The probability that a randomly chosen `2xx2` matrix with all the entries from the set of first 10 primes, is singular, is equal to :

The probability that a randomly chosen number from the set of first 100 natural numbers is divisible by 4 is

If the matrix [5x2-10 1] is singular, find the value of x .

The probability that a randomly selected 2-digit number belongs to the set { n in N: (2^(n)-2) is a multiple of 3} is equal to

A square is incribed in a circle . If p_(1) is the probability that a randomly chosen point of the circle lies within the square and p_(2) is the probability that the point lies outside the square then

The number of distinct values of a2xx2 determinant whose entries are from the set {-1,0,1}, is

Let M be the set of all 2xx2 matrices with entries from the set R of real numbers.Then, the function f:M rarr R defined by f(A)-|A| for every A in M, is

Four dice are thrown simultaneously and the numbers shown on these dice are recorded in 2 xx 2 matrices. The probability that such formed matrices have all different entries and are non-singular, is :