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प्रश्न
If a vertex of a triangle be (1, 1) and the middle points of the sides through it be (-2,-3) and (5 2) find the other vertices.
उत्तर
Let a ΔABC in which P and Q are the mid-points of sides AB and AC respectively. The coordinates are A (1, 1); P (−2, 3) and Q (5, 2).
We have to find the co-ordinates of `B(x_1,y_1)` and `C(x_2,y_2)`.
In general to find the mid-point P(x,y) of two points `A(x_1,y_1) `and `B(x_2,y_2)` we use section formula as,
`P(x,y) = ((x_1 + x_2)/2 , (y_1 + y_2)/2)`
Therefore mid-point P of side AB can be written as,
`P(-2, 3) = ((x_1 + 1)/2, (y_1 + 1)/2)`
Now equate the individual terms to get,
`x_1 = -5`
`y_1 = 5`
So, co-ordinates of B is (−5, 5)
Similarly, mid-point Q of side AC can be written as,
`Q(5, 2) = ((x_2 + 1)/2, (y_2 + 1)/2)`
Now equate the individual terms to get,
`x_2 = 9`
`y_2 = 3`
So, co-ordinates of C is (9, 3)
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संबंधित प्रश्न
If the points A (6, 1), B (8, 2), C (9, 4) and D (k, p) are the vertices of a parallelogram taken in order, then find the values of k and p.
Given a line segment AB joining the points A(−4, 6) and B(8, −3). Find:
- the ratio in which AB is divided by the y-axis.
- find the coordinates of the point of intersection.
- the length of AB.
If two adjacent vertices of a parallelogram are (3, 2) and (−1, 0) and the diagonals intersect at (2, −5), then find the coordinates of the other two vertices.
A (2, 5), B (-1, 2) and C (5, 8) are the vertices of triangle ABC. Point P and Q lie on AB and AC respectively, such that AP: PB = AQ: QC = 1: 2. Calculate the coordinates of P and Q. Also, show that 3PQ = BC.
Find the ratio In which is the segment joining the points (1, - 3} and (4, 5) ls divided by x-axis? Also, find the coordinates of this point on the x-axis.
In the figure given below, the line segment AB meets X-axis at A and Y-axis at B. The point P (- 3, 4) on AB divides it in the ratio 2 : 3. Find the coordinates of A and B.
Point P(– 4, 6) divides point A(– 6, 10) and B(m, n) in the ratio 2:1, then find the coordinates of point B
The points A(x1, y1), B(x2, y2) and C(x3, y3) are the vertices of ∆ABC. The median from A meets BC at D. Find the coordinates of the point D.
Complete the following activity to find the coordinates of point P which divides seg AB in the ratio 3:1 where A(4, – 3) and B(8, 5).
Activity:
∴ By section formula,
∴ x = `("m"x_2 + "n"x_1)/square`,
∴ x = `(3 xx 8 + 1 xx 4)/(3 + 1)`,
= `(square + 4)/4`,
∴ x = `square`,
∴ y = `square/("m" + "n")`
∴ y = `(3 xx 5 + 1 xx (-3))/(3 + 1)`
= `(square - 3)/4`
∴ y = `square`
Find the ratio in which the line segment joining the points A(6, 3) and B(–2, –5) is divided by x-axis.
