作业帮数学题 不难 200分 来抢
来源:学生作业帮 编辑:作业帮 分类:数学作业 时间:2024/05/26 03:28:26
数学题 不难 200分 来抢
在△ABC中,求证:a cosA+b cosB+c cosC = 2a sinB sinC
谢谢大家~~小妹感激不尽-\(^o^)/~
在△ABC中,求证:a cosA+b cosB+c cosC = 2a sinB sinC
谢谢大家~~小妹感激不尽-\(^o^)/~
证明:左=a cosA+b·cosB+c·cosC
=a(cosA+b/a cosB+c/a cosC)
=a(cosA+sinB/sinA cosB+sinC/sinA cosC)
=a[cosA+(sinBcosB+sinCcosC)/sinA]
=a[cosA+sin(B+C)cos(B-C)/sinA]
=a[-cos(B+C)+cos(B-C)]
=2asinBsinC
=右
=a(cosA+b/a cosB+c/a cosC)
=a(cosA+sinB/sinA cosB+sinC/sinA cosC)
=a[cosA+(sinBcosB+sinCcosC)/sinA]
=a[cosA+sin(B+C)cos(B-C)/sinA]
=a[-cos(B+C)+cos(B-C)]
=2asinBsinC
=右