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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 1/(2+z)+2/(1+z)+z/(1+2) = 4 .
    Question type: Equation
    Solution:Original question:
     1 ÷ (2 + z ) + 2 ÷ (1 + z ) + z ÷ (1 + 2) = 4
     Multiply both sides of the equation by:(2 + z )
     1 + 2 ÷ (1 + z ) × (2 + z ) + z ÷ (1 + 2) × (2 + z ) = 4(2 + z )
    Remove a bracket on the left of the equation::
     1 + 2 ÷ (1 + z ) × 2 + 2 ÷ (1 + z ) × z + z ÷ (1 + 2) × (2 + z ) = 4(2 + z )
    Remove a bracket on the right of the equation::
     1 + 2 ÷ (1 + z ) × 2 + 2 ÷ (1 + z ) × z + z ÷ (1 + 2) × (2 + z ) = 4 × 2 + 4 z
    The equation is reduced to :
     1 + 4 ÷ (1 + z ) + 2 ÷ (1 + z ) × z + z ÷ (1 + 2) × (2 + z ) = 8 + 4 z
     Multiply both sides of the equation by:(1 + z )
     1(1 + z ) + 4 + 2 z + z ÷ (1 + 2) × (2 + z )(1 + z ) = 8(1 + z ) + 4 z (1 + z )
    Remove a bracket on the left of the equation:
     1 × 1 + 1 z + 4 + 2 z + z ÷ (1 + 2) × (2 + z )(1 + z ) = 8(1 + z ) + 4 z (1 + z )
    Remove a bracket on the right of the equation::
     1 × 1 + 1 z + 4 + 2 z + z ÷ (1 + 2) × (2 + z )(1 + z ) = 8 × 1 + 8 z + 4 z (1 + z )
    The equation is reduced to :
     1 + 1 z + 4 + 2 z + z ÷ (1 + 2) × (2 + z )(1 + z ) = 8 + 8 z + 4 z (1 + z )
    The equation is reduced to :
     5 + 3 z + z ÷ (1 + 2) × (2 + z )(1 + z ) = 8 + 8 z + 4 z (1 + z )
     Multiply both sides of the equation by:(1 + 2)
     5(1 + 2) + 3 z (1 + 2) + z (2 + z )(1 + z ) = 8(1 + 2) + 8 z (1 + 2) + 4 z (1 + z )(1 + 2)
    Remove a bracket on the left of the equation:
     5 × 1 + 5 × 2 + 3 z (1 + 2) + z (2 + z )(1 + z ) = 8(1 + 2) + 8 z (1 + 2) + 4 z (1 + z )(1 + 2)
    Remove a bracket on the right of the equation::
     5 × 1 + 5 × 2 + 3 z (1 + 2) + z (2 + z )(1 + z ) = 8 × 1 + 8 × 2 + 8 z (1 + 2) + 4 z (1 + z )(1 + 2)
    The equation is reduced to :
     5 + 10 + 3 z (1 + 2) + z (2 + z )(1 + z ) = 8 + 16 + 8 z (1 + 2) + 4 z (1 + z )(1 + 2)
    The equation is reduced to :
     15 + 3 z (1 + 2) + z (2 + z )(1 + z ) = 24 + 8 z (1 + 2) + 4 z (1 + z )(1 + 2)
    Remove a bracket on the left of the equation:
     15 + 3 z × 1 + 3 z × 2 + z (2 + z )(1 + z ) = 24 + 8 z (1 + 2) + 4 z (1 + z )(1 + 2)
    Remove a bracket on the right of the equation::
     15 + 3 z × 1 + 3 z × 2 + z (2 + z )(1 + z ) = 24 + 8 z × 1 + 8 z × 2 + 4 z (1 + z )(1 + 2)
    The equation is reduced to :
     15 + 3 z + 6 z + z (2 + z )(1 + z ) = 24 + 8 z + 16 z + 4 z (1 + z )(1 + 2)
    The equation is reduced to :
     15 + 9 z + z (2 + z )(1 + z ) = 24 + 24 z + 4 z (1 + z )(1 + 2)
    Remove a bracket on the left of the equation:
     15 + 9 z + z × 2(1 + z ) + z z (1 + z ) = 24 + 24 z + 4 z (1 + z )(1 + 2)
    Remove a bracket on the right of the equation::
     15 + 9 z + z × 2(1 + z ) + z z (1 + z ) = 24 + 24 z + 4 z × 1(1 + 2) + 4 z z (1 + 2)
    The equation is reduced to :
     15 + 9 z + z × 2(1 + z ) + z z (1 + z ) = 24 + 24 z + 4 z (1 + 2) + 4 z z (1 + 2)
    Remove a bracket on the left of the equation:
     15 + 9 z + z × 2 × 1 + z × 2 z + z z (1 + z ) = 24 + 24 z + 4 z (1 + 2) + 4 z z (1 + 2)

    The solution of the equation:
        z1≈-1.856211 , keep 6 decimal places
        z2≈-0.429617 , keep 6 decimal places
        z3≈11.285828 , keep 6 decimal places    
    There are 3 solution(s).

解程的详细方法请参阅:《方程的解法》


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