MCQEasyJEE 2024Significant Figures & Error Analysis

JEE Physics 2024 Question with Solution

If the percentage errors in measuring the length and the diameter of a wire are 0.1%0.1\% each, the percentage error in measuring its resistance will be:

  • A

    0.2%0.2\%

  • B

    0.3%0.3\%

  • C

    0.1%0.1\%

  • D

    0.144%0.144\%

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: Percentage error in length LL is 0.1%0.1\% and percentage error in diameter dd is 0.1%0.1\%.

Find: Percentage error in resistance RR of the wire.

The resistance of a wire is

R=ρLAR = \frac{\rho L}{A}

For a circular cross-section,

A=πd24A = \frac{\pi d^2}{4}

So,

R=4ρLπd2R = \frac{4\rho L}{\pi d^2}

Hence RLd2R \propto \frac{L}{d^2}.

For error propagation in products and powers,

ΔRR=ΔLL+2Δdd\frac{\Delta R}{R} = \frac{\Delta L}{L} + 2\frac{\Delta d}{d}

Substituting the given percentage errors,

Percentage error in R=0.1%+2×0.1%\text{Percentage error in } R = 0.1\% + 2 \times 0.1\% Percentage error in R=0.3%\text{Percentage error in } R = 0.3\%

Therefore, the percentage error in measuring the resistance is 0.3%0.3\%. The correct option is B.

Direct Proportionality Trick

Given: RLd2R \propto \frac{L}{d^2}, with percentage errors in LL and dd equal to 0.1%0.1\% each.

Find: Percentage error in RR.

Because LL is in the numerator with power 11, its percentage error is added once. Because dd is in the denominator with power 22, its percentage error is added twice.

So directly,

Error in R=0.1%+2(0.1%)=0.3%\text{Error in } R = 0.1\% + 2(0.1\%) = 0.3\%

Therefore, the correct option is B.

Common mistakes

  • Using RLdR \propto \frac{L}{d} instead of RLd2R \propto \frac{L}{d^2}. This is wrong because the cross-sectional area of the wire is proportional to d2d^2, not dd. First write A=πd24A = \frac{\pi d^2}{4} and then substitute into the resistance formula.

  • Subtracting percentage errors because dd is in the denominator. This is wrong in error propagation, where absolute fractional errors add for multiplication and division. Add the contributions and multiply by the power of each variable.

  • Converting 0.3%0.3\% into the answer 0.0030.003 for this MCQ. This is wrong because the options are given in percentage form, so the required answer is 0.3%0.3\%, not its decimal equivalent.

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