Linear Algebra Midterm 2

Leontif Model x - production vector d- final demand

(I-C)x=d or (I-C)^-1 d=x

The statement is true because it is the Multiplicative Property of determinants.

(det A)(det ​B)=det AB. Select the correct choice below​ and, if​ necessary, fill in the answer box to complete your choice

Basis of Col A {[5] [7]} {[5] , [3]} {[3] [3]} Find a Basis for Nul A {[4] [-5]} {[-7] [4]} {[1] , [0]} {[0] [1]}

A matrix A and an echelon form of A are shown below. Find a basis for Col A and a basis for Nul A. A= [5 7 29 -3] [1 2 10 -3] [5 3 1 13] ~ [0 1 7 -4] [3 3 9 3] [0 0 0 0]

True. If 0 is an eigenvalue of​ A, then there are nontrivial solutions to the equation Ax=0x. The equation Ax=0x is equivalent to the equation Ax=0​, and Ax=0 has nontrivial solutions if and only if A is not invertible.

A matrix A is not invertible if and only if 0 is an eigenvalue of A. Choose the correct answer below

True. A number c is an eigenvalue of A if and only if the equation Ax=cx has nontrivial​ solutions, and Ax=cx and ​(A-cI)x=0 are equivalent equations.

A number c is an eigenvalue of A if and only if the equation ​(A-cI)x=0 has a nontrivial solution. Choose the correct answer below.

​False; if A and B are invertible​ matrices, then left parenthesis AB right parenthesis Superscript negative 1equalsUpper B Superscript negative 1Upper A Superscript negative 1.

A product of invertible n x n matrices is​ invertible, and the inverse of the product is the product of their inverses in the same order.

The statement is false. Conditions​ (ii) and​ (iii) must be satisfied for each u and v in​ H, which is not specified in the given statement.

A subspace of |R^n is any set H such that​ (i) the zero vector is in​ H, (ii) u​, v​, and u+v are in​ H, and​ (iii) c is a scalar and Cu is in H.

True. An eigenspace of A corresponding to the eigenvalue lambda is the null space of the matrix ​(A-λ​I).

An eigenspace of A is a null space of a certain matrix. Choose the correct answer below.

The statement is false because scaling a row also scales the determinant by the same scalar factor.

An elementary row operation on A does not change the determinant. Choose the correct answer below.

A square lower triangular matrix is invertible when all entries on its main diagonal are nonzero. If all of the entries on its main diagonal are​ nonzero, then the nxn matrix has n pivot positions.

An mxn lower triangular matrix is one whose entries above the main diagonal are​ zeros. When is a square lower triangular matrix​ invertible? Justify your answer.

True. A​ steady-state vector for a stochastic matrix is actually an eigenvector because it satisfies the equation Ax=x.

A​ steady-state vector for a stochastic matrix is actually an eigenvector. Choose the correct answer below.

The matrix is not invertible. If a matrix has two identical columns then its columns are linearly dependent. According to the Invertible Matrix Theorem this makes the matrix not invertible.

Can a square matrix with two identical columns be​ invertible? Why or why​ not?

An example of a 2x2 matrix with only one distinct eigenvalue is [1 0] [0 1] .

Construct an example of a 2x2 matrix with only one distinct eigenvalue.

​True; since each elementary matrix corresponds to a row​ operation, and every row operation is​ reversible, every elementary matrix has an inverse matrix.

Each elementary matrix is invertible.

​False, because any subspace of |R^n must contain the​ zero-vector. Therefore, a line can only be a​ one-dimensional subspace of |R^n if it passes through the origin.

Each line in |R^n is a​ one-dimensional subspace of |R^n.

[ .7 0 -3.5] [0 1.4 8.4] [0 0 1 ]

Find the 3x3 matrix that produces the described composite 2D transformation​ below, using homogeneous coordinates. Translate by ​(- 5​,6​), and then scale the​ x-coordinate by 0.7 and the​ y-coordinate by 1.4.

The characteristic polynomial is λ^2 - 2λ - 5. The real eigenvalues are 1 + √6 , 1 - √6

Find the characteristic polynomial and the eigenvalues of the matrix. A= [ 3 2 ] [ 1 -1]

The characteristic polynomial is -λ^3 + 21λ + 16.

