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प्रश्न
Find the lengths of the medians of a triangle whose vertices are A (−1, 3), B (1, −1), and C (5, 1).
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उत्तर
We have to find the lengths of the medians of a triangle whose co-ordinates of the vertices are A (−1, 3); B (1, −1), and C (5, 1).
So we should find the midpoints of the triangle’s sides.
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 P of side AB can be written as,
`P (x, y) = ((-1 + 1) / 2, (3 -1) / 2)`
Now equate the individual terms to get,
x = 0
y = 1
So co-ordinates of P are (0, 1)
Similarly, mid-point Q of side BC can be written as,
`Q (x, y) = ((5 + 1)/2, (1 - 1) / 2)`
Now equate the individual terms to get,
x = 3
y = 0
So co-ordinates of Q are (3, 0)
Similarly, mid-point R of side AC can be written as,
`R (x, y) = ((5 - 1) / 2, (1 + 3) / 2)`
Now equate the individual terms to get,
x = 2
y = 2
So co-ordinates of Q are (2, 2)
Therefore length of the median from A to the side BC is,
AQ = `sqrt((-1 -3)^2 + (3 - 0)^2)`
= `sqrt(16 + 9)`
= 5
Similarly length of the median from B to the side AC is,
BR = `sqrt((1- 2)^2 + (-1 - 2)^2)`
= `sqrt(1 + 9)`
= `sqrt(10)`
Similarly length of the median from C to the side AB is
CP = `sqrt((5 - 0)^2 + (1 - 1)^2)`
= `sqrt25`
= 5
