![]() ![]() Would give you the angles to the destructive pointsīecause we know the delta x, the path length difference, Speaking you could plug in one halves for M and that And lambda is the wavelength, the distance between peaks of the wave. The centerline up to the point on the wall where you The d is the distance between the two slits, that would be d. What does it give you? This M is gonna be zero, And so in order to getĬonstructive points d sine theta, which is the path lengthĭifference has to equal zero lambda, two lambda and this is the double slit formula, X for constructive points was integers times wavelengths, so zero, one wavelength, two wavelength and so on. The path length difference? The path length difference for a double slit is just d times sine of theta. Hypotenuse in this case is d, this entire distance between the two holes because this side is the right angle. And the opposite to this theta is delta x, so I have delta x over the Theta, because this is theta and that theta is the sameĪs this theta over here. Relationship between these, I can say that sine of Wave from the bottom hole had to travel compared to So this is my triangle and this is supposed to be a right angle. This represents that line I had to draw to make the right angle. And then I've got this other orange line. I'm gonna call thatĭistance d, the distance between the two holes,Ĭenter to center distance. I've got this distanceīetween the holes, which is d. I've got a right triangle in here and I'm gonna redraw it over here. So now that I know that these two angles are the same it's just basic trigonometry. ![]() So how do I find this? Well again, if I'm farĪway here this angle here will equal this angle inside of here. Whatever is left this wouldīe the path length difference. ![]() So what would the path length be? The path length difference would just be this piece down here. Will be the same length as the path from here forwards. In other words, the path from here onward, from here forwards, If this is a right angle right here, then the remainder If my screen's far away, what'll be true is that Third line is gonna goįrom here down, cut through this at a right angle and Spaced, which isn't too much of a problem because these holes are very close together, IĬan draw a third line and this third line's Significantly further away than these two holes are The center of this bottom slit to that point and I'm gonna draw a line from the center of How is the path lengthĭifference related to this angle? The way we can do it is this. And my question that I'm asking is based on this angle is there some way to determine the path length difference? That's the important thing here, how do I determine the path length difference. So my angle is going to be this, so this here would be my angle. This is how I'm going to measure the angle from the centerline to some So I've got this line hereĪnd let's say I wanted to measure to some point on This is gonna let me measure angles here. This way, so let's say I draw a reference line that goes straight through the center. Out a function for this path length differenceīased on what angle I am at. I need some way to determine the path length difference based on something I could measure. I told you these two slitsĪre so close together, maybe micrometers or nanometers apart, that how are we going to measure? How are we going to physically measure the difference in path length? If I go over to thisīarrier, these two holes are gonna look like they'reĪt the exact same spot. Okay so that's all well and good, but we've got a problem. ![]()
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