已知直角梯形ABCD中,AB∥CD,
AB⊥BC,AB=1,BC=2,CD=1+,过A作AE⊥CD,垂足为E,G,F分别为AD,CE的中点,现将△ADE沿AE折叠,使得DE⊥EC.
(Ⅰ)求证:BC⊥平面CDE;
(Ⅱ)求证:FG∥平面BCD;
(Ⅲ)在线段AE上找一点R,使得面BDR⊥面DCB,并说明理由.
(I)如下图所示:由已知得:DE⊥AE,DE⊥EC∴DE⊥面ABCE.∴DE⊥BC,又BC⊥CE,∴BC⊥面DCE(II)取AB中点H,连接GH,FH,∴GH∥BD,FH∥BC,∴GH∥面BCD,FH∥面BCD.∴面FHG∥面BCD,∴GF∥面BCD.(III)分析可...