linear algebra 2 parts mcq
part a
part b
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linear algebra 2 parts mcq
part a
part b
Solve the system 5 = ;3x -...
linear algebra 2 parts part a part b А PDPT Orthogonally diagonalize as A = 1...
linear algebra 2 parts
part a
part b
А PDPT Orthogonally diagonalize as A = 1 22 1 1 V2 V2 -- P- 0-[8] b. 1 1 2 P- 0-16] 1 1 V2V P- 1 1 12 2 1 √2/2 0-168] 1 d. P 1 1 V2 V2 1 1 √ √ 0-16] e. p=[17] -=[:-] f. 1 P= 1 2 2 1 1 2 2 0-[• -] Solve the system 5 = ;3x - ܕܠ ܐ2 + X1 13...
linear algebra 2 part mcq part a part b H Let be the set of third...
linear algebra 2 part mcq
part a
part b
H Let be the set of third degree polynomials H = {ax + ax? + ax' | AEC) P3 why or why not? H Is a subspace of Select all correct answer choices (there may be more than one). a. H P3 is a subspace of because it can be written as the span of a subset of b. H is a subspace of because it contains only second degree polynomials...
Let be the set of third degree polynomials Is a subspace of ? Why or why not?...
Let be the set of third degree polynomials
Is a subspace of ? Why or why
not?
Select all correct answer choices (there may be more than
one).
a.
is not a subspace of because it is not
closed under vector addition
b.
is a subspace of because it contains the zero
vector of
c.
is not a subspace of because it is not closed
under scalar multiplication
d.
is a subspace of because it contains only
second degree polynomials
e.
is...
Let H be the set of third degree polynomials Let H be the set of third...
Let H be the set of third degree polynomials
Let H be the set of third degree polynomials {ax + ax? + ax3 | DEC} Is H a subspace of P3? Why or why not? Select all correct answer choices (there may be more than one). a. H is not a subspace of P3 because it is not closed under scalar multiplication b.H is a subspace of P3 because it contains the zero vector of P3 c. H is not...
Let H be the set of third degree polynomials H = {ax + ax? + ax?...
Let H be the set of third degree polynomials H = {ax + ax? + ax? | aEC} Is H a subspace of P3? Why or why not? Select all correct answer choices (there may be more than one). a. H is a subspace of P3 because it contains the zero vector of P3 b. H is a subspace of P3 because it is closed under vector addition and scalar multiplication Oc H is a subspace of P3 because it...
Let H be the set of third degree polynomials H = {ax + ax? + ax?...
Let H be the set of third degree polynomials H = {ax + ax? + ax? | aEC} is H a subspace of P3? Why or why not? Select all correct answer choices (there may be more than one). a. H is a subspace of P3 because it contains the zero vector of P3 b.H is a subspace of P3 because it is closed under vector addition and scalar multiplication c. H is a subspace of P3 because it can...
Let H be the set of third degree polynomials H = {ax + ax2 + ax...
Let H be the set of third degree polynomials H = {ax + ax2 + ax aEC} Is H a subspace of P3? Why or why not? Select all correct answer choices (there may be more than one). 0 a. H is a subspace of P3 because it contains only second degree polynomials 1b. H is a subspace of P3 because it can be written as the span of a subset of P3 OcH is not a subspace of P3...
Let H be the set of third degree polynomials H = {ax + ax? + ax3...
Let H be the set of third degree polynomials H = {ax + ax? + ax3 | DEC} Is H a subspace of P3? Why or why not? Select all correct answer choices (there may be more than one). a. A is a subspace of P3 because it contains the zero vector of P3 | b. H is not a subspace of P3 because it does not contain the zero vector of P3 c. H is not a subspace of...
linear algebra do both drawing in part A and B 2. Consider the set and let...
linear algebra
do both drawing in part A and B
2. Consider the set and let addition and scalar multiplication be the standard operations on vectors in R2 (a) State a specific numerical example that shows that V is not closed under vector addition, then draw a sketch for your example, shading the region V, and drawing your example vectors and their linear combination with the parallelogram method that shows V is not closed under vector addition (b) Provide a...
