^n1 is the unit vector along incident ray, ^n2 along the normal to plane mirror and ^n3 is the unit vector along reflected ray direction, then which of the following must be true ?
A
(^n1×^n2)×^n3=0
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B
^n1.^n3=0
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C
(^n1×^n2).^n3=0
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D
^n1.^n2=0
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Solution
The correct option is C(^n1×^n2).^n3=0 From the laws of reflection the incident ray, reflected ray and normal lie on the same plane.
Here ^n1^n2 and ^n3 are in the same x−y plane.
From rule of cross product of vector (^n1×^n) will give an unit vector which is perpendicular to the plane of ^n1,^n2 i.e. ⊥ to the (x−y) plane. ∵(^n1×^n2)⊥^n3 ⇒(^n1×^n2).^n3=0 (from dot product)
Hence, option (c) is the correct answer.