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,9.9,圆锥曲线综合问题,第,2,课时范围、最值问题,1/69,课时作业,题型分类深度剖析,内容索引,2/69,题型分类深度剖析,3/69,题型一范围问题,解答,(1),求直线,FM,斜率;,几何画板展示,4/69,又由,a,2,b,2,c,2,,可得,a,2,3,c,2,,,b,2,2,c,2,.,设直线,FM,斜率为,k,(,k,0),,,F,(,c,0),,则直线,FM,方程为,y,k,(,x,c,).,5/69,(2),求椭圆方程;,解答,6/69,解答,7/69,设点,P,坐标为,(,x,,,y,),,直线,FP,斜率为,t,,,整理得,2,x,2,3,t,2,(,x,1),2,6,,,8/69,当,x,(,1,0),时,有,y,t,(,x,1),0,,,9/69,10/69,处理圆锥曲线中取值范围问题应考虑五个方面,(1),利用圆锥曲线几何性质或判别式结构不等关系,从而确定参数取值范围,.,(2),利用已知参数范围,求新参数范围,解这类问题关键是建立两个参数之间等量关系,.,(3),利用隐含不等关系建立不等式,从而求出参数取值范围,.,(4),利用已知不等关系结构不等式,从而求出参数取值范围,.,(5),利用求函数值域方法将待求量表示为其它变量函数,求其值域,从而确定参数取值范围,.,思维升华,11/69,解答,12/69,所以点,F,1,坐标为,(,2,0),,点,F,2,坐标为,(2,0),,,13/69,(2),若,2,,求椭圆离心率,e,取值范围,.,解答,14/69,设点,P,坐标为,(,x,0,,,y,0,),,点,M,坐标为,(,x,M,,,y,M,),,,15/69,又椭圆离心率,e,(0,1),,,16/69,题型二最值问题,命题点,1,利用三角函数有界性求最值,例,2,(,徐州模拟,),过抛物线,y,2,4,x,焦点,F,直线交抛物线于,A,,,B,两点,点,O,是坐标原点,则,AF,BF,最小值是,_.,答案,解析,4,几何画板展示,17/69,命题点,2,数形结合利用几何性质求最值,例,3,(,江苏,),在平面直角坐标系,xOy,中,,P,为双曲线,x,2,y,2,1,右支上一个动点,.,若点,P,到直线,x,y,1,0,距离大于,c,恒成立,则实数,c,最大值为,_.,答案,解析,18/69,双曲线,x,2,y,2,1,渐近线为,x,y,0,,,直线,x,y,1,0,与渐近线,x,y,0,平行,,由点,P,到直线,x,y,1,0,距离大于,c,恒成立,,19/69,命题点,3,转化为函数利用基本不等式或二次函数求最值,(1),求椭圆,C,方程,.,解答,20/69,设椭圆半焦距为,c,.,21/69,(2),过动点,M,(0,,,m,)(,m,0),直线交,x,轴于点,N,,交,C,于点,A,,,P,(,P,在第一象限,),,且,M,是线段,PN,中点,.,过点,P,作,x,轴垂线交,C,于另一点,Q,,延长,QM,交,C,于点,B,.,证实,设,P,(,x,0,,,y,0,)(,x,0,0,,,y,0,0).,由,M,(0,,,m,),,可得,P,(,x,0,,,2,m,),,,Q,(,x,0,,,2,m,).,22/69,求直线,AB,斜率最小值,.,解答,23/69,设,A,(,x,1,,,y,1,),,,B,(,x,2,,,y,2,).,由,知直线,PA,方程为,y,kx,m,,则,直线,QB,方程为,y,3,kx,m,.,整理得,(2,k,2,1),x,2,4,mkx,2,m,2,4,0,,,24/69,25/69,由,m,0,,,x,0,0,,可知,k,0,,,26/69,处理圆锥曲线最值问题求解方法,圆锥曲线中最值问题类型较多,解法灵活多变,但总体上主要有两种方法:一是利用几何法,即经过利用曲线定义、几何性质以及平面几何中定理、性质等进行求解;二是利用代数法,即把要求最值几何量或代数表示式表示为某个,(,些,),参数函数,(,解析式,),,然后利用函数方法、不等式方法等进行求解,.,思维升华,27/69,跟踪训练,2,(,扬州预测,),已知圆,(,x,a,),2,(,y,1,r,),2,r,2,(,r,0),过点,F,(0,1),,圆心,M,轨迹为,C,.,(1),求轨迹,C,方程;,依题意,由圆过定点,F,可知轨迹,C,方程为,x,2,4,y,.,解答,几何画板展示,28/69,(2),设,P,为直线,l,:,x,y,2,0,上点,过点,P,作曲线,C,两条切线,PA,,,PB,,当点,P,(,x,0,,,y,0,),为直线,l,上定点时,求直线,AB,方程;,解答,几何画板展示,29/69,同理可得切线,PB,方程为,x,2,x,2,y,2,y,2,0.,30/69,因为切线,PA,,,PB,均过点,P,(,x,0,,,y,0,),,,所以,x,1,x,0,2,y,0,2,y,1,0,,,x,2,x,0,2,y,0,2,y,2,0,,,所以,(,x,1,,,y,1,),,,(,x,2,,,y,2,),为方程,x,0,x,2,y,0,2,y,0,两组解,.,所以直线,AB,方程为,x,0,x,2,y,2,y,0,0.,31/69,(3),当点,P,在直线,l,上移动时,求,AF,BF,最小值,.,由抛物线定义可知,AF,y,1,1,,,BF,y,2,1,,,所以,AF,BF,(,y,1,1)(,y,2,1),y,1,y,2,(,y,1,y,2,),1,,,又点,P,(,x,0,,,y,0,),在直线,l,上,所以,x,0,y,0,2,,,解答,32/69,课时作业,33/69,1.