2. Let P2(R) be the vector space of polynomials over R up to degree 2. Consider {1+r= 2r°, –1+x +2², 1 – x + r*}, {1– 3r + x², 1 – 3r – 2a², 1 – 2.r + 3r²} . В B' (a) Show that B and B' are bases of P2(R). (b) Find the coordinate matrices of p(x) = 9x² + 4x – 2 relative to the bases B and B' (c) Find the transition matrix Pg-→B'. (d) Verify that = PB¬B' [x(p)B].

Transcribed Image Text:

2. Let P2(R) be the vector space of polynomials over R up to degree 2. Consider {1+x – 20°, –1+ r + x²,1– e + x'} , {1- Зг + д?, 1 — Зr — 21?, 1 - 2л + З22}. В B' (a) Show that B and B' are bases of P2(R). (b) Find the coordinate matrices of p(x) = 9x² +4x – 2 relative to the bases B and B'. (c) Find the transition matrix PB→B' - (d) Verify that [x(p)]B = PB-¬B' [x(p)B].