Given the line passes through the points:
A = ( -5 , -2 ) , B = ( -2 , 0 ) and C = ( 4 , 4 )
Now, we will check which statements is not true:
1) The slope of AB is different than the slope of BC
This is not true, because the three points are on the same line
So, the slope of AB = the slope of BC
2) The ratios of the rise to the run for the triangles are equivalent
This is true, the ratios rise to the run are equal to the slope
As the slope is constant the ratios will be constant
3) AB has the same slope of AC
This is true, the three points are on the same line
4) the slope of AC = 2/3
Slope = Rise/Run
Rise = 4 - (-2) = 4 + 2 = 6
Run = 4 - (-5) = 4 + 5 = 9
So, the slope = 6/9 = 2/3
So, the statement is true
So, the wrong statement is the first one which is:
The slope of AB is different than the slope of BC