states that if
then
or
where a and b are real numbers or algebraic expressions. In other words, if the product of two numbers or two expressions equals zero, then one of the numbers or one of the expressions must equal zero because zero multiplied by anything equals zero.
Multiplying the factors expands the equation to a string of terms separated by plus or minus signs. So, in that sense, the operation of multiplication undoes the operation of factoring. For example, expand the factored expression
by multiplying the two factors together.
The product is a quadratic expression. Set equal to zero,
is a quadratic equation. If we were to factor the equation, we would get back the factors we multiplied.
The process of factoring a quadratic equation depends on the leading coefficient, whether it is 1 or another integer. We will look at both situations; but first, we want to confirm that the equation is written in standard form,
where a, b, and c are real numbers, and
The equation
is in standard form.
We can use the zero-product property to solve quadratic equations in which we first have to factor out the greatest common factor (GCF), and for equations that have special factoring formulas as well, such as the difference of squares, both of which we will see later in this section.
The zero-product property states
where a and b are real numbers or algebraic expressions.
A quadratic equation is an equation containing a second-degree polynomial; for example
where a, b, and c are real numbers, and if
it is in standard form.
In the quadratic equation
the leading coefficient, or the coefficient of
is 1. We have one method of factoring quadratic equations in this form.
Given a quadratic equation with the leading coefficient of 1, factor it.
where k is one of the numbers found in step 1. Use the numbers exactly as they are. In other words, if the two numbers are 1 and
the factors are
Factor and solve the equation:
To factor
we look for two numbers whose product equals
and whose sum equals 1. Begin by looking at the possible factors of
The last pair,
sums to 1, so these are the numbers. Note that only one pair of numbers will work. Then, write the factors.
To solve this equation, we use the zero-product property. Set each factor equal to zero and solve.
The two solutions are
and
We can see how the solutions relate to the graph in [link]. The solutions are the x-intercepts of
Factor and solve the quadratic equation:
Solve the quadratic equation by factoring:
Find two numbers whose product equals
and whose sum equals
List the factors of
The numbers that add to 8 are 3 and 5. Then, write the factors, set each factor equal to zero, and solve.
The solutions are
and
Solve the quadratic equation by factoring:
Solve the difference of squares equation using the zero-product property:
Recognizing that the equation represents the difference of squares, we can write the two factors by taking the square root of each term, using a minus sign as the operator in one factor and a plus sign as the operator in the other. Solve using the zero-factor property.
The solutions are
and
Solve by factoring:
When the leading coefficient is not 1, we factor a quadratic equation using the method called grouping, which requires four terms. With the equation in standard form, let’s review the grouping procedures:
multiply
and whose sum equals
term with two terms using the numbers found in step 1 as coefficients of x.
Use grouping to factor and solve the quadratic equation:
First, multiply
Then list the factors of
The only pair of factors that sums to
is
Rewrite the equation replacing the b term,
with two terms using 3 and 12 as coefficients of x. Factor the first two terms, and then factor the last two terms.
Solve using the zero-product property.
The solutions are
See [link].
Solve using factoring by grouping:
Solve the equation by factoring:
This equation does not look like a quadratic, as the highest power is 3, not 2. Recall that the first thing we want to do when solving any equation is to factor out the GCF, if one exists. And it does here. We can factor out
from all of the terms and then proceed with grouping.
Use grouping on the expression in parentheses.
Now, we use the zero-product property. Notice that we have three factors.
The solutions are
and
Solve by factoring:
When there is no linear term in the equation, another method of solving a quadratic equation is by using the square root property, in which we isolate the
term and take the square root of the number on the other side of the equals sign. Keep in mind that sometimes we may have to manipulate the equation to isolate the
term so that the square root property can be used.
With the
term isolated, the square root property states that:
where k is a nonzero real number.
**Given a quadratic equation with an
term but no
term, use the square root property to solve it.**
term on one side of the equal sign.
sign before the expression on the side opposite the squared term.
sign.
Solve the quadratic using the square root property:
Take the square root of both sides, and then simplify the radical. Remember to use a
sign before the radical symbol.
The solutions are
Solve the quadratic equation:
First, isolate the
term. Then take the square root of both sides.
