Min-Max problem

Yankel

Active member
Hello, I need some help with this simple question, don't know why I got it wrong...

The price of a single phone call is 0.5\$and the average number of calls made in a month is 200. For each 5 cent of price increment, the average number of calls made by the customers decreases by 10. Find what should be the cost of a single call so that the income will be maximal. I know I need to build up a function and then find derivative and all that, I just can't build the right function.... The final answer is by the way 0.75\$.

Thank you

Last edited by a moderator:

earboth

Active member
Hello, I need some help with this simple question, don't know why I got it wrong...

The price of a single phone call is 0.5 USD and the average number of calls made in a month is 200.

For each 5 cent of price increment, the average number of calls made by the customers decreases by 10.

Find what should be the cost of a single call so that the income will be maximal.

I know I need to build up a function and then find derivative and all that, I just can't build the right function....
The final answer is by the way 0.75$. Thank you 1. Please don't use the dollar sign. 2. Let x be the number of 5-cts-increment. Then the income is determined by:$ \displaystyle{f(x)=(0.5 + 0.05 \cdot x)(200-10x)} \$

• 