Vectors A and B are mutually perpendicular . component of vector A+ vector B in direction of vector A - vector B will be ?
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◆ Answer -
R = A^2-B^2 / √(A^2+B^2)
● Explanation -
Magnitude of A-B is given as -
|A-B| = √(A^2 + B^2 - 2AB.cos90)
|A-B| = √(A^2 + B^2 - 2AB × 0)
|A-B| = √(A^2 + B^2)
Unit vector along A-B will be given as -
Unit vector = (A-B) / |A-B|
Unit vector = (A-B) / √(A^2+B^2)
Component of A+B in direction of A-B will be -
R = (A+B).(A-B) / √(A^2+B^2)
R = A^2-B^2 / √(A^2+B^2)
Therefore, component of A+B in direction of A-B will be A^2-B^2 / √(A^2+B^2) .
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