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Question 220921: find an equation of the line containg the given pair of points (-2,-9) and (-6,-4)
Answer by drj(1380)   (Show Source):
You can put this solution on YOUR website! Find an equation of the line containg the given pair of points (-2,-9) and (-6,-4)
However, here are the steps showing you how you can check your work with one of the points.
Step 1. The slope of the line m is given as
where for our example is x1=-2, y1=-9, x2=-6 and y2=-4 (think of  ). You can choose the points the other way around but be consistent with the x and y coordinates. You will get the same result.
Step 2. Substituting the above values in the slope equation gives
Step 3. The slope is calculated as -5/4 or m=-5/4
Step 4. Now use the slope equation of step 1 and choose one of the given points. I'll choose point (-2, -9). Letting y=y2 and x=x2 and substituting m=-3 in the slope equation given as,
Step 5. Multiply both sides of equation by x+2 to get rid of denomination found on the right side of the equation
Step 6. Now simplify and put the above equation into slope-intercept form.
Subtract 9 from both sides of the equation
 ANSWER in slope-intercept form. m=-5/4 and y-intercept=-23/2
Step 7. See if the other point (-6,-4) or x=-6 and y=-4 satisfies this equation
 So the point (-6,-4) satisfies the equation and is on the line. In other words, you can use the other point to check your work.
Note; above equation can be also be transform into standard form as
See graph below to check the above steps.
I hope the above steps were helpful.
And good luck in your studies!
For free Step-By-Step Videos on Introduction to Algebra, please visit http://www.FreedomUniversity.TV/courses/IntroAlgebra or for Trigonometry visit http://www.FreedomUniversity.TV/courses/Trigonometry.
Respectfully,
Dr J
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