law degree outside the U.S., earning an LL.M is a common way... could be an undergraduate degree in law such as the LL.B., or... for what counts as a good school is often too narrow given...
extension is of degree 2 if a=b, this leaves the case a≠b which I am also having problems with and I don't know what to do (I have some cases like if m,n are different primes then the...
I read somewhere that if $\pi$ is an irreducible polynomial of degree $m$ then $F_p(x)\ \backslash \left< \pi \right>$ is a finite field of order $p$. What is $F_p(x)\ \backslash \left< \pi \
By removing the line through the inflection points of a fourth degree polynomial, the polynomial acquires a vertical axis of symmetry. The golden ratio pops up unexpectedly.
Definition For a sequence $a_0,a_1,\cdots,a_n$, the corresponding self-convolution is another sequence $\displaystyle b_m=\sum\limits_{i+j=m}a_ia_j$ where $0\leq m\leq 2n$. Calculating the self-
My Course ; Learn ; Explore ; Bookmarks ; 1. Measuring Angles ; Angles in Standard Position · 12m ; Coterminal Angles · 7m ; Complementary and Supplementary Angles · 10m ; Radians · 8m
A Master of Science degree conferred from Columbia University, an Ivy League university in New York City A master's degree [note 1] (from Latin magister) is a postgraduate academic degree...
PTE 709 -QP 2 - Free download as Word Doc (.doc / .docx), PDF File (.pdf), Text File (.txt) or read online for free. This document outlines the exam for a Master's degree in qualitative and quantit...
Let $x^n -a \in F[x]$ be an irreducible polynomial over $F$, and let $b \in K$ be its root, where $K$ is an extension field of F. If $m$ is a positive integer such that $m|n$, find the degree of the
Let $a,b$ be algebraic over the field $F$, such that $\deg(a,F)$ and $\deg(b,F)$ are coprime. Then is $\deg(a+b,F)=\deg(a,F)\deg(b,F)$? What about $\deg(ab,F)$? I have tried to represent $a,b$ as