Mathematics, 05.05.2020 17:32 Tyrant4life
A formal power series over R is a formal infinite sum f = X[infinity] n=0 anxn, where the coefficients an ∈ R. We add power series term-by-term, and two power series are the same if all their coefficients are the same. (We don’t plug numbers in for x, because we don’t want to worry about issues with convergence of the sum.) There is a vector space V whose elements are the formal power series over R. There is a derivative operator D ∈ L(V ) defined by taking the derivative term-by-term: D X[infinity] n=0 anxn ! = X[infinity] n=0 (n + 1)an+1xn What are the eigenvalues of D? For each eigenvalue λ, give a basis of the eigenspace E(D, λ). (Hint: construct eigenvectors by solving the equation Df = λf term-by-term.)
Answers: 2
Mathematics, 21.06.2019 13:00
Determine the quotient and remainder when (6a3)+11a2-4a-9) is divided by (3a-2) express your answer in the form q(a) + r(a)/d(a)
Answers: 2
Mathematics, 21.06.2019 17:00
Need this asap if anyone can i would be very grateful. if you could show workings that would really
Answers: 1
Mathematics, 21.06.2019 17:30
Mrs. morton has a special reward system for her class. when all her students behave well, she rewards them by putting 3 marbles into a marble jar. when the jar has 100 or more marbles, the students have a party. right now, the the jar has 24 marbles. how could mrs. morton reward the class in order for the students to have a party?
Answers: 3
A formal power series over R is a formal infinite sum f = X[infinity] n=0 anxn, where the coefficien...
English, 20.12.2019 00:31
Mathematics, 20.12.2019 00:31
Mathematics, 20.12.2019 00:31
Mathematics, 20.12.2019 00:31
English, 20.12.2019 00:31
History, 20.12.2019 00:31
English, 20.12.2019 00:31
English, 20.12.2019 00:31
English, 20.12.2019 00:31
English, 20.12.2019 00:31
English, 20.12.2019 00:31
Mathematics, 20.12.2019 00:31
Mathematics, 20.12.2019 00:31