Fourier Series MCQ | Electricalvoice - 必威app官方下载,必威betway App下载

1.考虑 $g(t)=\begin{cases} t-\left \lfloor t \right \rfloor, & \text{} t\geq 0 \\ t-\left \lceil t \right \rceil, & \text{} otherwise \end{cases}$ , where t ∈ R. Here $\left \lfloor t \right \rfloor$ represents the largest integer less than or equal to t and $\left \lceil t \right \rceil$ denotes the samllest integer greater than or equal to t. The coefficient of the second harmonic component of the fourier series representing g(t) is

1
0
-1
2

Answer

Answer. b

2. Let g: [0,∞) → [0,∞) be a function defined by g(x) = x – [x], where [x] represents the integer part of x. (i.e., it is the largest integer which is less than or equal to x). The value of the constant term in the Fourier series expansion of g(x) is

Answer

Answer. a

3. Let x(t) be a periodic signal with time period T, Let y(t) = x(t – t_o) + x(t + t_o) for some t_o. The fourier series coefficients of y(t) are denoted by b_k. If b_k= 0 for all odd K. Then to can be equal to

Answer

Answer. b

4. The fourier series for the function f(x) = sin²x is

sin x + sin 2x
1 – cos 2x
sin 2x + cos 2x
0.5 – 0.5cos 2x

Answer

Answer. d

5. If an a.c. voltage wave is corrupted with an arbitrary number of harmonics, then the overall voltage waveform differs from its fundamental frequency component in terms of

只有the peak values
只有the rms values
只有the average values
all the three measures (peak, rms and average values)

Answer

Answer. d

6. The signum function is given by

$sgn(x)=\begin{cases} \frac{x}{\left | x \right |}; & \text{} x\neq 0 \\ 0\: ; & \text{} x= 0 \end{cases}$

The Fourier series expansion of sgn(cos(t)) has

只有sine terms with all harmonics
只有cosine terms with all harmonics
甚至只有正弦项编号的谐波
只有余弦术语，奇数谐波

Answer

Answer. d

7. The Fourier series coefficients of a periodic signal x(t) expressed as

$x(t)=\sum_{k=-\infty }^{\infty}a_ke^{j2\pi kt/T}$ are given by

a_-2= 2 – j1; a_-1= 0.5 + j0.2; a₀= j2; a₁= 0.5 – j0.2; a₂= 2 + j1;

and a_k= 0; for |k| > 2

Which of the following is true?

x(t) has finite energy because only finitely many coefficients are non-zero
x(t) has zero average value because it is periodic
the imaginary part of x(t) is constant
the real part of x(t) is even

Answer

Answer. c

8. x(t) is a real valued function of a real variable with period T. Its trigonometric Fourier series expansion contains no terms of frequency ω = 2π (2k)/T; k = 1, 2, …… Also, no sine terms are present. Then x(t) satisfies the equation