(3). Define a linear transformation T: R2 R2 by →> where G = ( 3) ₁ 0 <0 < cos (0) - sin(0) cos(0) cos(0) a b (4). The matrix A = T(x) = Gx-x, 0. Then linear transformation T is one-to-one and onto. ( ) satisfies the equation A² - (a + d) A + (ad-bc)I = 0, for any real numbers C d a, b,c and d, where O denotes a 2 x 2 square matrix. distinot nicomalues then so does A².

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(3). Define a linear transformation T: R2 R2 by →> where G = cos (0) -sin(0) cos(0) cos(0) 3) ₁ 0 <0< satisfies the equation A² - (a + d) A+ (ad-bc)I = 0, for any real numbers T(x) = Gx-x, a b 0. Then linear transformation T is one-to-one and onto. ( ) (4). The matrix A = C d a, b, c and d, where O denotes a 2 x 2 square matrix. distinot nicomvalues then so does 4².