MCQEasyJEE 2026Heat, Temperature & Thermal Expansion

JEE Physics 2026 Question with Solution

An aluminium and steel rods having same lengths and cross-sections are joined to make total length of 120cm120 \, \text{cm} at 30C30^\circ \text{C}. The coefficient of linear expansion of aluminium and steel are 24×106/C24 \times 10^{-6}/^\circ \text{C} and 1.2×105/C1.2 \times 10^{-5}/^\circ \text{C}, respectively. The length of this composite rod when its temperature is raised to 100C100^\circ \text{C}, is _____ cm.

  • A

    120.20120.20

  • B

    120.03120.03

  • C

    120.15120.15

  • D

    120.06120.06

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: The composite rod consists of aluminium and steel parts of equal initial length. Total initial length is 120cm120 \, \text{cm} at 30C30^\circ \text{C}. The coefficients are αAl=24×106/C\alpha_{Al} = 24 \times 10^{-6}/^\circ \text{C} and αSt=1.2×105/C=12×106/C\alpha_{St} = 1.2 \times 10^{-5}/^\circ \text{C} = 12 \times 10^{-6}/^\circ \text{C}.

Find: The final length of the composite rod at 100C100^\circ \text{C}.

Since both rods have the same initial length,

LAl,0=LSt,0=1202=60cmL_{Al,0} = L_{St,0} = \frac{120}{2} = 60 \, \text{cm}

The temperature rise is

ΔT=10030=70C\Delta T = 100 - 30 = 70^\circ \text{C}

Using linear expansion,

Lf=L0(1+αΔT)L_f = L_0(1 + \alpha \Delta T)

For the aluminium rod,

LAl,f=60(1+24×106×70)=60(1+0.00168)=60.1008cmL_{Al,f} = 60\left(1 + 24 \times 10^{-6} \times 70\right) = 60(1 + 0.00168) = 60.1008 \, \text{cm}

For the steel rod,

LSt,f=60(1+12×106×70)=60(1+0.00084)=60.0504cmL_{St,f} = 60\left(1 + 12 \times 10^{-6} \times 70\right) = 60(1 + 0.00084) = 60.0504 \, \text{cm}

Therefore, the total final length is

Ltotal,f=LAl,f+LSt,f=60.1008+60.0504=120.1512cmL_{total,f} = L_{Al,f} + L_{St,f} = 60.1008 + 60.0504 = 120.1512 \, \text{cm}

So the closest option is 120.15cm120.15 \, \text{cm}. The correct option is C.

Using total expansion directly

Given: Total initial length Ltotal,0=120cmL_{total,0} = 120 \, \text{cm}, with equal parts of 60cm60 \, \text{cm} each. Temperature change is 70C70^\circ \text{C}.

Find: Total final length after heating.

The total expansion is the sum of the expansions of the two rods:

ΔLtotal=LAl,0αAlΔT+LSt,0αStΔT\Delta L_{total} = L_{Al,0}\alpha_{Al}\Delta T + L_{St,0}\alpha_{St}\Delta T

Substituting the values,

ΔLtotal=(60×24×106×70)+(60×12×106×70)\Delta L_{total} = (60 \times 24 \times 10^{-6} \times 70) + (60 \times 12 \times 10^{-6} \times 70) ΔLtotal=0.1008+0.0504=0.1512cm\Delta L_{total} = 0.1008 + 0.0504 = 0.1512 \, \text{cm}

Hence,

Ltotal,f=Ltotal,0+ΔLtotal=120+0.1512=120.1512cmL_{total,f} = L_{total,0} + \Delta L_{total} = 120 + 0.1512 = 120.1512 \, \text{cm}

Therefore, the length of the composite rod is approximately 120.15cm120.15 \, \text{cm}, so the correct option is C.

Common mistakes

  • Assuming the full 120cm120 \, \text{cm} length belongs to each material is incorrect because the rod is made of two equal parts. First split the initial length into 60cm60 \, \text{cm} and 60cm60 \, \text{cm}.

  • Using only one coefficient of expansion for the whole composite rod is wrong because aluminium and steel expand differently. Calculate each expansion separately and then add them.

  • Taking ΔT=100C\Delta T = 100^\circ \text{C} instead of 10030=70C100 - 30 = 70^\circ \text{C} gives an incorrect expansion. Always use the change in temperature, not the final temperature itself.

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