Diffraction from a single slit.

AI Thread Summary
The discussion revolves around calculating the angular width of electromagnetic waves emerging from a single slit in a constrained space. The user correctly identifies the wavelength using the speed of light and frequency but struggles with the application of the formula for angular width. They initially obtain an angle of 1.37 degrees, which is significantly lower than the expected 2.9 degrees from the textbook. Key confusion arises from the understanding that θ represents half the angular width, necessitating the final answer to be doubled. The user plans to revisit the textbook for clarification on the formula and its application.
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Homework Statement


You need to use your cell phone which broadcasts an 830 MHz signal but you're in an alley between two massive radio wave absorbing building that have only a 15m space between them. What is the angular width in degrees of the electromagnetic wave after it emerges from between the buildings.


Homework Equations


a sinO = (pd)/a
a = slit width - 15m
sinO = sine of theta, couldn't figure out how to do theta - unknown
p = the number for the central maximum or minimum - 1?
d = wavelength (didn't know how to do lambda either) - .361m

The Attempt at a Solution


There's a basic element I'm missing here. I determined wavelength by dividing the speed of light by the frequency. So I then divide wavelength by the slit width of 15m and get an even smaller number that leads to an extremely small angle after I take the arcsine that seems unreasonable given the dimensions involved in this problem.

The book comes up with an answer of 2.9 degrees. There's got to be something basic to this problem I'm missing, but I can't figure out what. Can somebody give me a nudge in the correct direction?
 
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you are given the frequency .. can't you get the value of the wavelength?
 
I already have the wavelength but that's not what the problem is asking for. Its asking for the angular width of the wavelength. I'm getting an angle with four decimal places which isn't anywhere near what the book gets or even what seems right.
 
what is your final answer for this question?
 
Sorry - I s'pose I should have given that.

I divided .361/15 and took the arcsine of that. I'm getting 1.37 degrees. Looks like my previous answer (that was in thousandths of degrees) was because my calculator was still in rads. Still though, I'm really off by at least half.
 
In the formula θ is half the angle. And the angular width of the central maximum is 2θ.
 
I have a question for you .. is the first equation you provided right? please check it once again ..
 
rl.bhat said:
In the formula θ is half the angle. And the angular width of the central maximum is 2θ.
I didn't recall the part about being half the angle. I'll consult the book again. I might have more questions though.
 

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