∵B和A关于原点对称
∴B也在椭圆上
设右焦点为F′
根据椭圆定义：|AF|+|AF′|=2a
又∵|BF|=|AF′|∴|AF|+|BF|=2a …①
O是Rt△ABF的斜边中点,且|OF|=c,∴|AB|=2c
又|AF|=2csinθ …②
|BF|=2ccosθ …③
②③代入①2csinθ+2ccosθ=2a
∴ c/a= 1/(sinθ+cosθ)
即e= 1/(sinθ+cosθ)= 1/[√2(sin(θ+π/4))
∵θ∈[ π/12,π/4],
∴ π/3≤θ+π/4≤ π/2
∴ √3/2≤sin（θ+ π/4）≤1
√6/2≤√2(sin(θ+π/4) ≤√2.
∴ √2/2≤e≤ √6/3.