Linear Algebra Exam 2 - Terms and Concepts
If A = [aij] and B= [bij] are mxn matrices and C is within R, we have the following definitions:
(1) A = B if aij = bij (2) A + B = [aij + bij] (3) CA = [Caij]
Equivalent statements that make up the Invertible Matrix Theorem:
(1) A is an invertible matrix (2) A is row equivalent to the nxn identity matrix (3) A has n pivots (4) The equation Ax = 0 has only the trivial solution (5) The columns of A form a linearly independent set (6)The linear transformation x —> Ax is one-to-one (7) The equation Ax = b has at least one solution for each b in R^n (8) The columns of A span R^n (9) The linear transformation A —> Ax maps R^n onto R^n (10) There is an nxn matrix C such that CA = I (11) There is an nxn matrix D such that AD = I (12) A^T is an invertible matrix
Types of Contraction/Expansion Standard Matrices
(1) Horizontal Contraction and Expansion (2) Vertical Contraction and Expansion
Types of Shear Standard Matrices
(1) Horizontal Shear (2) Vertical Shear
Properties of the Inverse:
(1) If A is an invertible matrix, then A^-1 is invertible and (A^-1)^-1 = A (2) If A and B are mxn invertible matrices, then so is AB, and the inverse of AB is the product of the inverses of A and B in the reverse order. I.e. (AB)^-1 = B^-1A^-1 (3) If A is an invertible matrix, then so is A^T, and the inverse of A^T is the transpose of A^-1. I.e. (A^T)^-1 = (A^-1)^T
Types of Projection Standard Matrices
(1) Projection onto the x1-axis (2) Projection onto the x2 axis
Types of Reflection Transformation Matrices
(1) Reflection through the x1 axis (2) Reflection through the x2 axis (3) Reflection through the line x2 = x1 (4) Reflection through the line x2 = -x1 (5) Reflection through the origin
Two definitions of matrix multiplication:
(1) The column definition (2) The hand-twist method
Let a be an mxn matrix. If A is invertible, AX = b:
(1) has a solution (2) the solution is unique
Properties of matrix multiplication: A(BC) =
(AB)C. Matrix multiplication is always associative
Properties of matrix multiplication: r(AB) = ___ = ____, if r is in R
(rA)B; A(rB)
Concerning matrices: r(sA) =
(rs)A
Concerning matrices: A + 0 = _____ = _____
0 + A; A
A transformations a contraction if k is...
0<k<1
THEOREM 3: Let A and B denote matrices whose sizes are appropriate for the following sums and products: A(^T)^T =
A
Concerning matrices: (A + B) + C =
A + (B + C)
Determinant
A function that inputs a matrix nxn and outputs a real number. It's closely tied to the question of whether a matrix is invertible
One-to-One
A mapping T: R^n —> R^m in which each b in R^m is the image of AT MOST ONE x in R^m
Properties of matrix multiplication: A(B + C) =
AB + AC. Matrix multiplication is always distributive
Properties of the inverse: If A and B are mxn invertible matrices, then so is ____, and the inverse of AB is the product of the inverses of A and B in the ___ order
AB; reverse (i.e. (AB)^1 = B^-1A^-1)
Properties of matrix multiplication: If In is the nxn identity matrix, then InA = ___ = _____
AIn; A
Equation for the Inverse of a Two-By-Two Matrix
A^-1 = (1/(ad - bc)[(d,-b),(-c,a)])
Let A and B be square matrices. If AB = I, then A and B are both invertible, with B = _____ and A = _____
A^-1; B^-1
The inverse of A, if it exists, is a matrix A^-1 such that AA^-1 = ___ = ____
A^-1A; In
THEOREM 3: Let A and B denote matrices whose sizes are appropriate for the following sums and products: (A + B)^T =
A^T + B^T
Properties of the inverse: If A is an invertible matrix, then so is ___, and the inverse of A^T is the ______
A^T; transpose of A^-1 (i.e. (A^T)^-1 = (A^-1)^T)
If A is an mxn matrix, and if B is an nxn matrix with columns b1, ..., bp, then the produce AB is the mxn matrix whose columns are ______
Ab1, ..., Abp
Transpose
An mxn matrix A^T whose columns are the corresponding rows of the mxn matrix A
Elementary Matrix
An mxn matrix obtained by performing one elementary row operation to In. You can write any series of row operations as a sequence of elementary row operations!
Concerning matrices: A + B =
B + A
(AB)^T =
B^T A^T
Concerning matrices: C(A + B) =
CA + CB
(C + D)A =
CA + DA
If we want to know if a matrix is invertible, sometimes we can ______
Check for a dependency relation! If a dependency relation exists, the matrix is dependent and, thus, not invertible
Commutable
Describes A and B is AB = BA
Not singular
Describes a matrix that is invertible
Singular
Describes a matrix that is not invertible
If something is linear, it _____ and ______
Distributes over addition; you can pull constants out
If an elementary row operation is performed on an mxn matrix A, the resulting matrix can be written as ___, where the mxn matrix E is created by performing the same row operations to ____
EA; Im
A mapping T: R^n —> R^m is said to be onto R^m if...
Each b in R^m is the image of AT LEAST ONE x in R^n.
