MCQEasyJEE 2023Resistivity & Conductivity

JEE Physics 2023 Question with Solution

The resistance of a wire is 5Ω5 \, \Omega . If it's stretched to 55 times of its original length, its new resistance will be:

  • A

    (1) 625ohm625 \, \text{ohm}

  • B

    (2) 5ohm5 \, \text{ohm}

  • C

    (3) 125ohm125 \, \text{ohm}

  • D

    (4) 25ohm25 \, \text{ohm}

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: The initial resistance of the wire is Ri=5ΩR_i = 5 \, \Omega and the wire is stretched to 55 times its original length.

Find: The new resistance after stretching.

The solution states that the volume of wire remains constant during stretching.

Vi=VfV_i = V_f

So,

Aili=AflfA_i l_i = A_f l_f

Since the new length is lf=5ll_f = 5l, we get

Al=A(5l)A l = A'(5l)A=A5A' = \frac{A}{5}

Using resistance relation,

R=ρlAR = \rho \frac{l}{A}

For the stretched wire,

Rf=ρlfAf=ρ5lA/5R_f = \rho \frac{l_f}{A_f} = \rho \frac{5l}{A/5}Rf=25ρlA=25RiR_f = 25 \rho \frac{l}{A} = 25R_iRf=25×5=125ΩR_f = 25 \times 5 = 125 \, \Omega

Therefore, the new resistance is 125Ω125 \, \Omega. The correct option is A.

Diagram of a cylindrical wire before and after stretching, showing initial length l, final length 5l, and resistance relations with cross-sectional area changing.

Why resistance increases by a factor of 25

Given: The wire length becomes 5l5l while material remains the same, so ρ\rho is unchanged.

Find: How the resistance changes.

Since volume is constant,

Al=A(5l)Al = A'(5l)A=A5A' = \frac{A}{5}

Resistance depends directly on length and inversely on area:

RlAR \propto \frac{l}{A}

After stretching, length becomes 55 times and area becomes 15\frac{1}{5} times. Hence,

Rf5lA/5=25lAR_f \propto \frac{5l}{A/5} = 25\frac{l}{A}

So the resistance becomes 2525 times the original value.

Rf=25×5Ω=125ΩR_f = 25 \times 5 \, \Omega = 125 \, \Omega

Therefore, the correct option is A. Note that the raw options list labels 125ohm125 \, \text{ohm} as option C, but the solution explicitly concludes option A and computes 125Ω125 \, \Omega.

Common mistakes

  • Students often assume resistance is only proportional to length and multiply 5Ω5 \, \Omega by 55 to get 25Ω25 \, \Omega. This is wrong because stretching also reduces the cross-sectional area. Use R=ρl/AR = \rho l/A and constant volume together.

  • A common mistake is to keep the area unchanged after stretching. That is incorrect because for the same wire, volume remains constant, so increasing length must decrease area. First apply Al=AlAl = A'l'.

  • Some students use the option numbering from the question list instead of the resolved answer from the solution. Here the numerical value is 125Ω125 \, \Omega, but the source has a labeling mismatch. Always trust the worked solution first.

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