Question

(10 points) Explain what is wrong with the following discussion: Let pi(t) = 1, p2(t) = t, and p3(t) = 2 + t2. Note that p3(t) = 2p1(t) + tpz(t). Therefore ps belongs to Span{p1.p2}.

Answer 1

Wrong in this discussion is that the elements p₁(t) and p₂(t) can only be multiplied with elements of field to get their linear combination and t is not an element of field thus p₃(t) can be expressed as linear combination of p₁(t) and p₂(t) and thereby does not belongs to span of p₁(t) and p₂(t) . If you doubt in any step please comment down i will try to explain that step further and if you were able to understand the explanation please give feedback

Pi(t)=1, P₂ (t) = t and B(A) = 2+82 P3 (O) = 2 pilt) + P2 (A) In the span {P1, P2} the elements will be of the form xpi(t) + B P₂ (t) where apß Ef Here it fo given that P3 (t) = 2p, (f) + & P2 (P) which r8 true but P3 belongs to span { pi(t) P₂ (A)} & wrong. since t&F and the repore P3 cannot be written in the bhear combination of Pi and P2 as Whear combination of PI & P2 RS g form a pill)+BP264) where x, BEF $