Estimate using the trapezoid rule and Simpson’s rule for ∫ ? ? 2 ?? 2 0...

2. Use Simpson’s rule with six rectangles to estimate for using the Fundamental Theorem. ?Integral from...

2. Use Simpson’s rule with six rectangles to estimate for using the Fundamental Theorem. ?Integral from 0-4 x^3 dx

Approximate the arc length of the curve over the interval using Simpson’s Rule, with N=8 y=4e^(-x^2),[0,2]

Approximate the arc length of the curve over the interval using Simpson’s Rule, with N=8 y=4e^(-x^2),[0,2]

For the integral below, write a program to do the trapezoid rule using the sequence of...

For the integral below, write a program to do the trapezoid rule using the sequence of mesh sizes h = (b – a)/2, (b – a)/4, (b – a)/8, ..., (b – a)/128, where b – a is the length of the given interval: f(x) = e−x sin(4x), [0, pi], I(f) = (4/17)(1 − e^-pi) = 0.2251261368. Verify that the expected rate of error decrease is obtained. Attach your code and a plot of error vs. h.

Compute the area of a circle with a radius =9 using the trapezoid rule . Select...

Compute the area of a circle with a radius =9 using the trapezoid rule . Select the number of trapezoids =4 . your answere below should be based on 4 trapezoids for half circle

1. The equation of a particular ellipse is x2 /16 + y2/9 = 1 a. Since...

1. The equation of a particular ellipse is x2 /16 + y2/9 = 1 a. Since there is symmetry along the x-axis, we are going to express the ellipse ? as a function of ?. b. Sketch the graph of your function c. Use the Trapezoid rule (use 8 subdivisions) d. Use Simpson’s rule (use 8 subdivisions) e. Compare your answers to the true value of 12? f. For trapezoid rule, how many (subdivisions would you need to have an...

Compute the integral of the function f(x) = -x3 + 6x2 + 1 in the interval...

Compute the integral of the function f(x) = -x3 + 6x2 + 1 in the interval 0 to 3 using A. Simpson’s 1/3 rule using two intervals AND B. Simpson’s 3/8 rule using two intervals

2. Provide an example to illustrate Simpson’s Paradox.

2. Provide an example to illustrate Simpson’s Paradox.

V(t) = 2t^3 + 3t^2 + sqrt(3) It is well known that the distance covered by...

V(t) = 2t^3 + 3t^2 + sqrt(3) It is well known that the distance covered by the missile can be found using integration of the equation above. Using a constant interval size of 2, use a combination of Simpson’s 3/8 rule and Multiple Simpson’s 1/3 rule with n = 4 to calculate the distance travelled by the missile from = 1 to = 15.

Using the interval rule, estimate the relative splittings between hyperfine sublevels in 5D3/2 and 5D5/2 fine...

Using the interval rule, estimate the relative splittings between hyperfine sublevels in 5D3/2 and 5D5/2 fine structure levels of 137Ba+ ion. Compare your calculations to the experimentally measured values and explain the discrepancy.

Application of Simpson's and Trapezoid approximations a)Find T6 and S6 with the correct first six decimal...

Application of Simpson's and Trapezoid approximations a)Find T6 and S6 with the correct first six decimal figures that aproximate to the integral ∫0-? (?? +?+2)?? b) Determine the error that was made using T6 and S6