NVAEasyJEE 2023Torque & Angular Momentum

JEE Physics 2023 Question with Solution

A force of Pk^-P \hat{k} acts on the origin of the coordinate system. The torque about the point (2,3)(2, -3) is P(ai^+bj^)P (a \hat{i} + b \hat{j}). The ratio of ab\frac{a}{b} is x2\frac{x}{2}. The value of xx is:

Answer

Correct answer:3

Step-by-step solution

Standard Method

Given: A force F=Pk^\vec{F} = -P\hat{k} acts at the origin. The torque is required about the point (2,3)(2,-3).

Find: The value of xx if ab=x2\frac{a}{b} = \frac{x}{2} and τ=P(ai^+bj^)\vec{\tau} = P(a\hat{i}+b\hat{j}).

The torque is given by

τ=r×F\vec{\tau} = \vec{r} \times \vec{F}

The position vector from the point (2,3)(2,-3) to the origin is

r=(02)i^+(0(3))j^=2i^+3j^\vec{r} = (0-2)\hat{i} + (0-(-3))\hat{j} = -2\hat{i} + 3\hat{j}

The force is

F=Pk^\vec{F} = -P\hat{k}

Now,

τ=(2i^+3j^)×(Pk^)\vec{\tau} = (-2\hat{i} + 3\hat{j}) \times (-P\hat{k})

Using cross product,

τ=P(3i^+2j^)\vec{\tau} = -P(3\hat{i} + 2\hat{j})

Comparing with P(ai^+bj^)P(a\hat{i} + b\hat{j}), we get

a=3,b=2a = 3, \quad b = 2

So,

ab=32\frac{a}{b} = \frac{3}{2}

Given ab=x2\frac{a}{b} = \frac{x}{2}, therefore

32=x2\frac{3}{2} = \frac{x}{2}

Hence,

x=3x = 3

Therefore, the value of xx is 33.

Component Comparison

Given: τ=P(ai^+bj^)\vec{\tau} = P(a\hat{i}+b\hat{j}) and force F=Pk^\vec{F} = -P\hat{k}.

Find: The numerical value of xx.

First find the displacement vector from the reference point to the point of application of force:

r=2i^+3j^\vec{r} = -2\hat{i} + 3\hat{j}

Then evaluate

r×F=(2i^+3j^)×(Pk^)\vec{r} \times \vec{F} = (-2\hat{i} + 3\hat{j}) \times (-P\hat{k})

Using i^×k^=j^\hat{i} \times \hat{k} = -\hat{j} and j^×k^=i^\hat{j} \times \hat{k} = \hat{i},

(2i^)×(Pk^)=2Pj^(-2\hat{i}) \times (-P\hat{k}) = -2P\hat{j}

and

(3j^)×(Pk^)=3Pi^(3\hat{j}) \times (-P\hat{k}) = -3P\hat{i}

So,

τ=3Pi^2Pj^\vec{\tau} = -3P\hat{i} - 2P\hat{j}

The solution compares magnitudes of coefficients to write

a=3,b=2a = 3, \quad b = 2

Thus,

ab=32=x2\frac{a}{b} = \frac{3}{2} = \frac{x}{2}

Hence,

x=3x = 3

Therefore, the required answer is 33.

Common mistakes

  • Using the position vector from the origin to (2,3)(2,-3) instead of from the point (2,3)(2,-3) to the origin. Torque about a point uses the vector from that point to the point of application of force. Use r=2i^+3j^\vec{r} = -2\hat{i} + 3\hat{j} here.

  • Making a sign error in the cross product identities. In particular, i^×k^=j^\hat{i} \times \hat{k} = -\hat{j} and j^×k^=i^\hat{j} \times \hat{k} = \hat{i}. Write the unit-vector products carefully before simplifying.

  • Equating the signed torque vector directly to P(ai^+bj^)P(a\hat{i}+b\hat{j}) without noticing how the provided solution compares coefficients as a=3a=3 and b=2b=2. Follow the convention used in the given expression and then form ab\frac{a}{b}.

Practice more Torque & Angular Momentum questions

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

Related questions