MCQMediumJEE 2025Skew Lines & Shortest Distance

JEE Mathematics 2025 Question with Solution

If the shortest distance between the lines x12=y23=z34\frac{x-1}{2} = \frac{y-2}{3} = \frac{z-3}{4} and x1=yα=z51\frac{x}{1} = \frac{y}{\alpha} = \frac{z-5}{1} is 56\frac{5}{\sqrt{6}}, then the sum of all possible values of α\alpha is:

  • A

    32\frac{3}{2}

  • B

    32\frac{-3}{2}

  • C

    33

  • D

    3-3

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: The lines are

x12=y23=z34\frac{x-1}{2}=\frac{y-2}{3}=\frac{z-3}{4}

and

x1=yα=z51\frac{x}{1}=\frac{y}{\alpha}=\frac{z-5}{1}

with shortest distance

D=56.D=\frac{5}{\sqrt{6}}.

Find: The sum of all possible values of α\alpha.

Take point A(1,2,3)A(1,2,3) and direction vector d1=2,3,4\vec d_1=\langle 2,3,4\rangle for the first line. For the second line, take point B(0,0,5)B(0,0,5) and direction vector d2=1,α,1\vec d_2=\langle 1,\alpha,1\rangle. Then

AB=1,2,2.\overrightarrow{AB}=\langle -1,-2,2\rangle.

Use the shortest distance formula for skew lines:

D=AB(d1×d2)d1×d2.D=\frac{\left|\overrightarrow{AB}\cdot(\vec d_1\times \vec d_2)\right|}{\left\|\vec d_1\times \vec d_2\right\|}.

Now,

d1×d2=ijk2341α1=34α,2,2α3.\vec d_1\times \vec d_2= \begin{vmatrix} \mathbf i & \mathbf j & \mathbf k\\ 2 & 3 & 4\\ 1 & \alpha & 1 \end{vmatrix} =\langle 3-4\alpha,\,2,\,2\alpha-3\rangle.

Hence,

d1×d2=(34α)2+4+(2α3)2=20α236α+22.\left\|\vec d_1\times \vec d_2\right\|=\sqrt{(3-4\alpha)^2+4+(2\alpha-3)^2}=\sqrt{20\alpha^2-36\alpha+22}.

Also,

AB(d1×d2)=(1)(34α)+(2)(2)+2(2α3)=8α13.\overrightarrow{AB}\cdot(\vec d_1\times \vec d_2)=(-1)(3-4\alpha)+(-2)(2)+2(2\alpha-3)=8\alpha-13.

Therefore,

8α1320α236α+22=56.\frac{|8\alpha-13|}{\sqrt{20\alpha^2-36\alpha+22}}=\frac{5}{\sqrt{6}}.

Squaring both sides,

(8α13)2=256(20α236α+22).(8\alpha-13)^2=\frac{25}{6}\left(20\alpha^2-36\alpha+22\right).

So,

29α2+87α116=0.29\alpha^2+87\alpha-116=0.

Solving,

α=87±872+42911658=87±14558{1,4}.\alpha=\frac{-87\pm\sqrt{87^2+4\cdot29\cdot116}}{58}=\frac{-87\pm145}{58}\in\{1,-4\}.

Hence the sum of all possible values is

1+(4)=3.1+(-4)=-3.

Therefore, the correct option is D.

Vector formula shortcut

Given: Two skew lines with direction vectors d1=2,3,4\vec d_1=\langle 2,3,4\rangle and d2=1,α,1\vec d_2=\langle 1,\alpha,1\rangle.

Find: The sum of all possible values of α\alpha.

The quickest route is to directly use one point from each line and the vector formula for distance between skew lines. With A(1,2,3)A(1,2,3) and B(0,0,5)B(0,0,5),

AB=1,2,2.\overrightarrow{AB}=\langle -1,-2,2\rangle.

Then compute only the two quantities needed in the formula:

d1×d2=34α,2,2α3,\vec d_1\times\vec d_2=\langle 3-4\alpha,2,2\alpha-3\rangle, AB(d1×d2)=8α13.\overrightarrow{AB}\cdot(\vec d_1\times\vec d_2)=8\alpha-13.

Substitute into

AB(d1×d2)d1×d2=56\frac{|\overrightarrow{AB}\cdot(\vec d_1\times\vec d_2)|}{\|\vec d_1\times\vec d_2\|}=\frac{5}{\sqrt6}

to get

8α1320α236α+22=56.\frac{|8\alpha-13|}{\sqrt{20\alpha^2-36\alpha+22}}=\frac{5}{\sqrt6}.

This gives

29α2+87α116=0,29\alpha^2+87\alpha-116=0,

so

α=1,4.\alpha=1,-4.

Therefore, their sum is 3-3, so the correct option is D.

Common mistakes

  • Using the distance formula for parallel lines or intersecting lines is incorrect because these lines are skew. For skew lines, use D=AB(d1×d2)d1×d2D=\frac{|\overrightarrow{AB}\cdot(\vec d_1\times\vec d_2)|}{\|\vec d_1\times\vec d_2\|} instead.

  • Taking the wrong connecting vector between points on the two lines leads to an incorrect dot product. Choose one fixed point from each line carefully, then form AB\overrightarrow{AB} consistently.

  • Errors in the cross product d1×d2\vec d_1\times\vec d_2 are common. A sign mistake in the determinant changes both numerator and denominator, so expand the determinant carefully.

  • Stopping after finding one value of α\alpha is incomplete because the equation is quadratic. Solve for all possible values and then add them, since the question asks for the sum of all possible values.

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