With `1,omega,omega^(2)` as cube roots of unity, inverse of which of the following matrices exists?

Find the inverse of each of the following matrices [{:(1,2),(2,-1):}]

Find the inverse of each of the following matrices [{:(2,-3),(5,4):}]

Using elementary transformations find the inverse of each of the following matrices , if it exist. [{:(1,2),(2,-1):}]

If 1,omega,omega^(2) are the cube roots of unity, then the roots of the equation (x-1)^(3)+8=0 are

Find the inverse of each of the following matrices [{:(2,0,-1),(5,1,0),(0,1,3):}]

Find the inverse of each of the following matrices [{:(5,8,1),(0,2,1),(4,3,-1):}]

Find the inverse of each of the following matrices [{:(2,-1,1),(-1,2,-1),(1,-1,2):}]

Find the inverse of each of the following matrices [{:(3,-10,-1),(-2,8,2),(2,-4,-2):}]

If omega is a non-real complex cube root of unity, find the values of the following. (i) omega^(1999) (ii) omega^(998) (iii) ((-1+isqrt(3))/2)^(3n+2),ninNand i=sqrt(-1) (iv) (1+omega)(1+omega )^(2)(1+omega)^(4)(1+omega)^(8) ...upto 2n factors (v) ((alpha+betaomega+gammaomega^(2)+deltaomega^(2))/(beta+alphaomega^(2)+gammaomega+deltaomega))," where "alpha,beta,gamma,delta, in R (vi) 1*(2-omega)(2-omega^(2))+2*(3-omega)(3-omega^(2))+3*(4-omega)(4-omega^(2))+...+...+(n-1)*(n-omega)(n-omega^(2))

Using elementary row transformations , find the inverse of each of the matrices , if it exists in example number . [{:(1,-1),(2,3):}]