The solutions are
Solve the quadratic equation using the square root property:
Not all quadratic equations can be factored or can be solved in their original form using the square root property. In these cases, we may use a method for solving a quadratic equation known as completing the square. Using this method, we add or subtract terms to both sides of the equation until we have a perfect square trinomial on one side of the equal sign. We then apply the square root property. To complete the square, the leading coefficient, a, must equal 1. If it does not, then divide the entire equation by a. Then, we can use the following procedures to solve a quadratic equation by completing the square.
We will use the example
to illustrate each step.
Given a quadratic equation that cannot be factored, and with
first add or subtract the constant term to the right sign of the equal sign.
Multiply the b term by
and square it.
Add
to both sides of the equal sign and simplify the right side. We have
The left side of the equation can now be factored as a perfect square.
Use the square root property and solve.
The solutions are
Solve the quadratic equation by completing the square:
First, move the constant term to the right side of the equal sign.
Then, take
of the b term and square it.
Add the result to both sides of the equal sign.
Factor the left side as a perfect square and simplify the right side.
Use the square root property and solve.
The solutions are
Solve by completing the square:
The fourth method of solving a quadratic equation is by using the quadratic formula, a formula that will solve all quadratic equations. Although the quadratic formula works on any quadratic equation in standard form, it is easy to make errors in substituting the values into the formula. Pay close attention when substituting, and use parentheses when inserting a negative number.
We can derive the quadratic formula by completing the square. We will assume that the leading coefficient is positive; if it is negative, we can multiply the equation by
and obtain a positive a. Given
we will complete the square as follows:
First, move the constant term to the right side of the equal sign:
As we want the leading coefficient to equal 1, divide through by a:
Then, find
of the middle term, and add
to both sides of the equal sign:
Next, write the left side as a perfect square. Find the common denominator of the right side and write it as a single fraction:
Now, use the square root property, which gives
Finally, add
to both sides of the equation and combine the terms on the right side. Thus,
Written in standard form,
any quadratic equation can be solved using the quadratic formula:
where a, b, and c are real numbers and
Given a quadratic equation, solve it using the quadratic formula
and
Solve the quadratic equation:
Identify the coefficients:
Then use the quadratic formula.
Use the quadratic formula to solve
First, we identify the coefficients:
and
Substitute these values into the quadratic formula.
The solutions to the equation are
and
or
and
Solve the quadratic equation using the quadratic formula:
The quadratic formula not only generates the solutions to a quadratic equation, it tells us about the nature of the solutions when we consider the discriminant, or the expression under the radical,
The discriminant tells us whether the solutions are real numbers or complex numbers, and how many solutions of each type to expect. [link] relates the value of the discriminant to the solutions of a quadratic equation.
Value of Discriminant | Results |
---|---|
One rational solution (double solution) |
perfect square | Two rational solutions |
not a perfect square | Two irrational solutions |
Two complex solutions |
For
, where
,
, and
are real numbers, the discriminant is the expression under the radical in the quadratic formula:
It tells us whether the solutions are real numbers or complex numbers and how many solutions of each type to expect.
Use the discriminant to find the nature of the solutions to the following quadratic equations:
Calculate the discriminant
for each equation and state the expected type of solutions.
There will be one rational double solution.
As
is a perfect square, there will be two rational solutions.
As
is a perfect square, there will be two rational solutions.
There will be two complex solutions.
One of the most famous formulas in mathematics is the Pythagorean Theorem. It is based on a right triangle, and states the relationship among the lengths of the sides as
where
and
refer to the legs of a right triangle adjacent to the
angle, and
refers to the hypotenuse. It has immeasurable uses in architecture, engineering, the sciences, geometry, trigonometry, and algebra, and in everyday applications.
We use the Pythagorean Theorem to solve for the length of one side of a triangle when we have the lengths of the other two. Because each of the terms is squared in the theorem, when we are solving for a side of a triangle, we have a quadratic equation. We can use the methods for solving quadratic equations that we learned in this section to solve for the missing side.
The Pythagorean Theorem is given as
where
and
refer to the legs of a right triangle adjacent to the
angle, and
refers to the hypotenuse, as shown in [link].
