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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/m+1/(m+1)+1/(m+2)+1/(m+3) = 19/20 .
    Question type: Equation
    Solution:Original question:
     1 ÷ m + 1 ÷ ( m + 1) + 1 ÷ ( m + 2) + 1 ÷ ( m + 3) = 19 ÷ 20
     Multiply both sides of the equation by: m
     1 + 1 ÷ ( m + 1) × m + 1 ÷ ( m + 2) × m + 1 ÷ ( m + 3) × m = 19 ÷ 20 × m
     Multiply both sides of the equation by:( m + 1)
     1( m + 1) + 1 m + 1 ÷ ( m + 2) × m ( m + 1) + 1 ÷ ( m + 3) × m ( m + 1) = 19 ÷ 20 × m ( m + 1)
    Remove a bracket on the left of the equation:
     1 m + 1 × 1 + 1 m + 1 ÷ ( m + 2) × m ( m + 1) + 1 ÷ ( m + 3) = 19 ÷ 20 × m ( m + 1)
    Remove a bracket on the right of the equation::
     1 m + 1 × 1 + 1 m + 1 ÷ ( m + 2) × m ( m + 1) + 1 ÷ ( m + 3) = 19 ÷ 20 × m m + 19 ÷ 20 × m × 1
    The equation is reduced to :
     1 m + 1 + 1 m + 1 ÷ ( m + 2) × m ( m + 1) + 1 ÷ ( m + 3) × m =
19
20
 m m +
19
20
 m
    The equation is reduced to :
     2 m + 1 + 1 ÷ ( m + 2) × m ( m + 1) + 1 ÷ ( m + 3) × m ( m + 1) =
19
20
 m m +
19
20
 m
     Multiply both sides of the equation by:( m + 2)
     2 m ( m + 2) + 1( m + 2) + 1 m ( m + 1) + 1 ÷ ( m + 3) × m ( m + 1) =
19
20
 m m ( m + 2) +
19
20
 m ( m + 2)
    Remove a bracket on the left of the equation:
     2 m m + 2 m × 2 + 1( m + 2) + 1 m ( m + 1) + 1 =
19
20
 m m ( m + 2) +
19
20
 m ( m + 2)
    Remove a bracket on the right of the equation::
     2 m m + 2 m × 2 + 1( m + 2) + 1 m ( m + 1) + 1 =
19
20
 m m m +
19
20
 m m × 2 +
19
20
 m ( m + 2)
    The equation is reduced to :
     2 m m + 4 m + 1( m + 2) + 1 m ( m + 1) + 1 ÷ ( m + 3) =
19
20
 m m m +
19
10
 m m +
19
20
 m ( m + 2)
     Multiply both sides of the equation by:( m + 3)
     2 m m ( m + 3) + 4 m ( m + 3) + 1( m + 2)( m + 3) + 1 m =
19
20
 m m m ( m + 3) +
19
10
 m m ( m + 3) +
19
20
 m ( m + 2)
    Remove a bracket on the left of the equation:
     2 m m m + 2 m m × 3 + 4 m ( m + 3) + 1 =
19
20
 m m m ( m + 3) +
19
10
 m m ( m + 3) +
19
20
 m ( m + 2)
    Remove a bracket on the right of the equation::
     2 m m m + 2 m m × 3 + 4 m ( m + 3) + 1 =
19
20
 m m m m +
19
20
 m m m × 3 +
19
10
 m
    The equation is reduced to :
     2 m m m + 6 m m + 4 m ( m + 3) + 1( m + 2) =
19
20
 m m m m +
57
20
 m m m +
19
10
 m m
    Remove a bracket on the left of the equation:
     2 m m m + 6 m m + 4 m m + 4 m =
19
20
 m m m m +
57
20
 m m m +
19
10
 m m
    Remove a bracket on the right of the equation::
     2 m m m + 6 m m + 4 m m + 4 m =
19
20
 m m m m +
57
20
 m m m +
19
10
 m m
    The equation is reduced to :
     2 m m m + 6 m m + 4 m m + 12 m =
19
20
 m m m m +
57
20
 m m m +
19
10
 m m
    Remove a bracket on the left of the equation:
     2 m m m + 6 m m + 4 m m + 12 m =
19
20
 m m m m +
57
20
 m m m +
19
10
 m m
    Remove a bracket on the right of the equation::
     2 m m m + 6 m m + 4 m m + 12 m =
19
20
 m m m m +
57
20
 m m m +
19
10
 m m
    The equation is reduced to :
     2 m m m + 6 m m + 4 m m + 12 m =
19
20
 m m m m +
57
20
 m m m +
19
10
 m m
    Remove a bracket on the left of the equation:
     2 m m m + 6 m m + 4 m m + 12 m =
19
20
 m m m m +
57
20
 m m m +
19
10
 m m

    After the equation is converted into a general formula, there is a common factor:
    ( m - 3 )
    From
        m - 3 = 0
    it is concluded that::
        m1=3

    Solutions that cannot be obtained by factorization:
        m2≈-2.700282 , keep 6 decimal places
        m3≈-1.602749 , keep 6 decimal places
        m4≈-0.486443 , keep 6 decimal places    
    There are 4 solution(s).

解程的详细方法请参阅:《方程的解法》


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