Try another version of this question A coffee shop currently sells 450 lattes a day at $3.00 each. They recently tried raising the by price by $0.25 a latte, and found that they sold 50 less lattes a day. Get help: Box 1: Enter your answer as an expression. Example: 3x^2+1, x/5, (a+b)/c
Box 2: Enter your answer as an expression. Example: 3x^2+1, x/5, (a+b)/c
Box 3: Enter your answer as a number (like 5, -3, 2.2172) or as a calculation (like 5/3, 2^3, 5+4) Box 4: Enter your answer as a number (like 5, -3, 2.2172) or as a calculation (like 5/3, 2^3, 5+4)
a) Assume that the number of lattes they sell in a day, `N` , is linearly related to the sale price, `p` (in dollars). Find an equation for `N` as a function of `p` .
`N(p)` =
b) Revenue (the amount of money the store brings in before costs) can be found by multiplying the cost per cup times the number of cups sold. Again using `p` as the sales price, use your equation from above to write an equation for the revenue, `R` as a function of `p` .
`R(p)` =
c) The store wants to maximize their revenue (make as much money as possible). Find the value of `p` that will maximize the revenue (round to the nearest cent).
p =
which will give a maximum revenue of $
Be sure your variables match those in the question
Be sure your variables match those in the question
Enter DNE for Does Not Exist, oo for Infinity
Enter DNE for Does Not Exist, oo for Infinity