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Show that the Zernike polynomials Z4 and Z11 are orthogonal to each other. Show your work. In thi...
Chapter 2. Legendre Polynomials Examples Show that each function set is orthogonal in the given interval...
Chapter 2. Legendre Polynomials Examples Show that each function set is orthogonal in the given interval with respect to the specified weight function a. {sin mx}, (-7,7], w(x) = 1 b. {1, 2, 3 (3x2 - 1)}, [-1, 1], w(x) = 1 c. {1, 1 – 2, 3 (x2 - 4x + 2)}; (0,00), w(x) = e-6 Theorem: If the set of functions {P(x)} is orthogonal, then any piece-wise contin- uous function in [a, b] can be represented by the...
Show that two parallel currents attract each other. Show your work.
Show that two parallel currents attract each other. Show your work.
ou Problem 10.4.3. Show that the first four Hermite polynomials are im Ho = Hi =...
ou Problem 10.4.3. Show that the first four Hermite polynomials are im Ho = Hi = 2y (10.4.35) (10.4.36) H2 = -2(1 – 2y?) H3 = -12(y - 3) (10.4.37) (10.4.38) where the overall normalization (choice of ao or ai) is as per some convention we need not get into. To compare your answers to the above, choose the starting coefficients to agree with the above. Show that oo e-yHn(y)Hm(y)dy = dnm (VT2"n!) (10.4.39) I-oo for the cases m,n <...
Exercise 13. For each pair of polynomials p(x), q(x) E P define (p, q) р(«)q(2) dx....
Exercise 13. For each pair of polynomials p(x), q(x) E P define (p, q) р(«)q(2) dx. -1 inner product (i) Prove that (p, q) defines on P3 an orthogonal (ii) Show that 1, х are (iii) Find the angle between 1 and 1 + x.
Exercise 13. For each pair of polynomials p(x), q(x) E P define (p, q) р(«)q(2) dx. -1 inner product (i) Prove that (p, q) defines on P3 an orthogonal (ii) Show that 1, х are...
3. Given pairwise orthogonal vectors u, v, w ER(each vector is orthogonal to every other), with...
3. Given pairwise orthogonal vectors u, v, w ER(each vector is orthogonal to every other), with || || = ||0|| = ||w|| = 1, and C1, C2, C3 € R, prove that || Cu + c2v + c3w||2 = cſ + cx+cz.
Please write neat and show work/steps 3. Consider the function f(x) = (4x +5 on the...
Please write neat and show work/steps
3. Consider the function f(x) = (4x +5 on the interval (-1.1). (a) Find the quadratic Taylor approximation fr(x) > 00 + 10 + c2x2. Calculate the C to four decimal places. (b) Find the quadratic Legendre approximation f1(x) -- 20 +ajx + a2x?. Calculate the a; to four decimal places. If the two approximations differ greatly, something is probably wrong. You may want to consult section 4 in the pdf I sent you...
true fasle TIA Problem 15. Mark each of the following statements as true or false: but 1. A three-term recurrence relation for orthogonal polynomials is theoretically useful rei not practical for...
true fasle TIA
Problem 15. Mark each of the following statements as true or false: but 1. A three-term recurrence relation for orthogonal polynomials is theoretically useful rei not practical for numerical calculation. 2. Standard double-precision floating point arithmetic has a precision of about 10-16 3. Spline interpolation is based on a mathematical model of an old technique of making curves by stringing thin pieces of wood between nodes. 4. The composite trapezoid rule is particularly effective for integrating periodic...
• • Show all of your work for each problem. Draw a line separating each problem....
• • Show all of your work for each problem. Draw a line separating each problem. 1) Find an equation of the sphere that passes through the point (6, -2,3) and has center (-1,2,1). 2) Find the values of x such that the vectors (3,2,x) and (2x, 4,x) are orthogonal 3) Find the velocity, speed, and acceleration of a particle moving with position function r(t) = (2+2 - 3)i + 2tj. Sketch the path of the particle and draw the...
We will continue to work on the concepts of basis and dimensions in this homework Again, if neces...
We will continue to work on the concepts of basis and dimensions in this homework Again, if necessary, you can use your calculator to compute the rref of a matrix 1 (5 points) Recalled that in Calculus, if the dot product of two vectors is zero, then we know that the two vectors are orthogonal (perpendicular) to each other. That is, if yi 3 y3 then the angle between the two vectors is coS 2 The two vectors z and...
