The output power of a system can be represented by a continuous function f(t) overthe interval 1 ts 6 that is given by:(i)bf(t) = [²a2 + sin(√2x) dxEstimate the output power of the system by using trapezoidal rule and 1/3Simpson's rule with n = 10.(ii) Calculate the exact solution of the output power by using scientific calculator.(iii) Find the absolute error for each method from Q2(a)(i).

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Answered: The output power of a system can be…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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sin(x)+ exp(-4x). f(x) (1) x + 4 a) Use the Trapezoidal rule to integrate Equation 1 over the interval [0, 27]. Obtain at least 3 digits of accuracy and provide justifica- tion for your answer. You may use your computer tool, but you must turn in the source code, as well as your solution. b) Trapezoidal rule works by integrating a number of smaller panels and summing the result. The panel integration is performed using fi+ fi+1. Modify your tool to perform a "new" trapezoidal-like integration, but using weights 0.6, 0.4. Integrate using the new method over the interval [0, 27] using the same x values you used for your most accurate answer above.
On the graph of f ( x ) = sec ( x ) and the interval ( -2π, 0 ], for what value(s) of x does f ( x ) = 1 ?
What's the linear approximation of the function f(x) = x² sin(2x) at the point x = π, π/3? f(x) 0.949+0.717(x − π/3) f(x)≈ 0.867 +0.642(x − π/3) f(x)≈ 0.949 +0.923(x - π/3) f(x)≈ 0.738 +0.768(x − π/3)
(a) At any time t seconds, the distance x metres of a particle moving in a straight line from a fixed point is given by x = 4t² -3t+ In(1+3t) Determine expressions for the initial velocity and acceleration of the particle and their values after 3 seconds.
A thin bar of length L = 3 meters is situated along the x axis so that one end is at x = 0 and the other end is at x = 3. The thermal diffusivity of the bar is k = 0.4. The bar’s initial temperature is given by the function f(x) = 200 - 30x degrees Celsius. The ends of the bar (x = 0 and x = 3) are then put in an icy bath and kept at a constant 0 degrees C. Let u(x,t) be the temperature in the bar at x at time t, with t measured in seconds. Find u(x,t) and then u5(2, 0.1).

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