Respuesta :
Answer:
At resonance impedance of series RLC circuit is minimum and equal to resistance of the circuit
Explanation:
Let the resistance of the series RLC circuit is R
Capacitive reactance of the circuit is [tex]X_C[/tex] and inductive reactance of the circuit is [tex]X_l[/tex]
We know that impedance of the series RLC circuit is given by [tex]Z=\sqrt{R^2+(X_L-X_C)^2}[/tex], here R is the resistance [tex]X_l[/tex] is inductive reactance and [tex]X_C[/tex] is capacitive reactance
At resonance capacitive reactance will be equal to inductive reactance
So [tex]X_C=X_l[/tex]
So impedance will become [tex]Z=R[/tex]
So from above calculation we can say that impedance of series RLC circuit is minimum and equal to resistance of the circuit
Answer:
Explanation:
Let R is the resistance of the circuit, L is the inductance of the circuit and c is the capacitance.
Inductive reactance= XL
capacitive reactance = Xc
The impedance of the RLC circuit is
[tex]Z=\sqrt{R^{2}+\left ( X_{L}^{2}-X_{C}^2 \right )}[/tex]
As the circuit is in resonance, So, XL = Xc
In this condition, Z = R
So, the impedance is equal to the resistance of the circuit.
