Question | Answer |

the square root of (u1)^2+...+ (uk)^k | |

choosing a point in a matrix, turning it into a one, then annihilating entries above and below it | |

first nonzero entry in every row is one and below each one are zeroes | |

system of linear equations with one or more solutions | |

when one non-zero vector is a scalar multiple of another, these vectors are: | |

a basic solution to a linear program in which all variables are nonnegative | |

when a linear system has an infinite number of solutions it has: | |

2-parameter solution = | |

If every vector is a unit vector and the vectors are mutually orthogonal then the vectors are | |

x vector =(x1,x2,...,xn) = Po vector + t times the v vector | |

the set of all linear combinations of a set of vectors | |

when it costs less then $1 in raw materials to make $1 worth of product | |

vector starting at the origin and ending at a point | |

a matrix where all entries are non-negative and every column sums to one | |

system where all constraints are 0 (when every equation in the system equals 0) | |

method used to find the determinant and/or inverse of a 3x3 matrix or larger | |

A vector space W that is part of a larger vector space V | |

If given any demand there is a production schedule that meets that demand | |

Vector Sn = T^n times vector So | |

vector of length one | |

when you multiply this with a matrix it is like multiplying by one | |

3-or more-parameter solution = | |

A system is consistent if and only if the row rank of the coefficient matrix equals the row rank of the augmented matrix | |

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