Overview: 2 questions will be solved this time.Among them
           ☆2 equations

[ 1/2 Equation]
    Work: Find the solution of equation (5y+1)/6-(1-3y)/5 = (9y+1)/8-(1-y)/3 .
    Question type: Equation
    Solution:Original question:

(

5

y

+

1

)

÷

6

−

(

1

−

3

y

)

÷

5

=

(

9

y

+

1

)

÷

8

−

(

1

−

y

)

÷

3

    Remove the bracket on the left of the equation:

Left side of the equation =

5

y

×

1 6

+

1

×

1 6

−

(

1

−

3

y

)

×

1 5

=

5 6

y

+

1 6

−

(

1

−

3

y

)

×

1 5

=

5 6

y

+

1 6

−

1

×

1 5

+

3

y

×

1 5

=

5 6

y

+

1 6

−

1 5

+

3 5

y

=

43 30

y

−

1 30

    The equation is transformed into :

43 30

y

−

1 30

=

(

9

y

+

1

)

÷

8

−

(

1

−

y

)

÷

3

    Remove the bracket on the right of the equation:

Right side of the equation =

9

y

×

1 8

+

1

×

1 8

−

(

1

−

y

)

×

1 3

=

9 8

y

+

1 8

−

(

1

−

y

)

×

1 3

=

9 8

y

+

1 8

−

1

×

1 3

+

y

×

1 3

=

9 8

y

+

1 8

−

1 3

+

y

×

1 3

=

35 24

y

−

5 24

    The equation is transformed into :

43 30

y

−

1 30

=

35 24

y

−

5 24

    Transposition :

43 30

y

−

35 24

y

=

-

5 24

+

1 30

    Combine the items on the left of the equation:

-

1 40

y

=

-

5 24

+

1 30

    Combine the items on the right of the equation:

-

1 40

y

=

-

7 40

    By shifting the terms and changing the symbols on toth sides of the equation, we obtain :

7 40

=

1 40

y

    If the left side of the equation is equal to the right side, then the right side must also be equal to the left side, that is :

1 40

y

=

7 40

    The coefficient of the unknown number is reduced to 1 :

y

=

7 40

÷

1 40

=

7 40

×

40

=

7

×

1

    We obtained :

y

=

7

    This is the solution of the equation.

[ 2/2 Equation]
    Work: Find the solution of equation 1-(x-(1+x)/3)/3 = x/2-(2x-(10-7x)/3)/2 .
    Question type: Equation
    Solution:Original question:

1

−

(

x

−

(

1

+

x

)

÷

3

)

÷

3

=

x

÷

2

−

(

2

x

−

(

10

−

7

x

)

÷

3

)

÷

2

    Remove the bracket on the left of the equation:

Left side of the equation =

1

−

x

×

1 3

+

(

1

+

x

)

÷

3

×

1 3

=

1

−

x

×

1 3

+

(

1

+

x

)

×

1 9

=

1

−

1 3

x

+

1

×

1 9

+

x

×

1 9

=

1

−

1 3

x

+

1 9

+

x

×

1 9

=

10 9

−

2 9

x

    The equation is transformed into :

10 9

−

2 9

x

=

x

÷

2

−

(

2

x

−

(

10

−

7

x

)

÷

3

)

÷

2

    Remove the bracket on the right of the equation:

Right side of the equation =

1 2

x

−

2

x

×

1 2

+

(

10

−

7

x

)

÷

3

×

1 2

=

1 2

x

−

1

x

+

(

10

−

7

x

)

×

1 6

=

-

1 2

x

+

(

10

−

7

x

)

×

1 6

=

-

1 2

x

+

10

×

1 6

−

7

x

×

1 6

=

-

1 2

x

+

5 3

−

7 6

x

=

-

5 3

x

+

5 3

    The equation is transformed into :

10 9

−

2 9

x

=

-

5 3

x

+

5 3

    Transposition :

-

2 9

x

+

5 3

x

=

5 3

−

10 9

    Combine the items on the left of the equation:

13 9

x

=

5 3

−

10 9

    Combine the items on the right of the equation:

13 9

x

=

5 9

    The coefficient of the unknown number is reduced to 1 :

x

=

5 9

÷

13 9

=

5 9

×

9 13

=

5

×

1 13

    We obtained :

x

=

5 13

    This is the solution of the equation.

    Convert the result to decimal form :

x

=

0.384615

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