Abstract
Double differential transform method has been employed to compute double Laplace transform. To illustrate the method, four examples of different forms have been prepared.
Highlights
The concept of the DTM was first proposed by Zhou [1], who solved linear and nonlinear problems in electrical circuit problems
(∑∞ k=1(k/k!)(−st)k) we conclude that lim x→∞ t→∞
From the properties of double differential transform, we have r=0 l=0 r l!
Summary
The concept of the DTM was first proposed by Zhou [1], who solved linear and nonlinear problems in electrical circuit problems. ∫ e−px {DTt ∫ e−stf (x, t) dt} dx}] ] . Lim x → ∞ (−st)e−st(−px)e−px = 0; since (∑∞ r=t1→(r∞/r!)(−px)r) = (−st)e−st(−px)e−px (∑∞ k=1(k/k!)(−st)k) we conclude that lim x→∞ t→∞ By using the definition of polynomial, we have
Sign-in/Register to view highlights & summary Sign-in/Register to access full text options 
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Schedule a call
