Question

If a gym charges its members $300 per to join, they get 1000 members. For each $2 increase in price they can expect to lose 5 members. How much should the gym charge to maximize its revenue?

Answer 1

Gym charge should be `$350` from `875` members to get maximum revenue of `$306250`

Explanation:

Gym charge is `C= $300` and number of members are `M=1000`

Revenue is `R= C* M = $300000` . Let the number of `$2`

increase be `x` then revenue is `R= (300+2 x)* (1000-5 x)`

`R = -10 x^2 +2000 x - 1500 x + 300000` or

`R = -10 x^2 +500 x + 300000` or

`R = -10( x^2 -50 x ) + 300000` or

`R = -10( x^2 -50 x +625 )+6250 + 300000` or

`R = -10( x-25)^2 + 306250 ; R` will be maximum

when `x-25=0 :. x=25 :. 2 x=50 ; C=300+50=350` ;

`M=1000-5*25=875 , R=306250` and so gym charge

should be `$350` from `875` members to get maximum

revenue or `$306250` [Ans]