Advertisements
Advertisements
Question
The line joining the points (2, 1) and (5, -8) is trisected at the points P and Q. If point P lies on the line 2x - y + k = 0. Find the value of k.
Solution
We have two points A (2, 1) and B (5,-8). There are two points P and Q which trisect the line segment joining A and B.
Now according to the section formula if any point P divides a line segment joining `A(x_1,y_1)` and `B(x_2,y_2)`in the ratio m: n internally than,
`P(x,y) = ((nx_1 + mx_2)/(m + n), (ny_1 + my_2)/(m + n))`
The point P is the point of trisection of the line segment AB. So, P divides AB in the ratio 1: 2
Now we will use section formula to find the co-ordinates of unknown point A as,
`p(x_1,y_1) = ((1(5) + 2(2))/(1 + 2)"," (2(1) + 1(-8))/(1 + 2))`
Therefore, co-ordinates of point P is(3,-2)
It is given that point P lies on the line whose equation is `2x - y + k = 0`
So point A will satisfy this equation.
2(4) - 0 + k = 0
So,
k = -8
APPEARS IN
RELATED QUESTIONS
Which point on the x-axis is equidistant from (5, 9) and (−4, 6)?
Find the coordinates of the point which divides the line segment joining (−1,3) and (4, −7) internally in the ratio 3 : 4
Find the ratio in which the line segment joining (-2, -3) and (5, 6) is divided by y-axis. Also, find the coordinates of the point of division in each case.
Find the coordinates of the points which divide the line segment joining the points (-4, 0) and (0, 6) in four equal parts.
In what ratio does the line x - y - 2 = 0 divide the line segment joining the points A (3, 1) and B (8, 9)?
The midpoint P of the line segment joining points A(-10, 4) and B(-2, 0) lies on the line segment joining the points C(-9, -4) and D(-4, y). Find the ratio in which P divides CD. Also, find the value of y.
If the vertices of ΔABC be A(1, -3) B(4, p) and C(-9, 7) and its area is 15 square units, find the values of p
Find the ratio in which the line segment joining the points A(3, 8) and B(–9, 3) is divided by the Y– axis.
A point whose abscissa and ordinate are 2 and −5 respectively, lies in
If the points A(−2, 1), B(a, b) and C(4, −1) ae collinear and a − b = 1, find the values of aand b.
If the points A(1, –2), B(2, 3) C(a, 2) and D(– 4, –3) form a parallelogram, find the value of a and height of the parallelogram taking AB as base.
Write the ratio in which the line segment joining points (2, 3) and (3, −2) is divided by X axis.
Write the coordinates the reflections of points (3, 5) in X and Y -axes.
If x is a positive integer such that the distance between points P (x, 2) and Q (3, −6) is 10 units, then x =
If the points (k, 2k), (3k, 3k) and (3, 1) are collinear, then k
If the points P (x, y) is equidistant from A (5, 1) and B (−1, 5), then
Any point on the line y = x is of the form ______.
Abscissa of all the points on the x-axis is ______.
Assertion (A): The ratio in which the line segment joining (2, -3) and (5, 6) internally divided by x-axis is 1:2.
Reason (R): as formula for the internal division is `((mx_2 + nx_1)/(m + n) , (my_2 + ny_1)/(m + n))`
Statement A (Assertion): If the coordinates of the mid-points of the sides AB and AC of ∆ABC are D(3, 5) and E(–3, –3) respectively, then BC = 20 units.
Statement R (Reason): The line joining the mid-points of two sides of a triangle is parallel to the third side and equal to half of it.
