Mathematics
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current location:Solving equations online > On line Solution of Monovariate Equation > The history of univariate equation calculation
    389152-178.28*(1200+273.15)+8.314*(1200+273.15)ln(([(100/x)-1]^3)*0.01^1 )= 0
    8=tan(x)/tan(3)
    389152-178.28*(1300+273.15)+8.314*(1300+273.15)ln(([(100/x)-1]^3)*0.01^1 )= 0
    389152-178.28*(1300+273.15)+8.314*(1300+273.15)ln(([(100/x)-1]^3)*0.1^1 )= 0
    389152-178.28*(1300+273.15)+8.314*(1300+273.15)ln(([(100/x)-1]^3)*1^1 )= 0
    8=tanx/tan3
    -208319+25.773*(1300+273.15)+8.314*(1300+273.15)ln(([(100/x)-1]^4)*1^1 )= 0
    -208319+25.773*(1200+273.15)+8.314*(1200+273.15)ln(([(100/x)-1]^4)*1^1 )= 0
    -208319+25.773*(1100+273.15)+8.314*(1100+273.15)ln(([(100/x)-1]^4)*1^1 )= 0
    8=tany/tan3
    -208319+25.773*(1000+273.15)+8.314*(1000+273.15)ln(([(100/x)-1]^4)*1^1 )= 0
    -208319+25.773*(900+273.15)+8.314*(900+273.15)ln(([(100/x)-1]^4)*1^1 )= 0
    -208319+25.773*(800+273.15)+8.314*(800+273.15)ln(([(100/x)-1]^4)*1^1 )= 0
    -208319+25.773*(700+273.15)+8.314*(700+273.15)ln(([(100/x)-1]^4)*1^1 )= 0
    3.2762394=(1-(1+i)^(-4))/i
    20000x/6104.56=(1-(1+x)^(-4))
    20000i/6104.56=(1-(1+i)^(-4))
    52-(x+1)=25
    t/(-t^2+2t+3)=(-t^2+2t)/(3-t)
    (-0.5a^2+1.5a)/(4-a)=a/(-0.5a^2+1.5a+2)

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