Tag: distance from a point to line
Questions Related to distance from a point to line
The length of the perpendicular drawn from the points $(5,4,-1)$ to the line $\overline r = \widehat i + \lambda \left( {2\widehat i + 9\widehat i + 5\widehat k} \right)$ is
The perpendicular distance of the point $(2,4,-1)$ from the line $\dfrac{x+5}{1}=\dfrac{y+3}{4}=\dfrac{z-6}{-9}$ is
A point on the line $\bar {r}=2\hat {i}+3\hat {j}+4\hat {k}+t(\hat {i}+\hat {j}+\hat {k})$ is
Perpendicular distance between the plane $ 2 x-y+2 z=1 $ and origin is
The position vector of point $A$ is $(4, 2, -3)$. If $p {1}$ is perpendicular distance of $A$ from $XY-plane$ and $p _{2}$ is perpendicular distance from Y-axis, then $p _{1} + p _{2} =$ ______.
The perpendicular distance from a point $P$ with position vector $5\vec {i}+\vec {j}+3\vec {k} $ to the line $\vec {r}=(3\vec {i}+7\vec {j}+\vec {k})+t(\vec {j}+\vec {k})$ is
The perpendicular distance of the point $(6, -4, 4)$ on to the line joining the points $A(2, 1, 2), B(3, -1, 4)$ is?
Find point $Q$, the foot of perpendicular drawn on line repeat $AB$, from $P\ A(1, 2, 4)\ B(3, 4,5)\ P(2, 4, 3)$.
The length of the perpendicular drawn from the point $( 3 , - 1,11 )$ to the line $\dfrac { x } { 2 } = \dfrac { y - 2 } { 3 } = \dfrac { z - 3 } { 4 } $ is:
The perpendicular distance of $p _1, p _2, p _3$ of points $({a^2}, 2a), \, (ab, a + b), \, ({b^2}, 2b)$ respectively from straight line $x + y\tan \theta + {{tan}^2} \theta = 0$ are in :