The resultant of two vectors and is perpendicular to and its magnitude is half that of . The angle between and is:
- A
- B
- C
- D
The resultant of two vectors and is perpendicular to and its magnitude is half that of . The angle between and is:
Correct answer:C
Standard Method
Given: The resultant vector is , , and .
Find: The angle between and .
From the condition that is perpendicular to , the resultant has no component along . Therefore, the component of along must cancel itself.
So,
This gives an acute angle of
But since the resultant is perpendicular to , the required angle between and is obtuse, hence
Therefore, the angle between the vectors is . The correct option is C.
Note on solution discrepancy
One extracted approach on the page computes using dot-product algebra, but another approach and the page's declared correct answer state . Following the solution authority and its final marked answer, the accepted answer is corresponding to option C.
Using only and concluding the angle directly without reconciling it with the page's accepted final answer can lead to a mismatch. Always check the final conclusion on the solution before marking the option.
Treating the half-magnitude condition as a scalar subtraction without resolving components correctly is wrong. The condition concerns the magnitude of the resultant vector, so component-based reasoning or full vector relations must be used carefully.
Choosing because it appears in one approach is a common extraction trap. When multiple approaches conflict, use the solution's declared correct answer and final accepted option.
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