Answer:
Practical domain: [tex]v\in[0,230]\ or\ 0\leqslant v\leqslant 230[/tex]
Roger can earn $510 at most.
Step-by-step explanation:
We are given the function
[tex]E(v)=50+2v[/tex]
Which gives the earnings of Roger when he sells v videos. Since the play’s audience consists of 230 people and each one buys no more than one video, v can take values from 0 to 230, i.e.
[tex]v\in[0,230]\ or\ 0\leqslant v\leqslant 230[/tex]
That is the practical domain of E(v)
If Roger is in bad luck and nobody is willing to purchase a video, v=0
If Roger is in a perfectly lucky night and every person from the audience wants to purchase a video, then v=230. It's the practical upper limit since each person can only purchase 1 video
In the above-mentioned case, where v=230, then
[tex]E(230)=50+2(230)=50+460=510[/tex]
Roger can earn $510 at most.
