【答案】60
【解析】分析:(1)根據(jù)∠BAM+∠BAN=180°���,∠BAM:∠BAN=2:1,即可得到∠BAN的度數(shù)�����;
(2)設(shè)A燈轉(zhuǎn)動(dòng)t秒,兩燈的光束互相平行��,分兩種情況進(jìn)行討論:當(dāng)0<t<90時(shí)�����,根據(jù)2t=1(30+t)���,可得 t=30�����;當(dāng)90<t<150時(shí)���,根據(jù)1(30+t)+(2t﹣180)=180,可得t=110����;
(3)設(shè)燈A射線轉(zhuǎn)動(dòng)時(shí)間為t秒,根據(jù)∠BAC=2t﹣120°���,∠BCD=120°﹣∠BCD=t﹣60°�,即可得出∠BAC:∠BCD=2:1,據(jù)此可得∠BAC和∠BCD關(guān)系不會(huì)變化.
詳解:(1)∵∠BAM+∠BAN=180°����,∠BAM:∠BAN=2:1,∴∠BAN=180°×
=60°.
故答案為:60���;
(2)設(shè)A燈轉(zhuǎn)動(dòng)t秒�,兩燈的光束互相平行��,
①當(dāng)0<t<90時(shí)��,如圖1.
∵PQ∥MN���,∴∠PBD=∠BDA.
∵AC∥BD��,∴∠CAM=∠BDA��,∴∠CAM=∠PBD
∴2t=1(30+t)���,解得 t=30;
②當(dāng)90<t<150時(shí)�,如圖2.
∵PQ∥MN,∴∠PBD+∠BDA=180°.
∵AC∥BD���,∴∠CAN=∠BDA
∴∠PBD+∠CAN=180°
∴1(30+t)+(2t﹣180)=180�����,解得 t=110.
綜上所述:當(dāng)t=30秒或110秒時(shí)����,兩燈的光束互相平行��;
(3)∠BAC和∠BCD關(guān)系不會(huì)變化.
理由:設(shè)燈A射線轉(zhuǎn)動(dòng)時(shí)間為t秒�,
∵∠CAN=180°﹣2t,∴∠BAC=60°﹣(180°﹣2t)=2t﹣120°.
又∵∠ABC=120°﹣t����,∴∠BCA=180°﹣∠ABC﹣∠BAC=180°﹣t,而∠ACD=120°��,∴∠BCD=120°﹣∠BCA=120°﹣(180°﹣t)=t﹣60°��,∴∠BAC:∠BCD=2:1��,即∠BAC=2∠BCD��,∴∠BAC和∠BCD關(guān)系不會(huì)變化.
