| Question | Answer |
|---|
| vector v = c1v1+c2v2+...+ckvk for some scalars c1,c2...ck | |
| above and below leading ones are zeroes | |
| 3-or more-parameter solution = | |
| Vector Sn = T^n times vector So | |
| If det(A) does not equal 0 then A is | |
| when it costs less then $1 in raw materials to make $1 worth of product | |
| using row operations to put a matrix into ref | |
| first nonzero entry in every row is one and below each one are zeroes | |
| when a linear system has an infinite number of solutions it has: | |
| A system is consistent if and only if the row rank of the coefficient matrix equals the row rank of the augmented matrix | |
| A basis that is also an orthonormal set | |
| linear system that does not have any solutions | |
| If a set of vectors spans the vector space V and the set is linearly independent it is a | |
| If every vector is a unit vector and the vectors are mutually orthogonal then the vectors are | |
| If AB = I and BA = I then B is the _______ of A. | |
| If given any demand there is a production schedule that meets that demand | |
| vector of length one | |
| system where all constraints are 0 (when every equation in the system equals 0) | |
| an extra variable that's added to an inequality to make the constraint an equality | |
| 2-parameter solution = | |
| x vector =(x1,x2,...,xn) = Po vector + t times the v vector | |
| choosing a point in a matrix, turning it into a one, then annihilating entries above and below it | |
Colors of the Rainbow 
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