| First lets find the slope through the points (,) and (,) 
 
 Start with the slope formula (note: (,) is the first point (,) and  (,) is the second point (,))
 
 
 Plug in ,,,  (these are the coordinates of given points)
 
 
 Subtract the terms in the numerator  to get .  Subtract the terms in the denominator  to get
 
 
 
 So the slope is
 
 
 
 
 
 
 
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 Now let's use the point-slope formula to find the equation of the line:
 
 
 
 
 ------Point-Slope Formula------
 where  is the slope, and (,) is one of the given points
 
 
 So lets use the Point-Slope Formula to find the equation of the line
 
 
 Plug in , , and  (these values are given)
 
 
 
 Rewrite  as
 
 
 
 Rewrite  as
 
 
 
 Distribute
 
 
 Multiply  and  to get
 
 Subtract  from  both sides to isolate y
 
 
 Combine like terms  and  to get  (note: if you need help with combining fractions, check out this solver)
 
 
 
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 Answer:
 
 
 
 So the equation of the line which goes through the points (,) and (,)  is:
 
 
 The equation is now in  form (which is slope-intercept form) where the slope is  and the y-intercept is
 
 
 Notice if we graph the equation  and plot the points (,) and (,),  we get this: (note: if you need help with graphing, check out this solver)
 
 
 Graph of  through the points (,) and (,)
 
 
 Notice how the two points lie on the line. This graphically verifies our answer.
 
 
 
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