MCQEasyJEE 2024Combination of Resistors

JEE Physics 2024 Question with Solution

When a potential difference VV is applied across a wire of resistance RR, it dissipates energy at a rate WW. If the wire is cut into two halves and these halves are connected mutually in parallel across the same supply, the energy dissipation rate will become:

  • A

    W/4W/4

  • B

    W/2W/2

  • C

    2W2W

  • D

    4W4W

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: Potential difference VV is applied across a wire of resistance RR, and the initial energy dissipation rate is WW.

Find: The new energy dissipation rate when the wire is cut into two equal halves and the halves are connected in parallel across the same supply.

For the original wire,

W=V2RW = \frac{V^2}{R}

Since resistance of a uniform wire is directly proportional to its length, cutting the wire into two equal halves makes the resistance of each half

R=R2R' = \frac{R}{2}

When these two equal resistances are connected in parallel,

1Req=1R+1R=1R/2+1R/2=4R\frac{1}{R_{eq}} = \frac{1}{R'} + \frac{1}{R'} = \frac{1}{R/2} + \frac{1}{R/2} = \frac{4}{R}

Hence,

Req=R4R_{eq} = \frac{R}{4}

Now the new power dissipation is

P=V2Req=V2R/4=4V2RP' = \frac{V^2}{R_{eq}} = \frac{V^2}{R/4} = \frac{4V^2}{R}

Using W=V2RW = \frac{V^2}{R},

P=4WP' = 4W

Therefore, the energy dissipation rate becomes 4W4W. Hence, the correct option is D.

Resistance Scaling Trick

Given: Original resistance is RR and original power is W=V2RW = \frac{V^2}{R}.

Find: New power after cutting the wire into two equal halves and connecting them in parallel.

Each half has resistance R/2R/2. Two equal resistors of resistance R/2R/2 in parallel have equivalent resistance equal to half of R/2R/2, that is,

Req=R4R_{eq} = \frac{R}{4}

At constant supply voltage, power is inversely proportional to resistance:

P1RP \propto \frac{1}{R}

So reducing resistance from RR to R/4R/4 increases power by a factor of 44:

P=4WP' = 4W

Therefore, the energy dissipation rate becomes 4W4W. Hence, the correct option is D.

Common mistakes

  • Assuming each half still has resistance RR. This is wrong because resistance of a uniform wire is directly proportional to length. After cutting into two equal parts, each half has resistance R/2R/2, not RR.

  • Using the series combination instead of parallel combination for the two halves. This is wrong because the question explicitly states the halves are connected in parallel. First find the equivalent resistance for a parallel circuit, then apply the power formula.

  • Using power as directly proportional to resistance at constant voltage. This is wrong because for a fixed supply voltage, P=V2RP = \frac{V^2}{R}, so power increases when resistance decreases.

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