Math 210-01: Linear Algebra: Reading Homework 8.3--8.4
- Polar Form and DeMoivre : what basic procedure(s) are facilitated by the polar form of a complex number?
- Polar Form : what is polar form of a complex number?
- argument : what is the principal argument of a complex number? why do we need to define it? how is it denoted?
- DeMoivre's Theorem : what is DeMoivre's theorem?
- nth roots : how is the nth root, w, of a complex number z defined?
- finding nth roots : how do we calculate the nth root of a complex number?
- nth roots of unity : what are the nth roots of unity?
- Complex Vector Spaces and Inner Products : what is a complex vector space?
- $C^n$ : what is $C^n$? what is a standard basis for it? what is its dimension?
- Inner products : what is the Euclidean inner product?
- properties : what properties does the Euclidean inner product have?
- norms : what is the Euclidean norm? Euclidean distance?
- Complex Inner Products : how is a complex inner product defined?
Math 210-01: Linear Algebra: Reading Homework 8.3--8.4
Last Modified: Wed May 5 07:58:44 1999
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