The locus of the point which is equidistant from the points $A (2, 3)$ and $B (- 3, 4)$ is

5 x - y + 6 = 0

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5 x + y + 6 = 0

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x + 5 y + 6 = 0

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x - 5 y + 6 = 0

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Solution

The correct option is A $5 x - y + 6 = 0$
Let the equidistant point be $P (h, k)$
$P A = P B$
$\Rightarrow P A^{2} = P B^{2} \Rightarrow (h - 2)^{2} + (k - 3)^{2} = (h + 3)^{2} + (k - 4)^{2} \Rightarrow 4 - 4 h + 9 - 6 k = 9 + 6 h + 16 - 8 k \Rightarrow 5 h - k + 6 = 0$

Hence, the locus of $P$ is $5 x - y + 6 = 0$

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