如图\((\)一\()\),\( \overset{ .}{OP}\)为一条拉直的细线,\(A\)、\(B\)两点在\( \overset{ .}{OP}\)上,且\( \overset{ .}{OA}\):\( \overset{ .}{AP}=1\):\(3\),\( \overset{ .}{OB}\):\( \overset{ .}{BP}=3\):\(5.\)若先固定\(B\)点,将\( \overset{ .}{OB}\)折向\( \overset{ .}{BP}\),使得\( \overset{ .}{OB}\)重迭在\( \overset{ .}{BP}\)上,如图\((\)二\()\),再从图\((\)二\()\) 的\(A\)点及与\(A\)点重迭处一起剪开,使得细线分成三段,则此三段细线由小到大的长度比为何?\((\) \()\)