If the point $A (2, - 4)$ is equidistant from $P (3, 8)$ and $Q (- 10, y)$ then find the value of $y$ . Also, find distance $P Q$ .

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Solution

Step 1: Apply the distance formula to solve for the value of $y$
According to the question point $A$ is equidistant from points $P$ and $Q$ .
$\Rightarrow$ $A P = A Q$
$\Rightarrow$ $A P^{2} = A Q^{2}$
Given points: $A (2, - 4)$ , $P (3, 8)$ , and $Q (- 10, y)$ .
The formula to find the distance between two points $(x_{1}, y_{1})$ and $(x_{2}, y_{2})$ is given as
$d = \sqrt{{(x_{2} - x_{1})}^{2} + {(y_{2} - y_{1})}^{2}}$
Using the distance formula we can write the above equation as
$\Rightarrow$ ${(2 - 3)}^{2} + {(- 4 - 8)}^{2} = {\{2 - (- 10)\}}^{2} + {(- 4 - y)}^{2}$
$\Rightarrow$ $1 + 144 = 144 + y^{2} + 8 y + 16$
$\Rightarrow$ $y^{2} + 8 y + 15 = 0$
$\Rightarrow$ $(y + 3) (y + 5) = 0$
$\Rightarrow$ $y = - 3$ or $y = - 5$
Step 2: Solve the distance $P Q$ when $y = - 3$
When $y = - 3$ , $Q = (- 10, - 3)$
Applying distance formula to find $P Q$ we get
$P Q$ $= \sqrt{{\{3 - (- 10)\}}^{2} + {\{8 - (- 3)\}}^{2}}$
$= \sqrt{169 + 121}$
$\Rightarrow$ $P Q$ $= \sqrt{290}$ $. . . (i)$
Step 3: Solve for the distance $P Q$ when $y = - 5$
When $y = - 5$ , $Q = (- 10, - 5)$
Applying the distance formula to find $P Q$ we get
$P Q$ $= \sqrt{{\{3 - (- 10)\}}^{2} + {\{8 - (- 5)\}}^{2}}$
$\Rightarrow$ $= \sqrt{169 + 169}$
$\Rightarrow$ $P Q$ $= 13 \sqrt{2}$ $. . . (i i)$
Hence, the value of $y$ is $- 3$ or $- 5$ and the distance $P Q$ is $\sqrt{290}$ units or $13 \sqrt{2}$ units respectively for each value of $y$ .

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