Download - Harmonic waves
What is a Harmonic Wave?
If a wave is undergoing harmonic motion it is considered a harmonic wave. Simple harmonic motion is the type of periodic motion in which the restoring force is directly proportional to the displacement
It is also known as a sinusoidal wave (a sin graph)
It has a smooth repetitive oscillation
Since a harmonic wave is described by a sine (or a cosine) function, its properties are determined by the amplitude (A), it’s wavelength (λ) and it’s period (T)
Characteristics of a Harmonic wave
Amplitude: Corresponds to the maximum displacement from the equilibrium position of any element. Amplitude is always a positive quantity.
Wavelength: The shortest distance over which a wave shape repeats is called the wavelength. Represented by the symbol lambda (λ)
Wave number: the reciprocal of the wavelength
Period: the time for a particle make one complete cycle T=1/f
Frequency: the number of wave cycles passing a fixed point of the medium in one section
Phase shift (φ) : a horizontal shift by how many units the "starting point" (0,0) of a standard sine curve, y = sin(x), has moved to the right or left.
Speed of the Wave
To calculate the speed of the wave you multiply the wavelength of the graph to the frequency.
Find the angular frequency when the wave has a velocity of 100m/s, a wave number of 2.
a) 50
b) 0
c) 200
d) 30
Solutions
1. plug the numbers into the equation, we know that wavelength is equal to 2pi/k and frequency is equal to w/2pi
2. Sub those equations into the original formula and you will get
v= w/k
3. rearrange to solve for angular frequency
w=vk
4. plug in your number
5.w=100*2
w=200
c)
If the frequency increased what would happen to the velocity?
a) it remains constant
b) it would decrease
c) it would increase