Show that (u, u2 ub) is an orthogonal basis for R Thon express as a inear...
Show that (u, u2 ub) is an orthogonal basis for R Thon express as a inear of the u's Which of the following cniteria are necessary for a set of vectors to be an orthogonal basis for a subspace W of IR? Select all that apply A. The vectors must span W B. The vectors must all have a length of 1 D C. The distance between any pair of distinct vectors must be constant D. The vectors must form...
Chapter 2. Legendre Polynomials Examples Show that each function set is orthogonal in the given interval with respect to the specified weight function a. {sin mx}, (-7,7], w(x) = 1 b. {1, 2, 3 (3x2 - 1)}, [-1, 1], w(x) = 1 c. {1, 1 – 2, 3 (x2 - 4x + 2)}; (0,00), w(x) = e-6 Theorem: If the set of functions {P(x)} is orthogonal, then any piece-wise contin- uous function in [a, b] can be represented by the...
ou Problem 10.4.3. Show that the first four Hermite polynomials are im Ho = Hi = 2y (10.4.35) (10.4.36) H2 = -2(1 – 2y?) H3 = -12(y - 3) (10.4.37) (10.4.38) where the overall normalization (choice of ao or ai) is as per some convention we need not get into. To compare your answers to the above, choose the starting coefficients to agree with the above. Show that oo e-yHn(y)Hm(y)dy = dnm (VT2"n!) (10.4.39) I-oo for the cases m,n <...
Exercise 13. For each pair of polynomials p(x), q(x) E P define (p, q) р(«)q(2) dx. -1 inner product (i) Prove that (p, q) defines on P3 an orthogonal (ii) Show that 1, х are (iii) Find the angle between 1 and 1 + x.
Exercise 13. For each pair of polynomials p(x), q(x) E P define (p, q) р(«)q(2) dx. -1 inner product (i) Prove that (p, q) defines on P3 an orthogonal (ii) Show that 1, х are...
3. Given pairwise orthogonal vectors u, v, w ER(each vector is orthogonal to every other), with || || = ||0|| = ||w|| = 1, and C1, C2, C3 € R, prove that || Cu + c2v + c3w||2 = cſ + cx+cz.
Please write neat and show work/steps
3. Consider the function f(x) = (4x +5 on the interval (-1.1). (a) Find the quadratic Taylor approximation fr(x) > 00 + 10 + c2x2. Calculate the C to four decimal places. (b) Find the quadratic Legendre approximation f1(x) -- 20 +ajx + a2x?. Calculate the a; to four decimal places. If the two approximations differ greatly, something is probably wrong. You may want to consult section 4 in the pdf I sent you...
true fasle TIA
Problem 15. Mark each of the following statements as true or false: but 1. A three-term recurrence relation for orthogonal polynomials is theoretically useful rei not practical for numerical calculation. 2. Standard double-precision floating point arithmetic has a precision of about 10-16 3. Spline interpolation is based on a mathematical model of an old technique of making curves by stringing thin pieces of wood between nodes. 4. The composite trapezoid rule is particularly effective for integrating periodic...
• • Show all of your work for each problem. Draw a line separating each problem. 1) Find an equation of the sphere that passes through the point (6, -2,3) and has center (-1,2,1). 2) Find the values of x such that the vectors (3,2,x) and (2x, 4,x) are orthogonal 3) Find the velocity, speed, and acceleration of a particle moving with position function r(t) = (2+2 - 3)i + 2tj. Sketch the path of the particle and draw the...
We will continue to work on the concepts of basis and dimensions in this homework Again, if necessary, you can use your calculator to compute the rref of a matrix 1 (5 points) Recalled that in Calculus, if the dot product of two vectors is zero, then we know that the two vectors are orthogonal (perpendicular) to each other. That is, if yi 3 y3 then the angle between the two vectors is coS 2 The two vectors z and...
Show that (u, u2 ub) is an orthogonal basis for R Thon express as a inear of the u's Which of the following cniteria are necessary for a set of vectors to be an orthogonal basis for a subspace W of IR? Select all that apply A. The vectors must span W B. The vectors must all have a length of 1 D C. The distance between any pair of distinct vectors must be constant D. The vectors must form...
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