Find the characteristic polynomial of the​ matrix, using either a cofactor expansion or the special formula for 3x3 determinants.​ [ 0 2 1 ] [ 2 0 4 ] [ 1 4 0]

True. Checking whether a given vector u is in fact an eigenvector is easy because it only requires checking that u is a nonzero vector and finding if Au is a scalar multiple of u.

Finding an eigenvector of A may be​ difficult, but checking whether a given vector u is in fact an eigenvector is easy. Choose the correct answer below.

One eigenvalue of A is λ=0. This is because the columns of A are linearly​ dependent, so the matrix is not invertible.

For A= [-1 2 5] [-1 2 5]​ [-1 2 5]​​, find one​ eigenvalue, with no calculation. Justify your answer.

Nonzero vector in Nul A [ 3 ] [-3] [ 1 ] [ 0 ] Nonzero vector Col A [ 4 ] [ -16 ] [ 12 ]

For the matrix A​ below, find a nonzero vector in Nul A and a nonzero vector in Col A. A = [4 3 -3 4] [-16 -9 21 4] [12 3 -27 12]

Nul A is a subspace of |R^p for p=3 and Col A is a subspace of|R^q for q=5

Give integers p and q such that Nul A is a subspace of set of |R^p and Col A is a subspace of |R^q. A= [-5 4 3] [-2 1 0] [3 -4 0] [8 9 0] [6 -6 1]

Find ​det(A-λ​I), where lambda is a scalar.

How can the characteristic polynomial of a matrix A be​ determined?

−x⋅cos(θ)+y⋅sin(θ)+x −x⋅sin(θ)−y⋅cos(θ)+y

How do you find the last coordinates of the last column when rotating around a point other than the origin.

False; B Superscript negative 1 Baseline Upper A Superscript negative 1 is the inverse of AB.

If A and B are n x n and​ invertible, then A Superscript negative 1 Baseline Upper B Superscript negative 1 is the inverse of AB.

True; since A can be row reduced to the identity​ matrix, A is row equivalent to the identity matrix. Since every matrix that is row equivalent to the identity is​ invertible, A is invertible.

If A can be row reduced to the identity​ matrix, then A must be invertible.

True; since A is​ invertible, A Superscript negative 1 b exists for all b in set of real numbers R Superscript n. Define x= A Superscript negative 1 b. Then Ax=b.

If A is an invertible n x n ​matrix, then the equation Ax=b is consistent for each b in set of real numbers R Superscript n.

​False; if A is​ invertible, then the row operations required to reduce A to the identity correspond to some product of elementary matrices E 1 E2 E3 . . . Ep. Then the row operations required to reduce A Superscript negative 1 to the identity would correspond to the product Ep Superscript negative 1 . . . E3 Superscript negative 1 E2 Superscript negative 1 E1 Superscript negative 1.

If A is​ invertible, then elementary row operations that reduce A to the identity Upper I Subscript n also reduce Upper A Superscript negative 1 to Upper I Subscript n.

It is a known theorem that if A is invertible then Upper A Superscript negative 1 must also be invertible. According to the Invertible Matrix​ Theorem, if a matrix is invertible its columns form a linearly independent set.​ Therefore, the columns of Upper A Superscript negative 1 are linearly independent.

If A is​ invertible, then the columns of Upper A Superscript negative 1 are linearly independent. Explain why.

True; since Upper A Superscript negative 1 is the inverse of​ A, Upper A Superscript negative 1AequalsIequalsAUpper A Superscript negative 1. Since Upper A Superscript negative 1AequalsIequalsAUpper A Superscript negative 1​, A is the inverse of Upper A Superscript negative 1.

If A is​ invertible, then the inverse of Upper A Superscript negative 1 is A itself.

​False; if ad-bc=/​0, then A is invertible.

If A=[a b, c d] and ab-cd=/​0, then A is invertible.

​True; if ad=bc then ad-bc=​0, and 1/ad-bc, A=[a b, c d] is undefined.

If A=[a b, c d] and ad=bc, then A is not invertible.

False. The condition that Ax=λx for some scalar λ is not sufficient to determine if x is an eigenvector of A. The vector x must be nonzero.

