Advertisements
Advertisements
प्रश्न
If A (2, 2), B (−4, −4) and C (5, −8) are the vertices of a triangle, than the length of the median through vertex C is
पर्याय
- \[\sqrt{65}\]
- \[\sqrt{117}\]
- \[\sqrt{85}\]
- \[\sqrt{113}\]
Advertisements
उत्तर
We have a triangle ΔABC in which the co-ordinates of the vertices are A (2, 2) B (−4,−4) and C (5,−8).
In general to find the mid-point P (x , y) of two points A(x1 , y1 ) and B (x2 , y2) we use section formula as,
`P(x , y) = ((x_1 + x_2 )/2 , (y_1 + y_2 ) / 2)`
Therefore mid-point D of side AB can be written as,
`D(x ,y ) = ((2-4)/2 , (2-4)/2)`
Now equate the individual terms to get,
x = -1
y = - 1
So co-ordinates of D is (−1,−1)
So the length of median from C to the side AB,
`CD = sqrt((5 +1)^2 + (-8 + 2)^2)`
`= sqrt(36 + 49 )`
`= sqrt(85)`
APPEARS IN
संबंधित प्रश्न
On which axis do the following points lie?
Q(0, -2)
Find the ratio in which the point (2, y) divides the line segment joining the points A (-2,2) and B (3, 7). Also, find the value of y.
In what ratio does the point (−4, 6) divide the line segment joining the points A(−6, 10) and B(3,−8)?
If the poin A(0,2) is equidistant form the points B (3, p) and C (p ,5) find the value of p. Also, find the length of AB.
Find the points on the x-axis, each of which is at a distance of 10 units from the point A(11, –8).
Find the co-ordinates of the point equidistant from three given points A(5,3), B(5, -5) and C(1,- 5).
If the point A (4,3) and B ( x,5) lies on a circle with the centre o (2,3) . Find the value of x.
In what ratio is the line segment joining A(2, -3) and B(5, 6) divide by the x-axis? Also, find the coordinates of the pint of division.
In what ratio does y-axis divide the line segment joining the points (-4, 7) and (3, -7)?
Find the coordinates of the points of trisection of the line segment joining the points (3, –2) and (–3, –4) ?
Find the value of k, if the points A (8, 1) B(3, −4) and C(2, k) are collinear.
Find the value of a for which the area of the triangle formed by the points A(a, 2a), B(−2, 6) and C(3, 1) is 10 square units.
Write the perimeter of the triangle formed by the points O (0, 0), A (a, 0) and B (0, b).
If the centroid of the triangle formed by points P (a, b), Q(b, c) and R (c, a) is at the origin, what is the value of a + b + c?
Find the point on the y-axis which is equidistant from the points (5, −2) and (−3, 2).
If segment AB is parallel Y-axis and coordinates of A are (1, 3), then the coordinates of B are ______.
If the sum of X-coordinates of the vertices of a triangle is 12 and the sum of Y-coordinates is 9, then the coordinates of centroid are ______.
What are the coordinates of origin?
If the points P(1, 2), Q(0, 0) and R(x, y) are collinear, then find the relation between x and y.
Given points are P(1, 2), Q(0, 0) and R(x, y).
The given points are collinear, so the area of the triangle formed by them is `square`.
∴ `1/2 |x_1(y_2 - y_3) + x_2(y_3 - y_1) + x_3(y_1 - y_2)| = square`
`1/2 |1(square) + 0(square) + x(square)| = square`
`square + square + square` = 0
`square + square` = 0
`square = square`
Hence, the relation between x and y is `square`.
The distance of the point (3, 5) from x-axis (in units) is ______.
