【答案】(1)證明見(jiàn)解析;(2)證明見(jiàn)解析���;(3)15°����,24°�����;(4)是�����;(5)
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【解析】
試題分析:(1)先由旋轉(zhuǎn)的性質(zhì)���,再判斷出△APD≌△AOD',最后用旋轉(zhuǎn)角計(jì)算即可�;
(2)先判斷出Rt△AEM≌Rt△ABN,在判斷出Rt△APM≌Rt△AON 即可���;
(3)先判斷出△AD′O≌△ABO����,再利用正方形,正五邊形的性質(zhì)和旋轉(zhuǎn)的性質(zhì)�����,計(jì)算即可���;
(4)先判斷出△APF≌△AE′F′��,再用旋轉(zhuǎn)角為60°����,從而得出△PAO是等邊三角形��;
(5)用(3)的方法求出正n邊形的�,“疊弦角”的度數(shù).
試題解析:(1)如圖1,∵四ABCD是正方形�,由旋轉(zhuǎn)知:AD=AD',∠D=∠D'=90°�,∠DAD'=∠OAP=60°,∴∠DAP=∠D'AO��,∴△APD≌△AOD'��,∴AP=AO,∵∠OAP=60°�,∴△AOP是等邊三角形;
(2)如圖2��,作AM⊥DE于M���,作AN⊥CB于N.∵五ABCDE是正五邊形�,由旋轉(zhuǎn)知:AE=AE'�,∠E=∠E'=108°,∠EAE'=∠OAP=60°�����,∴∠EAP=∠E'AO����,∴△APE≌△AOE'(ASA),∴∠OAE'=∠PAE.
在Rt△AEM和Rt△ABN中�����,∠AEM=∠ABN=72°����,AE=AB,∴Rt△AEM≌Rt△ABN (AAS)���,∴∠EAM=∠BAN���,AM=AN.在Rt△APM和Rt△AON中,AP=AO�����,AM=AN��,∴Rt△APM≌Rt△AON (HL)�����,∴∠PAM=∠OAN�,∴∠PAE=∠OAB,∴∠OAE'=∠OAB (等量代換).
(3)由(1)有�����,△APD≌△AOD'���,∴∠DAP=∠D′AO���,在△AD′O和△ABO中���,∵AD′=AB,AO=AO����,∴△AD′O≌△ABO,∴∠D′AO=∠BAO�,由旋轉(zhuǎn)得,∠DAD′=60°�,∵∠DAB=90°����,∴∠D′AB=∠DAB﹣∠DAD′=30°,∴∠D′AD=
∠D′AB=15°����,同理可得,∠E′AO=24°��,故答案為:15°���,24°.
(4)如圖3�,∵六邊形ABCDEF和六邊形A′B′C′E′F′是正六邊形��,∴∠F=F′=120°����,由旋轉(zhuǎn)得,AF=AF′����,EF=E′F′,∴△APF≌△AE′F′�,∴∠PAF=∠E′AF′,由旋轉(zhuǎn)得����,∠FAF′=60°,AP=AO
∴∠PAO=∠FAO=60°�,∴△PAO是等邊三角形.
故答案為:是.
(5)同(3)的方法得,∠OAB=[(n﹣2)×180°÷n﹣60°]÷2=.
故答案:.
