A) infinite
B) five
C) three
D) zero
Correct Answer: B
Solution :
For possible interference maxima on the screen, the condition is \[d\sin \theta =n\lambda \] ... (i) Given\[d=slit-width=2\lambda \] \[\therefore \] \[2\lambda \sin \theta =n\lambda \] \[\Rightarrow \] \[2\sin \theta =n\] The maximum value of\[\sin \theta \]is\[1\], hence, \[n=2\times 1=2\] Thus, Eq. (i) must be satisfied by \[5\] integer values\[ie,\,\,-2,\,\,-1,\,\,0,\,\,1,\,\,2\]. Hence, the maximum number of possible interference maxima is\[5\].You need to login to perform this action.
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