Exercise 3 Consider the subset W = {P(x) € P2 | P(4) = P'(2) = 0} of the space of quadratic polynomials P2 = {a+ br + cr² | a, b, c € R}. Here P' is the usual derivative of the polynomial P. a) Find all the a, b ER such that the polynomial a + br is in W. b) Find the a,b, c €R such that the polynomial a + br+ cr² is in W c) Find a basis of W. What is its dimension? d) Find a basis of V = {P(x) € P2 | P'(2) = 0}.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Exercise 3
Consider the subset W = {P(x) € P2 | P(4) = P'(2) = 0} of the
%3D
%3D
space
of quadratic polynomials P2 = {a + bx + cr² | a, b, c € R}.
Here P' is the usual derivative of the polynomial P.
a) Find all the a, b eR such that the polynomial a + bx is in W.
b) Find the a, b, c € R such that the polynomial a + br + cr² is in W
c) Find a basis of W. What is its dimension?
d) Find a basis of V = {P(x) € P2 | P'(2) = 0}.
Transcribed Image Text:Exercise 3 Consider the subset W = {P(x) € P2 | P(4) = P'(2) = 0} of the %3D %3D space of quadratic polynomials P2 = {a + bx + cr² | a, b, c € R}. Here P' is the usual derivative of the polynomial P. a) Find all the a, b eR such that the polynomial a + bx is in W. b) Find the a, b, c € R such that the polynomial a + br + cr² is in W c) Find a basis of W. What is its dimension? d) Find a basis of V = {P(x) € P2 | P'(2) = 0}.
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