1.Let a LFSR be built with characteristic polynomial f(x) = x 4 + x 3 +...

Let f(x) be a polynomial and let r be a root of f(x). If x_1 is...

Let f(x) be a polynomial and let r be a root of f(x). If x_1 is sufficiently close to r then x_2 = i(x_1) is closer, x_3 = i(x_2) is closer still, etc. Here i(x) = x - f(x)/f'(x) is what we called the improvement function a. Let f(x)=x^2-10. Compute i(x) in simplified form (i.e. everything in one big fraction involving x). Let r = sqrt(10) and x_1=3. Show a hand computation of x_2 and then x_3, expressing both your...

Let f(x) be polynomial function in field F[x]. f’(x) be the derivative of f(x). Given the...

Let f(x) be polynomial function in field F[x]. f’(x) be the derivative of f(x). Given the greatest common factor (f(x), f’(x))=1. And (x-a)|f(x). Show that (x-a)^2 can not divide f(x).

Let A =[6,8;-4,-6] A. Find the characteristic polynomial of A p(x)= B. Find the eigenvalue of...

Let A =[6,8;-4,-6] A. Find the characteristic polynomial of A p(x)= B. Find the eigenvalue of A and the basis for the associated eigenspaces. smallest eigenvalue= Basis for the eigenspaces= largest eigenvalue= basis for the eigenspaces=

Let p be a prime and m an integer. Suppose that the polynomial f(x) = x^4+mx+p...

Let p be a prime and m an integer. Suppose that the polynomial f(x) = x^4+mx+p is reducible over Q. Show that if f(x) has no zeros in Q, then p = 3.

Q7) Factorise the polynomial f(x) = x3 − 2x2 + 2x − 1 into irreducible polynomials...

Q7) Factorise the polynomial f(x) = x3 − 2x2 + 2x − 1 into irreducible polynomials in Z5[x], i.e. represent f(x) as a product of irreducible polynomials in Z5[x]. Demonstrate that the polynomials you obtained are irreducible. I think i manged to factorise this polynomial. I found a factor to be 1 so i divided the polynomial by (x-1) as its a linear factor. So i get the form (x3 − 2x2 + 2x − 1) = (x2-x+1)*(x-1) which is...

Let f(x) = 1 + x − x2 +ex-1. (a) Find the second Taylor polynomial T2(x)...

Let f(x) = 1 + x − x2 +ex-1. (a) Find the second Taylor polynomial T2(x) for f(x) based at b = 1. b) Find (and justify) an error bound for |f(x) − T2(x)| on the interval [0.9, 1.1]. The f(x) - T2(x) is absolute value. Please answer both questions cause it will be hard to post them separately.

let f(x)=cos(x). Use the Taylor polynomial of degree 4 centered at a=0 to approximate f(pi/4)

let f(x)=cos(x). Use the Taylor polynomial of degree 4 centered at a=0 to approximate f(pi/4)

Let f(x) = 2/ x and a = 1. (a) Find the third order Taylor polynomial,...

Let f(x) = 2/ x and a = 1. (a) Find the third order Taylor polynomial, T3(x), that approximates f near a. (b) Estimate the largest that |f(x)−T3(x)| can be on the interval [0.5,1.5] by using Taylor’s inequality for the remainder.

Consider the polynomial f(x) = x ^4 + x ^3 + x ^2 + x +...

Consider the polynomial f(x) = x ^4 + x ^3 + x ^2 + x + 1 with roots in GF(256). Let b be a root of f(x), i.e., f(b) = 0. The other roots are b^ 2 , b^4 , b^8 . e) Write b 4 as a combination of smaller powers of b. Prove that b 5 = 1. f) Given that b 5 = 1 and the factorization of 255, determine r such that b = α...

1. This question is on the Taylor polynomial. (a) Find the Taylor Polynomial p3(x) for f(x)=...

1. This question is on the Taylor polynomial. (a) Find the Taylor Polynomial p3(x) for f(x)= e^ x sin(x) about the point a = 0. (b) Bound the error |f(x) − p3(x)| using the Taylor Remainder R3(x) on [−π/4, π/4]. (c) Let pn(x) be the Taylor Polynomial of degree n of f(x) = cos(x) about a = 0. How large should n be so that |f(x) − pn(x)| < 10^−5 for −π/4 ≤ x ≤ π/4 ?