If P(2, m) is the midpoint of the line joining Q(m, n) and R(n, -4), find the values of m and n.
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Correct Answer: Option a
Explanation:
Q(m, n) and R(n, -4)
Midpoint : P(2, m)
\(\implies (\frac{m + n}{2}, \frac{n - 4}{2}) = (2, m)\)
\(m + n = 2 \times 2 \implies m + n = 4 ... (i)\)
\(n - 4 = 2 \times m \implies n - 4 = 2m ... (ii)\)
Solving (i) and (ii) simultaneously,
m = 0 and n = 4.
Q(m, n) and R(n, -4)
Midpoint : P(2, m)
\(\implies (\frac{m + n}{2}, \frac{n - 4}{2}) = (2, m)\)
\(m + n = 2 \times 2 \implies m + n = 4 ... (i)\)
\(n - 4 = 2 \times m \implies n - 4 = 2m ... (ii)\)
Solving (i) and (ii) simultaneously,
m = 0 and n = 4.