Answer:
More than $81,818.18
Step-by-step explanation:
Let x represent amount of sales.
We have been given that option A offers a base salary of 11,000 a year with a commission of 16 percent of your sales.
Total income using option A would be [tex]A(x)=0.16x+11,000[/tex]
We are also told that option B offers a base salary of 20,000 a year with a commission of 5 percent of your sales.
Total income using option B would be: [tex]B(x)=0.05x+20,000[/tex]
To solve our given problem, we need to solve for x such that [tex]A(x)>B(x)[/tex].
[tex]0.16x+11,000>0.05x+20,000[/tex]
[tex]0.16x-0.05x>20,000-11,000[/tex]
[tex]0.11x>9,000[/tex]
[tex]\frac{0.11x}{0.11}>\frac{9,000}{0.11}[/tex]
[tex]x>81,818.1818[/tex]
Therefore, in order to produce larger income for option A, you will have to sell more than $81,818.18.
