Applied Tensor Analysis for Electrical Students, Volume 1Macdonald, 1964 - Calculus of tensors |
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Page 170
... coefficients in the " grid " so constructed , ( a ) for the non - fault loops and ( b ) for the fault loops of Fig . 6-2 . ( a ) The currents i to i in the non - fault loops are expressed in terms of their own reference axes ( l ' to 4 ...
... coefficients in the " grid " so constructed , ( a ) for the non - fault loops and ( b ) for the fault loops of Fig . 6-2 . ( a ) The currents i to i in the non - fault loops are expressed in terms of their own reference axes ( l ' to 4 ...
Page 179
... coefficients of the unknown x and y . Dx is a square array in which the a coefficients of x are re- placed by the known b's . D , is a square array in which the a coefficients of y are re- placed by the known b's . All these ...
... coefficients of the unknown x and y . Dx is a square array in which the a coefficients of x are re- placed by the known b's . D , is a square array in which the a coefficients of y are re- placed by the known b's . All these ...
Page 180
... coefficients of the unknown x , y , z . D is a square array in which the a coefficients of x are replaced by the known b's . D , is a square array in which the a coefficients of y are replaced by the known b's . D , is a square array in ...
... coefficients of the unknown x , y , z . D is a square array in which the a coefficients of x are replaced by the known b's . D , is a square array in which the a coefficients of y are replaced by the known b's . D , is a square array in ...
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Common terms and phrases
3jh² a₁ actual network algebra Appendix applied tensor analysis b₁ b₂ busbars Chapter circuit coefficients coil compound element current tensor current transformation tensor currents and voltages D₁ denotes determinant diagonal E₁ e₂ electrical electrical network em(c engineering example F tensors F₁ fault conditions fault current faulted network faults at F1 Gabriel Kron Given Network h h2 h² h h²i h²i₂ hi₂ i₁ i₂ indices inverse iẞ jh² junction Junction-Pair Analysis junction-pair voltages Kron line-to-line fault load loop currents mathematical Mesh Analysis mesh network method Network of Fig notation primitive network problem quantity reference axes Reference Frame aß rows columns sequence networks sequence operators shown in Fig SMOI symbols symmetrical component tensor analysis tensor equation three-phase transformation tensors transpose unfaulted voltage tensor voltage transformation tensor Yẞa Z₁ Zap(s Zaß zero reference axis αβ