Express the de Broglie wavelength in terms of the kinetic energy of a relativistic particle. What is the kinetic energy for which the nonrelativistic formula leads to an error of less than 1% ?

Express the de Broglie wavelength in terms of the kinetic energy of a

1.	Express the de Broglie wavelength in terms of the kinetic energy of a relativistic particle. What is the kinetic energy for which the nonrelativistic formula leads to an error of less than 1% ?
Answer» Solution :The kinetic energy of a particle is `K=EPSILON-epsilon_(0)=SQRT(epsilon_(0)^(2)+p^(2)c^(2))-epsilon_(0)` from which we obtain for the momentum `p=1/csqrt(K(2epsilon_(0)+K))`, and for the de BROGLIE WAVE `lamda=h/p=(hc)/(sqrt(K(2epsilon_(0)+K)))` For `Kltlt epsilon _(0)`, we obtain the nonrelativistic APPROXIMATION: `lamda_("nonrel")=(hc)/(sqrt(2epsilon_(0)K))=h/(sqrt(2mK))` The error due to the substitution of the nonrelativistic formula for the relativistic one is `delta=(lamda_("nonrel")-lamda)/lamda=sqrt((2epsilon _(0)+K)/(2 epsilon_(0)))-1`, which gives `K/(2epsilon_(0))=(1+delta)^(2)-1~~1delta` Since `deltaltlt1`. Hence, the error introduced by the substitution of the nonrelativistic formula for the relativistic one will be less than `delt , ifKltlt4delta epsilon_(0)`.

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Express the de Broglie wavelength in terms of the kinetic energy of a relativistic particle. What is the kinetic energy for which the nonrelativistic formula leads to an error of less than 1% ?

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