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            • 1.
              已知等差数列\(\{a_{n}\}\)满足:\(a_{2}=5\),\(a_{4}+a_{6}=22\),\(\{a_{n}\}\)的前\(n\)项和为\(S_{n}\)
              \((1)\)求\(a_{n}\)及\(S_{n}\);
              \((2)\)令\(b_{n}= \dfrac {1}{a_{n}^{2}-1}(n∈N^{*})\),求数列\(\{b_{n}\}\)的前\(n\)项和\(T_{n}\).
              难度:较易
              解析 收藏 试题篮
            • 2.
              已知正项等比数列\(\{a_{n}\}\)满足\(\log _{ \frac {1}{2}}(a_{1}a_{2}a_{3}a_{4}a_{5})=0\),且\(a_{6}= \dfrac {1}{8}\),则数列\(\{a_{n}\}\)的前\(9\)项和为\((\)  \()\)
              A.\(7 \dfrac {31}{32}\)
              B.\(8 \dfrac {31}{32}\)
              C.\(7 \dfrac {63}{64}\)
              D.\(8 \dfrac {63}{64}\)
              难度:较易
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            • 3.
              已知公差不为零的等差数列\(\{a_{n}\}\)的前\(n\)项和为\(S_{n}\),若\(S_{10}=110\),且\(a_{1}\),\(a_{2}\),\(a_{4}\)成等比数列.
              \((1)\)求数列\(\{a_{n}\}\)的通项公式;
              \((2)\)若\(b_{n}= \dfrac {1}{(a_{n}-1)(a_{n}+1)}\),求数列\(\{b_{n}\}\)的前\(n\)项和\(T_{n}\).
              难度:较易
              解析 收藏 试题篮
            • 4.
              已知数列\(\{a_{n}\}\)满足\(a_{n+2}-a_{n+1}=a_{n+1}-a_{n}\;(n∈N^{*})\),且\(a_{3}+a_{7}=20\),\(a_{2}+a_{5}=14\).
              \((1)\)求\(\{a_{n}\}\)的通项公式;
              \((2)\)设\(b_{n}= \dfrac {1}{(a_{n}-1)\cdot (a_{n}+1)}\),数列\(\{b_{n}\}\)的前\(n\)项和为\(T_{n}\),求证:\(T_{n} < \dfrac {1}{2}\).
              难度:较易
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            • 5.
              已知数列\(\{a_{n}\}\)的前\(n\)项和\(S_{n}\)满足:\(S_{n}=2(a_{n}-1)\),数列\(\{b_{n}\}\)满足:对任意\(n∈N*\)有\(a_{1}b_{1}+a_{2}b_{2}+…+a_{n}b_{n}=(n-1)⋅2^{n+1}+2\).
              \((1)\)求数列\(\{a_{n}\}\)与数列\(\{b_{n}\}\)的通项公式;
              \((2)\)记\(c_{n}= \dfrac {b_{n}}{a_{n}}\),数列\(\{c_{n}\}\)的前\(n\)项和为\(T_{n}\),证明:当\(n\geqslant 6\)时,\(n|T_{n}-2| < 1\).
              难度:较易
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            • 6.
              已知等差数列\(\{a_{n}\}\)中,\(a_{7}=9\),\(S_{7}=42\)
              \((1)\)求\(a_{15}\)与\(S_{20}\)
              \((2)\)数列\(\{c_{n}\}\)中\(c_{n}=2^{n}a_{n}\),求数列\(\{c_{n}\}\)的前\(n\)项和\(T_{n}\).
              难度:较易
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            • 7.
              已知数列\(\{a_{n}\}\)的前\(n\)项和为\(S_{n}\),若\(S_{n}=n^{2}+5n\).
              \((1)\)证明数列\(\{a_{n}\}\)是等差数列;
              \((2)\)求数列\(\{ \dfrac {1}{a_{n}\cdot a_{n+1}}\}\)的前\(n\)项和\(T_{n}\).
              难度:较易
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            • 8.
              已知等差数列\(\{a_{n}\}\)的前\(n\)项和为\(s_{n}\),且满足\(a_{3}=6\),\(S_{11}=132\)
              \((1)\)求\(\{a_{n}\}\)的通项公式;
              \((2)\)求数列\(\{ \dfrac {1}{S_{n}}\}\)的前\(n\)项和\(T_{n}\).
              难度:较易
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            • 9.
              在等差数列\(\{a_{n}\}\)中,\(a_{2}=4\),\(a_{4}+a_{7}=15\).
              \((1)\)求数列\(\{a_{n}\}\)的通项公式;
              \((2)\)设\(b_{n}=2^{a_{n}-2}\),求\(b_{1}+b_{2}+b_{3}+…+b_{10}\)的值.
              难度:较易
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            • 10.
              等差数列\(\{a_{n}\}\)中,\(a_{2}=5\),\(a_{1}+a_{4}=12\),等比数列\(\{b_{n}\}\)的各项均为正数,且满足\(b_{n}b_{n+1}=2\;^{a_{n}}\)
              \((\)Ⅰ\()\)求数列\(\{a_{n}\}\)的通项公式及数列\(\{b_{n}\}\)的公比\(q\)
              \((\)Ⅱ\()\)求数列\(\{a_{n}+b_{n}\}\)的前\(n\)项和\(S_{n}\).
              难度:较易
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