321pts Consider the following sets of polynomials. > {-1,,3P+1, , *), B = {5x +3*, 2,...
Q3. Consider the vector space P, consisting of all polynomials of degree at most two together with the zero polynomial. Let S = {p.(t), p2(t)} be a set of polynomials in P, where: pi(t) = -4 +5, po(t) = -3° - 34+5 (a) Determine whether the set S = {P1(t).pz(t)} is linearly independent in Py? Provide a clear justification for your solution. (8 pts) (b) Determine whether the set S = {p(t),p2(t)} spans the vector space P ? Provide a...
1. Determine if the following pair of sets is equivalent. Justify your answer. {1, 2, 3, 4, 5, 6, 7} and {a, ...) 2. Decide whether the following statement is true or false. Justify your answer. {x:x is letter in the word "rat") sty:y is a letter in the word "smart") 3. Represent the following set using a Venn Diagram: AU(B-C) U B C
vi) Consider the following polynomials in the vector space of polynomials of degree 3 or less, P3. Pi(x) 12 +3r2 +a3 P2(x) 132 Pa(r) 1242 P4(z) = 1-r + 3r2 + 2r3 Which of the following statements are true and which are false? Explain your answer. a) The set {Pi, P2,P3} is a basis for P3. b) The set {Pi,P2, p3,P4,P5} İs a linearly independent set in P3. vi) Consider the following polynomials in the vector space of polynomials of...
1. Why the following sets are not vector space? with the regular vector addition and scalar multiplication. a) V = {E: * > 0, y 20 with the regula b) V = {l*: *y 2 o} with the regular vector addition and scalar multiplication. c) V = {]: x2+y's 1} with the regular vector addition and scalar multiplication. 2. The set B = {1,1+t, t + t2 is a basis for P, the set of all polynomials with degree less...
1. (15 points) Prove whether the following sets are linearly dependent or independent, and determine whether they form a basis of the vector space to which they belong. s 10110 -1 ) / -1 2) / 2 1 17 ) } in M2x2(R). "11-21 )'(1 1)'( 10 )'(2 –2 )S (b) {23 – X, 2x2 +4, -2x3 + 3x2 + 2x +6} in P3(R) (the set of polynomials of degree less than 3. (c) {æ4—23+5x2–8x+6, – x4+x2–5x2 +5x-3, x4+3x2 –...
3. Determine if each set is a subspace of the space of degree < 2 polynomials. If so, provide a basis for the set. (a) Degree s 2 polynomial functions whose degree 1 coefficient is zero: $(x) = ax2 + c where a,CER. (b) Degree s 2 polynomial functions whose degree 1 coefficient is 1: f(x) = ax2 + x + c where a,CER.
Exercise 5.2: Identify the identity elements in the following sets. 1) The group of integral polynomials under addition. 2) The group of integral polynomials under multiplication. 3) The set of integral polynomials under composition. 4) The set SL3(Z) (that is, matrix entries are integers). 5) The set SL3(R) (matrix entries are real numbers). 6) The set SL3C) (matrix entries are complex numbers).
Math 407 Homework 4 Name: 1. Why the following sets are not vector space? with the regular vector addition and scalar multiplication. b) v = {(7: «y 20} with the regular vector addition and scalar multiplication. with the regular vector addition and scalar multiplication. 2. The set B = {1,1+t, t+t?} is a basis for P, the set of all polynomials with degree less than or equal to 2. Find the coordinate vector of p(t)-5+21+342 3. Let H =Span{ői, üz.us)...
3. Find the product. a) 3p'(2p +5p)(p +2p+1) b) p(3p+7)(3p-7) c) -(4r-2) d) (2a+3)(a -a' +a-a+ 1)
Q3. Consider the vector space B, consisting of all polynotninls of degree at most two together with the zero polynomial. Let S = {p(t).p2(t)} be a set of polynomials in P, where P.(t) = -2+3 pa(t) --21-24 + 3 (a) Determine whether the set S = {p(), pea(t)} is linearly independent in Py? Provide a clear justification for your solution. (8 pts) (b) Determine whether the set S = {p(t), pa(t)} spans the vector space B? Provide a clear justification...