Advertisements
Advertisements
प्रश्न
If (a, b) is the mid-point of the line segment joining the points A(10, –6) and B(k, 4) and a – 2b = 18, find the value of k and the distance AB.
Advertisements
उत्तर
Since, (a, b) is the mid-point of line segment AB.
∴ (a, b) = `((10 + "k")/2, (-6 + 4)/2)` ...`["Since, mid-point of a line segment having points" (x_1, y_1) "and" (x_2, y_2) = ((x_1 + x_2)/2, (y_1 + y_2)/2)]`
⇒ (a, b) = `((10 + "k")/2, -1)`
Now, equating coordinates on both sides, we get
∴ a = `(10 + "k")/2` ...(i)
And b = –1 ...(ii)
Given, a – 2b = 18
From equation (ii),
a – 2(–1) = 18
⇒ a + 2 = 18
⇒ a = 16
From equation (i),
16 = `(10 + "k")/2`
⇒ 32 = 10 + k
⇒ k = 22
Hence, the required value of k is 22.
⇒ k = 22
∴ A = (10 – 6), B = (22, 4)
Now, distance between A(10, –6) and B(22, 4),
AB = `sqrt((22 - 10)^2 + (4 + 6)^2` ...`[∵ "Distance between the point" (x_1, y_1) "and" (x_2, y_2), d = sqrt((x_2 - x_1)^2 + (y_2 - y_1)^2)]`
= `sqrt((12)^2 + (10)^2`
= `sqrt(144 + 100)`
= `sqrt(244)`
= `2sqrt(61)`
Hence, the required distance of AB is `2sqrt(61)`.
APPEARS IN
संबंधित प्रश्न
Show that the points (1, – 1), (5, 2) and (9, 5) are collinear.
Find the values of y for which the distance between the points P (2, -3) and Q (10, y) is 10 units.
If the distance between the points (4, k) and (1, 0) is 5, then what can be the possible values of k?
If the distances of P(x, y) from A(5, 1) and B(–1, 5) are equal, then prove that 3x = 2y
Find the centre of the circle passing through (6, -6), (3, -7) and (3, 3)
Find the distance between the points
(i) A(9,3) and B(15,11)
Find the distance of the following points from the origin:
(ii) B(-5,5)
Distance of point (−3, 4) from the origin is ______.
Find the distance of the following point from the origin :
(13 , 0)
Prove that the points (0 , 2) , (1 , 1) , (4 , 4) and (3 , 5) are the vertices of a rectangle.
Prove that the points (a, b), (a + 3, b + 4), (a − 1, b + 7) and (a − 4, b + 3) are the vertices of a parallelogram.
ABCD is a square . If the coordinates of A and C are (5 , 4) and (-1 , 6) ; find the coordinates of B and D.
The centre of a circle is (2x - 1, 3x + 1). Find x if the circle passes through (-3, -1) and the length of its diameter is 20 unit.
Point P (2, -7) is the centre of a circle with radius 13 unit, PT is perpendicular to chord AB and T = (-2, -4); calculate the length of AB.
By using the distance formula prove that each of the following sets of points are the vertices of a right angled triangle.
(i) (6, 2), (3, -1) and (- 2, 4)
(ii) (-2, 2), (8, -2) and (-4, -3).
The distance between point P(2, 2) and Q(5, x) is 5 cm, then the value of x ______
If the distance between the points (4, P) and (1, 0) is 5, then the value of p is ______.
If the distance between the points (x, -1) and (3, 2) is 5, then the value of x is ______.
|
Case Study Trigonometry in the form of triangulation forms the basis of navigation, whether it is by land, sea or air. GPS a radio navigation system helps to locate our position on earth with the help of satellites. |
- Make a labelled figure on the basis of the given information and calculate the distance of the boat from the foot of the observation tower.
- After 10 minutes, the guard observed that the boat was approaching the tower and its distance from tower is reduced by 240(`sqrt(3)` - 1) m. He immediately raised the alarm. What was the new angle of depression of the boat from the top of the observation tower?
Find distance between points P(– 5, – 7) and Q(0, 3).
By distance formula,
PQ = `sqrt(square + (y_2 - y_1)^2`
= `sqrt(square + square)`
= `sqrt(square + square)`
= `sqrt(square + square)`
= `sqrt(125)`
= `5sqrt(5)`
