Oldal tetejére By Bella Online at free ebook pengantar akuntansi 1 pdf the author’s brazilian origins date back to 2003 when his first book, the Brazilian au. It is the story of a Brazilian boy who discovers his passion for statisticsQ: $V = \ell_1 = \text{span}\{1, x, x^2\}$ and $U = \ell_\infty = \text{span}\{1, x, x^2,...\}$ I have this linearly independent vectors: $$\begin{cases} v_1 = 1\\ v_2 = x\\ v_3 = x^2 \end{cases}$$ and this: $$\begin{cases} u_1 = 1\\ u_2 = x\\ u_3 = x^2\\ u_4 = x^3\\ \vdots\\ \end{cases}$$ And I need to prove that $U = V = \ell_1 \text{ and } U = \ell_\infty$, and find the norms of these spaces. I know that these sets are not subspaces but I think I need to prove that they are of the same dimension and equal vectors. A: Hint: What is the dimensions of $\text{span}\{u_1, u_2, \dots\}$ and $\text{span}\{v_1, v_2, \dots\}$? and what is the dimensions of $\ell_1$ and $\ell_\infty$? Q: Inline function in C I am trying to learn inline functions in c programming. In this code snippet I am trying to use it in a function. But the compiler complains that in this function is a void function. I can't use inline in a function of type void. Is there a way to do it? Actually, I am trying to use this function in a recursion. I can't find the right recursion structure. inline int recursion(int n) { if (n == 0) return 1; return recursion(n - 1) + recursion(n - 1); } static void Show(int n) {