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Question

Two identical metal wires of thermal conductivities K1 and K2 respectively are connected in series. The effective thermal conductivity of the combination is:


A

2K1K2K1+K2

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B

K1+K2K1K2

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C

K1+K22K1K2

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D

K1K2K1+K2

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Solution

The correct option is A

2K1K2K1+K2


Step 1: Given

Thermal conductivity of first metal wire is K1.

Thermal conductivity of second metal wire is K2.

Equivalent thermal conductivity of metal wires is Keq.

Resistance of first metal wire is R1.

Resistance of second metal wire is R2.

Equivalent resistance of metal wires is Req.

Length of the metal wires is l. (Both wires have same length)

Area of cross-section of the metal wires is A. (Both wires have same length)

Step 2: Formula Used

When two wires are connected in series, their equivalent resistance is Req=R1+R2.

The resistance of a wire in terms of thermal conductivity K is given by R=lKA, where l is length of wire and A is area of wire.

Step 3: Find the effective thermal conductivity

Substitute R=lKA, in Req=R1+R2. The new length will be twice the original length and the area of cross-section will remain same.

Req=R1+R2⇒2lKeq=lK1A+lK2A⇒2KeqlA=1K1+1K2lA⇒2Keq=1K1+1K2

Solve the above equation further.

2Keq=K1+K2K1K2⇒Keq2=K1K2K1+K2⇒Keq=2K1K2K1+K2

Hence, option A is correct.


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