带绝对值的定积分求解
(最下面有图)\!\(\*SubsuperscriptBox[\(\[Integral]\),\(0\),\(2\[Pi]\)]\(Abs[Sin[x]-\*Fracti...
(最下面有图)
\!\(
\*SubsuperscriptBox[\(\[Integral]\), \(0\), \(2 \[Pi]\)]\(Abs[
Sin[x] -
\*FractionBox[\(4\), \(3\)] Cos[x]] \[DifferentialD]x\)\)
为什么不等于
\!\(
\*SubsuperscriptBox[\(\[Integral]\), \(ArcTan[
\*FractionBox[\(3\), \(4\)]]\), \(Pi + ArcTan[
\*FractionBox[\(3\), \(4\)]]\)]\(\((Sin[x] -
\*FractionBox[\(4\), \(3\)] Cos[x])\) \[DifferentialD]x\)\) + \!\(
\*SubsuperscriptBox[\(\[Integral]\), \(ArcTan[
\*FractionBox[\(3\), \(4\)]] - Pi\), \(ArcTan[
\*FractionBox[\(3\), \(4\)]]\)]\(\(-\((Sin[x] -
\*FractionBox[\(4\), \(3\)] Cos[x])\)\) \[DifferentialD]x\)\) 展开
\!\(
\*SubsuperscriptBox[\(\[Integral]\), \(0\), \(2 \[Pi]\)]\(Abs[
Sin[x] -
\*FractionBox[\(4\), \(3\)] Cos[x]] \[DifferentialD]x\)\)
为什么不等于
\!\(
\*SubsuperscriptBox[\(\[Integral]\), \(ArcTan[
\*FractionBox[\(3\), \(4\)]]\), \(Pi + ArcTan[
\*FractionBox[\(3\), \(4\)]]\)]\(\((Sin[x] -
\*FractionBox[\(4\), \(3\)] Cos[x])\) \[DifferentialD]x\)\) + \!\(
\*SubsuperscriptBox[\(\[Integral]\), \(ArcTan[
\*FractionBox[\(3\), \(4\)]] - Pi\), \(ArcTan[
\*FractionBox[\(3\), \(4\)]]\)]\(\(-\((Sin[x] -
\*FractionBox[\(4\), \(3\)] Cos[x])\)\) \[DifferentialD]x\)\) 展开
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(有图)
首先非常感谢您耐心细致的回答。我主要想弄明白这一点:
x在区间[ArcTan (3/4), \[Pi] + ArcTan (3/4)] 时,sin x - 4/3 cos x > 0
x在区间[-\[Pi] + ArcTan (3/4), ArcTan (3/4)] 时,sin x - 4/3 cos x < 0
因此我去掉绝对值,并把区间分成两段,分别积分,但结果是错的,请问为什么错了?
追答
θ~π+θ sinx-4/3cosx>0
π+θ~2π+θ sinx-4/3cosx<0
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