Answer:
[tex]m=2/3[/tex], [tex](9,6)[/tex]
Step-by-step explanation:
we know that
A relationship between two variables, x, and y, represent a proportional variation if it can be expressed in the form [tex]y/x=k[/tex] or [tex]y=kx[/tex]
In a proportional relationship the constant of proportionality k is equal to the slope m of the line and the line passes through the origin
Verify each case
case A) For [tex]m=2/3[/tex] point [tex](9,6)[/tex]
The linear direct variation equation is equal to
[tex]y=(2/3)x[/tex]
For [tex]x=9, y=6[/tex]
substitute the value of x and the value of y in the equation and then compare the result
[tex]6=(2/3)(9)[/tex]
[tex]6=6[/tex] ------> is true
therefore
This line represent a direct variation
case B) For [tex]m=2/3[/tex] point [tex](6,9)[/tex]
The linear direct variation equation is equal to
[tex]y=(2/3)x[/tex]
For [tex]x=6, y=9[/tex]
substitute the value of x and the value of y in the equation and then compare the result
[tex]9=(2/3)(6)[/tex]
[tex]9=4[/tex] ------> is not true
therefore
This line not represent a direct variation
case C) For [tex]m=2/3[/tex] point [tex](9,-6)[/tex]
The linear direct variation equation is equal to
[tex]y=(2/3)x[/tex]
For [tex]x=9, y=-6[/tex]
substitute the value of x and the value of y in the equation and then compare the result
[tex]-6=(2/3)(9)[/tex]
[tex]-6=6[/tex] ------> is not true
therefore
This line not represent a direct variation
case D) For [tex]m=-2/3[/tex] point [tex](9,6)[/tex]
The linear direct variation equation is equal to
[tex]y=-(2/3)x[/tex]
For [tex]x=9, y=6[/tex]
substitute the value of x and the value of y in the equation and then compare the result
[tex]6=-(2/3)(9)[/tex]
[tex]6=-6[/tex] ------> is not true
therefore
This line not represent a direct variation
