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Section 5.2b
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Do Now: Exploration 1 on page 264 It is a fact that With this information, determine the values of the following integrals. Explain your answers (use a graph, when necessary). 1. 2. 3. 4. 5. 6.
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Do Now: Exploration 1 on page 264 It is a fact that With this information, determine the values of the following integrals. Explain your answers (use a graph, when necessary). 7. 8. 9. 10. Suppose k is any positive number. Make a conjecture about
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A Similar Challenge: #29-38 on p.267-268 Use graphs, your knowledge of area, and the fact that to evaluate the given integrals. 29. 30. 31. 32. 33. 34.
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A Similar Challenge: #29-38 on p.267-268 Use graphs, your knowledge of area, and the fact that to evaluate the given integrals. 35. 36. 37. 38.
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Integrals on the Calculator Our modern calculators are good at calculating Riemann sums…our text denotes this function as NINT: We write this statement with an understanding that the right- hand side of the equation is an approximation of the left-hand side…
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Examples: Evaluate the following integrals numerically.
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Discontinuous Integrable Functions As we already know, a function is not differentiable where it is discontinuous. However, we can integrate functions that have points of discontinuity. Examples… –1 Find Let’s look at the graph… 12–1 1 Areas of rectangles: Discontinuity at x = 0!!! What does our calculator give us on this one???
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Discontinuous Integrable Functions As we already know, a function is not differentiable where it is discontinuous. However, we can integrate functions that have points of discontinuity. Examples… Explain why the given function is not continuous on [0, 3]. What kind of discontinuity occurs? Removable discontinuity at x = 2
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Discontinuous Integrable Functions As we already know, a function is not differentiable where it is discontinuous. However, we can integrate functions that have points of discontinuity. Examples… Use areas to show that The thin strip above x = 2 has zero area, so the area under the curve is the same as A Trapezoid!!!
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Discontinuous Integrable Functions As we already know, a function is not differentiable where it is discontinuous. However, we can integrate functions that have points of discontinuity. Examples… Use areas to show that Sum the rectangles:
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