Answer:
The coordinates of C is (-8,1)
Step-by-step explanation:
Looking at the attached image, you'd see that, AB is 1 and BC is 1, that's because we are told that ratio of AB to AC is 1:2 meaning, AC is 2 and AB is 1. Therefore for that ratio to be satisfied BC has to be 1 so that AC would be 2.
Now let's assume the coordinates of C is [tex](x,y)[/tex].
To get it's coordinates, we use the section formula:
[tex](x,y)= (\frac{mx + nx_{1}}{m + n} , \frac{my + ny_{1}}{m + n})[/tex]
Where (m,n) is the (AB, BC)
Therefore we have
[tex](-1,2) = (\frac{1\times x + 1\times6}{1 + 1} , \frac{1\times y + 1\times3}{1 + 1})[/tex]
This gives:
[tex](-1,2) = (\frac{x + 6}{2} , \frac{y + 3}{2})[/tex]
[tex]-1 =( \frac{x + 6}{2}[/tex] and [tex]2 = \frac{y + 3}{2})[/tex]
From there x = -8 and y = 1
Therefore the coordinates of C is (-8, 1).
