Respuesta :
Answer:
625 nm
Explanation:
For constructive interference, the expression is:
[tex]d\times sin\theta=m\times \lambda[/tex]
Where, m = 1, 2, .....
d is the distance between the slits.
The formula can be written as:
[tex]sin\theta=\frac {\lambda}{d}\times m[/tex] ....1
The location of the bright fringe is determined by :
[tex]y=L\times tan\theta[/tex]
Where, L is the distance between the slit and the screen.
For small angle , [tex]sin\theta=tan\theta[/tex]
So,
Formula becomes:
[tex]y=L\times sin\theta[/tex]
Using 1, we get:
[tex]y=L\times \frac {\lambda}{d}\times m[/tex]
For two fringes:
The formula is:
[tex]\Delta y=L\times \frac {\lambda}{d}\times \Delta m[/tex]
For first and second bright fringe,
[tex]\Delta m=1[/tex]
Given that:
[tex]\Delta y=0.555\ mm[/tex]
d = 2.14 mm
L = 1.90 m
Also,
1 mm = 10⁻³ m
So,
[tex]\Delta y=0.555\times 10^{-3}\ m[/tex]
d = 2.14×10⁻³ m
Applying in the formula,
[tex]0.555\times 10^{-3}=1.90\times \frac {\lambda}{2.14\times 10^{-3}}\times 1[/tex]
[tex]\lambda=625\times 10^{-9}\ m[/tex]
Also,
1 m = 10⁹ nm
So wavelength is 625 nm
Answer:
625.1 nm
Explanation:
Wavelength of light, [tex]= \lambda[/tex]
Width of fringe,[tex]\beta = 0.555 mm = 0.555 \times 10^{-3}m[/tex]
Distance of screen,[tex]D= 1.90 m[/tex]
separation of slits, [tex]d = 2.14 mm = 2.14 \times10^{-3} m[/tex]
The formula for fringe width is :
[tex]\beta = \frac{\lambda D}{d}[/tex]
so rearranging the equation to get wavelength
[tex]\lambda = \frac{\beta d}{D}\\\lambda=\frac{ 0.555 \times 10^{-3}m(2.14 \times10^{-3} m)}{ 1.90 m} \\\lambda=0.625105\times10^{-6}m\\ \lambda=625.1 nm[/tex]
Therefore, the wavelength of the light is 625.1 nm
