What Is the Path Length Difference for Light in a Double Slit Experiment?

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The discussion focuses on calculating the path length difference for light in a double slit experiment with slits 0.12 mm apart and a wavelength of 550 nm. The user attempts to find the angle for the m=1 maximum using the formula θm = m*(λ/d) but mistakenly uses degrees instead of radians, leading to incorrect calculations. The correct approach involves using the sine function with the angle in radians to determine the path length difference accurately. The user expresses confusion over the steps and seeks clarification on the correct method. Understanding the correct unit conversion and application of trigonometric functions is crucial for solving this problem.
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Homework Statement


Two narrow slits are 0.12 mm apart. Light of wavelength 550 nm illuminates the slits, causing an interference pattern on a screen 1.0 m away. Light from each slit travels to the m=1 maximum on the right side of the central maximum.

Part A -
How much farther did the light from the left slit travel than the light from the right slit?
Express your answer using two significant figures.

Homework Equations


r=dsin(theta)
(theta)m = m*(lambda/d)
y=L*tan(theta)

ym = (m*lambda*L)/d

The Attempt at a Solution



I don't understand how to do these problems...

thetam = (m*lambda*)/d
thetam = (1*(5.5*10^-7m)/(1m)
thetam = 5.5*10^-7


path length difference = dsin(theta)
so...
r = d*sin(theta)
r = 1m *sin(5.5*10^-7)
r = 9.599^-9m
r = 9.6nm
That doesn't appear to be the correct answer(Unless MasteringPhysics is wrong). Sadly, I don't know if I did the right steps or used the correct equations.

Any help is appreciated.
 
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Hi Foxhound101,


Foxhound101 said:

Homework Statement


Two narrow slits are 0.12 mm apart. Light of wavelength 550 nm illuminates the slits, causing an interference pattern on a screen 1.0 m away. Light from each slit travels to the m=1 maximum on the right side of the central maximum.

Part A -
How much farther did the light from the left slit travel than the light from the right slit?
Express your answer using two significant figures.

Homework Equations


r=dsin(theta)
(theta)m = m*(lambda/d)
y=L*tan(theta)

ym = (m*lambda*L)/d

The Attempt at a Solution



I don't understand how to do these problems...

thetam = (m*lambda*)/d
thetam = (1*(5.5*10^-7m)/(1m)
thetam = 5.5*10^-7

Remember that this is really:

<br /> \sin\theta=\frac{m\lambda}{d}<br />

The approximation you are using (\theta=\frac{m\lambda}{d}) is fine since the angle is small enough, but remember that this approximation is true if the angle is measured in radians. So the angle you found is 5.5\times 10^{-7}\mbox{ rad}.

path length difference = dsin(theta)
so...
r = d*sin(theta)
r = 1m *sin(5.5*10^-7)
r = 9.599^-9m

This number was calculated with the angle measure set to degrees, not radians.
 
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