A ray of light is incident on a plane mirror along a vector (^i+^j−^k). The normal on the incident point is along (^k). The unit vector along the reflected ray will be:
A
1√2(^i+^j−^k)
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B
−1√3(^i+^j+^k)
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C
−^i−^j
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D
1√3(^i+^j+^k)
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Solution
The correct option is D1√3(^i+^j+^k) Incident ray vector (→A), →A=^i+^j−^k Normal direction vector (→N), →N=(^k) After reflection, the component of incident ray parallel to normal gets reversed.
Thus, reflected ray vector (→R), →R=[(^i+^j)]−(−^k)=^i+^j+^k So, the unit vector along the reflected ray, →R=→R|→R| ⇒→R=^i+^j+^k√3=1√3(^i+^j+^k) Hence, option (d) is the correct answer.