Find the coordinates of a point on the line x + y = 5 which is equidistant from (6, 4) and (5, 2).

Question

Q) Find the coordinates of a point on the line x + y = 5 which is equidistant from (6, 4) and (5, 2).
(Q 25B - 30/3/3 - CBSE 2026 Question Paper)

Sapling Academy · Accepted Answer

Let the coordinates of the this point be (x, y)
Step 1: Since this point lies on equation, it will satisfy the line equation
∴ x + y = 5 ........ (i)
Step 2: Since its equidistant from points (6, 4) and (5, 2);
∴ Distance between (x, y) and (6, 4) = Distance between (x, y) and (5, 2)
Since the distance between (x1, y1) and (x2, y2) is given by:
D = $\sqrt{(x_2-x_1)^2 +(y_2-y_1)^2}$
∴ $\sqrt{(6-x)^2 +(4-y)^2} = \sqrt{(5-x)^2 +(2-y)^2}$
By squaring on both sides, we get:
(6 - x) 2 + (4 - y) 2 = ( 5 - x) 2 + ( 2 - y) 2 
By applying albebraic identity of (a - b) 2 = a 2 + b 2 - 2 a b, we get:
(36 + x 2 - 12 x + 16 + y 2 - 8 y) = (25 + x 2 - 10 x + 4 + y 2 - 4 y)
(36 + $\cancel{x^2}$ - 12 x + 16 + $\cancel{y^2}$ - 8 y) = (25 + $\cancel{x^2}$ - 10 x + 4 + $\cancel{y^2}$ - 4 y)
∴ 52 - 12 x - 8 y = 29 - 10 x - 4 y
∴ (29 - 10 x - 4 y) - (52 - 12 x - 8 y) = 0
∴ 29 - 10 x - 4 y - 52 + 12 x + 8y = 0
∴ 2 x + 4 y = 23 ...... (ii)
Step 3: Let's multiply equation (i) by 2 and subtract equation (ii):
∴ 2 x + 4 y - 2 (x + y) = 23 - 2 (5)
∴ 2 x + 4 y - 2 x - 2 y = 23 - 10
∴ $\cancel{2x}$ + 4 y - $\cancel{2x}$ - 2 y = 13
∴ 2 y = 13
∴ y = $\frac{13}{2}$
Step 4: By substituting value of y in equation (i), we get:
x + y = 5
∴ x = 5 - y = 5 - $\frac{13}{2}$
∴ x = $\frac{-3}{2}$
Therefore, the coordinates of the point are $(\frac{-3}{2}, \frac{13}{2})$.
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