Difference between revisions of "Angular Frequency"
| Line 8: | Line 8: | ||
*Relates to the [[frequency]] of [[oscillation]] (f) by the formula ω = 2πf. | *Relates to the [[frequency]] of [[oscillation]] (f) by the formula ω = 2πf. | ||
*Indicates how quickly an [[object]] moves through its circular path. | *Indicates how quickly an [[object]] moves through its circular path. | ||
| + | *[[Angular Frequency|Angular frequency]] is used to describe the motion of [[object]]s in periodic motion, such as [[pendulum]]s and springs. | ||
| + | *[[Angular Frequency|Angular frequency]] is an important concept in the analysis of [[wave]] motion and [[Simple Harmonic Motion|simple harmonic motion (SHM)]]. | ||
| + | *[[Angular Frequency|Angular frequency]] is also used in [[Alternating Current|alternating current]] circuits to describe the oscillations of [[volt]]age and [[current]]. | ||
===Formula=== | ===Formula=== | ||
Revision as of 18:58, 19 May 2024
Key Stage 5
Meaning
Angular frequency is the rate of change of angular displacement, often used in oscillatory systems.
About Angular Frequency
- Angular frequency is given by the symbol 'ω' (a lower case Omega in the Greek Alphabet).
- Measured in radians per second (rad/s).
- Relates to the frequency of oscillation (f) by the formula ω = 2πf.
- Indicates how quickly an object moves through its circular path.
- Angular frequency is used to describe the motion of objects in periodic motion, such as pendulums and springs.
- Angular frequency is an important concept in the analysis of wave motion and simple harmonic motion (SHM).
- Angular frequency is also used in alternating current circuits to describe the oscillations of voltage and current.
Formula
ω = 2πf
Where:
ω is the angular frequency.
f is the frequency of oscillations.
Examples
- The angular frequency of a pendulum can be calculated from its period.
- In alternating current (AC), angular frequency relates to the electrical frequency.