已知向量a=(cos3x/2,sin3x/2),向量b=(cosx/2,-sinx/2),向量c=(根号3,-1)(1)当a⊥b时,求x的值的集合;(2)求|a-c|的最大值.
<p>问题:已知向量a=(cos3x/2,sin3x/2),向量b=(cosx/2,-sinx/2),向量c=(根号3,-1)(1)当a⊥b时,求x的值的集合;(2)求|a-c|的最大值.<p>答案:↓↓↓<p class="nav-title mt10" style="border-top:1px solid #ccc;padding-top: 10px;">刘小茂的回答:<div class="content-b">网友采纳 (1)a⊥b=>a.b=0(cos(3x/2),sin(3x/2).(cos(x/2),-sin(x/2))=0cos(3x/2)cos(x/2)-sin(3x/2)sin(x/2)=0cos2x=02x=nπ+π/2x=nπ/2+π/4n=0,1,2,...x的值的集合={x|x=nπ/2+π/4,n=0,1,2,.}(2)a-c=(...
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