Which equation represents the slope intercept form of the line below

Interpreting Lines:

This is an introduction to drawing lines when given the slope and the y-intercept in an equation form. Remember that the y-intercept is where the graph crosses the y-axis; this is where we usually start. First, find the y-intercept, then determine the slope. For now, just focus on whether the slope is positive or negative.

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Interpreting Lines:
Additional Resources
How do you write an equation in slope
What is the slope of the line described by the equation below Y =
What is the slope of the line described by the equation below Y =
What is the slope of the line described by the equation below Y =

Here are the variables we will start using in our function:

m = slope
b = y-intercept

The equation is y = mx + b. The x and y variables remain as letters, but m and b are replaced by numbers (ex: y = 2x + 4, slope = 2 and y-intercept = 4). The following video will show a few examples of understanding how to use the slope and intercept from an equation.

Video Source (03:53 mins) | Transcript

y = mx + b

This equation is called the slope-intercept form because the two numbers in the equation are the slope and the intercept. Remember, the slope (m) is the number being multiplied to x and the intercept (b) is the number being added or subtracted.

Additional Resources

Khan Academy: Intro to Slope-Intercept Form (08:59 mins; Transcript)
Khan Academy: Worked Examples: Slope-Intercept Intro (04:39 mins; Transcript)

Practice Problems

Find the slope of the line:
\(\text{y}=6\text{x}+2\)

Find the y-intercept of the line:
\({\text{y}}=-7{\text{x}}+4\)

Find the slope of the line:
\({\text{y}}=-3{\text{x}}+5\)

Find the y-intercept of the line:
\({\text{y}}=-{\text{x}}-3\)

Writing the Equation of a Line

Learning Objective(s)

· Find the slope and the y-intercept, and write an equation of the line.

· Given the slope and a point on the line, write an equation of the line.

· Given two points, write the equation of a line.

Introduction

A linear equation can be expressed in the form

. In this equation, x and y are coordinates of a point, m is the slope, and b is the y-coordinate of the y-intercept. Because this equation describes a line in terms of its slope and its y-intercept, this equation is called the slope-intercept form. When working with linear relationships, the slope-intercept form helps to translate between the graph of a line and the equation of a line.

Slope-intercept Form

The graph below represents any line that can be written in slope-intercept form. It has two slider bars that can be manipulated. The bar labeled m lets you adjust the slope, or steepness, of the line. The bar labeled b changes the y-intercept. Try sliding each bar back and forth, and see how that affects the line.

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You should have noticed that changing the value of m could swivel the line from horizontal to nearly vertical and through every slope in-between. As m, the slope, gets larger, the line gets steeper. When the absolute value of m gets close to zero, the slope flattens.

Changing the value of b moved the line around the coordinate plane. A positive y-intercept means the line crosses the y-axis above the origin, while a negative y-intercept means that the line crosses below the origin.

Simply by changing the values of m and b, you can define any line. That’s how powerful and versatile the slope-intercept formula is.

Now that you understand the slope-intercept form, you can look at the graph of a line and write its equation just by identifying the slope and the y-intercept from the graph. Let’s try it with this line.

For this line, the slope is

, and the y-intercept is 4. If you put those values into the slope-intercept form, y = mx + b, you get the equation

Example
Problem	Write the equation of the line that has a slope of and a y-intercept of −5.
		Substitute the slope (m) into y = mx + b.
Answer	or	Substitute the y-intercept (b) into the equation.

If you know the slope of a line and a point on the line, you can draw a graph. So using an equation in the point-slope form, you can easily identify the slope and a point. Consider the equation

. You can tell from this equation that the y-intercept is at (0, −1). Start by plotting that point, (0, −1), on a graph.

You can also tell from the equation that the slope of this line is −3. So start at (0, −1) and count up 3 and over −1 (1 unit in the negative direction, left) and plot a second point. (You could also have gone down 3 and over 1.) Then draw a line through both points, and there it is, the graph of

What is the equation of a line that has a slope of −2 and goes through the point (0, 8)?

A) y = −2x + 8

B) y = 8x – 2

C) y = −2x + 0

D) 0 = 8x – 2

Slope and a Point on the Line

Using slope-intercept form to help write the equation of a line is possible when you know both the slope (m) and the y-intercept (b), but what if you know the slope and just any point on the line, not specifically the y-intercept? Can you still write the equation? The answer is yes, but you will need to put in a little more thought and work than you did previously.

