I have seen that some electrical components (which contain R,L,C elements) datasheets shows the curve of the quality factor Q with respect to frequency, and not simply its value at the resonance frequency. For instance, this is the curve we find on this inductor datasheet of an high frequency inductor:
Now, the definition of the quality factor is this one:
At resonance the energy stored in the equivalent RLC circuit of the component may be evaluated as the maximum energy stored in the inductance or also as the maximum energy stored in the capacitance during a period, since at resonance both quantities are equal. But how we evaluate the energy stored for a generic frequency? I'd say that in general, the energy stored in the magnetic field is different from that stored in the electric field, if we are not working at resonance.
Best Answer
You're using a definition from wikipedia which explicitly has failed verification:
Obviously, tread carefully if you use wikipedia, and twice so if the authors of the wikipedia page disagree on something. Generally, the quality of wikipedia on fundamental EE is often not very good. Do not use Wikipedia as only source! (that goes for anything, basically, but it really applies to wikipedia, and students these days are taught that wikipedia is of mixed quality.)
So, I'd not pay any attention to that definition unless it's especially useful to me. I'm too lazy to check whether that formula actually is correct (i.e. means the same as the usual definitions of quality factor).
Instead, use the much more common formula that relates the losses to the energy oscillating in and out of an inductor (that we model with a series parasitic resistance):
$$Q_L(f) =\frac{X(f)}{R} = \frac{2\pi f L}{R}$$
with \$f\$ being the frequency, \$L\$ the inductance at that frequency (that's not a constant in real materials) and \$R\$ representing ohmic losses.