Use Gauss-Jordan row reduction to solve the given system of equations. (If there is no solution, enter NO SOLUTION. If the system is dependent, express your answer using the parameters x, y, andlor z.) x+2y z: x y+Zz 2x 2 0 0 9 (\"2,4 ) Use Gauss-Jordan row reduction to solve the given system of equations. (If there is no solution, enter NO SOLUTION. If the system is dependent, express your answer using the parameters x and/or y.) 8x - 9y = 3 24x - 27y = 9 ( x, y ) =Use Gauss-Jordan row reduction to solve the given system of equations. (If there is no solution, enter NO SOLUTION. If the system is dependent, express your answer using the parameters x and/or y.) X Y= 0 3x - y = 3 X y = ( x, y ) =In the matrix of a system of linear equations, suppose that one of the rows is a multiple of another. What can you say about the row-reduced form of the matrix? 0 The row-reduced matrix has a row of ones. 0 The row-reduced matrix has two rows of zeros. O The row-reduced matrix has a row of zeros. O The row-reduced matrix has a column of zeros. O The row-reduced matrix has two columns of zeros. Your friend Frans tells you that the system of linear equations you are solving cannot have a unique solution because the reduced matrix has a row of zeros. Comment on his claim. 0 The claim is right. 0 The claim is wrong. Use Gauss-Jordan row reduction to solve the given system of equations. HINT [See Examples 1-6.] (If there is no solution, enter NO SOLUTION. If the system is dependent, express your answer in terms of z, where x = x(z) and y = y(z).) 3xy+z=7 4Xy+z=3 (x. y, z) =( )