The matrix of the transformation reflect...

The matrix of the transformation reflection in the line `x+y=0` is (A) `[(-1,0),(0,-1)]` (B) `[(1,0),(0,-1)]` (C) `[(0,1),(1,0)]` (D) `[(0,-1),(-1,0)]`

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If A=[(1,0),(0,1)] then A^4= (A) [(1,0),(0,1)] (B) [(1,1),(0,10)] (C) [(0,0),(1,1)] (D) [(0,1),(1,0)]

If A=[(1,0),(0,1)] then A^4= (A) [(1,0),(0,1)] (B) [(1,1),(0,10)] (C) [(0,0),(1,1)] (D) [(0,1),(1,0)]

If A=[(0,1),(1,0)] then A^4 is (A) [(0,0),(1,1)] (B) [(1,1),(0,0)] (C) [(0,1),(1,0)] (D) [(1,0),(0,1)]

the matrix [(0,1),(1,0)] is the matrix reflection in the line

the matrix [(0,1),(1,0)] is the matrix reflection in the line

the matrix [(0,1),(1,0)] is the matrix reflection in the line

the matrix [(0,1),(1,0)] is the matrix reflection in the line

The trnsformation orthogonal projection on X-axis is given by the matrix (A) [(0,1),(0,0)] (B) [(0,0),(0,1)] (C) [(0,0),(1,0)] (D) [(1,0),(0,0)]

If A=[(1,0),(1/2,1)] then A^50 is (A) [(1,25),(0,1)] (B) [(1,0),(25,1)] (C) [(1,0),(0,50)] (D) [(1,0),(50,1)]

If A=[(1,0),(1/2,1)] then A^50 is (A) [(1,25),(0,1)] (B) [(1,0),(25,1)] (C) [(1,0),(0,50)] (D) [(1,0),(50,1)]

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