1.
已知曲线\(C\)的方程为\({y}^{2}=4x \),过原点作斜率为\(l\)的直线和曲线\(C\)相交,另一个交点记为\({P}_{1} \),过\({P}_{1} \)作斜率为\(2\)的直线与曲线\(C\)相交,另一个交点记为\({P}_{2} \),过\({P}_{2} \)作斜率为\(4\)的直线与曲线\(C\)相交,另一个交点记为\({P}_{3} \),\(……\),如此下去,一般地,过点\({P}_{n} \)作斜率为\({2}^{n} \)的直线与曲线\(C\)相交,另一个交点记为\({P}_{n+1} \),设点\({P}_{n}\left({x}_{n},{y}_{n}\right) (n∈{N}^{*} ).\)
\((1)\)指出\({y}_{1} \),并求\({y}_{n+1} \)与\({y}_{n} \)的关系式\((n∈{N}^{*} )\);
\((2)\)求\(\left\{{y}_{2n-1}\right\} (n∈{N}^{*} )\)的通项公式,并指出点列\({P}_{1} \),\({P}_{3} \),\(…\),\({P}_{2n+1} \),\(…\)向哪一点无限接近?说明理由;
\((3)\)令\({a}_{n}={y}_{2n+1}-{y}_{2n-1} \),数列\(\left\{{a}_{n}\right\} \)的前\(n\)项和为\({S}_{n} \),设\({b}_{n}= \dfrac{1}{ \dfrac{3}{4}{S}_{n}+1} \),求所有可能的乘积\({b}_{i}·{b}_{j}\left(1\leqslant i\leqslant j\leqslant n\right) \)的和.