MCQMediumJEE 2025Skew Lines & Shortest Distance

JEE Mathematics 2025 Question with Solution

Let L1:x12=y23=z34L_1: \frac{x-1}{2} = \frac{y-2}{3} = \frac{z-3}{4} and L2:x23=y44=z55L_2: \frac{x-2}{3} = \frac{y-4}{4} = \frac{z-5}{5} be two lines. Then which of the following points lies on the line of the shortest distance between L1L_1 and L2L_2?

  • A

    (53,7,1)\left( \frac{-5}{3}, -7, 1 \right)

  • B

    (2,3,13)(2, 3, \frac{1}{3})

  • C

    (83,1,13)\left( \frac{8}{3}, -1, \frac{1}{3} \right)

  • D

    (143,3,223)\left( \frac{14}{3}, -3, \frac{22}{3} \right)

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given:

L1:x12=y23=z34L_1: \frac{x-1}{2} = \frac{y-2}{3} = \frac{z-3}{4}

and

L2:x23=y44=z55L_2: \frac{x-2}{3} = \frac{y-4}{4} = \frac{z-5}{5}

Find: Which given point lies on the line of shortest distance between L1L_1 and L2L_2.

Let point PP on L1L_1 be

P(2λ+1,3λ+2,4λ+3)P(2\lambda + 1, 3\lambda + 2, 4\lambda + 3)

and point QQ on L2L_2 be

Q(3μ+2,4μ+4,5μ+5)Q(3\mu + 2, 4\mu + 4, 5\mu + 5)

Then the direction ratios of PQPQ are

(3μ2λ+1,4μ3λ+2,5μ4λ+2)(3\mu - 2\lambda + 1, 4\mu - 3\lambda + 2, 5\mu - 4\lambda + 2)

Since the line of shortest distance is perpendicular to both lines, we use

PQ(2,3,4)=0PQ \cdot (2,3,4) = 0

and

PQ(3,4,5)=0PQ \cdot (3,4,5) = 0

So,

2(3μ2λ+1)+3(4μ3λ+2)+4(5μ4λ+2)=02(3\mu - 2\lambda + 1) + 3(4\mu - 3\lambda + 2) + 4(5\mu - 4\lambda + 2) = 0 38μ29λ+16=038\mu - 29\lambda + 16 = 0

Also,

3(3μ2λ+1)+4(4μ3λ+2)+5(5μ4λ+2)=03(3\mu - 2\lambda + 1) + 4(4\mu - 3\lambda + 2) + 5(5\mu - 4\lambda + 2) = 0 50μ38λ+21=050\mu - 38\lambda + 21 = 0

Solving these two equations,

λ=13,μ=16\lambda = \frac{1}{3}, \qquad \mu = -\frac{1}{6}

Hence,

P=(53,3,133)P = \left( \frac{5}{3}, 3, \frac{13}{3} \right)

and

Q=(32,103,256)Q = \left( \frac{3}{2}, \frac{10}{3}, \frac{25}{6} \right)

Therefore, direction ratios of PQPQ are

QP=(16,13,16)Q-P = \left( \frac{1}{6}, -\frac{1}{3}, \frac{1}{6} \right)

So the equation of the line of shortest distance is

x531=y32=z1331\frac{x - \frac{5}{3}}{1} = \frac{y - 3}{-2} = \frac{z - \frac{13}{3}}{1}

Now check option DD, (143,3,223)\left( \frac{14}{3}, -3, \frac{22}{3} \right):

14/35/31=3,332=3,22/313/31=3\frac{14/3 - 5/3}{1} = 3, \qquad \frac{-3 - 3}{-2} = 3, \qquad \frac{22/3 - 13/3}{1} = 3

All three ratios are equal, so this point lies on the required line.

Therefore, the correct option is D.

Verify using the given options

Given: The line of shortest distance between two skew lines joins points on the two lines and is perpendicular to both.

Find: Which option lies on that line.

Take

P(2λ+1,3λ+2,4λ+3)L1P(2\lambda + 1, 3\lambda + 2, 4\lambda + 3) \in L_1

and

Q(3μ+2,4μ+4,5μ+5)L2Q(3\mu + 2, 4\mu + 4, 5\mu + 5) \in L_2

Then

PQ=(3μ2λ+1,4μ3λ+2,5μ4λ+2)\overrightarrow{PQ} = (3\mu - 2\lambda + 1, 4\mu - 3\lambda + 2, 5\mu - 4\lambda + 2)

Using perpendicularity with direction vectors (2,3,4)(2,3,4) and (3,4,5)(3,4,5), we get

2(3μ2λ+1)+3(4μ3λ+2)+4(5μ4λ+2)=038μ29λ+16=0\begin{aligned} 2(3\mu - 2\lambda + 1) + 3(4\mu - 3\lambda + 2) + 4(5\mu - 4\lambda + 2) &= 0 \\ 38\mu - 29\lambda + 16 &= 0 \end{aligned}

and

3(3μ2λ+1)+4(4μ3λ+2)+5(5μ4λ+2)=050μ38λ+21=0\begin{aligned} 3(3\mu - 2\lambda + 1) + 4(4\mu - 3\lambda + 2) + 5(5\mu - 4\lambda + 2) &= 0 \\ 50\mu - 38\lambda + 21 &= 0 \end{aligned}

From these,

λ=13,μ=16\lambda = \frac{1}{3}, \qquad \mu = -\frac{1}{6}

Hence the required line is

x531=y32=z1331\frac{x - \frac{5}{3}}{1} = \frac{y - 3}{-2} = \frac{z - \frac{13}{3}}{1}

Now testing the option points, the point

(143,3,223)\left( \frac{14}{3}, -3, \frac{22}{3} \right)

satisfies all three equal ratios and hence lies on the line.

Therefore, the point on the line of shortest distance is (143,3,223)\left( \frac{14}{3}, -3, \frac{22}{3} \right), so the correct option is D.

Common mistakes

  • Students often assume the line of shortest distance only needs to join any point on L1L_1 to any point on L2L_2. This is wrong because the shortest distance segment must be perpendicular to both lines. Always apply the two dot product conditions with both direction vectors.

  • A common mistake is using the wrong direction vectors for the lines, such as mixing (2,3,4)(2,3,4) and (3,4,5)(3,4,5) with the point coordinates. The ratios in the symmetric form give the direction vectors directly. Use (2,3,4)(2,3,4) for L1L_1 and (3,4,5)(3,4,5) for L2L_2.

  • Some students form PQ\overrightarrow{PQ} incorrectly by subtracting coordinates in the wrong order. That changes the equations and leads to wrong values of λ\lambda and μ\mu. Compute each component carefully from QPQ-P or PQP-Q and then use the same choice consistently.

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