Be careful that you don’t describe what the team or group... Result (R): We signed contracts with 15 former advertisers... someone's opinion. • Give me a specific example of a time when...
How to approach proofs similar to "Show a group, $G$, is infinite if $G = \langle r, s, t\mid rst = 1\rangle $" I have not worked much with relations and tend to get lost in notation. I am practic...
I am having a little difficulty understanding how to approach this question. When S = $2^R$ and T = $2^S$, would that mean that the elements of S = $\{2^1,\space 2^a\}$ and T = $\{2^2,\space 2^{2a}...
D E P A R T M E N T O F A G R I C U L T U R E, F I S H E R I E S A N D F O R E S T R Y Policy Approaches Capacity building (innovation and R&D) Industry and business adjustment Market liberalisatio...
174 likes, 18 comments - h_dot - March 20, 2024: "W I N N E R G Y - L I F E - U P - H E A L T H - W E A L T H - P R O S P E R I T Y - H A P P I N E S S Aye @out4fame_g I need my chest piece done be...
Give an example of a $T\in\mathcal L\left(\mathbb R^2\right)$ s. t. $Ker(T) = Im(T)$. MY APPROACH According to the rank-nullity theorem, $\dim Ker(T) = \operatorname{rank}(T) = 1$. Considering t...
Let $(S,d)$ be a metric space and $t \in S$. Let $(s_n)$ be a sequence in $(S,d)$. Show that if $(s_n)$ converges in $S$, then $(d(s_n,t))$ converges in $\Bbb R$. If $s_n \to t$, then $d(s_n,t) \to...
I have to prove that $|T \cup S|$ where $T$ is infinite and $S$ is countable, equal to $|T|$, and this is also $|\mathbb{R}|$. How can I approach this? $|T \cup S| = |T| = |\mathbb{R}|$ I tried...
The terms S (intransitive), A, P (transitive), as well as T and R (ditransitive) have been used since the 1970s to allow linguists to characterize the differences between major alignment patterns s...
I'm looking for a ring R where the unit a is not a unit for the subring S, but is irreducible in S. I'm unsure of how to approach this problem, I've tried several different types of rings but can'...