2 Answers

Potatoswatter · Answer 1 · 2020-11-15T18:28:33+0000

Answer:

108.33 nm

Step-by-step explanation:

For destructive interference the thickness
$2t=(m+(1)/(2))(\lambda )/(n)$ , for minimum m=0

So
$2t=(\lambda )/(2n)$

$t=(\lambda )/(4n)$

Here
$\lambda$ is wavelength and n is order of index

So
$=(\lambda )/(4n)=(650)/(4* 1.5)=108.333nm$

So the least non zero thickness for destructive interference is 108.33 nm

Zeus Monolitics · Answer 2 · 2020-11-18T23:56:34+0000

Answer:

t = 108.33 nm

Step-by-step explanation:

we know that for destructive interference we have following relation

$2t =(m+(1)/(2)) (\lambda)/(n)$

for minimum thickness m =0

therefore we have

t = (lambda)/(4n)

where
$\lambda = 650 nm$

refrective index n = 1.5

putting all value to get required value of thickness

t = (650)/(4*1.5)

t = 108.33 nm

Please log in or register to add a comment.