Legendre polynomial 7. Using the Legendre polynomials given by Px(x) = 2mm. An (x2 - 1)"...
A polynomial p(x) is an expression in variable x which is in the form axn + bxn-1 + …. + jx + k, where a, b, …, j, k are real numbers, and n is a non-negative integer. n is called the degree of polynomial. Every term in a polynomial consists of a coefficient and an exponent. For example, for the first term axn, a is the coefficient and n is the exponent. This assignment is about representing and computing...
6. Compute four Legendre polynomials degree 0, 1, 2 and 3, respectively. You can assume that these polynomials endre polynomial to construct a Gaussian quadrature. Approximate the value of the integral are monic. Use the roots of the cubic Leg- sin(2x) dx using your quadrature rule. 6. Compute four Legendre polynomials degree 0, 1, 2 and 3, respectively. You can assume that these polynomials endre polynomial to construct a Gaussian quadrature. Approximate the value of the integral are monic. Use...
3. Let Po(x) respectively. Find the monic Legendre polynomials of degree 2, 3 and 4 using the orthogonality relation f P(x)Pm(x)dx = 0, mn and m,n E N. 1 and P1(x) = x be two Legendre polynomials of degree 0 and 1, 3. Let Po(x) respectively. Find the monic Legendre polynomials of degree 2, 3 and 4 using the orthogonality relation f P(x)Pm(x)dx = 0, mn and m,n E N. 1 and P1(x) = x be two Legendre polynomials of...
Q4 For the homomorphism from P2, the vector space of polynomials of degree two or less to P3, the vector space of polynomials of degree three or less given by : P→ P(t + 1)dt. a) Find : 0(1), 4(x), (x2) b) Find the range space and the kernel of o c)Prove that the range of O is {P € P3 / P(0) = 0} d) Prove that is a isomorphism from P2 to the range space. Let's St+1)dt =...
4. Determine whether the polynomials Pi = 1 + x, P2 = 1 + x2, P3 = x + 2 are linearly independent or linearly dipendent in P3.
The expression Φ(x, h)-(1-2xh + h2)-1/2 where |hl < 1 is the generating function for Legendre polynomials. φ(x, h) can be expressed as a sum of Legendre polynomials The function (x, h) = Po(x) + hA(x) + h2Pg(x) + hn (x) The generating function of the Legendre polynomials has some applications in Physics, such as expressing the electric potential at point P due to a charge q. The location of the charge is r with respect to the origin O...
For the function f(x) = e 2x, which of the following polynomials is the 2nd degree Taylor polynomial for f(2') at the point I = 0? 1) P(x) = 1-2+x2 2) P2 (3)=1-23 +22 3) P3(x) = 1 - 2.c + 2x2 4) P4(x) = 1 + 2x + 2x2 O Polynomial in 3) Polynomial in 1) O Polynomial in 2) O Polynomial in 4)
2 points) Let H be the subspace of P2 spanned by 2x2 - 6x +3, x2 -2x 1 and -2r221 (a) A basis for H is Enter a polynomial or a list of polynomials separated by commas, in terms of lower-case x . For example x+1,x-2 (b) The dimension of H is c)Is (2x2 6x +3, x2 - 2x +1, -2x2 +2x 1 a basis for P2? 2 points) Let H be the subspace of P2 spanned by 2x2 -...
a. Find the linear approximating polynomial for the following function centered at the given point a. b. Find the quadratic approximating polynomial for the following function centered at the given point a. c. Use the polynomials obtained in parts a. and b. to approximate the given quantity. 1 Ca= 1; approximate 1.09 a. Py(x) = 0 b. P2(x)=0 1 1. c. Using the linear approximating polynomial to estimate, 16a is approximately (Type an integer or a decimal.) Using the quadratic...
2. Since it is difficult to evaluate the integral dr exactly, we will approximate it using Maclaurin polynomials (a) Determine P4(x), the 4th degree Maclaurin polynomial of the integrand e". (b) Obtain an upper bound on the error in the integrand for r in the range 0-x 1/2, when the integrand is approximated by Pi(x). (c) Find an approximation to the original integral by integrating P4(r (d) Obtain an upper bound on the error in the integration in (c) (e)...