Which Fourier Dirichlet conditions for transform existence specify the necessity of possessing finite values of the signal at any instant over a finite interval of time (T) ?

a. Single Valued Property

b. Finite-discontinuities

c. Finite Peaks

d. Absolute Integration

ANSWER: Single Valued Property

Explanation:

The conditions which provide chances to the periodic function to get expanded in a convergent Fourier series , are renowned as Dirichlet Conditions.

Thus, the very first Dirichlet condition states that, the signal should have only the finite values over any time instant for a finite interval of time so the signal can be considered to be fourier transformable.

This condition implies the single-valued property that does not change or tend to increase over the infinite time intervals.