PPT-Evaluation of Definite Integrals via the Residue Theorem

ECE 6382 Notes are from D R Wilton Dept of ECE 1 David R Jackson Fall 2017 Notes 10 Brief Review of Singular Integrals Logarithmic singularities are examples of integrable. Sigma Notation. What does the following notation mean?. means. the sum of the numbers from the lower number to the top number.. Area under curves. In 5.1, we found that we can approximate areas using rectangles.. 3: Indefinite and Definite . Integrals, . the Fundamental Theorem of . Calculus, Integration Via Substitution, Integration by Parts, Computing Areas, Computing Volumes by the Disk and Shell Methods. Part I: Indefinite and Definite Integrals and the Fundamental Theorem of Calculus. Ms. . Battaglia. – . ap. calculus . Definite integral. A definite integral is an integral . with upper and lower bounds. The number a is the . lower limit. of integration, and the number b is the . The integrals we have studied so far represent signed areas of bounded regions. . There are two ways an integral can be improper: . . (. 1) The interval of integration may be . infinite.. (2. ) . The . FACULTY OF EDUCATION. Mathematics Education Department. Integratıon, fınıte sum and defınıte ıntegral. 1. Orhan TUĞ (PhDc). A. Figure 5.1.8. Figure 5.1.9. Error analysis. Error analysis. Upper and lower estimates of the area. Calculus. Calculus answers two very important questions.. The first, how to find the instantaneous rate of change, we answered with our study of derivatives. The second we are now ready to answer, how to find the area of irregular regions.. * Read these sections and study solved examples in your textbook!. Work On:. Practice problems from the textbook and assignments from the . coursepack. as assigned on the course web page (under the link “SCHEDULE HOMEWORK”). Area and Estimating with Finite Sums. Section 5.2. Sigma Notation and Limits of Finite Sums. Section 5.3. The Definite Integral. Section 5.4. The Fundamental Theorem of Calculus. As the number of rectangles increased, the approximation of the area under the curve approaches a value.. Copyright .  2010 Pearson Education, Inc.. Section 5.3 – The Definite Integral. Definition. Visualize and compute.  . Solution. . First we graph the function over the interval . using a . grapher. ..  . is the area of the yellow region..  . Now we compute..  .  .  . We’ve learned how to use . Riemann Sums. The sums you studied in the last section are called . Riemann Sums. When studying . area under a curve. , we consider only intervals over which the function has positive values because area must be positive. Riemann Sums. a. b. The rectangles need not have equal width, and the height may be . any. value of . f. (. x. ). within the subinterval. .. 1. Partition (divide) [. a,b. ] into . N. subintervals.. 5.2: . The Differential . dy. 5.2: . Linear Approximation. 5.3: . Indefinite Integrals. 5.4: . Riemann Sums (Definite Integrals). 5.5: . Mean Value Theorem/. Rolle’s. Theorem. Ch. 5 Test Topics. dx & . COURSE name : - INTEGRAL CALCULUS . DEPARTMENT OF MATHEMATICS . COURSE CODE :- MATH 309 TH . Course Description. Theorem 1: On Definite Integral . Theorem 2 : On Definite Integral. . Theorem 3 : On Definite Integral.