A determinant is chosen randomly from th...

A determinant is chosen randomly from the set of all determinant of order 4 with elements 2 and 3 .The probability that determinant chosen will have an even number of 2's is
1) `(2^(15)-2)/(16)`
2) `(2^(15)-2)/(2^(16))`
3) `(2^(8)-1)/(2^(16))`
4) `(2^(15)-1)/(2^(16))`

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A determinant is chosen randomly from the set of all determinant of order 4 with elements 2 and 3 .The probability that determinant chosen will have an even number of 2's is 1) `(2^(15)-2)/(16)`2) `(2^(15)-2)/(2^(16))` 3) `(2^(8)-1)/(2^(16))`4) `(2^(15)-1)/(2^(16))`

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A determinant is chosen randomly from the set of all determinant of order 4 with elements 2 and 3 .The probability that determinant chosen will have an even number of 2's is
1) `(2^(15)-2)/(16)`
2) `(2^(15)-2)/(2^(16))`
3) `(2^(8)-1)/(2^(16))`
4) `(2^(15)-1)/(2^(16))`