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Learn about marginal analysis and profit function to determine maximum profit. Explore concepts like marginal cost, marginal revenue, and differentiation for precise computations.
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What’s next? • So far we have graphical estimates for our project questions • We need now is some way to replace graphical estimates with more precise computations
Differentiation • Purpose- to determine instantaneous rate of change Eg: instantaneous rate of change in total cost per unit of the good We will learn • Marginal Demand, Marginal Revenue, Marginal Cost, and Marginal Profit
Marginal Cost :MC(q) • What is Marginal cost? The cost per unit at a given level of production EX: Recall Dinner problem C(q) = C0 + VC(q). = 9000+177*q0.633 MC(q)- the marginal cost at q dinners MC(100)- gives us the marginal cost at 100 dinners This means the cost per unit at 100 dinners How to find MC(q) ? We will learn 3 plans
Marginal Analysis • First Plan • Cost of one more unit
Marginal Analysis • Ex. Suppose the cost for producing a particular item is given by where q is quantity in whole units. Approximate MC(500).
Marginal Analysis • Second Plan • Average cost of one more and one less unit
Marginal Analysis • Ex. Suppose the cost for producing a particular item is given by where q is quantity in whole units. Approximate MC(500).
Marginal Analysis • Final Plan • Average cost of fractionally more and fractionally less units difference quotients • Typically use with h = 0.001
Marginal Analysis • Ex. Suppose the cost for producing a particular item is given by where q is quantity in whole units. Approximate MC(500). In terms of money, the marginal cost at the production level of 500, $6.71 per unit
Marginal Analysis • Use “Final Plan” to determine answers • All marginal functions defined similarly
Marginal Analysis • Graphs D(q) is always decreasing All the difference quotients for marginal demand are negative MD(q) is always negative
Marginal revenue 0 Marginal Analysis Maximum revenue • Graphs q1 q1 • R(q) is increasing • difference quotients for marginal revenue are positive • MR(q) is positive • R(q) is decreasing • difference quotients for marginal revenue are negative • MR(q) is negative This shows that the maximum revenue will occur at the value q1 where the marginal revenue is equal to zero
Marginal Analysis • Graphs
Differentiation, Marginal Dinner Problem- Marginal Analysis
Marginal analysis & Profit Function • Since P(q) = R(q) C(q) • profit will increase with more dinners • if the increase in revenue per dinner is greater than the increase in cost per dinner. • This happens where MR(q) > MC(q). • Similarly, profit will decrease with more dinners • if the change in revenue per dinner (positive or negative) is less than the increase in cost per dinner. • This happens where MR(q) < MC(q).
Marginal analysis & Profit Function • Profit stops increasing, and starts to decrease at its maximum value. • the maximum profit must occur whereMR(q) = MC(q). • From the plot of MR(q) and MC(q), MR(2,025) = $6.84 = MC(2,025). the maximum profit will occur at q = 2,025 dinners. Direct computation shows that D(2,025) = $22.21 and that P(2,025) = $14,052.
Dinner Problem • expect to sell 2,025 buffalo steak dinners per week • priced at $22.21 per dinner (recall p=D(q)) • for a total profit of $14,052
Differentiation, Marginal Where profit, P(q), is increasing, marginal profit, MP(q), is positive. Where P(q) is decreasing, MP(q) is negative. The change from increasing to decreasing profit occurs at the maximum profit. This must be where MP(q) changes from positive to negative. Thus,the maximum profit occurs when the marginal profit is zero, MP(q) = 0. MP(2,025) = $0.00. (results same as in the marginal analysis of revenue and cost) Another method to determine the maximum profit