\(p^2 = m^2 + dn^2\)

Which positive integers $d$ guarantee that for every prime greater than $d$ dividing some number in the form $k^2+d$, we can write $p^2=m^2+dn^2$ for some positive integers $m,n$?

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\(p^2 = m^2 + dn^2\)

Which positive integers $d$ guarantee that for every prime greater than $d$ dividing some number in the form $k^2+d$, we can write $p^2=m^2+dn^2$ for some positive integers $m,n$?

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\(p^2 = m^2 + dn^2\)

Which positive integers $d$ guarantee that for every prime greater than $d$ dividing some number in the form $k^2+d$, we can write $p^2=m^2+dn^2$ for some positive integers $m,n$?

Click here to download the article, or read it here:

\(p^2 = m^2 + dn^2\)

Which positive integers $d$ guarantee that for every prime greater than $d$ dividing some number in the form $k^2+d$, we can write $p^2=m^2+dn^2$ for some positive integers $m,n$?

Click here to download the article, or read it here:

\(p^2 = m^2 + dn^2\)

Which positive integers $d$ guarantee that for every prime greater than $d$ dividing some number in the form $k^2+d$, we can write $p^2=m^2+dn^2$ for some positive integers $m,n$?

Click here to download the article, or read it here:

\(p^2 = m^2 + dn^2\)

Which positive integers $d$ guarantee that for every prime greater than $d$ dividing some number in the form $k^2+d$, we can write $p^2=m^2+dn^2$ for some positive integers $m,n$?

Click here to download the article, or read it here: