Related MCQs

• A periodic function of half wave symmetry is necessarily
• Consider the trigonometric series, which holds true for all t, given by\(x(t)=\sin ω_0 t + \dfrac{1}{3} \sin 3 ω_0 t + \dfrac{1}{5} \sin 5 ω_0 t + \dfrac{1}{7}\sin 7 ω_0 t + ...\) At \(\omega_0 t = \dfrac{\pi}{2}\), the series converges to
• Directions: The below item consists of two statements, one labelled as the 'Statement (I)' and the other as 'Statement (II)'. Examine these two statements carefully and select the answers to these items using the codes given below:Statement (I): Dirichlet's conditions restrict the periodic signal x(t), to be represented by Fourier series, to have only finite number of maxima and minima.Statement (II): x(t) should possess only a finite number of discontinuities.Codes:
• A signal \(2\cos \left( {\frac{{2{\rm{\pi }}}}{3}{\rm{t}}} \right) - {\rm{cos}}\left( {{\rm{\pi t}}} \right){\rm{\;}}\)is input to an LTI system with the transfer functionH(s) = es + e-sIf ck denotes the kth coefficient in the exponential Fourier series of the output signal, then c3 is equal to
• If \(f\left( x \right) = \frac{l}{4} - x\), when \(0 < x < \frac{l}{2}\)\( = x - \frac{{3l}}{4}\) ,when \(\frac{l}{2} < x < l\)then the value of a0 in the Fourier series of this function is
• For a waveform to be expressed in Fourier series, which of the following conditions must be satisfied?I. Maxwell’s conditionsII. Drichlet conditionsIII. Sampling Theorem
• A periodic function satisfies Dirichlet’s conditions. This implies that the function
• Find the Fourier series of the waveform shown below.
• Parseval’s relation for a periodic signal relates
• Fourier series of an odd periodic function contains only