18/07/23 13:50:22.60 4rZpnird.net
>>194
qr = (1/8)√{(8pp-18)(8pp-2)},pp = (nn+2n+3)/8,
より
K(n) = (8/3)pqr
= (1/3)p√{(8pp-18)(8pp-2)}
= (1/3)(n+1)√{(nn+2n-15)(nn+2n+3)/8},
>>205 から
R = OH = p√{(4pp-9)/3(4pp-3)}
= √{(nn+2n-15)(nn+2n+3)/24(nn+2n-3)},
或いは、
3辺の長さが n,n+1,n+2 である三角形Tn の面積は、ヘロンの公式から
Tn = (1/4)(n+1)√{3(nn+2n-3)},
R = OH = (3/4)K(n)/Tn
= √{(nn+2n-15)(nn+2n+3)/24(nn+2n-3)},