Let S = {x2+2, x+1, x-1} a) Show that S is a basis for P2. b)...

Let S = {?2, (? − 1)2, (? − 2)2 } A) Show that S forms...

Let S = {?2, (? − 1)2, (? − 2)2 } A) Show that S forms a basis for P2 . B) Define an inner product on P2 via < p(x) | q(x) > = p(-1)q(-1) + p(0)q(0) + p(1)q(1). Using this inner product, and Gram-Schmidt, construct an orthonormal basis for P2 from S – use the vectors in the order given!

Consider the vector space P2 := P2(F) and its standard basis α = {1,x,x^2}. 1Prove that...

Consider the vector space P2 := P2(F) and its standard basis α = {1,x,x^2}. 1Prove that β = {x−1,x^2 −x,x^2 + x} is also a basis of P2 2Given the map T : P2 → P2 defined by T(a + bx + cx2) = (a + b + c) + (a + 2b + c)x + (b + c)x2 compute [T]βα. 3 Is T invertible? Why 4 Suppose the linear map U : P2 → P2 has the matrix representation...

Define T : P2 → R3 via T(a+bx+cx2) = (a+c,c,b−c), and let B = {1,x,x2} and...

Define T : P2 → R3 via T(a+bx+cx2) = (a+c,c,b−c), and let B = {1,x,x2} and D ={(1, 0, 0), (0, 1, 0), (0, 0, 1)}. (a) Find MDB(T) and show that it is invertible. (b) Use the fact that MBD(T−1) = (MDB(T))−1 to find T−1. Hint: A linear transformation is completely determined by its action on any spanning set and hence on any basis.

Consider Linear transformation in P2(R) T(x)=((1-x2)f'(x))'. Compose a basis for P2(R) composed of eigenvectors of T.

Consider Linear transformation in P2(R) T(x)=((1-x2)f'(x))'. Compose a basis for P2(R) composed of eigenvectors of T.

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 S ∈ L(R2) be given by S(x1, x2) = (x1 +x2, x2) and let I...

Let S ∈ L(R2) be given by S(x1, x2) = (x1 +x2, x2) and let I ∈ L(R2) be the identity operator. Using the inner product defined in problem 1 for the standard basis and the dot product, compute <S, I>, || S ||, and || I || {Inner product in problem 1: Let W be an inner product space and v1, . . . , vn a basis of V. Show that <S, T> = <Sv1, T v1> +...

Let W be an inner product space and v1,...,vn a basis of V. Show that〈S, T...

Let W be an inner product space and v1,...,vn a basis of V. Show that〈S, T 〉 = 〈Sv1, T v1〉 + . . . + 〈Svn, T vn〉 for S,T ∈ L(V,W) is an inner product on L(V,W). Let S ∈ L(R^2) be given by S(x1, x2) = (x1 + x2, x2) and let I ∈ L(R^2) be the identity operator. Using the inner product defined in problem 1 for the standard basis and the dot product, compute 〈S,...

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

Q: QUESTION 1 ..... [15%] Let g(x) = In(1 – x2) and h(x) = Vx+2. (a)...

Q: QUESTION 1 ..... [15%] Let g(x) = In(1 – x2) and h(x) = Vx+2. (a) Find (goh)(x) and determine its domain (b) Find the domain of (goh)(x) Solution.

1. A fair dice is rolled twice. Let X1 and X2 be the numbers that show...

1. A fair dice is rolled twice. Let X1 and X2 be the numbers that show up on rolls 1 and 2. Let X¯ be the average of the two rolls: X¯ = (X1 + X2)/2. Find the probability that X >¯ 4.