MCQEasyJEE 2026Superposition Principle & Standing Waves

JEE Physics 2026 Question with Solution

The fifth harmonic of a closed organ pipe is found to be in unison with the first harmonic of an open pipe. The ratio of lengths of closed pipe to that of the open pipe is 5x\frac{5}{x}. The value of xx is _____.

  • A

    22

  • B

    33

  • C

    44

  • D

    11

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: The fifth harmonic of a closed organ pipe is in unison with the first harmonic of an open pipe.

Find: The value of xx if

LcLo=5x\frac{L_c}{L_o} = \frac{5}{x}

where LcL_c and LoL_o are the lengths of the closed and open pipes respectively.

For a closed organ pipe, only odd harmonics are present, and the frequency of the nn-th harmonic is

fn=nv4Lcf_n = \frac{nv}{4L_c}

So, for the fifth harmonic,

f5=5v4Lcf_5 = \frac{5v}{4L_c}

For an open organ pipe, the first harmonic frequency is

f1=v2Lof_1 = \frac{v}{2L_o}

Since the two sounds are in unison, their frequencies are equal:

5v4Lc=v2Lo\frac{5v}{4L_c} = \frac{v}{2L_o}

Cancelling vv and simplifying,

54Lc=12Lo\frac{5}{4L_c} = \frac{1}{2L_o} 10Lo=4Lc10L_o = 4L_c LcLo=52\frac{L_c}{L_o} = \frac{5}{2}

Comparing with the given ratio

LcLo=5x\frac{L_c}{L_o} = \frac{5}{x}

we get

x=2x = 2

Therefore, the correct option is A.

Common mistakes

  • Using the closed pipe formula as if all harmonics are allowed. A closed organ pipe supports only odd harmonics, so the fifth harmonic must be written with f5=5v4Lcf_5 = \frac{5v}{4L_c}. Do not use the open-pipe pattern for the closed pipe.

  • Confusing the first harmonic of the open pipe with a higher mode. For an open pipe, the first harmonic is the fundamental frequency, so use f1=v2Lof_1 = \frac{v}{2L_o}. Do not write v4Lo\frac{v}{4L_o}.

  • Equating lengths instead of frequencies. Unison means the two frequencies are equal, not the lengths. First set 5v4Lc=v2Lo\frac{5v}{4L_c} = \frac{v}{2L_o}, then solve for the ratio of lengths.

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