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JBach · Answer 1 · 2022-09-24T14:12:36+0000

Answer:

$\mathbf{\lambda \simeq 3.039 * 10^(-8) \ m}$

Step-by-step explanation:

For a hydrogen-like atom, the spectral line wavelength can be computed by using the formula:

$\bar v = Z^2 R_H \Big((1)/(n_f^2)-(1)/(n_i^2)\Big)$

where:

emitted radiation of the wavenumber
$\bar v$ = ???

atomic no of helium Z = 2

Rydberg's constant
$R_H = 1.097*10^7 \ m^(-1)$

the initial energy of the principal quantum
n_1 = 2

Now, the emitted radiation of the wavenumber can be computed as:

$\bar v = (2)^2 (1.097*10^7 \ m^(-1) ) \Big((1)/(1^2)-(1)/(2^2)\Big)$

$\bar v = 3.291 * 10^ 7/m$

Now, the wavelength for the transition can be computed by using the relation between the wavelength λ and the emitted radiation of the wavenumber
$\bar v$ , which is:

$\bar v = (1)/(\lambda)$

$\lambda = (1)/(\bar v)$

$\lambda = (1)/(3.291 * 10^(7))* (m)/(1)$

$\mathbf{\lambda =3.03859 * 10^(-8) \ m}$

$\mathbf{\lambda \simeq 3.039 * 10^(-8) \ m}$

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