The coordinates of the point of trisection of the line segment joining the points A(4, 8) and B(-2, 4) are
Let, P and Q be point of Trisection.
AP = PQ = QB and AP:PB = 1:2
The part of the line from (4, 8) to P is one third of AB.
Coordinates by section formula (x,y)=(mx2+nx1m+n,my2+ny1m+n)
∴ x-coordinate of P =4×2−2×13=8−23=2
y-coordinate of P =8×2+4×13=16+43=203
Therefore coordinates of point P are (2,203)
Also since AP = PQ = QB, AQ:QB = 2:1
The part of the line from (4,8) to Q is two third the length of AB.
Again, by section formula we have,
x-coordinate of Q =4×1−2×23=0
y-coordinate of Q =8×1+4×23=163
Therefore coordinates of point Q are (0,163)