determine whether polynomials X^2 + 1, X^2 -1 and X^2 + X + 1 span p(2)  

Determine if the given polynomials given below span P2 p(x) = 1 − x2 , q(x)...

Determine if the given polynomials given below span P2 p(x) = 1 − x2 , q(x) = 1 + x, r(x) = 4x2+ 3x − 1, s(x) = 3x2+ 4x + 1

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.

If p(x) and q(x) are arbitrary polynomials of degree at most 2, then the mapping =p(−1)q(−1)+p(0)q(0)+p(2)q(2)...

If p(x) and q(x) are arbitrary polynomials of degree at most 2, then the mapping =p(−1)q(−1)+p(0)q(0)+p(2)q(2) defines an inner product in P3. Use this inner product to find , ||p||, ||q||, and the angle θ between p(x) and q(x) for p(x)=2x^2+3 and q(x)=2x^2−6x.

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) =

1. Determine whether the distribution represents a probability distribution. X 3 7 9 12 14 P(X)...

1. Determine whether the distribution represents a probability distribution. X 3 7 9 12 14 P(X) 4/13 1/13 3/13 1/13 2/13 2. Determine whether the distribution represents a probability distribution. X 5 7 9 P(X) 0.6 0.8 -0.4 3. Determine whether the distribution represents a probability distribution. X 20 30 40 50 P(X) 0.05 0.35 0.4 0.2

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.

Consider W = Span{p1(t),p2(t)} where p1(t) = 1−t^2 and p2(t) = 3+2t are the polynomials defined...

Consider W = Span{p1(t),p2(t)} where p1(t) = 1−t^2 and p2(t) = 3+2t are the polynomials defined on the interval [−1,1]. Find the orthogonal projection of q(t) = t^2−t−1 onto W.

Two polynomials P and D are given. Use either synthetic or long division to divide P(x)...

Two polynomials P and D are given. Use either synthetic or long division to divide P(x) by D(x), and express P in the form P(x) = D(x) · Q(x) + R(x). P(x) = 4x2 + 5x − 2, D(x) = x + 4

effect the decomposition of factors of the following polynomials with the information provided: a) P(x) =36x^3...

effect the decomposition of factors of the following polynomials with the information provided: a) P(x) =36x^3 - 12x^2 - 5x +1, knowing that one root is the sum of the other two.

Find an inner product on vector space P of polynomials that makes x and y orthogonal....

Find an inner product on vector space P of polynomials that makes x and y orthogonal. (x=1+t, y=1-t)