filmov
tv
Relation between Pn(x)
0:00:35
Legendre's function/ Rodrigue's Formula with special property of Pn(x)/pdf file link in description👇
0:04:24
Recurrence Relations For Pn(ki power m)x of Legendre's Equations and Legendre Polynomial (Part=2)
0:11:52
Legendre's Equation & Legendre's Function # Pn(x) #Qn(x)
0:06:16
Recurrence Relation for Pn(x) Part-2
0:06:16
Easy method for Laplace first integral for pn(x) -legendre polynomials
0:15:19
Legendre Polynomials | Generating Function of Legendre Polynomial
0:11:41
Applied Mathematics | Class -5 | Legendre's Equation solution | Pn(x) is a coefficient of h^n
0:19:55
Recurrence formula for Pn ( x )
0:11:14
Rodrigues Formula for Pn(x) of Legendre Polynomial ll Special Function ll Legendre Polynomial ll
0:05:11
State and Prove Laplace's First integral For Pn(x) of Legendre's Equations and Legendre Polynomial l
0:18:43
Associate Legendre Function with the help of Orthogonal Property For Pn(x) of Legendre's Polynomial
0:21:38
Rodrigue Formula of Pn(x)
0:09:16
Applications of Legendre's Polynomials, pn'(1)=n(n+1)/2
0:06:58
Proof that the Sample Variance is an Unbiased Estimator of the Population Variance
0:08:32
Generating function for Pn (x) Bsc2nd
0:08:46
Prove that Pn(1)=1 and Pn(-x)=(-1)^nPn(x) || Legendre's Polynomial || Lect 19
0:05:11
find the value of Pn (1) , Pn (-1) , Pn (-x) || numerical on legendre polynomials
0:10:27
Murphy's Formula For Pn(x) of Legendre's Polynomial ll Special Function ll Legendre Equations ll
0:06:19
State And Prove Christoffel's Expansion For Pn'(x) of Legendre Polynomial ll Special Function ll
0:00:22
Laplace first integral for pn(x) || Differential Equation || MSC MATHS #youtubeshorts
0:04:34
Orthogonal Property of Pn(x)&Pm(x) Legendre Polynomial ll Special Function ll Legendre Polynomial
0:15:39
Generating function for Pn ( X )
0:19:17
Behaviour of Pn(x) for Large Value Of n For Legendre Polynomial ll Special Function ll Legendre Equ
0:05:49
Prove that all the roots of Pn(x)=0 are real and distinct lies Between -1 and 1 ll Legendre Equation
Назад
Вперёд