4??1?14?tan??1=3所以tan(??)???; 41?tan?tan?1?tan?1?4743tan??tan46(?)?1746sin??cos?6tan??13(2)由(1)知, tanα=-,所以==?.
433sin??2cos?3tan??23(?)?263?113sin2?x?1 ?sin(2?x?)? 2、解:y?(1?cos2?x)?22622?1?1?2?,所以??因为T?;y?sin(x?)?因为0?x??,所以2?2621??5? 故 ?1?y? ??x??2666a2?c2?b22ac?ac1?? 3、解:(I)?b?a?c由余弦定理得cosB?2ac2ac22?又b?(0,?)?0?B??3
1?sin2B(sinB?cosB)2???cosB?sinB?2sin(B?) (II)y?sinB?cosBsinB?cosB4?O?B?7???1?2sin(B?)?2 即函数的值域是(1,2]
3441247C72A?B?cos2C?得4cos2?cos2C? 4、解:(Ⅰ)∵A+B+C=180°由4sin22221?cosC7?(2cos2C?1)? 整理,得4cos2C?4cosC?1?0 ∴4?221解得:cosC? ∵0??C?180? ∴C=60°
2? ???B???(Ⅱ)由余弦定理得:c=a+b-2abcosC,即7=a+b-2ab
2∴7?(a?b)?3ab=25-3ab?ab?6 ∴S?ABC?22222
11333 absinC??6??22225、解:(1)f(x)?a?b?(cosx?sinx)(cosx?sinx)?2sinxcosx
?cos2x?sin2x?2sinxcosx?cos2x?sin2x ?2sin(2x?)
42??? 所以函数f(x)的最小正周期T?2????3??(2)当??x?, ???2x??,?1?2sin(2x?)?2 444444 ∴当2x???4??2,即x??8时,f(x)有最大值2;
当2x??4???4,即x???4时,f(x)有最小值-1
6、解:(I)∵(2a-c)cosB=bcosC,∴(2sinA-sinC)cosB=sinBcosC.
即2sinAcosB=sinBcosC+sinCcosB=sin(B+C)∵A+B+C=π,∴2sinAcosB=sinA.∵0
1?.∵0 (II)m?n=4ksinA+cos2A. =-2sinA+4ksinA+1,A∈(0, 2 2 22) 32 设sinA=t,则t∈(0,1],则m?n=-2t+4kt+1=-2(t-k)+1+2k,t∈(0,1]. ∵k>1,∴t=1时,m?n取最大值.依题意得,-2+4k+1=5,∴k=7、解:(I)由已知条件: 0?x?3. 2?2, 得: ??3xx3xx3xx3xxa?b?(cos?cos,sin?sin)?(cos?cos)2?(sin?sin)2 22222222 ?2?2cos2x?2sinx 3xx3xxcos?sinsin?2sinx?cos2x 22221232 ??2sinx?2sinx?1??2(sinx?)? 22?13因为:0?x?,所以:0?sinx?1;所以,只有当: x?时, fmax(x)? 222 (2)f(x)?2sinx?cosx?0 ,或x?1时,fmin(x)?1 8、解: ⑴sinx?0……1分,得x?k?(k?Z)所以f(x)的定义域为 ?x|x?R,x?k?,其中k?Z? 2sinxcosx?2sin2x?f(x)??sinx?cosx?2sin(x?), 42sinx因为x?k?(k?Z),所以f(x)的最大值M?2 ⑵由tan?2?1得tan??22tan?21?tan2?2?44……9分,因为?是第一象限角,所以sin??, 53cos?? 37,所以f(?)?sin??cos?? 55