Question

is obtained by using
The solution of Laplace transform of te
(A) First shifting property
(B) Second shifting property
(C) Linearity Property
(D) Convolution Theorem
​

Answer 1

Answer:

2018

Laplace Transform of Piecewise Continuous Functions

Rather than being defined as a single continuous time-domain function, the excitation or input to a dynamic system may be a piecewise continuous function, such as the generic one of Figure 6.7, which is formed of n different functions, each defined over one subinterval over the zero-to-infinity time interval. The generic function segment indicated with an asterisk in Figure 6.7 is defined over the [ti−1, ti] subinterval and is part of the function fi(t), which spans the −∞ to +∞ time interval.