The weekly demand for the Pulsar 40-in. high-definition television is given by the demand equation
p = −0.04x + 517 (0 ≤ x ≤ 12,000)
where p denotes the wholesale unit price in dollars and x denotes the quantity demanded. The weekly total cost function associated with manufacturing these sets is given by
C(x) = 0.000004x3 − 0.05x2 + 400x + 80,000
where C(x) denotes the total cost incurred in
producing x sets. Find the level of production that will
yield a maximum profit for the manufacturer. Hint:
Use the quadratic formula. (Round your answer to the nearest whole
number.)
units
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The weekly demand for the Pulsar 40-in. high-definition television is given by the demand equation p...
12. -1 M points TanApCalcBr10 4.4.050. The weekly demand for the Pulsar 40-in. high-definition television is given by the demand equation p =-0.03x + 545 (0 12,000) x where ρ denotes the wholesale unit price in dollars and x denotes the quantity demanded. The weekly total cost function associated with manufacturing these sets is given by C(x) 0.000004x3 -0.04x2 400x 80,000 where C(x) denotes the total cost incurred in producing x sets. Find the level of production that will yield...
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The demand function for an oligopolistic market is given by the equation, Q = 275 – 4P, where Q is quantity demanded and P is price (Note: inverse demand for the dominant firm here is P = 50 - .2Q). The industry has one dominant firm whose marginal cost function is: MC = 12 + 1.2QD, and many small firms, with a total supply function: QS = 25 + P. In equilibrium, the total output of all small firms is...