It's been a while, but I think I remember this one. Lim 1/n =0 as n approaches infinity. Let x0 be undefined. For any e\>0 there exists an n such that |x(1/n) -1| lt; e. If you desire x(1/n) to be continuous at 0, you define x0 as 1.
E2a: since x^(1/n)1, you can drop the abs bars. I think you can get an inequality to pick n using logs.
The question about Cardassian weapons got me trying to remember what they used in STO. Even though it's not canon, I though it might be of interest:
the Cardassian Keldon Cruiser is well-engineered to tackle nearly any combat scenario. It comes pre-equipped with Spiral Wave Disruptor Beam Arrays. These fire a unique energy type that combines the special effects of Phasers and Disruptors, as well as having slightly higher damage and accuracy than other beam weapons.
Also got turned on to Wodehouse via Salmon. When I started into Psmith after exhausting Bertie & Jeeves, it felt really similar to going from HHGG to Dirk Gently. I often wonder how many Python-era comedy writers were weaned on P.G.
It's been a while, but I think I remember this one. Lim 1/n =0 as n approaches infinity. Let x0 be undefined. For any e\>0 there exists an n such that |x(1/n) -1| lt; e. If you desire x(1/n) to be continuous at 0, you define x0 as 1.
E2a: since x^(1/n)1, you can drop the abs bars. I think you can get an inequality to pick n using logs.