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प्रश्न
Find equations of lines which contains the point A(1, 3) and the sum of whose intercepts on the coordinate axes is zero.
उत्तर
Let the intercepts made by the line on the coordinate axes be a and b respectively.
∴ a + b = 0 ...(1)
The equation of the line is `x/"a" + y/"b"` = 1.
Since the line passes through the point A(1, 3),
`1/"a" + 3/"b"` = 1
∴ b + 3a = ab ...(2)
From (1), a = – b
Substituting a = – b in (2), we get,
b – 3b = – b(b)
∴ – 2b = – b2
∴ b2 – 2b = 0
∴ b(b – 2) = 0
∴ b = 0 or b – 2 = 0
∴ b = 0 or b = 2
By (1), when b = 0, a = 0
and when b = 2, a = – 2
When a = – 2, b = 2, equation of the line is
`x/(-2) + y/2` = 1
∴ – x + y = 2
∴ x – y + 2 = 0
When a = 0, b = 0, the line is passing through the origin.
∴ its equation is
y = mx
Since this line passes through A(1, 3),
3 = m(1)
∴ m = 3
∴ equation of the line is
y = 3x, i.e., 3x – y = 0
Hence, equations of required lines are x – y + 2 = 0 and 3x – y = 0.
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