Find a basis for the set of all third degree polynomials which contains the set {x...

5. Let S be the set of all polynomials p(x) of degree ≤ 4 such that...

5. Let S be the set of all polynomials p(x) of degree ≤ 4 such that p(-1)=0. (a) Prove that S is a subspace of the vector space of all polynomials. (b) Find a basis for S. (c) What is the dimension of S? 6. Let ? ⊆ R! be the span of ?1 = (2,1,0,-1), ?2 =(1,2,-6,1), ?3 = (1,0,2,-1) and ? ⊆ R! be the span of ?1 =(1,1,-2,0), ?2 =(3,1,2,-2). Prove that V=W.

Prove that the set V of all polynomials of degree ≤ n including the zero polynomial...

Prove that the set V of all polynomials of degree ≤ n including the zero polynomial is vector space over the field R under usual polynomial addition and scalar multiplication. Further, find the basis for the space of polynomial p(x) of degree ≤ 3. Find a basis for the subspace with p(1) = 0.

Let Z[x] be the ring of polynomials with integer coefficients. Find U(Z[x]), the set of all...

Let Z[x] be the ring of polynomials with integer coefficients. Find U(Z[x]), the set of all units of Z[x].

Write down all the monic irreducible polynomials of degree 1 in (Z/5Z)[x]. What is the product...

Write down all the monic irreducible polynomials of degree 1 in (Z/5Z)[x]. What is the product of these 5 polynomials? Do the same for degree 2 in (Z/5Z)[x].{Hint: there are 10of them} what is the product of these 10 polynomials

Let P2 denote the vector space of polynomials in x with real coefficients having degree at...

Let P2 denote the vector space of polynomials in x with real coefficients having degree at most 2. Let W be a subspace of P2 given by the span of {x2−x+6,−x2+2x−1,x+5}. Show that W is a proper subspace of P2.

Let Poly3(x) = polynomials in x of degree at most 2. They form a 3- dimensional...

Let Poly3(x) = polynomials in x of degree at most 2. They form a 3- dimensional space. Express the operator Q(p) = xp' + p'' . as a matrix (i) in basis {1, x, x^2 }, (ii) in basis {1, x, 1+x^2 } . Here, where p(x) represents a polynomial, p’ is its derivative, and p’’ its second derivative.

for the given functions f(x), let x0=1, x1=1.25, x2=1.6. Construct interpolation polynomials of degree at most...

for the given functions f(x), let x0=1, x1=1.25, x2=1.6. Construct interpolation polynomials of degree at most one and at most two to approximate f(1.4), and find the absolute error. a. f(x)=sin (pi x)

Consider P3 = {a + bx + cx2 + dx3 |a,b,c,d ∈ R}, the set of...

Consider P3 = {a + bx + cx2 + dx3 |a,b,c,d ∈ R}, the set of polynomials of degree at most 3. Let p(x) be an arbitrary element in P3. (a) Show P3 is a vector space. (b) Find a basis and the dimension of P3. (c) Why is the set of polynomials of degree exactly 3 not a vector space? (d) Find a basis for the set of polynomials satisfying p′′(x) = 0, a subspace of P3. (e) Find...

Let R[x] be the set of all polynomials (in the variable x) with real coefficients. Show...

Let R[x] be the set of all polynomials (in the variable x) with real coefficients. Show that this is a ring under ordinary addition and multiplication of polynomials. What are the units of R[x] ? I need a legible, detailed explaination

Determine the third and fourth Taylor polynomials of x3 + 3x - 1 at x =...

Determine the third and fourth Taylor polynomials of x3 + 3x - 1 at x = -1. p3(x) =   p4(x) =