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LabLynx Wiki

Posted on July 23, 2020 By Robert Payne

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

LIMSpec Wiki

Posted on July 23, 2020 By Robert Payne

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

Bioinformatics Wiki

Posted on July 23, 2020 By Robert Payne

Bioinformatics Wiki

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

IHE Wiki

Posted on July 23, 2020 By Robert Payne

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

HL7 Wiki

Posted on July 23, 2020 By Robert Payne

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

Clinfowiki

Posted on July 23, 2020 By Robert Payne

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

OpenWetWare

Posted on July 23, 2020 By Robert Payne

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

Statistical Genetics Wiki

Posted on July 23, 2020 By Robert Payne

Statistical Genetics Wiki

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

Cloud-Standards.org

Posted on July 23, 2020 By Robert Payne

Cloud-Standards.org

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

WikiBooks

Posted on July 23, 2020 By Robert Payne

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

LIMSwiki

Posted on July 23, 2020 By Robert Payne

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

Wikiversity

Posted on July 23, 2020 By Robert Payne

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

Wikipedia

Posted on July 23, 2020 By Robert Payne

The Legendre differential equation is the second order ordinary differential equation (ODE) which can be written as:

(1-x^{2})d^{2}y/dx^{2}-2xdy/dx+l(l+1)y=0\,

which when rearranged to:

{d \over dx}[(1-x^{2}){dy \over dx}]+l(l+1)y=0\,

is called Legendre differential equation of order

l

, where the quantity

l

is a constant.

Ly=0\,

where $L\,$ is the Legendre operator:

L={d \over dx}[(1-x^{2}){d \over dx}]+l(l+1)\,

In principle, $l$ can be any number, but it is usually an integer.

…

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