If Ax=λx for some scalar λ​, then x is an eigenvector of A. Choose the correct answer below.

False. The condition that Ax=λx for some vector x is not sufficient to determine if λ is an eigenvalue. The equation Ax=λx must have a nontrivial solution.

If Ax=λx for some vector x​, then λ is an eigenvalue of A. Choose the correct answer below.

True, because any coordinate in a subspace​ H, with basis B​, can only be written in one way as a linear combination of basis vectors. The linear combination gives a unique coordinate vector [x]B that is composed of the coordinates of x relative to B.

If B={v 1, . . . vp} is a basis for a subspace H and if x=c 1v 1 + ... + cp vp​, then c 1​, . . . , cp are the coordinates of x relative to the basis B.

It is not possible. Since Cx=v is consistent for every v in set of real numbers R^6​, according to the Invertible Matrix Theorem that makes the 6 x 6 matrix invertible. Since it is​ invertible, Cx=v has a unique solution.

If C is 6 x 6 and the equation Cx=v is consistent for every v in set of real numbers R Superscript 6​, is it possible that for some v​, the equation Cx=v has more than one​ solution? Why or why​ not?

True, because if a set of p vectors spans a​ p-dimensional subspace H of |R^n​, then these vectors must be linearly independent. Any linearly independent spanning set of p vectors forms a basis in p dimensions.

If a set of p vectors spans a​ p-dimensional subspace H of |R^n​, then these vectors form a basis of H

Equation Dx=b has a solution for each b in set of real numbers R Superscript 7. According to the Invertible Matrix​ Theorem, a matrix is invertible if the columns of the matrix form a linearly independent​ set; this would mean that the equation Dx=b has at least one solution for each b in set of real numbers R^n.

If the columns of a 7 x 7 matrix D are linearly​ independent, what can you say about the solutions of Dx=b​? ​Why?

Dimension of solution space=Nul A= 4

If the rank of a 4x6 matrix A is 2​, what is the dimension of the solution space Ax=0​?

Rank A=Col Space of A=4

If the subspace of all solutions of Ax=0 has a basis consisting of two vectors and if A is a 4x6 ​matrix, what is the rank of​ A?

False. There may be linearly independent eigenvectors that both correspond to the same eigenvalue.

If v1 and v2 are linearly independent​ eigenvectors, then they correspond to distinct eigenvalues. Choose the correct answer below.

The statement is true. The column space of A and S are both the set of all linear combinations of v1, . . . vp

If v1, . . . vp are in |R^n​, then S= Span{v 1, . . . vp} is the same as the column space of the matrix A=[v1 . . . vp].

The statement is false because in order for 5 to be an eigenvalue of​ A, the characteristic polynomial would need to have a factor of λ - 5.

If λ+5 is a factor of the characteristic polynomial of​ A, then 5 is an eigenvalue of A. Select the correct choice below​ and, if​ necessary, fill in the answer box to complete your choice.

​True, by definition of invertible.

In order for a matrix B to be the inverse of​ A, both equations AB=I and BA=I must be true.

It is not​ possible; according to the Invertible Matrix Theorem an n x n matrix cannot be invertible when its columns do not span set of real numbers R Superscript n.

Is it possible for a 5 x 5 matrix to be invertible when its columns do not span set of real numbers R Superscript 5​? Why or why​ not?

The value of h for which the eigenspace for λ=7 is​ two-dimensional is h=6.

It can be shown that the algebraic multiplicity of an eigenvalue lambda is always greater than or equal to the dimension of the eigenspace corresponding to λ. Find h in the matrix A below such that the eigenspace for λ=7 is​ two-dimensional. [ 7 -2 6 -2 ] [ 0 5 h 0 ] [ 0 0 7 8 ] [ 0 0 0 4]

Since Col A is​ p-dimensional, then the p columns of A span Col A and​ therefore, the spanning set of p columns is automatically a basis for Col A. This implies that the p columns of A are linearly independent.

Let A be an nxp matrix whose column​ space, denoted Col​ A, is​ p-dimensional. Explain why the columns of A must be linearly independent.

