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,5.4,平面向量,综合应用,1/69,基础知识自主学习,课时作业,题型分类深度剖析,内容索引,2/69,基础知识自主学习,3/69,1.,向量在平面几何中应用,(1),用向量处理常见平面几何问题技巧:,知识梳理,问题类型,所用知识,公式表示,线平行、点共线等问题,向量共线定理,a,b,,,其中,a,(,x,1,,,y,1,),,,b,(,x,2,,,y,2,),,,b,0,垂直问题,数量积运算性质,a,b,,,其中,a,(,x,1,,,y,1,),,,b,(,x,2,,,y,2,),,且,a,,,b,为非零向量,a,b,x,1,y,2,x,2,y,1,0,a,b,0,x,1,x,2,y,1,y,2,0,4/69,夹角问题,数量积定义,cos (为向量a,b夹角),其中,a,b为非零向量,长度问题,数量积定义,|,a,|,,,其中,a,(,x,,,y,),,,a,为非零向量,(2),用向量方法处理平面几何问题步骤:,平面几何问题,向量问题,处理向量问题,处理几何,问题,.,5/69,2.,向量与相关知识交汇,平面向量作为一个工具,常与函数,(,三角函数,),,解析几何结合,常经过向量线性运算与数量积,向量共线与垂直求解相关问题,.,6/69,知识拓展,2.,若直线,l,方程为,Ax,By,C,0,,则向量,(,A,,,B,),与直线,l,垂直,向量,(,B,,,A,),与直线,l,平行,.,几何画板展示,7/69,思索辨析,判断以下结论是否正确,(,请在括号中打,“”,或,“”,),(1),若,,则,A,,,B,,,C,三点共线,.(,),(2),若,a,b,0,,则,a,和,b,夹角为锐角;若,a,b,0,,则,a,和,b,夹角为钝角,.,(,),(3),在,ABC,中,若,0,,则,ABC,为钝角三角形,.(,),8/69,9/69,考点自测,1.,已知向量,a,(cos,,,sin,),,,b,(,,,1),,则,|2,a,b,|,最大值为,_.,答案,解析,4,设,a,与,b,夹角为,,,|2,a,b,|,2,4,a,2,4,ab,b,2,8,4|,a|b,|cos,8,8cos,,,0,,,,,cos,1,,,1,,,8,8cos,0,,,16,,即,|2,a,b,|,2,0,,,16,,,|2,a,b,|,0,,,4,.,|2,a,b,|,最大值为,4.,10/69,1,2,答案,解析,设,D,为,AC,中点,如图所表示,连结,OD,,,从而轻易得,AOB,与,AOC,面积之比为,1,2.,11/69,3.(,泰州模拟,),平面直角坐标系,xOy,中,若定点,A,(1,,,2),与动点,P,(,x,,,y,),满足,4,,则点,P,轨迹方程是,_(,填,“,内心,”,、,“,外心,”,、,“,重心,”,或,“,垂心,”,).,x,2,y,4,0,答案,解析,即,x,2,y,4.,12/69,答案,解析,几何画板展示,13/69,1,答案,解析,取,AB,中点,D,,连结,CD,、,CP,(,图略,).,14/69,题型分类深度剖析,15/69,题型一向量在平面几何中应用,例,1,(1),在平行四边形,ABCD,中,,AD,1,,,BAD,60,,,E,为,CD,中点,.,若,1,,则,AB,_.,答案,解析,16/69,在平行四边形,ABCD,中,,17/69,18/69,重心,答案,解析,所以点,P,轨迹必过,ABC,重心,.,19/69,引申探究,内心,答案,解析,20/69,所以点,P,轨迹必过,ABC,内心,.,21/69,向量与平面几何综合问题解法,(1),坐标法,把几何图形放在适当坐标系中,则相关点与向量就能够用坐标表示,这么就能进行对应代数运算和向量运算,从而使问题得到处理,.,(2),基向量法,适当选取一组基底,沟通向量之间联络,利用向量间关系结构关于未知量方程进行求解,.,思维升华,22/69,答案,解析,等边,23/69,24/69,25/69,5,答案,解析,26/69,以,D,为原点,分别以,DA,,,DC,所在直线为,x,轴、,y,轴建立如图所表示平面直角坐标系,,设,DC,a,,,DP,y,.,则,D,(0,,,0),,,A,(2,,,0),,,C,(0,,,a,),,,B,(1,,,a,),,,P,(0,,,y,),,,由点,P,是腰,DC,上动点,知,0,y,a,.,27/69,2,x,y,3,0,答案,解析,28/69,(4,k,)(,k,5),6,7,0,,,解得,k,2,或,k,11.,由,k,|,a,b,|,,又,|,a,b,|,2,a,2,b,2,2ab,3,,,1,2,3,4,5,6,7,8,9,10,11,12,13,14,56/69,2,答案,解析,1,2,3,4,5,6,7,8,9,10,11,12,13,14,57/69,答案,解析,1,2,3,4,5,6,7,8,9,10,11,12,13,14,58/69,方法一建立如图所表示平面直角坐标系,则,A,(0,,,0),,,B,(4,,,0),,,D,(0,,,4),,,C,(1,,,4).,又点,P,在直线,BC,上,即,3,n,4,m,4,,,1,2,3,4,5,6,7,8,9,10,11,12,13,14,59/69,1,2,3,4,5,6,7,8,9,10,11,12,13,14,60/69,1,2,3,4,5,6,7,8,9,10,11,12,13,14,61/69,解答,(1),若,a,b,,求,tan,值;,因为,a,b,,,1,2,3,4,5,6,7,8,9,10,11,12,13,14,62/69,(2),若,a,b,,求,值,.,解答,1,2,3,4,5,6,7,8,9,10,11,12,13,14,63/69,1,2,3,4,5,6,7,8,9,10,11,12,13,14,12.,已知向量,a,(cos,,,sin,),,,b,(cos,,,sin,),,,0,.,(1),若,|,a,b,|,,求证:,a,b,;,证实,由题意得,|,a,b,|,2,2,,,即,(,a,b,),2,a,2,2,a,b,b,2,2.,又因为,a,2,b,2,|,a,|,2,|,b,|,2,1,,,所以,2,2,a,b,2,,即,a,b,0,,故,a,b,.,64/69,解答,(2),设,c,(0,,,1),,若,a,b,c,,求,,,值,.,因为,a,b,(cos,cos,,,sin,sin,),(0,,,1),,,由此得,,cos,cos(,),,由,0,,得,0,,,又,0,0,,,x,R,,已知函数,f,(,x,),ab,最小正周期为,4.,(1),求,值;,解答,f,(,x,),ab,(cos,x,sin,x,,,1)(2sin,x,,,1),2sin,x,cos,x,2sin,2,x,1,1,2,3,4,5,6,7,8,9,10,11,12,13,14,68/69,(2),若,sin,x,0,是关于,t,方程,2,t,2,t,1,0,根,且,x,0,,求,f,(,x,0,),值,.,解答,1,2,3,4,5,6,7,8,9,10,11,12,13,14,69/69,
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