The following text appears on an educational website:---2. (a) Given $ W = \text{Span}\{x^3 - 3x, 2x^2 + 3x + 4\} $, a subspace of $ P_3(x) $, find $ W^\perp $.*Hint:* Assume $ ax^3 + bx^2 + cx + d = (a, b, c, d) $.(b) For the plane $ P : -2x - 5y + 4z = 0 $, compute a basis for each $ P $ and $ P^\perp $.---This problem involves finding orthogonal complements and computing bases for given mathematical spaces.

Given (a) W=Span{x3-3x, 2x2+3x+4} is a subspace of P3(x) To find W⊥ the orthogonal conjugate of the subspace W in P3(x) W=Span{x3-3x, 2x2+3x+4}W={ax3+2bx2+(-3a+3b)x+4b: a,b∈R} W can be identified as the subspace W '={a(1,0,-3,0)+b(0,2,3,4) : a,b∈R of R4 Let v1=(1,0,-3,0), v2=(0,2,3,4) The orthogonal complement W⊥ can be identified by the orthogonal complement of W' To find the vectors orthogonal to (1,0,-3,0) and (0,2,3,4) Note that the vectors v3=(0,2,0,-1) and v4=(6,-3, 1, 0) are orthogonal vectors v1=(1,0,-3,0), v2=(0,2,3,4) because v1·v3= v1·v4= v2·v3= v2·v4=0 Therefore orthogonal complement of W '={a(1,0,-3,0)+b(0,2,3,4) : a,b∈R of R4 is expressed as W'⊥={a(0,2,0,-1)+b(6,-3,2,0):a,b∈R} This can be identified as a subspace of P3(x) as W⊥=Span{6x3-3x2+2x, 2x2-1} The given equation of the plane is x-5y+4z=0 This implies (1,-2,4) is the null space of the plane x-5y+4z=0 Now to find the basis of the plane Therefore the plane x-5y+4z=0 is two dimensional Let z=1, y = 0 then x = 2 similarly if z=5, x=0, y = 4 Therefore the basis for the plane is B=201, 045 The null space is perpendicular to space spanned by B=201, 045 The basis for null space or orthogonal complement P⊥ is 1-24

Answered: W = Span{r* – 3r, 2r² + 3x + 4} a…

Math

Advanced Math

W = Span{r* – 3r, 2r² + 3x + 4} a subspace of P3(x), find W+. %3D

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Concept explainers

Minimization

In mathematics, traditional optimization problems are typically expressed in terms of minimization. When we talk about minimizing or maximizing a function, we refer to the maximum and minimum possible values of that function. This can be expressed in terms of global or local range. The definition of minimization in the thesaurus is the process of reducing something to a small amount, value, or position. Minimization (noun) is an instance of belittling or disparagement.

Maxima and Minima

The extreme points of a function are the maximum and the minimum points of the function. A maximum is attained when the function takes the maximum value and a minimum is attained when the function takes the minimum value.

Derivatives

A derivative means a change. Geometrically it can be represented as a line with some steepness. Imagine climbing a mountain which is very steep and 500 meters high. Is it easier to climb? Definitely not! Suppose walking on the road for 500 meters. Which one would be easier? Walking on the road would be much easier than climbing a mountain.

Concavity

In calculus, concavity is a descriptor of mathematics that tells about the shape of the graph. It is the parameter that helps to estimate the maximum and minimum value of any of the functions and the concave nature using the graphical method. We use the first derivative test and second derivative test to understand the concave behavior of the function.

Question

The following text appears on an educational website:

---

2. (a) Given $ W = \text{Span}\{x^3 - 3x, 2x^2 + 3x + 4\} $, a subspace of $ P_3(x) $, find $ W^\perp $.

*Hint:* Assume $ ax^3 + bx^2 + cx + d = (a, b, c, d) $.

(b) For the plane $ P : -2x - 5y + 4z = 0 $, compute a basis for each $ P $ and $ P^\perp $.

---

This problem involves finding orthogonal complements and computing bases for given mathematical spaces.

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