Problem 10.8.Natural frequency of a hinged plate

Determine the natural frequency of an isotropic square plate with hinged supports at all four edges. Give the percentage error of the approximate formula of the natural frequency: $f_{n} \approx \frac{18}{\sqrt{w}}$ .

Eq.(8-57)

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Steps

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Step 1. Give the analytical solution of the natural frequency.

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See Table 10.6 first row or Eq.10-99)

$f^{2} = f_{x}^{2} + f_{y}^{2} + f_{t}^{2} = \frac{π^{2} D}{4 m L^{4}} + \frac{π^{2} D}{4 m L^{4}} + \frac{2 π^{2} D}{4 m L^{4}} = \frac{π^{2} D}{m L^{4}} f = π \sqrt{\frac{D}{m L^{4}}}$

Step 2. Give the approximate solution of the natural frequency.

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Deflection at the middle of the square isotropic plate is

Table 10.3.

$w = 4.06 \frac{m g L^{4}}{1000 D}$

The natural frequency is approximated as

Eq.(8-57)

$f_{approx} = \frac{18}{\sqrt{w}} = \frac{18}{\sqrt{4.06 \frac{m g L^{4}}{D}}} = \frac{18}{\sqrt{4.06 \times 9.81}} \sqrt{\frac{D}{m L^{4}}} = 2.85 \sqrt{\frac{D}{m L^{4}}}$

Step 3. Compare the above solutions. Calculate the percentage error of the approximate solution.

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$\frac{f - f_{approx}}{f} = \frac{π \sqrt{\frac{D}{m L^{4}}} - 2.85 \sqrt{\frac{D}{m L^{4}}}}{π \sqrt{\frac{D}{m L^{4}}}} = \frac{π - 2.85}{π} = 0.0928 = 9.21 %$

Results

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The analytical solution of the natural frequency is

See Table 10.6 first row or Eq.(10-99)

$f^{2} = f_{x}^{2} + f_{y}^{2} + f_{t}^{2} = \frac{π^{2} D}{4 m L^{4}} + \frac{π^{2} D}{4 m L^{4}} + \frac{2 π^{2} D}{4 m L^{4}} = \frac{π^{2} D}{m L^{4}} f = π \sqrt{\frac{D}{m L^{4}}}$

The natural frequency can be approximated also from the deflection of the plate.Deflection at the middle of the square isotropic plate is

Table 10.3.

$w = 4.06 \frac{m g L^{4}}{1000 D}$

The natural frequency is approximated as

Eq.(8-57)

$f_{approx} = \frac{18}{\sqrt{w}} = \frac{18}{\sqrt{4.06 \frac{m g L^{4}}{D}}} = \frac{18}{\sqrt{4.06 \times 9.81}} \sqrt{\frac{D}{m L^{4}}} = 2.85 \sqrt{\frac{D}{m L^{4}}}$

The above solutions are compared. The percentage error of the approximate solution is calculated:

$\frac{f - f_{approx}}{f} = \frac{π \sqrt{\frac{D}{m L^{4}}} - 2.85 \sqrt{\frac{D}{m L^{4}}}}{π \sqrt{\frac{D}{m L^{4}}}} = \frac{π - 2.85}{π} = 0.0928 = 9.21 %$