Linear Transformation
Linear Transformation (p.63) β’ Matrix-vector multiplication is a linear transformation. β’ If π΄ is a π × π matrix, and π’ is π × 1 vector, then matrix π΄ maps the vector π’ from βπ to the π × 1 vector π’β² in βπ . βπ βπ π’ domain π΄ π’β² Co-domain 1 Linear Transformation (p.63) β’ The space in which the vector π’ exist is called βDomainβ (βπ ). β’ The space in which the vector π’ is mapped to is called βCo-domainβ (βπ ). β’ The subset of co-domain in which all βπ vectors are mapped into is called βRangeβ. π π π΄ β β Range π’ domain π’β² Co-domain 2 Linear Transformation (p.63) β’ Example: π₯ 1 0 1 0 π₯ β’ π΄ = 0 1 , π΄π’ = 0 1 π¦ = π¦ 0 0 0 0 0 β’ The matrix π΄ is a β2 β β3 mapping. π¦β² π§β² β3 π¦ π΄: β2 β β3 β2 π₯ π₯ π ππππ = π¦ 0 π₯β² 3 Linearity condition (p.65) β’ A transformation π is linear if it meets these requirements for all π’ and π£: π π + π = π π + π(π) π ππ = ππ(π) β’ From above implied that π π =π π ππ + ππ = ππ π + ππ(π) 4 Linear transformation theorem (p.71) 5 Linear Transformation (p.72) 6 2 Geometric linear transformation in β (p.73-75) 7 2 Geometric linear transformation in β (p.73-75) 8 2 Geometric linear transformation in β (p.73-75) 9 2 Geometric linear transformation in β (p.73-75) 10
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