JEE Mains · Maths · STD 11 - 10.2 parabola,ellipse,hyperbola
Let the focal chord of the parabola \(P: y^{2}=4 x\) along the line \(L: y=m x+c, m>0\) meet the parabola at the points \(M\) and \(N\). Let the line \(L\) be a tangent to the hyperbola \(H : x ^{2}- y ^{2}=4\). If \(O\) is the vertex of \(P\) and \(F\) is the focus of \(H\) on the positive \(x\)-axis, then the area of the quadrilateral \(OMFN\) is.
- A \(2 \sqrt{6}\)
- B \(2 \sqrt{14}\)
- C \(4 \sqrt{6}\)
- D \(4 \sqrt{14}\)
Answer & Solution
Correct Answer
(B) \(2 \sqrt{14}\)
Step-by-step Solution
Detailed explanation
\(H : \frac{ x ^{2}}{4}-\frac{ y ^{2}}{4}=1\) Focus (ae, 0) \(F (2 \sqrt{2}, 0)\) Line L: \(y = mx + c\) pass \((1,0)\) \(o = m + C\).......(1) Line \(L\) is tangent to Hyperbola. \(\frac{ x ^{2}}{4}-\frac{ y ^{2}}{4}=1\) \(C=\pm \sqrt{a^{2} m^{2}-\ell^{2}}\)…
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