Answer:
(5,12)
Step-by-step explanation:
The co-ordinates of point M is
When provided with points A(x1, y1) and B(x2,y2) then to find the coordinates of the points that divide the line segment AB internally we use the formula
[tex]X=\frac {mx1+nx2}{m+n} and y=\frac {my1+ny2}{m+n}[/tex]
Similarly, for the same points but when it’s divided externally we use the formula
[tex]X=\frac {mx1-nx2}{m-n} and y=\frac {my1-ny2}{m-n}[/tex]
For this case, we use the first formula
M=5 and n=6 hence m+n=11
Total ratio is 5+6=11
Difference in x direction=11-0=11 points
Difference in y direction=0-22=-22 points
Point M=5/11(11, -22)+ point A
Point M=(5,-10)+(0+22)=(5,12)
