Answer :
Answer:
[tex] y = A sin (kx \pm wt)[/tex]
Where k represent the number of wave [tex]k =\frac{2\pi}{\lambda}[/tex] and [tex] w =\frac{2\pi}{T}[/tex] represent the angular frequency with T the period.
For this case we know tha T = 520 nm
And the angular frequency would be given by:
[tex] w = \frac{2\pi}{520}= \frac{pi}{260}[/tex]
So then the possible anwer for this case would be:
D.) y= sin pi/260 theta
Since is the only option with satisfy the general equation of a wave.
Step-by-step explanation:
Since the sine function can be used to model light waves we can use the following general expression:
[tex] y = A sin (kx \pm wt)[/tex]
Where k represent the number of wave [tex]k =\frac{2\pi}{\lambda}[/tex] and [tex] w =\frac{2\pi}{T}[/tex] represent the angular frequency with T the period.
For this case we know tha T = 520 nm
And the angular frequency would be given by:
[tex] w = \frac{2\pi}{520}= \frac{pi}{260}[/tex]
So then the possible anwer for this case would be:
D.) y= sin pi/260 theta
Since is the only option with satisfy the general equation of a wave.