I.已知数列\(\{a_{n}\}\)的前\(n\)项和为\(S_{n}\),把满足条件\(a_{n+1}\leqslant S_{n}(n∈N^{*})\)的所有数列\(\{a_{n}\}\)构成的集合记为\(M\).
\((1)\)若数列\(\{a_{n}\}\)通项为\(a_{n}= \dfrac{1}{2^{n}}\),求证:\(\{a_{n}\}∈M\);
\((2)\)若数列\(\{a_{n}\}\)是等差数列,且\(\{a_{n}+n\}∈M\),求公差\(d\)的值;
\((3)\)若数列\(\{a\)\({\,\!}_{n}\)\(\}\)的各项均为正数,且\(\{a\)\({\,\!}_{n}\)\(\}∈M\),数列\(\{\)\( \dfrac{4^{n}}{a_{n}}\)\(\}\)中是否存在无穷多项依次成等差数列,若存在,给出一个数列\(\{a\)\({\,\!}_{n}\)\(\}\)的通项;若不存在,说明理由.
\(II.\)已知矩阵\(A=\left[ \begin{matrix} 1 & a \\ -1 & b \\ \end{matrix} \right]\)的一个特征值为\(2\),其对应的一个特征向量为\(\alpha =\left[ \begin{matrix} 2 \\ 1 \\ \end{matrix} \right].\)矩阵\({{B}^{-1}}=\left[ \begin{matrix} 1 & a \\ 0 & b \\ \end{matrix} \right]\),求\({{(AB)}^{-1}}\).
\(III.\)在极坐标系中,设直线\(\theta =\dfrac{{ }\!\!\pi\!\!{ }}{{3}}\)与曲线\({{\rho }^{2}}-10\rho \cos \theta +4=0\)相交于\(A\),\(B\)两点,求线段\(AB\) 中点的极坐标\(.\)
\(IV.\)、如图,四棱锥\(PABCD\)的底面\(ABCD\)是菱形,\(AC\)与\(BD\)交于点\(O\),\(OP⊥\)底面\(ABCD\),\(M\)为\(PC\)的中点,\(AC=4\),\(BD=2\),\(OP=4\).
\((1)\) 求直线\(AP\)与\(BM\)所成角的余弦值; \((2)\) 求平面\(ABM\)与平面\(PAC\)所成锐二面角的余弦值.
\(V.\)已知\(F_{n}(x)=\sum_{k=0}^{n}[(-1)^{k}C\rlap{_{n}}{^{k}}f_{k}(x)](n∈N^{*}).\)
\((1)\)若\(f_{k}(x)=x^{k}\),求\(F_{2\;015}(2)\)的值;
\((2)\)若\(f_{k}(x)= \dfrac{x}{x+k}(x∉\{0,-1,…,-n\})\),求证:\(F_{n}(x)= \dfrac{n!}{(x+1)(x+2)…(x+n)}\).