Hi
I honestly have no clue on how to approach these questions and I dont understand them. I also have a midterm the following week. If someone can please show me how I would do these questions step by step I will be so grateful.
1-The iterated integral J = integral b=8, a= 1(integral b=41-x, a= 40/x, f(x,y) dy) dx is the double integral of f(x,y)
over a planar region R. Reversing the order , the integral is expressible in the form
J = integral b,a (integral b=8, a=c f(x,y) dx) dy + integral b=p, a=q (integral b=v, a=u f(x,y) dx) dy. Find a , c , p , and v.
2-Find the volume of the wedge cut from the first octant by the surface z = 45 - 5y^2 and the vertical plane x + y = 3.
3-Let f(x) be a function such that - 9 ≤ f"(x) ≤ 3 , for x∈[2 , 4] and let J= (integral b=4 , a= 2) dx.
Find the maximum absolute error involved in approximating the integral J
using the Trapezoid Rule T10.
[h=2][/h]
I honestly have no clue on how to approach these questions and I dont understand them. I also have a midterm the following week. If someone can please show me how I would do these questions step by step I will be so grateful.
1-The iterated integral J = integral b=8, a= 1(integral b=41-x, a= 40/x, f(x,y) dy) dx is the double integral of f(x,y)
over a planar region R. Reversing the order , the integral is expressible in the form
J = integral b,a (integral b=8, a=c f(x,y) dx) dy + integral b=p, a=q (integral b=v, a=u f(x,y) dx) dy. Find a , c , p , and v.
2-Find the volume of the wedge cut from the first octant by the surface z = 45 - 5y^2 and the vertical plane x + y = 3.
3-Let f(x) be a function such that - 9 ≤ f"(x) ≤ 3 , for x∈[2 , 4] and let J= (integral b=4 , a= 2) dx.
Find the maximum absolute error involved in approximating the integral J
using the Trapezoid Rule T10.
[h=2][/h]
