Divam Kumar posted an Question
January 30, 2021 • 22:51 pm 30 points
  • IIT JAM
  • Mathematics (MA)

B.sc.iii maths linear & abstract algebra tt t : r'> r be a linear transformation detined by t(x, y, 2) (x - y + 25, 2x + -x2yt 2) then basis of null space of pa

B.Sc.III Maths Linear & Abstract Algebra Tt T : R'> R be a linear transformation detined by T(x, y, 2) (x - y + 25, 2x + -X2yt 2) Then basis of null space of Page 41 T is o(1.0.1)1 (b) {(1,0, 1)} o 50. Let T be a linear transformation defined as in question (49) then bas of Rang space of T is (a) {(1, 1, 2). (-2, 1, 1). (1, -1, 2)} (b) {1. 2, - 1). (-1, 0, 2), (1, -1, 1)} (c) {(1, 2, - ), F1, ,-2), (2, 0, 2)} (d) {(1, 2, - 1), (-1, 1, - 2)} Tha a linrar transformation defined as in question (49) then,

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    Satpal singh

    if you are satisfied with this answer accept this as best answer

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