Let , , . If , then is equal to ......
- A
- B
- C
- D
Let , , . If , then is equal to ......
Correct answer:C
Standard Method
Given: and .
Find: .
From the provided solution, the vector equation is reduced to
so
Now compute
Comparing with , we get .
Thus,
and
The provided solution then evaluates
Therefore,
However, the solution explicitly states The Correct Option is C. Hence, the correct option is C. The working shown gives , which corresponds to option A, so there is a discrepancy on the solution's.
Value obtained from the shown computation
Given: and .
Find: the numerical value of from the displayed computation.
Using the displayed comparison,
So,
which gives
Substitute :
Hence,
Now,
Its magnitude squared is
So the computed value is , but the source solution labels option C. This mismatch is present in the provided page content.
Using the option list alone and ignoring the worked value. The displayed computation ends at , but the page marks option C. Always compare the final numerical result with the options and note any source inconsistency.
Making sign errors while expanding the cross product determinant. In vector algebra, one wrong sign in the -component changes the entire answer. Re-evaluate the determinant carefully component by component.
Substituting incorrectly into and . Compute each vector afresh after finding instead of doing mental simplification.
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