The number of pivots=number of vectors in basis=dimension of Col A. Also = to rank of A

Relationship between basis for Col A and dimension of Col A?

number of free variables=number of vectors in Nul A=dimension to sol set

Relationship between basis of Nul A and dimension of solution set to Ax=0?

The statement is true. If a series of row operations is performed on a matrix A to form​ B, then the equations Ax=0 and Bx=0 have the same set of solutions.

Row operations do not affect linear dependence relations among the columns of a matrix.

If the equation Ax=b has a solution for each b in set of real numbers R Superscript n​, then A has a pivot position in each row. Since A is​ square, the pivots must be on the diagonal of A. It follows that A is row equivalent to Upper I Subscript n. ​Therefore, A is invertible.

Suppose A is nxn and the equation Ax=b has a solution for each b in set of real numbers R Superscript n. Explain why A must be invertible.​ [Hint: Is A row equivalent to I Subscript n​?]

If Col =/ F |R^5​, then the columns of F do not span |R^5. Since F is​ square, the Invertible Matrix Theorem shows that F is not invertible and the equation Fx=0 has a nontrivial solution.​ Therefore, Nul F contains a nonzero vector.

Suppose F is a 5 x 5 matrix whose column space is not equal to |R^5. What can you say about Nul​ F?

Since Col A is the set of all linear combinations of a1, . . . ap​, the set ​{a1, . . . ap} spans Col A. Because ​{a1, . . . ap} is also linearly​ independent, it is a basis for Col A.

Suppose the columns of a matrix A=[a1, . . . ap] are linearly independent. Explain why ​{a1, . . . ap} is a basis for Col A.

The statement is true. The columns of an invertible nxn matrix are linearly independent and span |R^n​, so they form a basis for |R^n.

The columns of an invertible nxn matrix form a basis for |R^n.

Since all the entries are​ positive, every sector must increase its output by some positive quantity. An increase in demand for any sector will increase the demand for every sector.

The consumption matrix C for the a certain​ country's economy for a particular year has the property that every entry in the matrix (I-C)^-1 is nonzero​ (and positive). What does that say about the effect of raising the demand for the output of just one sector of the​ economy? Since all the entries are​ positive, ________________ must ________________output by some positive quantity. An increase in demand for any sector will ________________ the demand for ________________.

The statement is false because the determinant of the 2times2 matrix A = [ 2 1 ] [ 1 2 ] is not equal to the product of the entries on the main diagonal of A.

The determinant of A is the product of the diagonal entries in A. Select the correct choice below​ and, if​ necessary, fill in the answer box to complete your choice.

​True, because the pivot columns of A form a basis for Col A.​ Therefore, the number of pivot columns of A is the same as the dimension of Col A.

The dimension of Col A is the number of pivot columns in A.

​True, because the Rank Theorem states that if matrix A has n​ columns, then rank A + dim Nul A = n. Since rank A is the same as dim ColA​, the dimensions of ColA and NulA add up to the total number of columns in A.

The dimensions of Col A and Nul A add up to the total number of columns in A.

False. If the matrix is a triangular​ matrix, the values on the main diagonal are eigenvalues.​ Otherwise, the main diagonal may or may not contain eigenvalues.

The eigenvalues of a matrix are on its main diagonal. Choose the correct answer below.

The statement is false. The described set is the null space of an mxn matrix A. This set is a subspace of |R^n.

The set of all solutions of a system of m homogeneous equations in n unknowns is a subspace of |R^m.

False. An echelon form of a matrix A usually does not display the eigenvalues of A.

To find the eigenvalues of​ A, reduce A to echelon form. Choose the correct answer below.

The point in |R^3 is (8, 4, -2)

What vector in set of |R^3 has homogeneous coordinates (1/6, 1/12, -1/24, 1/48)?

Set up and augmented matrix with [x]B as the last column. Row reduce and the if you get two pivot columns/rows, the numbers in the last column is x.

When given B1 and B2 (both bases) and [x]B, how do you solve for x?

set up the vector equation x=c1b1 + c2b2. Turn that into an augmented matrix

When given B1 and B2 (both bases) and the x vector, how do you solve for [x]B?

On their diagonal

Where do you find eigenvalues on a triangular matrix?