MCQMediumJEE 2023Cross Product

JEE Mathematics 2023 Question with Solution

If the points with position vectors αi^+10j^+13k^\alpha \hat{i} + 10\hat{j} + 13\hat{k}, 6i^+11j^+11k^6\hat{i} + 11\hat{j} + 11\hat{k}, and 92i^+βj^8k^\frac{9}{2}\hat{i} + \beta\hat{j} - 8\hat{k} are collinear, then (19α6β)2(19\alpha - 6\beta)^2 is equal to:

  • A

    4949

  • B

    3636

  • C

    2525

  • D

    1616

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: The position vectors are A=αi^+10j^+13k^A = \alpha \hat{i} + 10\hat{j} + 13\hat{k}, B=6i^+11j^+11k^B = 6\hat{i} + 11\hat{j} + 11\hat{k}, and C=92i^+βj^8k^C = \frac{9}{2}\hat{i} + \beta\hat{j} - 8\hat{k}.

Find: The value of (19α6β)2(19\alpha - 6\beta)^2.

For collinear points, the vectors AB\vec{AB} and BC\vec{BC} are parallel, so:

AB×BC=0\vec{AB} \times \vec{BC} = 0

Compute the vectors:

AB=(6α)i^+(1110)j^+(1113)k^=(6α)i^+j^2k^\vec{AB} = (6 - \alpha)\hat{i} + (11 - 10)\hat{j} + (11 - 13)\hat{k} = (6 - \alpha)\hat{i} + \hat{j} - 2\hat{k} BC=(926)i^+(β11)j^+(811)k^=32i^+(β11)j^19k^\vec{BC} = \left(\frac{9}{2} - 6\right)\hat{i} + (\beta - 11)\hat{j} + (-8 - 11)\hat{k} = -\frac{3}{2}\hat{i} + (\beta - 11)\hat{j} - 19\hat{k}

Now use the determinant form of the cross product:

AB×BC=i^j^k^6α1232β1119\vec{AB} \times \vec{BC} = \begin{vmatrix} \hat{i} & \hat{j} & \hat{k} \\ 6 - \alpha & 1 & -2 \\ -\frac{3}{2} & \beta - 11 & -19 \end{vmatrix}

Setting the components equal to zero and solving gives:

α=11719,β=412\alpha = \frac{117}{19}, \quad \beta = \frac{41}{2}

Substitute these values into 19α6β19\alpha - 6\beta:

19α6β=19117196412=117123=619\alpha - 6\beta = 19 \cdot \frac{117}{19} - 6 \cdot \frac{41}{2} = 117 - 123 = -6

Therefore,

(19α6β)2=(6)2=36(19\alpha - 6\beta)^2 = (-6)^2 = 36

So, the correct option is B.

Using component ratios for parallel vectors

Given: The three points are collinear.

Find: (19α6β)2(19\alpha - 6\beta)^2.

If points are collinear, then AB\vec{AB} and BC\vec{BC} are parallel. Hence their corresponding components are proportional.

From the solution data:

AB=(6α,1,2),BC=(32,β11,19)\vec{AB} = (6 - \alpha, 1, -2), \quad \vec{BC} = \left(-\frac{3}{2}, \beta - 11, -19\right)

Using the solved values obtained from the parallel-condition equations:

α=11719,β=412\alpha = \frac{117}{19}, \quad \beta = \frac{41}{2}

Now evaluate the required expression directly.

19α6β=19117196412=117123=619\alpha - 6\beta = 19 \cdot \frac{117}{19} - 6 \cdot \frac{41}{2} = 117 - 123 = -6

Therefore,

(19α6β)2=36(19\alpha - 6\beta)^2 = 36

Hence, the answer is 3636.

Common mistakes

  • Using the condition AB=BC\vec{AB} = \vec{BC} instead of checking that they are parallel is incorrect. Collinear points only require the direction vectors to be parallel, not equal. Use AB×BC=0\vec{AB} \times \vec{BC} = 0 or component proportionality instead.

  • Making sign errors while forming BC\vec{BC} is common, especially in the k^\hat{k}-component. Since 811=19-8 - 11 = -19, writing 1919 changes the entire result. Carefully subtract coordinates component-wise.

  • Confusing the option numbering with option labels can lead to the wrong marked answer. Here, source option (2)(2) corresponds to label B, not C. Always map 1A1 \to A, 2B2 \to B, 3C3 \to C, 4D4 \to D unless the page explicitly labels otherwise.

Practice more Cross Product questions

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

Related questions