Find the length of the missing side of the right triangle in [link].
As we have measurements for side b and the hypotenuse, the missing side is a.
Use the Pythagorean Theorem to solve the right triangle problem: Leg a measures 4 units, leg b measures 3 units. Find the length of the hypotenuse.
units
Access these online resources for additional instruction and practice with quadratic equations.
quadratic formula |
How do we recognize when an equation is quadratic?
It is a second-degree equation (the highest variable exponent is 2).
When we solve a quadratic equation, how many solutions should we always start out seeking? Explain why when solving a quadratic equation in the form
we may graph the equation
and have no zeroes (x-intercepts).
When we solve a quadratic equation by factoring, why do we move all terms to one side, having zero on the other side?
We want to take advantage of the zero property of multiplication in the fact that if
then it must follow that each factor separately offers a solution to the product being zero:
In the quadratic formula, what is the name of the expression under the radical sign
and how does it determine the number of and nature of our solutions?
Describe two scenarios where using the square root property to solve a quadratic equation would be the most efficient method.
One, when no linear term is present (no x term), such as
Two, when the equation is already in the form
For the following exercises, solve the quadratic equation by factoring.
For the following exercises, solve the quadratic equation by using the square root property.
For the following exercises, solve the quadratic equation by completing the square. Show each step.
For the following exercises, determine the discriminant, and then state how many solutions there are and the nature of the solutions. Do not solve.
Not real
One rational
Two real; rational
For the following exercises, solve the quadratic equation by using the quadratic formula. If the solutions are not real, state No Real Solution.
For the following exercises, enter the expressions into your graphing utility and find the zeroes to the equation (the x-intercepts) by using 2nd CALC 2:zero. Recall finding zeroes will ask left bound (move your cursor to the left of the zero,enter), then right bound (move your cursor to the right of the zero,enter), then guess (move your cursor between the bounds near the zero, enter). Round your answers to the nearest thousandth.
and
To solve the quadratic equation
we can graph these two equations
and find the points of intersection. Recall 2nd CALC 5:intersection. Do this and find the solutions to the nearest tenth.
and
To solve the quadratic equation
we can graph these two equations
and find the points of intersection. Recall 2nd CALC 5:intersection. Do this and find the solutions to the nearest tenth.
Beginning with the general form of a quadratic equation,
solve for x by using the completing the square method, thus deriving the quadratic formula.
Show that the sum of the two solutions to the quadratic equation is
A person has a garden that has a length 10 feet longer than the width. Set up a quadratic equation to find the dimensions of the garden if its area is 119 ft.2. Solve the quadratic equation to find the length and width.
7 ft. and 17 ft.
Abercrombie and Fitch stock had a price given as
where
is the time in months from 1999 to 2001. (
is January 1999). Find the two months in which the price of the stock was $30.
Suppose that an equation is given
where
represents the number of items sold at an auction and
is the profit made by the business that ran the auction. How many items sold would make this profit a maximum? Solve this by graphing the expression in your graphing utility and finding the maximum using 2nd CALC maximum. To obtain a good window for the curve, set
[0,200] and
[0,10000].
maximum at
A formula for the normal systolic blood pressure for a man age
measured in mmHg, is given as
Find the age to the nearest year of a man whose normal blood pressure measures 125 mmHg.
The cost function for a certain company is
and the revenue is given by
Recall that profit is revenue minus cost. Set up a quadratic equation and find two values of x (production level) that will create a profit of $300.
The quadratic equation would be
The two values of
are 20 and 60.
A falling object travels a distance given by the formula
ft, where
is measured in seconds. How long will it take for the object to traveled 74 ft?
A vacant lot is being converted into a community garden. The garden and the walkway around its perimeter have an area of 378 ft2. Find the width of the walkway if the garden is 12 ft. wide by 15 ft. long.
3 feet
An epidemiological study of the spread of a certain influenza strain that hit a small school population found that the total number of students,
who contracted the flu
days after it broke out is given by the model
where
Find the day that 160 students had the flu. Recall that the restriction on
is at most 6.
term is isolated so that the square root of both sides of the equation can be taken to solve for x
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