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CHAPTER 2 2.4 Continuity The Definite Integral animation i=1 n f (x i * ) x f (x) xx Riemann Sum xi*xi* xixi x i+1
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Definition of a Definite Integral If f is a continuous function defined for b x a we divide the interval [a,b] into subintervals of equal width x =(b–a)/n. We let x 0 (= a), x 1, x 2 … x n ( = b) be the endpoints of these subintervals and we choose sample points x 1 *, x 2 * … x n *, so x i * lies in the ith subinterval [x i-1, x i ]. Then the definite integral of f from a to b is b a b f (x) dx = lim n 0 i=1 n f (x i * ) x.
![Definition of a Definite Integral If f is a continuous function defined for b x a we divide the interval [a,b] into subintervals of equal width x =(b–a)/n.](http://images.slideplayer.com/26/8387336/slides/slide_2.jpg "We let x 0 (= a), x 1, x 2 … x n ( = b) be the endpoints of these subintervals and we choose sample points x 1 *, x 2 * … x n *, so x i * lies in the ith subinterval [x i-1, x i ]. Then the definite integral of f from a to b is b a b f (x) dx = lim n 0 i=1 n f (x i * ) x..")
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Example If f (x) = x 2, 0 <= x <= 1, evaluate the Riemann sum with n = 4, taking the sample points to be right endpoints. Right endpoints animation
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Example If f (x) = x 2, 0 <= x <= 1, evaluate the Riemann sum with n = 4, taking the sample points to be left endpoints. Left endpoints animation
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Example If f (x) = x 2, 0 <= x <= 1, evaluate the Riemann sum with n = 4, taking the sample points to be midpoints. Midpoints animation
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Midpoint Rule b a f (x) dx n i = 1 f (x i * ) x = x [ f (x 1 ) + … + f (x n )] where x = (b – a) / n and x i = ½ ( x i-1 + x i ) = midpoint of [x i-1, x i ]. _ _ _
![Midpoint Rule b a f (x) dx n i = 1 f (x i * ) x = x [ f (x 1 ) + … + f (x n )] where x = (b – a) / n and x i = ½ ( x i-1 + x i ) = midpoint of [x i-1, x i ].](http://images.slideplayer.com/26/8387336/slides/slide_6.jpg "_ _ _.")
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Properties of the Integral 1. a b c dx = c(b – a), where c is any constant. 2. a b [ f (x) + g(x)]dx = a b f (x) dx + a b g(x) dx 3. a b c f (x) dx = c a b f (x) dx, 4. a b [ f (x) - g(x)]dx = a b f (x) dx - a b g(x) dx. 6. a b f (x) dx + a b f (x) dx = a b f(x) dx.
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Example Solve : -1 3 |3x – 5| dx.
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