Adding mixed fraction number
Introduction :
A subdivision of the whole is the fraction. Fraction consists of the numerator and denominator. The number of the equal division is the numerator and which is creating the whole are the denominators. The adding mix fraction equation is the simple division of the fraction. First the given fraction is converted into the common fraction and the convert the denominator which is the similar add than added fraction.
Instruction of the add mixed fraction:
Example problems adding mix fraction equations:
Example problem:
Example 1:
To solve and finding adding mix fraction equations `7(1)/(3) + x = 1(1)/(3)`
Solution:
Taken the mixed fractions equation,`7(1)/(3) + x = 1(1)/(3) `
To covert the common format to the given mix fraction equations.
`(22)/(3) + x = (4)/(3)`
`x=(4)/(3)-(22)/(3)`
`x = (18)/(3)`
Example 2:
To solve and finding adding mix fraction equations `9(2)/(4)+y=4(3)/(4)`
Solution:
Taken the mixed fraction number`9(2)/(4) + y =4(3)/(4)`
To covert the common format to the given mixed fraction.
`9(2)/(4) + y = 4(3)/(4)`
`(38)/(4) + y =(19)/(4)`
To calculating the difference between the given two adding mix fraction equation.
`y = (19)/(4) - (38)/(4)`
`y = (19)/(4)`
Example 3:
To solve and finding adding mixed fraction number `1(6)/(4)+x=5(3)/(4)`
Solution:
Taken the mixed fraction number `1(6)/(4)+x=5(3)/(4)`
To covert the common format to the given mix fraction equations.
`((1xx4)+6)/(4)+x=((5xx4)+3)/(4)`
`(10)/(4)+x=(23)/(4)`
To calculating the difference between the given two adding mix fraction equation.
`x=(23)/(4)-(10)/(4)`
`x=(13)/(4)`
A subdivision of the whole is the fraction. Fraction consists of the numerator and denominator. The number of the equal division is the numerator and which is creating the whole are the denominators. The adding mix fraction equation is the simple division of the fraction. First the given fraction is converted into the common fraction and the convert the denominator which is the similar add than added fraction.
Instruction of the add mixed fraction:
- To find out the lcm for the given number.
- Get the original denominator of the initial fraction and multiply its number it wants to become the general denominator. So, to obtain 5 (original denominator) to become 25 (common denominator), multiply by 5.
- The initial numerator is multiply by the similar number, use the multiply the denominator.
- Obtain the second fraction of the denominator is multiplied by the common denominator.
- The second numerator fraction is multiply by the similar number.
- Two numerators are added and then not add the denominator. For example: 15/4 and 20/4
- Adding this number 15/4+20/4=35/4
Example problems adding mix fraction equations:
Example problem:
Example 1:
To solve and finding adding mix fraction equations `7(1)/(3) + x = 1(1)/(3)`
Solution:
Taken the mixed fractions equation,`7(1)/(3) + x = 1(1)/(3) `
To covert the common format to the given mix fraction equations.
`(22)/(3) + x = (4)/(3)`
`x=(4)/(3)-(22)/(3)`
`x = (18)/(3)`
Example 2:
To solve and finding adding mix fraction equations `9(2)/(4)+y=4(3)/(4)`
Solution:
Taken the mixed fraction number`9(2)/(4) + y =4(3)/(4)`
To covert the common format to the given mixed fraction.
`9(2)/(4) + y = 4(3)/(4)`
`(38)/(4) + y =(19)/(4)`
To calculating the difference between the given two adding mix fraction equation.
`y = (19)/(4) - (38)/(4)`
`y = (19)/(4)`
Example 3:
To solve and finding adding mixed fraction number `1(6)/(4)+x=5(3)/(4)`
Solution:
Taken the mixed fraction number `1(6)/(4)+x=5(3)/(4)`
To covert the common format to the given mix fraction equations.
`((1xx4)+6)/(4)+x=((5xx4)+3)/(4)`
`(10)/(4)+x=(23)/(4)`
To calculating the difference between the given two adding mix fraction equation.
`x=(23)/(4)-(10)/(4)`
`x=(13)/(4)`