Question:medium
In a plane, \(\vec{a}\) and \(\vec{b}\) are the position vectors of two points \(A\) and \(B\) respectively. A point \(P\) with position vector \(\vec{r}\) moves on that plane in such a way that
\[ |\vec{r} - \vec{a}| - |\vec{r} - \vec{b}| = c \quad (\text{real constant}). \]
The locus of \(P\) is a conic section whose eccentricity is:
In a plane, \(\vec{a}\) and \(\vec{b}\) are the position vectors of two points \(A\) and \(B\) respectively. A point \(P\) with position vector \(\vec{r}\) moves on that plane in such a way that
\[ |\vec{r} - \vec{a}| - |\vec{r} - \vec{b}| = c \quad (\text{real constant}). \]
The locus of \(P\) is a conic section whose eccentricity is:
\[ |\vec{r} - \vec{a}| - |\vec{r} - \vec{b}| = c \quad (\text{real constant}). \]
The locus of \(P\) is a conic section whose eccentricity is:
Show Hint
For conic sections, remember the relationship between eccentricity and focal distances for ellipses, hyperbolas, and parabolas.
Updated On: Nov 28, 2025
- \(\frac{|\vec{a} - \vec{b}|}{c}\)
- \(\frac{|\vec{a} + \vec{b}|}{c}\)
- \(\frac{|\vec{a} - \vec{b}|}{2c}\)
- \(\frac{|\vec{a} + \vec{b}|}{2c}\)
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