The profit, P, in hundreds of dollars, from the sale of “x” kilograms of tuna fish can be modeled by the function p(x) = 90x / x+100.

 

a) Determine the profit from the sale of 50 kg of tuna.

b) Determine the average rate of change in profit between 0 kg and 50 kg in sales

 

c)How much tuna must be sold for the profit to be 45 hundred dollars?

2. At the Bay of Fundy, a tourist notices it takes 6 hours to go from high tide to low tide.  She is informed from her tour guide that there is a 20 m water depth difference between the low tide and high tide. If the water depth is zero at low tide, create and label a graph to show the water level versus time, where t = 0 hours represents the time at low tide.