Luxury motor yacht charges 620 person per day

(c) What is the revenue per day if 79 people sign up for the cruise?

(b) What is the revenue per day if 60 people sign up for the cruise?

(a) Find a function R giving the revenue per day realized from the charter. R(x) = here

I'll get you started. See if you can compute $(b), (c)$.

$(a)$ $\beginR(x) & = 20\cdot 470 + (470 - 7)x = 9400 + 463x\;\text< dollars per day>\end$ Now $R$ to calculate the answers to $(b), (c)$

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What is the maximum revenue?

Assuming at least 20 people sign up for the cruise, determine how many passengers will result in the maximum revenue for the owner of the yacht. more

a yacht is moving at 10km/h in a south easterly direction and encounters a 3km/h current from the north. find the actual speed and direction of the yacht

Three people decide to share the cost of a yacht. By bringing in an additional partner, they can reduce the cost to each person by $4000. What is the total cost of the yacht? here

The owner of a luxury motor yacht that sails among the 4000 Greek islands charges $630 per person per day if exactly 20 people sign up for the cruise. However, if more than 20 people (up to the maximum capacity of 90) sign up for the cruise, then each fare is reduced by $5 per day for each additional passenger. Assume at least 20 people sign up for the cruise, and let x denote the number of passengers above 20.
(a) Find a function R giving the revenue per day realized from the charter.
R(x) =

(b) What is the revenue per day if 42 people sign up for the cruise?
$

(c) What is the revenue per day if 65 people sign up for the cruise?
$

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The owner of a luxury motor yacht that sails among the 4000 Greek islands charges $\$ 600 /$ person per day if exactly 20 people sign up for the cruise. However, if more than 20 people sign up for the cruise (up to the maximum capacity of 90 ), the fare for all the passengers is reduced by $\$ 4 /$ person for each additional passenger. Assume that at least 20 people sign up for the cruise, and let $x$ denote the number of passengers above 20 .
a. Find a function $R$ giving the revenue per day realized from the charter.
b. What is the revenue per day if 60 people sign up for the cruise?
c. What is the revenue per day if 80 people sign up for the cruise?