(1)将点代入到函数解析式中即可;
(2)比较代数式大小时,可以用作差的方法.
【解析】
解法一:
(Ⅰ)由已知得an+1=an+1、即an+1-an=1,又a1=1,
所以数列{an}是以1为首项,公差为1的等差数列.
故an=1+(a-1)×1=n.
(Ⅱ)由(Ⅰ)知:an=n从而bn+1-bn=2n.
bn=(bn-bn-1)+(bn-1-bn-2)++(b2-b1)+b1
=2n-1+2n-2++2+1
=
∵bn•bn+2-bn+12=(2n-1)(2n+2-1)-(2n+1-1)2
=(22n+2-2n-2n+2+1)-(22n+2-2•2n+1+1)
=-2n<0
∴bn•bn+2<bn+12
解法二:
(Ⅰ)同解法一.
(Ⅱ)∵b2=1
bn•bn+2-bn+12=(bn+1-2n)(bn+1+2n+1)-bn+12
=2n+1•bn+1-2n•bn+1-2n•2n+1
=2n(bn+1-2n+1)
=2n(bn+2n-2n+1)
=2n(bn-2n)
=…
=2n(b1-2)
=-2n<0
∴bn•bn+2<bn+12
)(n∈N*)在函数y=x2+1的图象上.
,求证:bn•bn+2<b2n+1.
(x>0),观察:
,
,
,
,
)cosx的最小值 .
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,那么当该棱锥的体积最大时,它的高为( )