\((1)\)计算:\({{(3-2\sqrt{3})}^{2}}={ }\!\!\_\!\!{ }\!\!\_\!\!{ }\!\!\_\!\!{ }\!\!\_\!\!{ }\!\!\_\!\!{ }\!\!\_\!\!{ }\!\!\_\!\!{ }\!\!\_\!\!{ }\).
\((2)\)若\(a\)、\(b\)、\(c\)为三角形的三边,且\(a\)、\(b\)满足\(\sqrt{a-10}+{{(b-2)}^{2}}=0\),第三边\(c\)为偶数,则\(c=\)________.
\((3)\)已知\(x=-1\)是一元二次方程\(x^{2}+ax+b=0\)的一个根,则\(a^{2}-2ab+b^{2}\)的值为________.
\((4)\)若矩形的对角线长为\(8cm\),两条对角线的一个交角为\(60^{\circ}\),则矩形的面积为________\(cm^{2}\).
\((5)\)如图,四边形\(ABCD\)是菱形\(.\)对角线\(AC=8cm\),\(DB=6cm\),\(DH⊥AB\)与点\(H.\)则\(DH=\)________\(cm\).
\((6)\)一元二次方程\((2x+1)^{2}-81=0\)的根是________.
\((7)\)如图,正方形\(ABCD\)的边长为\(3\),点\(E\)在边\(AB\)上,且\(BE=1.\)若点\(P\)在对角线\(BD\)上移动,则\(PA+PE\)的最小值是________.
\((8)\)观察下列各式:\(①\sqrt{1+\dfrac{1}{3}}=2\sqrt{\dfrac{1}{3}}\),\(②\sqrt{2+\dfrac{1}{4}}=3\sqrt{\dfrac{1}{4}}\),\(③\sqrt{3+\dfrac{1}{5}}=4\sqrt{\dfrac{1}{5}}\),\(…\),根据你所发现的规律写出第\(n(n\geqslant 1)\)个等式来:________.