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Math · Advanced Math
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A10. Obtain expressions for the magnitude and phase of the frequency response function of the system: d00 dy(t dt dt (5 marks). All. Without explicitly solving the following system differential equation explain why its impulse response will be an oscillation that grows very slowly with time dyの一0,00001dy(t)+2y(t)-u(t) dt dt (5 marks). A12. Using a time-step of, 0.1, seconds obtain an approximate discrete time model of the system described by the following ordinary differential equation: dy(t)+y(t) = 2a(r) dt
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