- Consider The Triangular Wave Which We Have Discussed In The Relevant Lecture Of Continuous Time Fourier Series Ctfs 1 (60.72 KiB) Viewed 17 times
Consider the triangular wave, which we have discussed in the relevant lecture of Continuous-time Fourier series (CTFS). For the same example: (i) (ii) (iii) (iv) (v) Sketch periodic extension of the given function. Also, determine fundamental time period of the given function from the graph. In your opinion, the given function is either even or odd or neither. Justify your answer? Is it possible to apply the Reduced Trigonometric Fourier Series (half range expansion) to the given function? If yes, either Fourier sine or cosine expansion would be you suggest? Find the Reduced Trigonometric Fourier Series for the above function, if any. Plot the line spectrum for the Trigonometric sSeries obtained in Part (iv).