13:04
168. Laplace transform: what is it? Definition, explanation and first example.
MateFacil
5:45
169. Laplace transform of an exponential, from the definition
6:00
170. Laplace transform: Linearity properties, with demonstrations and examples
4:04
171. Laplace Transform hyperbolic sine, using definition of sinh
3:45
172. Laplace transform of hyperbolic cosine using definition of cosh
4:45
175. Laplace transform of sine and cosine, using hyperbolic functions
3:50
176. Laplace transform from sine to square, using double angle identity
4:31
177. Laplace transform from cosine squared, using double angle identity
7:30
178. Laplace transform from sine to cube, by double angle identity and product to sum
7:26
179. Laplace transform from cosine to cube, by double angle identity and product to sum
3:39
180. Laplace transform of the sine of a sum, using trigonometric identity
181. Laplace transform of the cosine of a sum, using trigonometric identity
2:29
182. Laplace transform of sinus by cosine, using double angle identity
4:55
183. Laplace transform of t^n (n integer)
3:34
184. Laplace transform of a polynomial, example solved
5:30
185. Laplace transform of real powers of t, by gamma function
2:25
186. Laplace transform of square root of t, by gamma function
4:38
191. Laplace inverse transforms: what are they? And first examples
7:09
192. Laplace inverse transforms: Properties and demonstrations, and some examples
2:23
193. Laplace inverse transforms, examples solved. Hyperbolic Cosine
3:11
194. Laplace reverse transforms, examples solved. Hyperbolic sinus
2:03
195. Laplace inverse transforms, examples solved. Cosine
2:32
196. Laplace inverse transforms, examples solved. Sine.
197. Inverse Laplace transforms, examples solved. Sum of fractions
5:48
198. Laplace inverse transforms, examples solved. Sum of fractions
3:06
199. Inverse Laplace transform of 1 over square root of s, using gamma function
3:17
200. Inverse Laplace transform of square root of s, by gamma function
10:14
234. Laplace transform of the derivative of a function. Demonstration
11:04
235. Laplace transform of higher derivatives of a function
15:51
236. Differential Equation Solved by Laplace Transforms
8:09
237. Differential Equation Solved by Laplace Transforms
11:48
238. Differential equation solved by Laplace transforms, without initial condition
7:15
239. Differential equation solved by Laplace transforms, without initial condition
7:49
240. Differential equation solved by Laplace transforms, second order
6:37
241. Differential equation solved by Laplace transforms, second order
6:54
242. Differential equation solved by Laplace transforms, second order
8:19
243. Differential equation solved by Laplace transforms, third order
17:15
244. Laplace transform of an integral, proof of formula
3:48
245. Laplace transform of an integral, VERY EASY
5:37
247. Inverse Laplace transform using integrals
5:08
248. Inverse Laplace transform using integrals
10:49
G2. Gaussian Integral: Proof using beta and gamma functions
8:50
311. Laplace transform of step functions
