In BPF domain, using the operational matrix (mathbf{P}), we can integrate any time function expanded via block
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In BPF domain, using the operational matrix \(\mathbf{P}\), we can integrate any time function expanded via block pulse functions. Why this matrix \(\mathbf{P}\) is called an 'Operational Matrix'?
To integrate a function \(f(t)\) in BPF domain, taking 10 subintervals within a span of \(1 \mathrm{~s}\), what should be the dimension of the operational matrix for integration, \(\mathbf{P}\) ?
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Related Book For
Control System Analysis And Identification With MATLAB Block Pulse And Related Orthogonal Functions
ISBN: 246725
1st Edition
Authors: Anish Deb, Srimanti Roychoudhury
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