(,昆明两区七校调研,),过抛物线,y,2,x,焦点,F,直线,l,交抛物线于,A,,,B,两点,且直线,l,倾斜角,,点,A,在,x,轴上方,则,FA,取值范围是,_.,答案,解析,1,2,3,4,5,6,7,8,9,34/69,1,2,3,4,5,6,7,8,9,35/69,答案,解析,1,2,3,4,5,6,7,8,9,36/69,求,MP,最小值能够转化为求,OP,最小值,,当,OP,取得最小值时,点,P,位置为双曲线顶点,(3,0),,而双曲线渐近线为,4,x,3,y,0,,,1,2,3,4,5,6,7,8,9,37/69,答案,解析,(1,3,1,2,3,4,5,6,7,8,9,38/69,由,P,是双曲线左支上任意一点及双曲线定义,,在,PF,1,F,2,中,,PF,1,PF,2,F,1,F,2,,,又,e,1,,所以,1,b,0),右顶点为,A,(1,0),,过,C,1,焦点且垂直长轴弦长为,1.,(1),求椭圆,C,1,方程;,解答,1,2,3,4,5,6,7,8,9,48/69,(2),设点,P,在抛物线,C,2,:,y,x,2,h,(,h,R,),上,,C,2,在点,P,处切线与,C,1,交于,M,,,N,两点,.,当线段,AP,中点与,MN,中点横坐标相等时,求,h,最小值,.,解答,1,2,3,4,5,6,7,8,9,49/69,如图,设,M,(,x,1,,,y,1,),,,N,(,x,2,,,y,2,),,,P,(,t,,,t,2,h,),,,直线,MN,方程为,y,2,tx,t,2,h,.,将上式代入椭圆,C,1,方程中,得,4,x,2,(2,tx,t,2,h,),2,4,0,,,即,4(1,t,2,),x,2,4,t,(,t,2,h,),x,(,t,2,h,),2,4,0.,因为直线,MN,与椭圆,C,1,有两个不一样交点,,所以,式中,1,16,t,4,2(,h,2),t,2,h,2,40.,设线段,MN,中点横坐标是,x,3,,,1,2,3,4,5,6,7,8,9,50/69,由题意,得,x,3,x,4,,,即,t,2,(1,h,),t,1,0.,由,式中,2,(1,h,),2,4,0,,得,h,1,或,h,3.,当,h,3,时,,h,20,,,4,h,2,b,0),离心率,e,,左顶点为,A,(,4,0),,过点,A,作斜率为,k,(,k,0),直线,l,交椭圆,C,于点,D,,交,y,轴于点,E,.,(1),求椭圆,C,标准方程;,解答,1,2,3,4,5,6,7,8,9,53/69,因为左顶点为,A,(,4,0),,,又因为,b,2,a,2,c,2,12,,,1,2,3,4,5,6,7,8,9,54/69,(2),已知,P,为,AD,中点,是否存在定点,Q,,对于任意,k,(,k,0),都有,OP,EQ,?若存在,求出点,Q,坐标;若不存在,请说明理由,.,解答,1,2,3,4,5,6,7,8,9,55/69,直线,l,方程为,y,k,(,x,4),,,化简,得,(,x,4),(4,k,2,3),x,16,k,2,12,0,,,1,2,3,4,5,6,7,8,9,56/69,因为,P,为,AD,中点,,直线,l,方程为,y,k,(,x,4),,令,x,0,,得点,E,坐标为,(0,4,k,).,假设存在定点,Q,(,m,,,n,)(,m,0),,使得,OP,EQ,,则,k,OP,k,EQ,1,,,1,2,3,4,5,6,7,8,9,57/69,所以定点,Q,坐标为,(,3,0).,1,2,3,4,5,6,7,8,9,58/69,解答,1,2,3,4,5,6,7,8,9,59/69,因为,OM,l,,所以,OM,方程可设为,y,kx,,,由,OM,l,,,1,2,3,4,5,6,7,8,9,60/69,1,2,3,4,5,6,7,8,9,61/69,(1),求,C,1,,,C,2,方程;,解答,1,2,3,4,5,6,7,8,9,62/69,1,2,3,4,5,6,7,8,9,63/69,解答,(2),过,F,1,作,C,1,不垂直于,y,轴弦,AB,,,M,为,AB,中点,当直线,OM,与,C,2,交于,P,,,Q,两点时,求四边形,APBQ,面积最小值,.,1,2,3,4,5,6,7,8,9,64/69,因为,AB,不垂直于,y,轴,且过点,F,1,(,1,0),,,故可设直线,AB,方程为,x,my,1.,易知此方程判别式大于,0.,设,A,(,x,1,,,y,1,),,,B,(,x,2,,,y,2,),,,则,y,1,,,y,2,是上述方程两个实根,,1,2,3,4,5,6,7,8,9,65/69,即,mx,2,y,0.,1,2,3,4,5,6,7,8,9,66/69,设点,A,到直线,PQ,距离为,d,,,则点,B,到直线,PQ,距离也为,d,,,因为点,A,,,B,在直线,mx,2,y,0,异侧,,所以,(,mx,1,2,y,1,)(,mx,2,2,y,2,)0,,,1,2,3,4,5,6,7,8,9,67/69,于是,|,mx,1,2,y,1,|,|,mx,2,2,y,2,|,|,mx,1,2,y,1,mx,2,2,y,2,|,,,1,2,3,4,5,6,7,8,9,68/69,而,02,m,2,2,,故当,m,0,时,,S,取得最小值,2.,总而言之,四边形,APBQ,面积最小值为,2.,1,2,3,4,5,6,7,8,9,69/69,
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