If AB = I or BA= I, then prove that A is...

If AB = I or BA= I, then prove that A is invertible and `B=A^(-1)`.

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VIKRAM PUBLICATION ( ANDHRA PUBLICATION)-MATRICES -TEXTUAL EXERCISES (EXERCISE -3( e)

Find the Adjoint and Inverse of the matrix A=[{:(2,-3),(4," "6):}]
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Find the Adjoint and Inverse of the matrix [(cos alpha,-sin alpha),(si...
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Find the adjoint and inverse of the matrix A=[{:(1,0,2),(2,1,0),(3,2,1...
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Find the adjoint and inverse of the matrix [{:(2,1,2),(1,0,1),(2,2,1):...
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Find the adjoint and inverse of the following matrices. [(1,2),(3,-5)...
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Find the adjoint and inverse of the following matrices. [(1,-1),(-3,1...
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Find the adjoint and inverse of the following matrices. [(2,1),(1,-5)...
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If A = [(a+ib,c+id),(-c+id,a-ib)], a^(2)+b^(2)+c^(2)+d^(2) =1, then fi...
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If A =[{:(1,-2,3),(0,-1,4),(-2,2,1):}], then find (A)^(-1).
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IF A=[{:(-1,-2,-2),(2,1,-2),(2,-2,1):}] then show that adj A=3A^T. Als...
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IF abc ne 0, find the inverse of [{:(a,0,0),(0,b,0),(0,0,c):}]
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If S=[(0,1,1),(1,0,1),(1,1,0)], A=(1)/(2)[(b+c,c-a,b-a),(c-b,c+a,a-b),...
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IF 3A=[{:(1,2,2),(2,1,-2),(-2,2,-1):}] then show that A^-1=A'.
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IF A=[{:(3,-3,4),(2,-3,4),(0,-1,1):}] then show that A^-1=A^3.
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If AB = I or BA= I, then prove that A is invertible and B=A^(-1).
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