Chapter 4-2 Writing
Equations in Slope-Intercept Form
We usually use the
slope- intercept form of the line as our
”template”
We know that y =
mx + b so we can substitute that in what we know (what the problem gives us as
information) and solve for whatever we are missing
It helps to
memorize this little rhyme (Mrs Sobieraj made it up!)
Oh mystery line,
What could you be?
If I could just find you,
y = mx + b
First I’ll find m,
Then I’ll find b
Then I’ll put it all together
And I will see:
y = mx + b
What could you be?
If I could just find you,
y = mx + b
First I’ll find m,
Then I’ll find b
Then I’ll put it all together
And I will see:
y = mx + b
The rhyme has 3
steps and usually you will have 3 steps or questions to ask yourself:
1) Do I have the
slope (m)? If not find it by using the slope formula or counting it if you have
the graph—(carefully pick two sets of integer points)
2) Do I have the y-
intercept (b) ? If not, find it by plugging in a point and the slope and
solving for b or if you have the graph, just read it on the y axis.
3) Remember: Put it
all together in ONE equation at the end!
There are
FIVE general cases of mystery lines
First
Case:
You are given the slope and the y intercept (that is the easiest case)
For example: you are given m = 3/2 and b = - 7/5
You are given the slope and the y intercept (that is the easiest case)
For example: you are given m = 3/2 and b = - 7/5
Just plug in to
the generic slope intercept equation
y = (3/2)x – 7/5
Second
Case:
You have a graph of a line and need to determine the equation
Look at the graph and find 2 easy points to use to find the slope ( make sure they are integers) If the y intercept is not an integer—then follow the FOURTH CASE (below) completely!
You have a graph of a line and need to determine the equation
Look at the graph and find 2 easy points to use to find the slope ( make sure they are integers) If the y intercept is not an integer—then follow the FOURTH CASE (below) completely!
Put the
information together in y = mx + b form
Third Case:
You are given a point and the slope and need to find the intercept ( b)
Example: ( 3, 1)is a point on the line and m = 2
You are given a point and the slope and need to find the intercept ( b)
Example: ( 3, 1)is a point on the line and m = 2
Plug in the point
and the slope and find b
That is, start
with y = mx + b
You have a point ( 3, 1) plug it in to that equation:
You have a point ( 3, 1) plug it in to that equation:
1 = (2)(3) + b
1 = 6 + b
1 = 6 + b
-5 = b or
b = -5
b = -5
Now put it
altogether with the given slope of m = 2 and the y intercept ( b) which you
just found
y = 2x – 5
Fourth
Case:
You are given a point and the y intercept and need to find the slope > Let’s use the point ( 3, 1) again but this time you are given b = 2
You are given a point and the y intercept and need to find the slope > Let’s use the point ( 3, 1) again but this time you are given b = 2
Again you can use
y = mx + b . This time, however you are solving for m ( the slope)
1 = 3m + 2
-1 = 3m
1 = 3m + 2
-1 = 3m
-1/3 = m
m = -1/3
m = -1/3
Again, NOW put it
all together with the given intercept and the slope you just found
y = (-1/3)x + 2
y = (-1/3)x + 2
Fifth
Case:
You are given 2 points on a line and need to find the slope and the y intercept
Example: ( 1, 3) and ( -2, -3) are 2 points on the line
You are given 2 points on a line and need to find the slope and the y intercept
Example: ( 1, 3) and ( -2, -3) are 2 points on the line
You first need to
find the slope using the formula
m = change in y/ change in x
m = change in y/ change in x
m = (-3 -3)/(-2-1) or (3--3)/(1--2) which really is (3+3)/(1+2) or
6/3 = 2
Now plug the slope
in with one ( you get to pick—it will work with either) of the points and find
the intercept, b
3 = 2(1) + b
3 = 2+b
b = 2
Finally put it all
together
y = 2x +1
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