Mathematics
Mathematics, 16.04.2020 01:49, 2337911726

The first four Hermite polynomials are 1, 2t, minus2plus4t squared, and minus12tplus8t cubed. These polynomials arise naturally in the study of certain important differential equations in mathematical physics. Show that the first four Hermite polynomials form a basis of set of prime numbers P 3. To show that the first four Hermite polynomials form a basis of set of prime numbers P 3, what theorem should be used? A. Let H be a subspace of a finite-dimensional vector space V. Any linearly independent set in H can be expanded, if necessary, to a basis for H. B. If a vector space V has a basis of n vectors, then every basis of V must consist of exactly n vectors. C. Let V be a p-dimensional vector space, pgreater than or equals1. Any linearly independent set of exactly p elements in V is automatically a basis for V.

answer
Answers: 3

Other questions on the subject: Mathematics

image
Mathematics, 21.06.2019 13:30, struckedblazing
49xy +34y - 72z. determine the degree of the polynomial
Answers: 1
image
Mathematics, 21.06.2019 14:30, tbixler2021
Can you simplify 4/7? 24 points will be awarded!
Answers: 2
image
Mathematics, 21.06.2019 19:20, joelpimentel
Which number line represents the solution set for the inequality - x 24?
Answers: 3
image
Mathematics, 21.06.2019 19:30, miracle96
Choose the more precise measurement. 26.4 cm or 8.39 cm
Answers: 1
Do you know the correct answer?
The first four Hermite polynomials are 1, 2t, minus2plus4t squared, and minus12tplus8t cubed. These...

Questions in other subjects:

Konu
Mathematics, 11.09.2021 04:40
Konu
Mathematics, 11.09.2021 04:40
Konu
Mathematics, 11.09.2021 04:40
Konu
Mathematics, 11.09.2021 04:40
Konu
Mathematics, 11.09.2021 04:40