All Common Core: High School - Geometry Resources
Example Questions
Example Question #51 : Expressing Geometric Properties With Equations
In slope intercept form, find the equation of the line parallel to and goes through the point .
First step is to recall slope intercept form.
Where is the slope, and is a point on the line.
Since we want a line that is parallel, our slope () is going to be the same as the original equation.
So
Then we substitute -7 for and 10 for
After plugging them in, we get.
Now we solve for
Example Question #1 : Prove Slope Criteria For Parallel And Perpendicular Lines: Ccss.Math.Content.Hsg Gpe.B.5
In slope intercept form, find the equation of the line parallel to and goes through the point .
First step is to recall slope intercept form.
Where is the slope, and is a point on the line.
Since we want a line that is parallel, our slope () is going to be the same as the original equation.
So
Then we substitute 7 for and 5 for
After plugging them in, we get.
Now we solve for
Example Question #1 : Prove Slope Criteria For Parallel And Perpendicular Lines: Ccss.Math.Content.Hsg Gpe.B.5
In slope intercept form, find the equation of the line perpendicular to and goes through the point
First step is to recall slope intercept form.
Where is the slope, and is a point on the line.
Since we want a line that is perpendicular, our slope () is going to be the negative reciprocal of the original equation.
So
Then we substitute -10 for and 10 for
After plugging them in, we get.
Now we solve for
Example Question #2 : Prove Slope Criteria For Parallel And Perpendicular Lines: Ccss.Math.Content.Hsg Gpe.B.5
In slope intercept form, find the equation of the line perpendicular to and goes through the point .
First step is to recall slope intercept form.
Where is the slope, and is a point on the line.
Since we want a line that is perpendicular, our slope () is going to be the negative reciprocal of the original equation.
So
Then we substitute 1 for and -2 for
After plugging them in, we get.
Now we solve for
Example Question #4 : Prove Slope Criteria For Parallel And Perpendicular Lines: Ccss.Math.Content.Hsg Gpe.B.5
In slope intercept form, find the equation of the line perpendicular to and goes through the point .
First step is to recall slope intercept form.
Where is the slope, and is a point on the line.
Since we want a line that is perpendicular, our slope () is going to be the negative reciprocal of the original equation.
So
Then we substitute -1 for and -9 for
After plugging them in, we get.
Now we solve for
Example Question #5 : Prove Slope Criteria For Parallel And Perpendicular Lines: Ccss.Math.Content.Hsg Gpe.B.5
In slope intercept form, find the equation of the line perpendicular to and goes through the point .
First step is to recall slope intercept form.
Where is the slope, and is a point on the line.
Since we want a line that is perpendicular, our slope () is going to be the negative reciprocal of the original equation.
So
Then we substitute 2 for and -5 for
After plugging them in, we get.
Now we solve for
Example Question #6 : Prove Slope Criteria For Parallel And Perpendicular Lines: Ccss.Math.Content.Hsg Gpe.B.5
In slope intercept form, find the equation of the line perpendicular to and goes through the point .
First step is to recall slope intercept form.
Where is the slope, and is a point on the line.
Since we want a line that is perpendicular, our slope () is going to be the negative reciprocal of the original equation.
So
Then we substitute 7 for and -5 for
After plugging them in, we get.
Now we solve for
Example Question #3 : Prove Slope Criteria For Parallel And Perpendicular Lines: Ccss.Math.Content.Hsg Gpe.B.5
In slope intercept form, find the equation of the line parallel to and goes through the point .
First step is to recall slope intercept form.
Where is the slope, and is a point on the line.
Since we want a line that is parallel, our slope () is going to be the same as the original equation.
So
Then we substitute -5 for and 6 for
After plugging them in, we get.
Now we solve for
Example Question #9 : Prove Slope Criteria For Parallel And Perpendicular Lines: Ccss.Math.Content.Hsg Gpe.B.5
In slope intercept form, find the equation of the line perpendicular to and goes through the point .
First step is to recall slope intercept form.
Where is the slope, and is a point on the line.
Since we want a line that is perpendicular, our slope () is going to be the negative reciprocal of the original equation.
So
Then we substitute -5 for and -4 for
After plugging them in, we get.
Now we solve for
Example Question #8 : Prove Slope Criteria For Parallel And Perpendicular Lines: Ccss.Math.Content.Hsg Gpe.B.5
In slope intercept form, find the equation of the line perpendicular to and goes through the point .
First step is to recall slope intercept form.
Where is the slope, and is a point on the line.
Since we want a line that is perpendicular, our slope () is going to be the negative reciprocal of the original equation.
So
Then we substitute -5 for and 5 for
After plugging them in, we get.
Now we solve for