A transformation is a type of ______
Function
Transformation =
Function
Linear transformations are determined completely by what they do to the columns of ____
I2
Invertible Matrix Theorem
IMT. Series of equivalent terms that describes Matrix A (staring with "A is invertible")
THEOREM 7: An mxn matrix is invertible if and only if it is row equivalent to _____, and in this case, any sequence of elementary row operations that reduces A to In also ______
In ; transforms In into A^-1
Each elementary matrix E is _______
Invertible
All linear transformations from R^n to R^m are _______
Matrix transformations
Zero Matrix
Matrix whose entries are all zero
If AB = BC, is it true in general that B = C?
No
If a product AB is the zero matrix, can you conclude in general that either A = 0 or B = 0?
No!
Properties of matrix multiplication: Is AB = BA?
No! AB =/= BA. Matrix multiplication is not commutative in general
Do all laws of basic algebra apply to matrix operations?
No! For example, matrices AB = 0 does NOT imply that A = 0 or B = 0
Are projection transformations reversible?
Nope
Transformations are reversible only when they are ______
One-to-one
T is onto R^m when the ____ of T is ________.
Range; of the codomain R^m
The Algorithm Method for Finding A^-1
Row reduce the augmented matrix [AI]
A linear transformation T:R^n —> R^m is invertible if there's a linear transformation S:R^n —> R^n such that _______
S(T(x)) = T(S(x)) = X (we often write T^-1 for S)
How to find the inverse of a transformation matrix
STEP 1: Find A STEP 2: Find A^-1 STEP 3: Solve for T^-1 using A^-1
How to check if a transformation from R^n —> R^m is onto or one-to-one:
STEP 1: Reduce to echelon form STEP 2: Count the number of pivots STEP 3: If the number of pivots is equal to m, the transformation is onto. If the number of pivots is equal to n, then T is one-to-one
Diagonal Matrix
Square nxn matrix whose diagonal entries are zero
Basic Transformation Equation
T(x) = Ax
Let T:R^n—>R^m be a linear transformation. There exists a (unique) Matrix A such that _____
T(x) = Ax
In a one-to-one mapping, if x1 =/= x2, then...
T(x1) =/= T(x2)
A^-1
The inverse of A
Standard Matrix
The matrix A
a32 denotes ______
The third row and second column in Matrix A
Shear Transformation
Transformation that warps the shape of your vector
T is one-to-one if, for each b in R^m, the equation T(x) = b either has a _____ or _____
Unique solution; none at all
Are rotation transformations reversible?
Yep
Does the IMT apply ONLY to square matrices?
Yes
Transformation Matrix for Reflection Through the Origin
[(-1,0),(0,-1)]
Transformation Matrix for Reflection Through the X2-Axis
[(-1,0),(0,1)]
Transformation Matrix for Reflection Through the Line X2 = -X1
[(0,-1),(-1,0)]
Standard Matrix for Projection Onto the X1-Axis
[(0,0),(0,1)]
Transformation Matrix for Reflection Through the X1-Axis
[(1,0),(0,-1)]
Standard Matrix for Projection Onto the X1-Axis
[(1,0),(0,0)]
Vertical Shear Standard Matrix
[(1,0),(k,1)]
Horizontal Shear Standard Matrix
[(1,k),(0,1)]
Rotation Transformation Standard Matrix
[(cos θ, -sinθ),(sinθ, cosθ)]
Transformation Matrix for a Horizontal Contraction and Expansion
[(k,0),(0,1)]
We denote the entry in the ith row and jth column as ___
aij
THEOREM 9: Let T: R^n —> R^n be a linear transformation and let A be the standard matrix for T. The T is invertible if and only if A is ______
an invertible matrix
To construct A,let ______
e1 = [1 0 ... 0], ... , en = [0 0 ... 0 1], then A[T(e1),T(e2),T(e3)]
An nxn (square) matrix is diagonal if aij = 0 when _____
i =/= j
If we want to know if a matrix is invertible, it's easiest to first check ______
if A has n pivots
Properties of the inverse: If A is an invertible matrix, then A^-1 is ____ and (A^-1)^-1 = ____
invertible; A
If A is an nxn matrix and k is a positive integer, then A^k denotes the product of ______
k copies of A
A transformation is an expansion if k is...
k>1
An mxn entry has ___ rows and ____ columns
m;n
A matrix is non-singular if it's determinant is ____
not zero
THEOREM 3: Let A and B denote matrices whose sizes are appropriate for the following sums and products: For any scalar r, (rA)^T =
rA^T
The transpose of a product of matrices equals the product of their transposes in ________
reverse order
All elementary row operations are ______
reversible
If a matrix is not 2x2, you can find the inverse by ____________
setting your matrix equal to In and solving.
Each column of AB is a linear combination of the columns of A using weights from _______
the corresponding column of B
We can only add matrices together if _____. Otherwise, they are ________.
the same size; undefined
The inverse of matrix A, if it has one, is _____
unique
THEOREM 5: If A is an invertible nxn matrix, then for each b in R^n, the equation Ax = b has the unique solution _______
x = A^-1b
In a one-to-one mapping, if T(x1) = T(x2), then...
x1 = x2
