In this Concept, you will learn how to write equations in standard form.
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CK-12 Foundation: 0502S Standard Form of Linear Equations (H264)
Try This
Now that you’ve worked with equations in all three basic forms, check out the Java applet at http://www.ronblond.com/M10/lineAP/index.html . You can use it to manipulate graphs of equations in all three forms, and see how the graphs change when you vary the terms of the equations.
Guidance
You’ve already encountered another useful form for writing linear equations: standard form. An equation in standard form is written , where , and are all integers and is positive. (Note that the in the standard form is different than the in the slope-intercept form.)
One useful thing about standard form is that it allows us to write equations for vertical lines, which we can’t do in slope-intercept form.
For example, let’s look at the line that passes through points (2, 6) and (2, 9). How would we find an equation for that line in slope-intercept form?
First we’d need to find the slope: . But that slope is undefined because we can’t divide by zero. And if we can’t find the slope, we can’t use point-slope form either.
If we just graph the line, we can see that equals 2 no matter what is. There’s no way to express that in slope-intercept or point-slope form, but in standard form we can just say that , or simply .
Converting to Standard Form
To convert an equation from another form to standard form, all you need to do is rewrite the equation so that all the variables are on one side of the equation and the coefficient of is not negative.
Example A
Rewrite the following equations in standard form:
a)
b)
c)
Solution
We need to rewrite each equation so that all the variables are on one side and the coefficient of is not negative.
a)
Subtract from both sides to get .
Add 7 to both sides to get .
Flip the equation around to put it in standard form: .
b)
Distribute the –3 on the right-hand-side to get .
Add to both sides to get .
Add 2 to both sides to get . Flip that around to get .
c)
Find the common denominator for all terms in the equation – in this case that would be 6.
Multiply all terms in the equation by 6:
Subtract from both sides:
Subtract 3 from both sides:
The equation in standard form is .
Graphing Equations in Standard Form
When an equation is in slope-intercept form or point-slope form, you can tell right away what the slope is. How do you find the slope when an equation is in standard form?
Well, you could rewrite the equation in slope-intercept form and read off the slope. But there’s an even easier way. Let’s look at what happens when we rewrite an equation in standard form.
Starting with the equation , we would subtract from both sides to get . Then we would divide all terms by and end up with .
That means that the slope is and the intercept is . So next time we look at an equation in standard form, we don’t have to rewrite it to find the slope; we know the slope is just , where and are the coefficients of and in the equation.
Example B
Find the slope and the intercept of the following equations written in standard form.
a)
b)
c)
Solution
a) , and , so the slope is , and the intercept is .
b) , and , so the slope is , and the intercept is .
c) , and , so the slope is , and the intercept is .
Once we’ve found the slope and intercept of an equation in standard form, we can graph it easily. But if we start with a graph, how do we find an equation of that line in standard form?
First, remember that we can also use the cover-up method to graph an equation in standard form, by finding the intercepts of the line. For example, let’s graph the line given by the equation .
To find the intercept, cover up the term (remember, the intercept is where ):
The intercept is (2, 0).
To find the intercept, cover up the term (remember, the intercept is where :
The intercept is (0, -3).
We plot the intercepts and draw a line through them that extends in both directions:
Now we want to apply this process in reverse—to start with the graph of the line and write the equation of the line in standard form.
Example C
Find the equation of each line and write it in standard form.
a)
b)
c)
Solution
a) We see that the intercept is and the intercept is
We saw that in standard form : if we “cover up” the term, we get , and if we “cover up” the term, we get .
So we need to find values for and so that we can plug in 3 for and -4 for and get the same value for in both cases. This is like finding the least common multiple of the and intercepts.
In this case, we see that multiplying by 4 and multiplying by –3 gives the same result:
Therefore, and and the equation in standard form is .
b) We see that the intercept is and the intercept is
The values of the intercept equations are already the same, so and . The equation in standard form is .
c) We see that the intercept is and the intercept is
Let’s multiply the intercept equation by
Then we see we can multiply the intercept again by 4 and the intercept by 3, so we end up with and .
The equation in standard form is .
Watch this video for help with the Examples above.
CK-12 Foundation: Standard Form of Linear Equations
Vocabulary
- An equation in standard form is written , where , and are all integers and is positive. (Note that the in the standard form is different than the in the slope-intercept form.)
Guided Practice
Find the slope and the intercept of the following equations written in standard form.
a)
b)
Solution:
a) , and , so the slope is , and the intercept is .
b) , and , so the slope is , and the intercept is .
Practice
For 1-6, rewrite the following equations in standard form.
For 7-12, find the slope and intercept of the following lines.
For 13-14, find the equation of each line and write it in standard form.