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On line Solution of Monovariate Equation:
    Input any unary equation directly, and then click the "Next" button to obtain the solution of the equation.
    It supports equations that contain mathematical functions.
    Current location:Equations > Monovariate Equation > The history of univariate equation calculation > Answer

    Overview: 1 questions will be solved this time.Among them
           ☆1 equations

[ 1/1 Equation]
    Work: Find the solution of equation (150*(1-x)+50*x)*46*0.5 = (200*(1-x)+40*x)*66*0.5 .
    Question type: Equation
    Solution:Original question:
     (150(1 x ) + 50 x ) × 46 ×
1
2
= (200(1 x ) + 40 x ) × 66 ×
1
2
     Left side of the equation = (150(1 x ) + 50 x ) × 23
    The equation is transformed into :
     (150(1 x ) + 50 x ) × 23 = (200(1 x ) + 40 x ) × 66 ×
1
2
    Remove the bracket on the left of the equation:
     Left side of the equation = 150(1 x ) × 23 + 50 x × 23
                                             = 3450(1 x ) + 1150 x
                                             = 3450 × 13450 x + 1150 x
                                             = 34503450 x + 1150 x
                                             = 34502300 x
    The equation is transformed into :
     34502300 x = (200(1 x ) + 40 x ) × 66 ×
1
2
     Right side of the equation = (200(1 x ) + 40 x ) × 33
    The equation is transformed into :
     34502300 x = (200(1 x ) + 40 x ) × 33
    Remove the bracket on the right of the equation:
     Right side of the equation = 200(1 x ) × 33 + 40 x × 33
                                               = 6600(1 x ) + 1320 x
                                               = 6600 × 16600 x + 1320 x
                                               = 66006600 x + 1320 x
                                               = 66005280 x
    The equation is transformed into :
     34502300 x = 66005280 x

    Transposition :
      - 2300 x + 5280 x = 66003450

    Combine the items on the left of the equation:
     2980 x = 66003450

    Combine the items on the right of the equation:
     2980 x = 3150

    The coefficient of the unknown number is reduced to 1 :
      x = 3150 ÷ 2980
        = 3150 ×
1
2980
        = 315 ×
1
298

    We obtained :
      x =
315
298
    This is the solution of the equation.

    Convert the result to decimal form :
      x = 1.057047



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