Let be a matrix such that for all and . Let the random variable denote the possible values of the determinant of the matrix . Then, the variance of is:
- A
- B
- C
- D
Let be a matrix such that for all and . Let the random variable denote the possible values of the determinant of the matrix . Then, the variance of is:
Correct answer:B
Standard Method
Given: is a matrix with each entry from .
Find: The variance of the random variable , where is the determinant of .
The determinant is
So the possible values of are .
From all possible matrices, the probability distribution is:
Now,
Also,
And,
Therefore,
Hence, the correct option is B.
Counting All Cases
Given: where each of .
Find: The variance of .
Since each of the four entries can be chosen independently as or , the total number of possible matrices is
For a matrix,
Now and can each be either or , so the possible values of are
To get , we need and .
To get , we need and .
The remaining matrices have determinant :
Hence,
Now compute expectation:
Next,
Therefore,
Thus, the variance is and the correct option is B.
Assuming the determinant can take only the values and . This is wrong because can also be negative, giving . Always check all possible combinations of and .
Using incorrect probabilities for determinant values. The counts must come from all possible matrices, not from a partial listing. Count the cases for and carefully, then assign the remaining cases to .
Computing variance as only without checking . The formula is . Here , but that must be shown, not assumed blindly.
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