Yash Singh posted an Question
January 16, 2020 • 03:22 am 15 points
  • IIT JAM
  • Mathematics (MA)

A,1(v = T(O) a,)= T(O) u 2** V) I(0) 2 T0)=0, So, dimension of null space is Zero. T0. For n # m, let 7, R-R" and T,: RR TT, is be linear transformations such t

a,1(v = T(O) a,)= T(O) u 2** V) I(0) 2 T0)=0, So, dimension of null space is Zero. T0. For n # m, let 7, R-R" and T,: RR TT, is be linear transformations such that bijective. Then (a) rank (T,) = n and rank (T,) = m (6) rank (T) = m and rank (T,) = n ()rank (T) n and rank (7,) =n (d) rank (T) = m and rank (T = m (b) m

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  • Priyadarshan Choursiya best-answer

    if A be matrix of order m*n with m<= n then m may be possible for rank, because this the biggest cofactor of A. see attachment

    upload_1579114203323.jpg
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