Related Searches
Definitions

# Hydrogen spectral series

In physics, the spectral lines of hydrogen correspond to particular jumps of the electron between energy levels. The simplest model of the hydrogen atom is given by the Bohr model. When an electron jumps from a higher energy to a lower, a photon of a specific wavelength is emitted according to the Rydberg formula:

$\left\{1 over lambda\right\} = R left\left(\left\{1 over \left(n\text{'}\right)^2\right\} - \left\{1 over n^2\right\} right\right) qquad left\left(R = 10.972 times 10^6 mbox\left\{m\right\}^\left\{-1\right\} right\right)$
where n is the initial energy level and n' is the final energy level, and R is the Rydberg constant.

The spectral lines are grouped into series according to n' :

`  `
`     `
`     `
`     `
`     `
`     `
`     `
`     `

#### ` `

1Lyman series
`  `
2Balmer series
`  `
3Paschen series
`  `
4Brackett series
`  `
5Pfund series
`  `
6Humphreys series

`  `
`     `
`     `
`     `
`     `
`     `
`     `
`     `
`     `

## ` `

#### ` `

21223656
`  `
31034486
`  `
497.25434
`  `
594.96410
`  `
693.77397
`  `
$infty$91.1$infty$365

`  `
`     `
`     `
`     `
`     `
`     `
`     `
`     `
`     `

## ` `

#### ` `

4187054050
`  `
5128062630
`  `
6109072170
`  `
7100081940
`  `
895491820
`  `
$infty$820$infty$1460

`  `
`     `
`     `
`     `
`     `
`     `
`     `
`     `
`     `

## ` `

#### ` `

67460712372
`  `
7465087503
`  `
83740105129
`  `
93300114673
`  `
103040134171
`  `
$infty$2280$infty$3282

## Extension

Hydrogen is the element with the simplest-to-analyze emission spectrum. All other atoms possess at least two electrons in their unionized form and the interactions between these electrons makes analysis of the spectrum by such simple methods as described here impractical. The deduction of the Rydberg formula was a major step in physics, but it was long before an extension to the spectra of other elements could be accomplished.