To find the coordinate of A you can first determine the coordinate of D and apply the midpoint rule.
And to find the coordinates of D you must solve equations of AC and BD simultaneously.
AC has equation
[tex]y=-\frac{2}{3} x+ \frac{20}{3}[/tex]
Or
[tex] 3y+2x=20 --(1) [/tex]
BD has equation
[tex]y= \frac{3}{2}x -2[/tex]
Or
[tex] 2y-3x=-4 --(2)[/tex]
Multiply equation (1) by 2 and multiply equation (2) by 3 to obtain,
[tex] 6y+4x=40 --(3) [/tex]
[tex] 6y-9x=-12 --(4)[/tex]
Equation (3) minus equation (4)
gives
[tex] 13x=52[/tex]
[tex]\therefore x=4[/tex]
Putting the value of x=4 in equation (4) gives
[tex] 6y-9(4)=-12 [/tex]
This implies that
[tex] 6y-36=-12 [/tex]
[tex] 6y=36-12 [/tex]
[tex] 6y=24 [/tex]
[tex]\therefore y=4 [/tex]
Solving the equations of AC and BD simultaneously give the coordinates of D to be;
[tex]x= 4,y=4[/tex]
Let
[tex]A(m,n)[/tex] be the coordinates.
Since D is the midpoint of AC
[tex]\frac{m+10}{2}=4[/tex]
and
[tex]\frac{n+0}{2}=4[/tex]
Solving for m and n, we have
[tex] m=4×2-10=-2[/tex]
And
[tex] n=4×2=8[/tex]
Therefore A has coordinates
[tex] (-2,8)/tex]
