If point $Q(0,1)$ is equidistant from points $P(5,-3)$ and $R(x,6)$, find the values of $x$.
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Solution and Explanation
Step 1: Write the condition of equidistance.
\[
QP = QR
\]
Using the distance formula,
\[
\sqrt{(0-5)^2 + (1-(-3))^2} = \sqrt{(0-x)^2 + (1-6)^2}.
\]
Step 2: Simplify both sides.
Left side: $(0-5)^2 = 25$, $(1+3)^2 = 16$
\[
QP = \sqrt{25+16} = \sqrt{41}.
\]
Right side: $(0-x)^2 = x^2$, $(1-6)^2 = 25$
\[
QR = \sqrt{x^2 + 25}.
\]
Step 3: Equating and solving.
\[
\sqrt{41} = \sqrt{x^2 + 25} \ \Rightarrow\ 41 = x^2 + 25 \ \Rightarrow\ x^2 = 16.
\]
\[
x = \pm 4.
\]
Conclusion:
The values of $x$ are $4$ and $-4$.
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