Minimum value of a second order determinant whose each is either 1 or 2 is equal to

If each element of a second order determinant is either zero or one, what is the probability that the value of the determinant is positive? (Assume that the individual entries of the determinant are chosen independently, each value being assumed with probability (1)/(2) )

Number of second order determinants which have maximum values whose each entry is either -1 or 1 is equal to

Each element of the second order determinant is 1 and - 1 then ....... is the probability that value of determinant is not zero.

If the value of a third order determinant is 12, then the value of ther determinant formed by replacing each element by its co-factor will be 144

Show that the sum of an AP whose first term is a, the second term is b and the last term is c is equal to ((a+c)(b+c-2a))/(2(b-a)) .

Minimum value of 4x^2-4x|sinx|-cos^2 theta is equal

Find the minimum value of sec^2 theta + cos^2 theta + 2

For any "Delta"A B C the value of determinant |sin^2\ \ A cot A1sin^2B cot B1sin^2\ \ C cot C1| is equal to- s in A s in B s in C b. 1 c. 0 d. s in A+s in B+s in C

Minimum number of two coplanar vectors of equal magnitude whose vectors sum could be zero, is:

The value of the determinant |{:(-a, b, c), (a,-b, c), (a, b,-c):}| is equal to.