in today's video we're going to look at the basics of waves including how to label the different parts how to calculate the wave speed and the differences between transverse and longitudinal waves the first thing to understand about waves is that they transfer energy from one place to another but they don't transfer any matter so when light waves pass from a phone screen to your eye or sound waves pass from the speakers to your ear only energy is being transferred sometimes though we can interpret that energy as meaningful information which is why our brain is able to build up images and tunes from the light and sounds that it receives to travel from one place to another the waves vibrate or oscillate as we can see in this displacement distance graph the distance is how far the wave has traveled from the starting point while the displacement is how far from the equilibrium point the wave has oscillated so how far it's gone up or down the maximum displacement is known as the amplitude while the distance of one entire oscillation is called the wavelength so that could be from equilibrium up down and back up or it could be from the very top of a wave which we call the crest down and back up to the next crust it just has to be one entire oscillation and the opposite of the crest is called the trough now sometimes you might see a displacement time graph instead which looks pretty much the same but because we have time on the x-axis instead of distance the length of one complete oscillation would be the time period instead of the wavelength and the time period is just the time it takes for one complete oscillation the benefit of knowing the time period is that we can then use this equation here to work out frequency which is measured in hertz and is a number of complete oscillations per second to see how it works imagine that each oscillation takes 0.5 seconds or in other words the time period is 0.5 seconds this means that there must be a total of two oscillations per second so the frequency is two which is what we'd get if we did one divided by the time period of 0.5 we can also use the equation the other way around so time period equals 1 over frequency so if we were told that the frequency of a wave was four hertz which means four oscillations per second then to find the time period we'd just do one divided by four which tells us that each oscillation must be 0.25 seconds the next equation to know is that we can find the speed of the wave so the wave speed by multiplying the wavelength by the frequency so basically we multiply how long each wavelength is by how many there are per second and that will give us the total distance they travel per second to see how this works let's imagine we had a sound wave that had a frequency of 400 hertz and a wavelength of 70 centimeters what is its wave speed well in this case all we'd have to do is convert the 70 centimeters to 0.7 meters because we always want our wavelength in meters and then multiply it by the frequency of 400 hertz which gives us 280 meters per second as our wave speed the last thing we need to look at are the differences between transverse and longitudinal waves in transverse waves the oscillations are perpendicular to the direction of energy transfer or the direction in which the wave is moving which is why on our drawing the vibrations are going up and down whilst the overall wave is traveling from left to right most waves we can think of are transverse including all electromagnetic waves like light and radio waves ripples and waves in water and the waves of strings like on a guitar longitudinal waves on the other hand have oscillations that are parallel to the direction of energy transfer this one's a bit trickier to get your head around but basically it leads to some regions that are more spread out and other regions that are more compressed because the waves vibrating back and forth in motion it would look as if this area of compression is moving from the left to the right within the wave examples of longitudinal waves include sound waves and some types of shock waves like seismic p waves anyway that's everything for this video so hope you found it useful and i'll see you again soon you