Let , , and be vectors such that . If and , then is equal to:
JEE Mathematics 2023 Question with Solution
Answer
Correct answer:11
Step-by-step solution
Standard Method
Given: , , and .
Find: .
From the given cross product condition,
so is parallel to . Therefore,
where is a scalar.
Hence,
Using ,
Using ,
Solving these, we get
Now,
Therefore, .
Using the scalar equations explicitly
Given: .
Find: the required dot product.
From
we get
Now use
Substituting ,
Therefore,
Finally,
Therefore, the required numerical value is 11.
Common mistakes
Assuming implies . This is wrong because equal cross products with the same vector only imply . Instead, conclude that is parallel to .
Writing instead of . This is wrong because the zero cross product is with , so the parallel vector must be along . Use .
Making sign errors in , especially the term . This changes the scalar equation incorrectly. Expand each component carefully before simplifying.
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