PENGGUNAAN KUADRAT TERKECIL UNTUK MENENTUKAN SOLUSI SISTEM PERSAMAAN LINIER TAK HOMOGEN
| Main Author: | MULIANTY, MULIANTY |
|---|---|
| Format: | Thesis NonPeerReviewed Book |
| Bahasa: | eng |
| Terbitan: |
, 2009
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| Subjects: | |
| Online Access: |
http://eprints.umm.ac.id/8402/1/PENGGUNAAN_KUADRAT_TERKECIL_UNTUK_MENENTUKAN_SOLUSI_SISTEM_PERSAMAAN_LINIER_TAK_HOMOGEN.pdf http://eprints.umm.ac.id/8402/ |
Daftar Isi:
- Linear algebra is one of the mathematics science area or branch. Main problem in linear algebra is to finish linear equation system (SPL). In general, SPL is consisting of linear equations. System equation of AX = B told homogeneous if B is matrix zero, however if B is not matrix zero hence the equation system told do not be homogeneous. Every homogeneous linear equation system have the nature of consistence while linear equation system not homogeneous have the nature of consistence and do not consistence.. Intention of writing of this thesis is to study about way of determining solution of Linear Equatio. not homogeneous by using Least square. Become the Solving Of Linear System Equation Do not be Homogeneous by using least Square of Ax = b in this final duty can conducted with stages steps as following Determining.|| by || > || bp|| if S is room of is part of R m , to each every R m Îb there are a single element of p of approximate S to b for all y 1 p in S. common/ public Form from solving of smallest square of Ax = b into form normal equation of smallest Square of A T Ax=A T b Become, this is method very easy and efficient in determining the solving of SPL do not be Homogeneous wishing to be searched.