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Q4. Root-Mean-Square (RMS) value of a periodic current i(t) with period T can be computed as: IRMS = # i² (t)dt Assume t
Posted: Mon May 23, 2022 11:50 am
by answerhappygod
- Q4 Root Mean Square Rms Value Of A Periodic Current I T With Period T Can Be Computed As Irms I T Dt Assume T 1 (48.19 KiB) Viewed 36 times
Q4. Root-Mean-Square (RMS) value of a periodic current i(t) with period T can be computed as: IRMS = # i² (t)dt Assume that T=1 and i(t) is defined as: T i(t) = 8e sin (2n) for 0 ≤ts, i(t) = 0 for T/2 ≤ t ≤T Evaluate IRMS by a. Richardson extrapolation of combining two O(h²) trapezoidal integrals with h₂=T/8 and h₁=T/4 to obtain O(h*) result. b. Richardson extrapolation of combining two O(h*) integrals to obtain 0(h) result. c. 2-point Gauss-Legendre formula d. 3-point Gauss-Legendre formula e. The MATLAB integral function Compare the results f.