<br><font size="3">Dear all<br>&nbsp; I have two question in my calculation:<br>&nbsp; The first one, I have a problem in calculating the hyperfine constants A, my results are 10 <br>times larger than the experiment, the A is measured in Koe/muB in experiment, but in our <br>calculation the unit of A is KG/muB. we don not konw the magnetic permeability uŁ¬<br>How to solve this problem? thank you.<br><br>&nbsp; The second one, I want to deduce the&nbsp; formula</font> <font size="3">in the procedure</font>:<br>&nbsp;<img src="data:image/png;base64,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" alt=""><br><font size="3">--&gt;&gt;<font color="#0000FF"> Bc (atom, elc)=524.3[hyper f (atom,elc,1)-hyper f(atom,elc,2)]</font></font><font color="#0000FF">,</font> <font size="3">How do we justify this formula? <br>for my calculation, I get the coefficient is not 524.3, it is 520.3. Could anyone tell me the method?<br>thank you very much!</font><br><br><font size="3">Best wishes<br></font><br><br><br><span></span><br><br><br>