MCQMediumJEE 2025Equation of Line in 3D

JEE Mathematics 2025 Question with Solution

The distance of the point (7,10,11)(7, 10, 11) from the line x41=y40=z23\frac{x - 4}{1} = \frac{y - 4}{0} = \frac{z - 2}{3} along the line x72=y103=z116\frac{x - 7}{2} = \frac{y - 10}{3} = \frac{z - 11}{6} is

  • A

    1818

  • B

    1414

  • C

    1212

  • D

    1616

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: Point is P(7,10,11)P(7,10,11). The line is L1:x41=y40=z23L_1: \frac{x-4}{1}=\frac{y-4}{0}=\frac{z-2}{3} and the distance is to be measured along the line L2:x72=y103=z116L_2: \frac{x-7}{2}=\frac{y-10}{3}=\frac{z-11}{6}.

Find: The distance of point PP from line L1L_1 along line L2L_2.

Take a general point on L1L_1 by putting

x41=y40=z23=λ\frac{x-4}{1}=\frac{y-4}{0}=\frac{z-2}{3}=\lambda

Then

x=4+λ,y=4,z=2+3λx=4+\lambda,\quad y=4,\quad z=2+3\lambda

So a general point on L1L_1 is Q(4+λ,4,2+3λ)Q(4+\lambda,4,2+3\lambda).

A general point on L2L_2 is obtained by putting

x72=y103=z116=μ\frac{x-7}{2}=\frac{y-10}{3}=\frac{z-11}{6}=\mu

Thus

x=7+2μ,y=10+3μ,z=11+6μx=7+2\mu,\quad y=10+3\mu,\quad z=11+6\mu

Using intersection of the two lines

At the point of intersection, coordinates from the two lines must be equal. Therefore,

4+λ=7+2μ4+\lambda=7+2\mu 4=10+3μ4=10+3\mu 2+3λ=11+6μ2+3\lambda=11+6\mu

From

4=10+3μ4=10+3\mu

we get

3μ=6μ=23\mu=-6 \Rightarrow \mu=-2

Now substitute in

4+λ=7+2μ4+\lambda=7+2\mu

So,

4+λ=74=34+\lambda=7-4=3 λ=1\lambda=-1

Hence the intersection point is

Q=(41,4,2+3(1))=(3,4,1)Q=(4-1,4,2+3(-1))=(3,4,-1)

The required distance is PQPQ:

PQ=(73)2+(104)2+(11(1))2PQ=\sqrt{(7-3)^2+(10-4)^2+(11-(-1))^2} =42+62+122=\sqrt{4^2+6^2+12^2} =16+36+144=\sqrt{16+36+144} =196=14=\sqrt{196}=14

Therefore, the required distance is 1414, so the correct option is B.

Using parallel direction ratios

Given: P(7,10,11)P(7,10,11) and a variable point QQ on L1L_1.

Find: Distance PQPQ when PQPQ is along the given line with direction ratios (2,3,6)(2,3,6).

Let

Q=(λ+4,4,3λ+2)Q=(\lambda+4,4,3\lambda+2)

Then direction ratios of PQPQ are

(λ+47,  410,  3λ+211)=(λ3,6,3λ9)(\lambda+4-7,\;4-10,\;3\lambda+2-11)=(\lambda-3,-6,3\lambda-9)

Since PQPQ is parallel to the line with direction ratios (2,3,6)(2,3,6),

λ32=63=3λ96\frac{\lambda-3}{2}=\frac{-6}{3}=\frac{3\lambda-9}{6}

Now

63=2\frac{-6}{3}=-2

So,

λ32=2λ3=4λ=1\frac{\lambda-3}{2}=-2 \Rightarrow \lambda-3=-4 \Rightarrow \lambda=-1

Thus

Q=(3,4,1)Q=(3,4,-1)

Therefore,

PQ=(73)2+(104)2+(11+1)2=196=14PQ=\sqrt{(7-3)^2+(10-4)^2+(11+1)^2}=\sqrt{196}=14

Hence the correct option is B.

Common mistakes

  • Treating the problem as the shortest distance from a point to a line is incorrect. Here the distance is measured along a given line, so the joining line must be parallel to the second line, not perpendicular to the first line.

  • Misreading y40\frac{y-4}{0} and trying to divide by zero is wrong. It means the direction ratio along yy is 00, so on L1L_1 the coordinate remains constant: y=4y=4.

  • While forming the point on L1L_1, students may write Q=(4+λ,λ+4,2+3λ)Q=(4+\lambda,\lambda+4,2+3\lambda). This is incorrect because the middle direction ratio is 00. The correct point is Q=(4+λ,4,2+3λ)Q=(4+\lambda,4,2+3\lambda).

Practice more Equation of Line in 3D questions

Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.

Related questions