[" If "A" is an involutary matrix given by "A=[[0,1,-1],[4,-3,4],[3,-3,4]]],[" then the inverse of "(1)/(2)A" will be "]

A is an involuntary matrix given by A=[(0,1,-1),(4,-3,4),(3,-3,4)] , then the inverse of A//2 will be

A is an involuntary matrix given by A=[(0,1,-1),(4,-3,4),(3,-3,4)] , then the inverse of A//2 will be

A is an involuntary matrix given by A=|[0, 1,-1], [4,-3, 4], [3,-3, 4]| , then the inverse of A//2 will be 2A b. (A^(-1))/2 c. A/2 d. A^2

A is an involuntary matrix given by A=|[0, 1,-1], [4,-3, 4], [3,-3, 4]| , then the inverse of A//2 will be 2A b. (A^(-1))/2 c. A/2 d. A^2

If A is involutary matrix given by A=[(0,1,-1),(4,-3,4),(3,-3,4)] then inverse of A/2 will be

A is an involuntary matrix given by A=[[0,1,-14,-3,43,-3,4]], then the inverse of A/2 will be 2A b.(A^(-1))/(2) c.(A)/(2) d.A^(2)

A is an involuntary matrix given by A=[(0, 1,-1), (4,-3, 4), (3,-3, 4)] , then the inverse of A/2 will be a. 2A b. (A^(-1))/2 c. A/2 d. A^2

A is an involuntary matrix given by A=[0 1-1 4-3 4 3-3 4] , then the inverse of A//2 will be 2A b. (A^(-1))/2 c. A/2 d. A^2

Define involuntary matrix and show that [(0,1,-1),(4,-3,4),(3,-3,4)] is an involuntary matrix.

Find the inverse of the matrix A=[[3,1],[4,2]]