Problem 5. (1 point) Let H be the subset of vectors [x. y] in R2 such that the polint (x, y) les ...
Problem 5. (1 point) Let H be the subset of vectors [x. y] in R2 such that the polint (x, y) les between the lines y -3x and y x/3. (See the picture.) 1. Is H nonempty? choose 2. Is H closed under addition? If it is, enter CLOSED. If it is not, enter two vectors in H whose sum is not in H, using a comma separated list and syntax such as [1.2]. 13,4] 3 Is H closed under...
linear algebra 2 parts
part a
part b
А PDPT Orthogonally diagonalize as A = 1 22 1 1 V2 V2 -- P- 0-[8] b. 1 1 2 P- 0-16] 1 1 V2V P- 1 1 12 2 1 √2/2 0-168] 1 d. P 1 1 V2 V2 1 1 √ √ 0-16] e. p=[17] -=[:-] f. 1 P= 1 2 2 1 1 2 2 0-[• -] Solve the system 5 = ;3x - ܕܠ ܐ2 + X1 13...
linear algebra 2 part mcq
part a
part b
H Let be the set of third degree polynomials H = {ax + ax? + ax' | AEC) P3 why or why not? H Is a subspace of Select all correct answer choices (there may be more than one). a. H P3 is a subspace of because it can be written as the span of a subset of b. H is a subspace of because it contains only second degree polynomials...
Let be the set of third degree polynomials
Is a subspace of ? Why or why
not?
Select all correct answer choices (there may be more than
one).
a.
is not a subspace of because it is not
closed under vector addition
b.
is a subspace of because it contains the zero
vector of
c.
is not a subspace of because it is not closed
under scalar multiplication
d.
is a subspace of because it contains only
second degree polynomials
e.
is...
Let H be the set of third degree polynomials
Let H be the set of third degree polynomials {ax + ax? + ax3 | DEC} Is H a subspace of P3? Why or why not? Select all correct answer choices (there may be more than one). a. H is not a subspace of P3 because it is not closed under scalar multiplication b.H is a subspace of P3 because it contains the zero vector of P3 c. H is not...
Let H be the set of third degree polynomials H = {ax + ax? + ax? | aEC} Is H a subspace of P3? Why or why not? Select all correct answer choices (there may be more than one). a. H is a subspace of P3 because it contains the zero vector of P3 b. H is a subspace of P3 because it is closed under vector addition and scalar multiplication Oc H is a subspace of P3 because it...
Let H be the set of third degree polynomials H = {ax + ax? + ax? | aEC} is H a subspace of P3? Why or why not? Select all correct answer choices (there may be more than one). a. H is a subspace of P3 because it contains the zero vector of P3 b.H is a subspace of P3 because it is closed under vector addition and scalar multiplication c. H is a subspace of P3 because it can...
Let H be the set of third degree polynomials H = {ax + ax2 + ax aEC} Is H a subspace of P3? Why or why not? Select all correct answer choices (there may be more than one). 0 a. H is a subspace of P3 because it contains only second degree polynomials 1b. H is a subspace of P3 because it can be written as the span of a subset of P3 OcH is not a subspace of P3...
Let H be the set of third degree polynomials H = {ax + ax? + ax3 | DEC} Is H a subspace of P3? Why or why not? Select all correct answer choices (there may be more than one). a. A is a subspace of P3 because it contains the zero vector of P3 | b. H is not a subspace of P3 because it does not contain the zero vector of P3 c. H is not a subspace of...
linear algebra
do both drawing in part A and B
2. Consider the set and let addition and scalar multiplication be the standard operations on vectors in R2 (a) State a specific numerical example that shows that V is not closed under vector addition, then draw a sketch for your example, shading the region V, and drawing your example vectors and their linear combination with the parallelogram method that shows V is not closed under vector addition (b) Provide a...
Problem 5. (1 point) Let H be the subset of vectors [x. y] in R2 such that the polint (x, y) les between the lines y -3x and y x/3. (See the picture.) 1. Is H nonempty? choose 2. Is H closed under addition? If it is, enter CLOSED. If it is not, enter two vectors in H whose sum is not in H, using a comma separated list and syntax such as [1.2]. 13,4] 3 Is H closed under...
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