TS EAMCET · Maths · Parabola
If the focal distance of a point \(\mathrm{P}\left(2, \mathrm{y}_1\right)\) on the parabola \(\mathrm{y}^2=\mathrm{kx}\) is 3 , then the equation of the tangent drawn at \(\mathrm{P}\) to the given parabola is
- A \(x \pm 2 \sqrt{2} y+4=0\)
- B \(x \pm 2 \sqrt{2} y+2=0\)
- C \(x \pm \sqrt{2} y+4=0\)
- D \(x \pm \sqrt{2} y+2=0\)
Answer & Solution
Correct Answer
(D) \(x \pm \sqrt{2} y+2=0\)
Step-by-step Solution
Detailed explanation
Since \(P\left(2, y_1\right)\) lies on \(y^2=k x\) \[ \begin{aligned} & \Rightarrow y_1{ }^2=2 k \Rightarrow y_1=\sqrt{2 k} \\ & \therefore P\left(2, y_1\right) \equiv P(2, \sqrt{2 k}) \end{aligned} \] Focus of \(y^2=k x\) will be \(\left(\frac{k}{4}, 0\right)\)…
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