![MCQs [2024]](https://engineeringinterviewquestions.com/wp-content/uploads/2021/02/Interview-Questions-2.png)
Waves are everywhere, and we can describe them as disturbances that flow from one place to another through a medium. While all waves have the same fundamental characteristics and behaviors, some waves can be differentiated from others by visible characteristics. One way to categorize is by the direction of movement of the individual particles of the medium to the direction of the wave propagation. On this basis, waves are divided into two categories: transverse waves and longitudinal waves. A transverse wave is the wave in which every particle moves perpendicular to the direction of propagation of the wave. Besides, A longitudinal wave is the wave in which every particle moves in the direction of propagation of the wave
In this article, we will discuss Transverse waves, the speed of transverse waves, their features, etc. So, let us dive in.
What is a Wave?
While making a journey through the boat to a place like Elephanta caves, we observe that ripples of a sea make vibrations move the boat forward. These waves move up and down.
This means there is a flow of energy between the particles of a ripple, while it ascends and descends.
The energy flow is in the form of vibrations. So this ascending and descending nature of ripples is like that of waves. We conclude that ripples are waves, and these waves are transverse as they move in the boat’s direction.
Here, the mass of water remained at rest, while the energy in the form of up and down vibrations led the boat to move forward.
Let us take another experiment: throw a cork into a river that has already been disturbed. You will observe that the cork, being porous and hence is lighter in mass than water, will continue to float up and down. Even if the waves appear to be moving outward, the cork remains still. It proves that the waves are not moving. These are the pebble-induced disturbances.
We conclude that the transverse waves are the waves in which there is a flow of energy, while the mass remains at its position.
Let’s study transverse waves.
What are Transverse Waves?
Transverse waves are the waves in which the vibrations move in a direction perpendicular to that of the direction of propagation of the wave.
A pluck of a string or the ripples of water are examples of transverse waves.
If we Observe the Waves of Water:
Each particle in this wave is executing a simple harmonic motion.
This means particles aren’t moving, they’re just oscillating about their mean position, while the wave moves linearly.
These waves are the up and down vibrations of the ripples of water. We can observe that these waves have symmetry about a centerline.
By symmetrical, I mean, this wave is regular. If we cut a section of a particular crest, then observe that this section repeats end-to-end to make up the whole wave.
The maximum distance a vibration makes away from the wave centerline (crest or trough) is the amplitude of the wave.
This is what a transverse wave looks like.
We can consider an example of a light wave to understand what amplitude is.
Let’s take two bulbs of different wattage:
The bulb with 100-W power is brighter. So, we can consider this brightness as an amplitude.
Therefore, Power α (Amplitude)2.
Examples of Transverse Waves
The examples of transverse waves are:
Characteristics of Transverse Waves
The characteristics of transverse waves are:
-
Transverse waves can only pass through solids and cannot pass through liquids or gasses.
-
Polarization is a phenomenon that can only be observed in transverse waves. The plane of vibration, also known as polarization, is where all the particles in a medium vibrate at the same place.
-
When transverse waves propagate in a medium, pressure and density remain constant.
-
In transverse waves, the formation of typical crests and troughs is a natural process.
-
The rigidity of the medium affects the propagation of transverse waves.
Sound Waves are Transverse Waves
If we pluck a string from one end just like this:
The wave is moving ahead with particles moving back and forth, and the direction of motion of particles in a direction perpendicular to the propagation of a wave.
Just like a standing wave in a musical sound. When we play the guitar, its string make ripples when we stretch them as shown in the figure below:
We may say that sound waves are transverse. But how can we prove this?
As we took an example of a string. Here, when the wave of particles reaches the end, they invert while coming back. This means when a crest reaches the end while coming back, it turns to a trough as shown in the image below:
We can consider this phenomenon as the reflection of transverse waves.
Speed of a Transverse Wave
Have a look at the wave of a string:
These waves move from left to right at a constant speed. This speed is the speed of a wave.
Here are a few terminologies that you need to know:
-
Amplitude : Amplitude can be defined as the maximum displacement of a particle from its equilibrium position.
-
Wavelength: The distance between one peak and the next peak, or one trough and the next trough, is known as the wavelength.
-
Period: The time it takes for two successive peaks to pass through a fixed point is known as the period.
-
Frequency: The number of wavelengths that travel through a certain point in a second is known as frequency.
This Speed depends on Two Factors
-
The wave, and
-
What it is traveling through.
To understand this let’s take transverse waves examples in real life:
-
Waves travel faster in deep water than shallow water.
-
Let’s take two ropes of different widths as shown below:
A thin and a thick rope
Let us generate a pulse (or a wave) in these two ropes:
Wave in a thin rope Wave in a thick rope
Now, looking at these two images, we might wonder which wave in which rope would have a greater speed?
Well, the wave would pass with a greater force in a thin rope, but how?
Let’s assume, a thin rope as a pipe with a large diameter like this:
The water flow would be fast because the large diameter water pipe would allow the high-flow easily.
Now, let’s assume the thick rope as a water pipe with a smaller diameter:
Now, if the same energy-level water passes through this thin pipe, there will be greater vibrations between the water molecules as they possess higher energy and higher momentum.
From these two examples, we conclude that waves would pass easily through the thick pipe.
We know that the velocity of a transverse wave is:
[ v = sqrt{frac{T}{mu}}].
Where v = wave speed
T = Tension in the string (N/m), and
[mu] = linear mass density (mass per unit length (ml) measured in Kg/m.
This velocity is directly proportional to the square root of the tension in a string and inversely proportional to its linear mass density
The speed of a transverse wave decreases with an increase in the mass, but how?
Let’s say I have a light-weighted rope and heavy-weighted rope:
If I pluck these two ropes at one end, the rope with lesser weight would make more waves and travel faster than the heavy-weighted rope.
The speed of the wave increases with an increase in tension, but how?
Let’s take two ropes tied in different ways as shown below:
String tied tightly String tied loosely
In these conditions, if I pluck a string that is tied tightly. It will make larger oscillations than the one which is slackened.