Advertisements
Advertisements
प्रश्न
Find the values of k if the points A(k + 1, 2k), B(3k, 2k + 3) and C(5k – 1, 5k) are collinear.
उत्तर
We know that, if three points are collinear, then the area of triangle formed by these points is zero.
Since, the points A(k + 1, 2k), B(3k, 2k + 3) and C(5k – 1, 5k) are collinear.
Then, area of ΔABC = 0
⇒ `1/2[x_1(y_2 - y_3) + x_2(y_3 - y_1) + x_3(y_1 - y_2)]` = 0
Here, x1 = k + 1, x2 = 3k, x3 = 5k – 1 and y1 = 2k1, y2 = 2k + 3, y3 = 5k
⇒ `1/2[(k + 1)(2k + 3 - 5k) + 3k(5k - 2k) + (5k - 1)(2k - (2k + 3))]` = 0
⇒ `1/2[(k + 1)(-3k + 3) + 3k(3k) + (5k - 1)(2k - 2k - 3)]` = 0
⇒ `1/2[-3k^2 + 3k - 3k + 3 + 9k^2 - 15k + 3]` = 0
⇒ `1/2(6k^2 - 15k + 6)` = 0 ...[Multiply by 2]
⇒ 6k2 – 15k + 6 = 0 ...[By factorisation method]
⇒ 2k2 – 5k + 2 = 0 ...[Divide by 3]
⇒ 2k2 – 4k – k + 2 = 0
⇒ 2k(k – 2) – 1(k – 2) = 0
⇒ (k – 2)(2k – 1) = 0
If k – 2 = 0, then k = 2
If 2k – 1 = 0, then k = `1/2`
∴ k = `2, 1/2`
Hence, the required values of k are 2 and `1/2`.
APPEARS IN
संबंधित प्रश्न
Find values of k if area of triangle is 4 square units and vertices are (−2, 0), (0, 4), (0, k)
If area of triangle is 35 square units with vertices (2, −6), (5, 4), and (k, 4), then k is ______.
Find the missing value:
| Base | Height | Area of triangle |
| 15 cm | ______ | 87 cm2 |
Find the area of a triangle two sides of which are 18 cm and 10 cm and the perimeter is 42cm ?
Show that the following points are collinear:
A(5,1), B(1, -1) and C(11, 4)
For what values of k are the points A(8, 1) B(3, -2k) and C(k, -5) collinear.
Using integration, find the area of the triangle whose vertices are (2, 3), (3, 5) and (4, 4).
Using integration, find the area of triangle ABC, whose vertices are A(2, 5), B(4, 7) and C(6, 2).
Let ∆ = `|("A"x, x^2, 1),("B"y, y^2, 1),("C"z, z^2, 1)|`and ∆1 = `|("A", "B", "C"),(x, y, z),(zy, zx, xy)|`, then ______.
The area of a triangle with base 4 cm and height 6 cm is 24 cm2.
