1.
Evaluate the difference quotient and simplify the result.
h(x) = x2 +x+3
2.
The demand function for a commodity is
p= 19.25/(1+0.01x') , x ≥ 0
where p is the price per unit and x is the number of units sold.
(a) Find x as a function of p.
(b) Find the number of units sold when the price is $10.
Evaluate the difference quotient and simplify the result. h(x) = x2 +x+3
PART A) h(x) = x2 + x + 2 h(2+Δx)-h(2)/Δx Evaluate the difference quotient and simplify the result. Show all steps PART B) The inventor of a new game believes that the variable cost for producing the game is $0.95 per unit. The fixed cost is $9000. The selling price for each game is $4.95. How many units must be sold before the average cost per unit falls below the selling price?
Evaluate the difference quotient for the given function. Simplify your answer. f(x) = x2 + 3, f(4 + h) − f(4) h
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