Transcription of COMPLEX NUMBERS - NUMBER THEORY
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Chapter 5 COMPLEX Constructing the COMPLEX numbersOne way of introducing the fieldCof COMPLEX NUMBERS is via the arithmeticof 2 2 COMPLEX NUMBER is a matrix of the form x yyx ,wherexandyare real NUMBERS of the form x00x are scalar matrices and are calledrealcomplex NUMBERS and are denoted by the symbol{x}.The real COMPLEX NUMBERS {x}and{y}are respectively called therealpartandimaginary partof the COMPLEX NUMBER x yyx .The COMPLEX NUMBER 0 11 0 is denoted by the have the identities x yyx = x00x + 0 yy0 = x00x + 0 11 0 y00y ={x}+i{y},i2= 0 11 0 0 11 0 = 1 00 1 ={ 1}.
complex numbers – find the reduced row–echelon form of an matrix whose el-ements are complex numbers, solve systems of linear equations, find inverses and calculate determinants. For example, solve the system (1+i)z +(2−i)w = 2+7i 7z +(8−2i)w = …
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