Answer to Question #168071 in Quantum Mechanics for dheeraj

The rest mass energy of electron is "E_0 = m_e c^2." The de-Broglie wavelength is

"\\lambda_B = \\dfrac{h}{p_p} ."

The momentum of proton is "p_p=m_p v ," the kinetic energy is "E_k=\\dfrac{m_pv^2}{2}," so "m_pv = m_p \\cdot \\sqrt{\\dfrac{2E_k}{m_p}} = \\sqrt{2m_pE_k} = \\sqrt{2m_p m_ec^2} = \\sqrt{2m_p m_e}c ." Therefore, the de-Broglie wavelength is "\\lambda_B = \\dfrac{h}{\\sqrt{2m_p m_e}c} = \\dfrac{6.63\\cdot10^{-34}\\,\\mathrm{J\\cdot s}}{\\sqrt{2\\cdot 1836\\cdot (9.1\\cdot 10^{-31}\\,\\mathrm{kg})^2}\\cdot 3\\cdot10^8\\,\\mathrm{m\/s}} = 4\\cdot10^{-14}\\,\\mathrm{m}."