If the profit function for a firm is given by P(x) = 4200 + 170x X2 and limitations on space require that production be less than 100 units, nd the break-even points. (Enter your answers as a comma-separated list.) X = units I0. [-13 Points] DETAILS HARMATHAP12 2.3.009.EP. MY NOTES ASK YOUR TEACHER Suppose that in a monopoly market, the demand function for a product is p = 150 0.20x and the revenue function is R = px, where x is the number of units sold and p is the price per unit (in dollars). Form the revenue function R(x). Find the number of units that must be sold to maximize revenue. X = Find the price of the product (in dollars) that will maximize revenue. $ In calculus it is frequently important to write an expression in the form cx\