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·一道数学题

2025-03-18 08:40:55
推荐回答(5个)
回答1:

△ABC是锐角三角形

tanX取正是一、三象限,取负是二四象限。而题目是△ABC。所以只能取一二象限。又tanAtanB>1,所以tanA与tanB同号。

若同为第二象限,A、B都为钝角,三角形内角和180度,不可能有两个锐角,故舍去。

若同是第一象限为正,则A、B为锐角。但是由于tanAtanB>1,所以tanA>1、tanB>1必同时成立。(tanA<1且tanB<1,上述已舍去取负情况)
所以A、B都大于45度,A+B>90,A+B+C=180,所以C<90。
所以A、B、C都为锐角。

回答2:

解:三角形ABC中,A.B.C∈(0,180·)
因为tanA.tanB =(sinA.sinB)/(cosA.cosB)>1
所以 有 sinA.sinB和cosA.cosB同号,并且都大于0
即有 sinA.sinB>cosA.cosB
cosA.cosB-sinA.sinB<0
cos(A+B)<0
A+B 是第二或第三象限角,但是A+B必须<180度
所以A+B是第二象限角.C必定为锐角.
A.B中任意一个角可能为锐角,也可能为钝角.
当A,或B为钝角时,tanA.tanB<0 不合题意,舍去
所以A.B都为锐角

综上所述,△ABC是锐角三角形.
答案选1

回答3:

,△ABC是锐角三角形.
答案选1

回答4:

3。钝角三角形

回答5:

4。锐角或钝角三角形

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