The line segment joining the points $A (2, 1)$ and $B (5, - 8)$ is trisected at the point $P$ and $Q$ such that $P$ is nearer to $A$ . If $P$ also lies on line given by $2 x - y + k = 0$ , find value of $k$ .

Open in App

Solution

Using the section formula, if a point $(x, y)$ divides the line joining the points $(x_{1}, y_{1})$ and $(x_{2}, y_{2})$ in the ratio $m : n$ , then
$(x, y) = (\frac{m x_{2} + n x_{1}}{m + n}, \frac{m y_{2} + n y_{1}}{m + n})$
Since, $P$ and $Q$ are points of trisection and $P$ is nearer to $A$
$⟹ A P : P B = 1 : 2$
So, $P = (\frac{m x_{2} + n x_{1}}{m + n}, \frac{m y_{2} + n y_{1}}{m + n})$

$⟹ (\frac{1 (5) + 2 (2)}{1 + 2}, \frac{1 (- 8) + 2 (1)}{1 + 2})$

$⟹ P (- 3, 2)$ pasees through $2 x - y + k = 0$
$⟹ k = 8$

Suggest Corrections

Similar questions

A (2, 1)

B (5, - 8)

P

Q

P

2 x - y + K = 0

K

P

A (2, 1)

B (5, - 8)

\frac{A P}{A B} = \frac{1}{3}

P

2 x - y + k = 0

k

Join BYJU'S Learning Program