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7.5 Area Between Two Curves Find Area Between 2 Curves Find Consumer Surplus Find Producer Surplus.

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Presentation on theme: "7.5 Area Between Two Curves Find Area Between 2 Curves Find Consumer Surplus Find Producer Surplus."— Presentation transcript:

1 7.5 Area Between Two Curves Find Area Between 2 Curves Find Consumer Surplus Find Producer Surplus

2 Area between 2 curves Let f and g be continuous functions and suppose that f (x) ≥ g (x) over the interval [a, b]. Then the area of the region between the two curves, from x = a to x = b, is

3 Example: Find the area of the region that is bounded by the graphs of First, look at the graph of these two functions. Determine where they intersect. (endpoints not given)

4 Example (continued): Second, find the points of intersection by setting f (x) = g (x) and solving.

5 Example (concluded): Lastly, compute the integral. Note that on [0, 2], f (x) is the upper graph. (2 x  1)  ( x 2  1)     0 2  dx  (2 x  x 2 ) 0 2  dx  x 2  x 3 3       0 2  2 2  2 3 3        0 2  0 3 3        4  8 3  0  0  4 3

6 Example: Find the area bounded by Answer: 15

7 Example: Find the area of the region enclosed by Answer: 19/3

8 DEFINITION: The equilibrium point, (x E, p E ), is the point at which the supply and demand curves intersect. It is that point at which sellers and buyers come together and purchases and sales actually occur.

9 DEFINITION: Suppose that p = D(x) describes the demand function for a commodity. Then, the consumer surplus is defined for the point (Q, P) as Integrate from 0 to the quantity Demand function – price price and quantity are from the equil. pt.

10 Example: Find the consumer surplus for the demand function given by When x = 3, we have Then, Consumer Surplus  Dq   p 0 q   ( x  5) 2  4 0 3   ( x 2  10 x  21) dx 0 3  dq

11 Example(concluded):

12 DEFINITION: Suppose that p = S(x) is the supply function for a commodity. Then, the producer surplus is defined for the point (Q, P) as Integrate from 0 to the quantity price- Supply function price and quantity are from the equil. pt.

13 Example : Find the producer surplus for Find y when x is 3. When x = 3, Then,  Producer Surplus

14 Example: Given find each of the following: a) The equilibrium point. b) The consumer surplus at the equilibrium point. c) The producer surplus at the equilibrium point.

15 Example (continued): a) To find the equilibrium point, set D(x) = S(x) and solve. Thus, x E = 2. To find p E, substitute x E into either D(x) or S(x) and solve.

16 Example (continued): If we choose D(x), we have Thus, the equilibrium point is (2, $9).

17 Example (continued): b) The consumer surplus at the equilibrium point is

18 Example (concluded): b) The producer surplus at the equilibrium point is

19 More examples: 1)Find the area bounded by 2)Find the area bounded by 3)Given the following functions, Find a) the Equilibrium Point b) Producer Surplus c) Consumer Surplus Answers: 1) 6.611 2) 488/5 or 97.6 3) a) (25, $750), b) $3125, c) $15,625

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