Escalate

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Problem 4.3. Consider the polynomials B3(t)= (1 -t B(t)(1-t) Bt)= B(t) 3(1 t)? B(t) 2(1 )t B (t) 3(1 t)t B(t)t known as the BeTnstein polynomials of degree 2 and 3. (a) Show that the Bernstein polynomials B3(t), B?(t), B(t) binations of the basis (1, t, 2) of the vector space of polynomials of degree at most 2 as follows: are expressed as linear com B(t) 1 -2 0 2 -2 B C 0 0 Prove that Bat)Bt)B(t) = 1. (b) Show that the Bernstein polynomials B(t), B (t), B3(t), B(t) are expressed as linear combinations of the basis (1, t, 2,t3) of the vector space of polynomials of degree at most 3 as follows B(t) 1 -3 -1 3 0 -3 (B) 0 0 0 1 Prove that B(t)B(t)B(t) + B(t) = 1. (c) Prove that the Bernstein polynomials of degree 2 are linearly independent, and that the Bernstein polynomials of degree 3 are linearly independent