当??x??61时,AC??0,4?,BD???8,0?,S四边形ABCD?|AC||BD|?16.
2?y?3所以四边形ABCD的面积为16. 17.解:(1)f?x??4tanxcosxcos(x??)?3?4sinxcos(x?)?3 33?13?4sinx(cosx?sinx)?3?2sinxcosx?23sin2x?3 22??sin2x?3(1?cos2x)?3?sin2x?3cos2x?2sin(2x?).
32???. 所以,f?x?的最小正周期T?2???(2)令z?2x?,函数y?2sinz的单调递增区间是[??2k?,?2k?],k?Z.
322????5??k??x??k?,k?Z. 由??2k??2x???2k?,得?2321212???5????k??x??k?,k?Z},易知A?B?[?,]. 设A?[?,],B?{x|?441212124????所以,当x?[?,]时,f?x?在区间[?,]上单调递增
44124f?x?最大值为-2,最小值为1.
18.解:(1)由题知在ACD中,?CAD?由正弦定理知
?3,?CDA??,AC?10,?ACD?2???. 3AD10, ??2?sinsin(??)sin?332?10sin(??)533即CD?,AD?, sin?sin??所以S?4aAD?8aBD?12aCD??12CD?4AD?80?a
CD603?40sin(?[sin?3?cos??2??[203]a?60a(???).
sin?331?3cos??a, (2)S?203sin2?1令S?0得cos??
311当cos??时,S?0;当cos??时,S?0,
332???)3]a?80a
所以当cos??1时,S取得最小值, 3此时sin??2253cos??5sin?56,AD?, ?5?3sin?420?56km时,运输成本S最小. 4所以中转点C距A处
19.(1)当a?0时,g(x)?(2x?2)2?4, 因为2?0,
所以g?x??g?2???4,g?x?的值域为[?4,??) (2)若x?0,a?R
若x?(0,2]时,|f(x)|?2可化为?2?x?ax?1?2 即x?1?ax?x?3,所以x?因为y?x?222x13?a?x? xx113在(0,2]为递增函数,所以函数y?x?的最大值为, xx2因为x?333) ?2x??23(当且仅当x?,即x?3取“?”
xxx所以a的取值范围是a?[,23]. (3)因为h?x???32??f?x?,x?axx?a,当x?a时,h?x??4?4?2,
??g?x?,x?a2xa令t?2,t?(0,2],则p(t)?t?a当x?a时,即2?4224t?(t?)?a, aa2242a,p(t)?[4?4,0); a22a2a2当x?a时,h?x??x?ax?1,即h?x??(x?)?1?,
24aa2,??). 因为a?0,所以?a,h(x)?[1?2471a2157???, 若4?4??,a??,此时1?224162aa27??,即a??32,此时4a?4?4?3若1?4220.解:(1)因为f??x??2ax?271?4??,所以实数a??.
2211,所以f?x?在点(e,f(e))处的切线的斜率为k?2ae?, xe12所以f?x?在点(e,f(e))处的切线方程为y?(2ae?)(x?e)?ae?1,
e11ee1整理得y??(2ae?)(x?),所以切线恒过定点(,).
2e22212(2)令p(x)?f(x)?f2(x)?(a?)x?2ax?lnx?0,对x??1,???恒成立,
21(2a?1)x2?2ax?1(x?1)[(2a?1)x?1]?(*) 因为p?(x)?(2a?1)x?2a??xxx1, 2a?111①当?a?1时,有x2?x1?1,即?a?1时,在(x2,??)上有p??x??0,
22令p??x??0,得极值点x1?1,x2?此时p?x?在区间(x2,??)上是增函数,并且在该区间上有p(x)?(p(x2),??),不合题意;
②当a?1时,有x2?x1?1,同理可知,p?x?在区间?1,???上,有p(x)?(p(1),??),也不合题意; ③当a?1时,有2a?1?0,此时在区间?1,???上恒有p??x??0, 2从而p?x?在区间?1,???上是减函数;
要使p?x??0在此区间上恒成立,只须满足p?1???a?所以?11?0?a??, 2211?a?. 2211,]. 22综上可知a的范围是[?(利用参数分离得正确答案扣2分)
21245124时,f1?x??x?x?lnx,f2?x??x?x 363923125记y?f2?x??f1?x??x?lnx,x??1,???.
39(3)当a?2x56x2?5???0, 因为y??39x9xy??0,x?5 6