Let and be two vectors such that , and . If and the angle between and is , then is equal to:
- A
- B
- C
- D
Let and be two vectors such that , and . If and the angle between and is , then is equal to:
Correct answer:A
Standard Method
Given: , , and .
Find: , where is the angle between and .
Using dot product,
Now , so
Also,
Hence,
so
Now from ,
therefore
and so
Next,
From the extracted working,
Also,
Thus,
Therefore,
So, the correct option is A.
Direct Relation
Given: .
Find: .
First use
So,
With ,
Hence,
From the solution working,
Therefore,
which gives
Therefore, the required value is .
Using as a non-zero term. This is wrong because is perpendicular to . Therefore this dot product is zero, and only the term contributes.
Finding the angle between and and treating it as . This is wrong because is the angle between and . First compute the relation involving , then use it for .
Computing directly from without using . This is incomplete because the relation obtained is for , not for alone. One must first determine .
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