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i is the unit for imaginary number. In a complex coordinate, a+bi is point(a,b). The distance between | i is the unit for imaginary number. In a complex coordinate, a+bi is point(a,b). The distance between | ||
− | this point and the origin is | + | this point and the origin is the square root of (a^2 + b^2). |
In the form a+bi, when b=0, the complex number belongs to real number; when a=0, the complex number | In the form a+bi, when b=0, the complex number belongs to real number; when a=0, the complex number |
Revision as of 16:23, 2 September 2008
Review of Complex Number
Definition
Complex number is the combination of real number and imaginary number. It's basic form is a+bi, Where a is the real part and bi is the imaginary part. i is the unit for imaginary number. In a complex coordinate, a+bi is point(a,b). The distance between this point and the origin is the square root of (a^2 + b^2). In the form a+bi, when b=0, the complex number belongs to real number; when a=0, the complex number belongs to imaginary number; when they both are not zero, it belongs to complex region. The triangular form of a complex number is Z=r(cosx + isinx). r is the distance between point Z and the origin on a complex coordiante. rcosx is real part and irsinx is the imaginary part.