It is not possible to give an accurate answer to your question because the values read on a graph are not accurate enough. It should be necessary to have a numerical table instead of a graph.
The method to answer is very simple :
One read the frequency at the peak , $\text{f}_0\simeq 40$ kHz.
This is consistent with the expected value $39.788$ kHz. The deviation 0.212 kHz is due to the inaccuracy of reading on the graph.
Then compute $\omega_0=2\pi\text{f}_0$ .
The frequency limits for the bandwidth are at $24-3=21$ dB . See the figure below.
We read on the graph : $\quad\text{f}_1<\text{f} <\text{f}_2 \quad \begin{cases} \text{f}_1\simeq 21\text{ kHz}\\\ \text{f}_2\simeq 77\text{ kHz}\end{cases}$
The frequency bandwidth is $\quad 77-21=56$ kHz
This is consistent with the expected value 56.5 kHz . The deviation 0.5 kHz is due to the inaccuracy of reading on the graph.
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