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NEET PHYSICSEasy

An air column, closed at one end and open at the other, resonates with a tuning fork when the smallest length of the column is 50 cm50 \text{ cm}. The next larger length of the column resonating with the same tuning fork is

A

100 cm100 \text{ cm}

B

150 cm150 \text{ cm}

C

200 cm200 \text{ cm}

D

66.7 cm66.7 \text{ cm}

Step-by-Step Solution

  1. Identify the Type of Air Column: An air column closed at one end and open at the other acts as a closed organ pipe.
  2. Resonance Conditions for Closed Pipe: For a closed organ pipe, resonance occurs at odd multiples of λ/4\lambda/4. The resonating lengths are given by L=(2n1)λ4L = (2n-1)\frac{\lambda}{4}, where n=1,2,3,n = 1, 2, 3, \dots
  3. Find the Smallest Length: The smallest length (fundamental mode, n=1n=1) is given as L1=λ4=50 cmL_1 = \frac{\lambda}{4} = 50 \text{ cm}.
  4. Calculate the Next Larger Length: The next larger length (first overtone, n=2n=2) will be L2=3λ4L_2 = \frac{3\lambda}{4}. Since λ4=50 cm\frac{\lambda}{4} = 50 \text{ cm}, we substitute this value into the equation for L2L_2: L2=3×50 cm=150 cmL_2 = 3 \times 50 \text{ cm} = 150 \text{ cm}
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