Algebra II ch. 4 test
Matrix
an array of numbers arranged in rows and columns
Any two matrices can be multiplied together.
false
If a system of equations is dependent, then it does not have a solution.
false
If matrices A and B are inverse of each other, then AI=B and BI=A.
false
Matrix multiplication is commutative.
false
Dependent
infinitely many solutions
Inconsistent
no solution
Dimensions of a matrix
numbers of rows X number of columns
Independent
only 1 solution
If the calculator says Error...
that means the matrix would not have an inverse because the det would be 0 and if the det is 0 it can't have an inverse
If a matrix has A dimensions mXn and matrix B has dimensions nXr, then...
the product AB has dimensions mXr
If you multiply a 1X3 matrix and a 3X1 matrix...
the product is a 1X1 matrix
A is a square matrix with n rows and n columns. If there is an nXn matrix B such that AB=I and BA=I...
then A and B are inverse of one another
A is a square matrix with n rows and n columns. I is a matrix with the same dimensions and with ones on the main diagonals and zeros elsewhere.
then AI=IA=A
Two matrices are equal if they have the same dimensions and the corresponding entries are equivalent.
true
When adding or subtracting matrices, their dimensions must be the same.
true
No solution
when there is 0001 in the bottom row of an augmented matrix
Infinitely many solution
when there is a row of zeros in the bottom row of an augmented matrix