Recall that a point is an (x, y) coordinate pair and that all points on the line will satisfy the linear equation. So, if you have a point on the line, it must be a solution to the equation. Although you don’t know the exact equation yet, you know that you can express the line in slope-intercept form, y = mx + b.

You do know the slope (m), but you just don’t know the value of the y-intercept (b). Since point (x, y) is a solution to the equation, you can substitute its coordinates for x and y in y = mx + b and solve to find b!

This may seem a bit confusing with all the variables, but an example with an actual slope and a point will help to clarify.

Example
Problem	Write the equation of the line that has a slope of 3 and contains the point (1, 4).
	y = 3x + b	Substitute the slope (m) into y = mx + b.
	4 = 3(1) + b	Substitute the point (1, 4) for x and y.
	4 = 3 + b 1 = b	Solve for b.
Answer	y = 3x + 1	Rewrite y = mx + b with m = 3 and b = 1.

To confirm our algebra, you can check by graphing the equation y = 3x + 1. The equation checks because when graphed it passes through the point (1, 4).

Advanced Example

Problem

Write the equation of the line that has a slope of

and contains the point
.

Substitute the slope (m) into

Substitute the point

for x and y.

Solve for b.

Answer

Rewrite

with

and

Write the slope-intercept form of the line with a slope of

and which contains the

point (9, 4).

Advanced Question

Write the slope-intercept form of the line with a slope of -0.6 and which contains the point (3.8, 7.25).

A) y = -0.6x + 3.8

B) y = -0.6x + 4.97

C) y = 3.8x + 7.25

D) y = -0.6x + 9.53

Two Points on the Line

Let’s suppose you don’t know either the slope or the y-intercept, but you do know the location of two points on the line. It is more challenging, but you can find the equation of the line that would pass through those two points. You will again use slope-intercept form to help you.

The slope of a linear equation is always the same, no matter which two points you use to find the slope. Since you have two points, you can use those points to find the slope (m). Now you have the slope and a point on the line! You can now substitute values for m, x, and y into the equation y = mx + b and find b.

Example
Problem	Write the equation of the line that passes through the points (2, 1) and (−1, −5).
		Find the slope using the given points.
	y = 2x + b	Substitute the slope (m) into y = mx + b.
	1 = 2(2) + b	Substitute the coordinates of either point for x and y– this example uses (2, 1).
	1 = 4 + b −3 = b	Solve for b.
Answer	y = 2x + (−3), or y = 2x – 3	Rewrite y = mx + b with m = 2 and b = −3.

Notice that is doesn’t matter which point you use when you substitute and solve for b—you get the same result for b either way. In the example above, you substituted the coordinates of the point (2, 1) in the equation y = 2x + b. Let’s start with the same equation, y = 2x + b, but substitute in (−1, −5):

y = 2x + b

−5 = 2(−1) + b

−5 = −2 + b

−3 = b

The final equation is the same: y = 2x – 3.

Advanced Example
Problem	Write the equation of the line that passes through the points (-4.6,6.45) and (1.15,7.6).
	Find the slope using the given points.
	Substitute the slope (m) into .
	Substitute either point for x and y– this example uses (1.15,7.6). Then solve for b.
	Rewrite with m = 0.2and b = 7.37.
Answer	The equation of the line that passes through the points (-4.6,6.45) and (1.15,7.6) is .

Write the slope-intercept form of the line that passes through (5, 2) and (−1, −10).

Advanced Question

Which of the following lines goes through the points

and

Summary

The slope-intercept form of a linear equation is written as y = mx + b, where m is the slope and b is the value of y at the y-intercept, which can be written as (0, b). When you know the slope and the y-intercept of a line you can use the slope-intercept form to immediately write the equation of that line. The slope-intercept form can also help you to write the equation of a line when you know the slope and a point on the line or when you know two points on the line.

How do you write an equation in slope

The slope-intercept form is one way to write a linear equation (the equation of a line). The slope-intercept form is written as y = mx+b, where m is the slope and b is the y-intercept (the point where the line crosses the y-axis). It's usually easy to graph a line using y=mx+b.