a.) {(x1, x2, x3)T | X21 = X23 }(The 21and the 23are supposed to be on top of eachother.)
b.) {(X1, X2, X3)T | x3 = x1 + x2
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Prove that each of the following sets is convex (a) {(x1, 22, x3) E R3 | 0 < 띠, x2, 23 and x1 + 2x2 + 3x3 6)
Consider the following linear transformation T: RS → R3 where T(X1, X2, X3, X4, X5) = (x1-X3+X4, 2X1+X2-X3+2x4, -2X1+3x3-3x4+x5) (a) Determine the standard matrix representation A of T(x).
Consider the following linear transformation T: RS → R3 where T(X1, X2, X3, Xa, Xs) = (x1-x3+Xa, 2x1+x2-x3+2x4, -2X2+3x3-3x4+xs) (a) Determine the standard matrix representation A of T(x). (b) Find a basis for the kernel of T(x). (c) Find a basis for the range of T(x). (d) Is T(x) one-to-one? Is T(x) onto? Explain. (e) Is T(x) invertible? Explain
Determine whether the system is consistent 1) x1 + x2 + x3 = 7 X1 - X2 + 2x3 = 7 5x1 + x2 + x3 = 11 A) No B) Yes Determine whether the matrix is in echelon form, reduced echelon form, or neither. [ 1 2 5 -7] 2) 0 1 -4 9 100 1 2 A) Reduced echelon form B) Echelon form C) Neither [1 0 -3 -51 300 1-3 4 0 0 0 0 LOO 0...
Please show work Consider the following linear transformation T: RS → R3 where T(X1, X2, X3, X4, Xs) = (x1-X3+X4, 2x1+x2-X3+2x4, -2x1+3x3-3x4+xs) (a) Determine the standard matrix representation A of T(x). (b) Find a basis for the kernel of T(x). (c) Find a basis for the range of T(x). (d) Is T(x) one-to-one? Is T(x) onto? Explain. (e) Is T(x) invertible? Explain
Consider the following linear transformation T: R5 → R3 where T(X1, X2, X3, X4, X5) = (*1-X3+X4, 2X1+X2-X3+2x4, -2X1+3X3-3x4+x5) (a) Determine the standard matrix representation A of T(x). (b) Find a basis for the kernel of T(x). (c) Find a basis for the range of T(x). (d) Is T(x) one-to-one? Is T(x) onto? Explain. (e) Is T(x) invertible? Explain
Question 1: Let T: R3 ---> R2 defined by T(x1,x2,x3) = (x1 + 2x2, 2x1 - x2). Show that T as defined above is a Liner Transformation. Question 2: Determine whether the given set of vectors is a basis for S = {(1,2,1) , (3,-1,2),(1,1,-1)} R3 Need answers to both questions.
For the following systems, find the transfer function using MATLAB. Also, determine the poles and zeros of each transfer. You should be able to use some combination of the following MATLAB functions: 'ss2tf( )', 'ss( )', 'tf( )', 'pole( )', "zero( )', and 'roots() 100 ).y) = [0_1)|) 2 a. |x2(t)] -10 [x1 (t lx20 21 b. + 01 x1 (t) 0 x2(t) 1 u(t), y(t): ol]x3(t)] [(t)] x2(t) 3(t) [x1 (t)] [o 0 1x2(t) [x3(t)] -4 -2 0 2...
Algorithms Given the following 3SAT formula, convert the problem to Independent Set and determine from there if the formula is satisfiable: $ = (x1 V x2 V x3) ^ (X1 V X2 V x3) ^ (X1 V x2 V x3)
10) Determine whether the matrix operator is invertible, if so, find its inverse. a)T(x, y) = (3x + 4y, 5x + 7y) b)T(x1, X2 X3) = (x; + 2x2 + 3x3, xz – X3, X; +3x2 + 2x3)