state the condition for critically damped oscillation in LCR circuit
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Critical damping provides the quickest approach to zero amplitude for a damped oscillator. With less damping (underdamping) it reaches the zero position more quickly, but oscillates around it. With more damping(over damping), the approach to zero is slower.
The damping of the RLC circuit affects the way the voltage response reaches its final (or steady state) value. ... (iii) when which means that the two roots of the equation are equal (i.e. there is only one root) and relates to the case when the circuit is said to be critically damped.
An RLC circuit is an electrical circuitconsisting of a resistor (R), an inductor (L), and a capacitor (C), connected in series or in parallel. ... Introducing the resistor increases the decay of these oscillations, which is also known as damping. The resistor also reduces the peak resonant frequency
The damping of the RLC circuit affects the way the voltage response reaches its final (or steady state) value. ... (iii) when which means that the two roots of the equation are equal (i.e. there is only one root) and relates to the case when the circuit is said to be critically damped.
An RLC circuit is an electrical circuitconsisting of a resistor (R), an inductor (L), and a capacitor (C), connected in series or in parallel. ... Introducing the resistor increases the decay of these oscillations, which is also known as damping. The resistor also reduces the peak resonant frequency
akahire:
pls give mathematical condition
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Answer:
The condition in which the oscillation of the LCR circuit is damped when the value of R is small or large.
Explanation:
Critically Damped: This means that the condition in which the damping of an oscillator makes it return as fast as possible towards its equilibrium position as fast as possible.
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