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6.6 Area Between Two Curves
6.5 Evaluating Definite Integrals 6.6 Area Between Two Curves
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Properties of the Definite Integral
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Find the area of the region R under the graph of from x=-1 to x =1.
Evaluating Definite Integrals I Example Find the area of the region R under the graph of from x=-1 to x =1.
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AREAS BETWEEN CURVES Consider the region S that lies between two curves y = f(x) and y = g(x) and between the vertical lines x = a and x = b. Here, f and g are continuous functions and f(x) ≥ g(x) for all x in [a, b].
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AREAS BETWEEN CURVES As we did for areas under curves in Section 6.3, we divide S into n strips of equal width and approximate the i th strip by a rectangle with base ∆x and height
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AREAS BETWEEN CURVES Thus, we define the area A of the region S as the limiting value of the sum of the areas of these approximating rectangles. The limit here is the definite integral of f - g.
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REVIEW The Definite Integral
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Thus, we have the following theorem for area:
AREAS BETWEEN CURVES Thus, we have the following theorem for area: The area A of the region bounded by the curves y = f(x), y = g(x), and the lines x = a, x = b, where f and g are continuous and for all x in [a, b], is:
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AREAS BETWEEN CURVES Example Find the area of the region bounded above by y = bounded below by y = x, and bounded on the sides by x = 0 and x = 1.
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Step 2 Formulate the definite integral Step 3 Find the value
AREAS BETWEEN CURVES Solution: Step 1 Sketch the figure Step 2 Formulate the definite integral Step 3 Find the value
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AREAS BETWEEN CURVES Example Find the area of the region enclosed by the parabolas y = x2 and y = 2x - x2.
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AREAS BETWEEN CURVES From the figure, we see that the top and bottom boundaries are: yT = 2x – x2 and yB = x2
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AREAS BETWEEN CURVES
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properties
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AREAS BETWEEN CURVES The area between the curves y = f(x) and y = g(x)(continuous)and between x = a and x = b is:
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3 Vertical (horizontal) lines 4 Formula
Summary 1 Draw the image 2 Judgment 3 Vertical (horizontal) lines 4 Formula
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AREAS BETWEEN CURVES Exercise Find the area enclosed by the line y = x -1 and the parabola y2 = 2x + 6.
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AREAS BETWEEN CURVES It would have meant splitting the region in two and computing the areas labeled A1 and A2. The method used in the example is much easier.
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Some regions are best treated by regarding x as a function of y.
AREAS BETWEEN CURVES Some regions are best treated by regarding x as a function of y. If a region is bounded by curves with equations x = f(y), x = g(y), y = c, and y = d, where f and g are continuous and f(y) ≥ g(y) for c ≤ y ≤ d, then its area is:
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AREAS BETWEEN CURVES
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AREAS BETWEEN CURVES Thus,
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Find the area enclosed by 1.y=|x| and y=x2 - 2 2. y=x2 and x= y2
AREAS BETWEEN CURVES Exercises Find the area enclosed by 1.y=|x| and y=x2 - 2 2. y=x2 and x= y2
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