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13 Nov 2019
Difficult need help
Do Homework- Trevor Brancheau - Google Chrome ì Secure l https//www.mathalcom/Student/PlayerHomework.a spx?homeworkid=4455 1 1 032&questionId-8&fushed» false&dd-4675402¢ervin 2017 Fall Calculus with Business Applicatio (1) Homework: Section 4.2 Homework Score: 0 of 1 pt 4.2.41 Save , 15 of 16 (12 complete) â¼ HW Score: 68 75%, 11 of 16 pts -Question Help * The Trapezoidal Rule states that an integral can be approximated by replacing each rectangle in a Riemann sum with a trapezoid. If the function f over the interval [a.b] is subdivided into n equal subintervals of length Î.na then the area under f over [ablis approxim atelyaff(2)+f(x2)+f(x3)+ +f(x)+ì f(b) where x' = a and xn xn-1+Axor xn a + (n-1/4x. e the area under the graphof)ove he intelal uing the Trapezoidal Rule and the interval sublvisian shown in the graph on the right The area under the graph is approximately Simplify your answer.) Enter your answer in the answer box and then click Check Answer Clear All Check Answer
Difficult need help
Do Homework- Trevor Brancheau - Google Chrome ì Secure l https//www.mathalcom/Student/PlayerHomework.a spx?homeworkid=4455 1 1 032&questionId-8&fushed» false&dd-4675402¢ervin 2017 Fall Calculus with Business Applicatio (1) Homework: Section 4.2 Homework Score: 0 of 1 pt 4.2.41 Save , 15 of 16 (12 complete) â¼ HW Score: 68 75%, 11 of 16 pts -Question Help * The Trapezoidal Rule states that an integral can be approximated by replacing each rectangle in a Riemann sum with a trapezoid. If the function f over the interval [a.b] is subdivided into n equal subintervals of length Î.na then the area under f over [ablis approxim atelyaff(2)+f(x2)+f(x3)+ +f(x)+ì f(b) where x' = a and xn xn-1+Axor xn a + (n-1/4x. e the area under the graphof)ove he intelal uing the Trapezoidal Rule and the interval sublvisian shown in the graph on the right The area under the graph is approximately Simplify your answer.) Enter your answer in the answer box and then click Check Answer Clear All Check Answer
Hubert KochLv2
29 Apr 2019