Introduction for mixed numbers solver:
In a fraction if numerator is greater than denominator then this kind of fraction is know improper fraction. The improper fraction in standard form is known as mixed number.
A mixed number consists of
an integerProper fraction.

`ab/c`
a is the integer
`b/c` is the proper fraction
Now let see problems on mixed numbers operations

 

Example problems for mixed number solver
Problem solver 1.
Find the sum of two mixed number` 7(1)/4` and `8(1)/4`
Solution:
The given mixed numbers are `7(1)/4` and` 8(1)/4`
Initially to perform any operations on mixed numbers we must convert it to fraction
=  7`1/4` in fraction
Multiply 7 and 4 and add with 1
=   7`1/4`
= `(28+1)/4`
=`29/4`
8`1/4` in fraction
Multiply 8 and 4 and add with 1
= 8`1/4`
= `(32+1)/4`
=`33/4`
7`1/4` +8`1/4` =`29/4` +`33/4`
=`(29+33)/4`
=62/4
This can be simplified has
= 15.5
Problem solver 2.
Find the difference of two mixed number 5`1/5` and 6`1/5`
Solution:
The given mixed numbers are 5`1/5` and 6`1/5`
Initially to perform any operations on mixed numbers we must convert it to fraction
5`1/5` in fraction
Multiply 5 and 5 and add with 1
= 5`1/5`
= `(25+1)/5`
=`26/5`
61/5 in fraction
Multiply 6 and 5 and add with 1
= 6`1/5`
= `(30+1)/5`
=3`1/5`
5`1/5` -6`1/5` =`26/5` -`31/5`
=`(26-31)/5`
=`-5/5`
This can be simplified has
=-1
Problem solver 3.
Find the product of 7` 1/6` and 8`1/6`
Solution:
The given mixed numbers are 7`1/6` and 8`1/6`
Initially to perform any operations on mixed numbers we must convert it to fraction
7`1/6` in fraction
Multiply 7 and 6 and add with 1
=7`1/6`
=`(42+1)/6`
=`43/6`
`81/6` in fraction
Multiply 8 and 6 and add with 1
=`81/6`
=` (48+1)/6`
=`49/6`
`1/6` *`1/6` =`43/6` *`49/6`
=`(43*49)/(6*6)`
=`2107/36`
More example problems mixed number solver
Problem solver 1.
Find the sum of two mixed number 9`1/7 ` and 10`1/7`
Solution:
The given mixed numbers are 9`1/7` and 10`1/7`
Initially to perform any operations on mixed numbers we must convert it to fraction
9`1/7` in fraction
Multiply 9 and 7 and add with 1
= 9`1/7`
= `(63+1)/7`
=`64/7`
`101/7` in fraction
Multiply 10 and 7 and add with 1
= ` 1/7`
=` (70+1)/7`
=`71/7`
9`1/7` +10`1/7` =`64/7` +`71/7`
=`(64+71)/7`
=`135/7`
This can be simplified has
=19.28

 

Problem solver 2.

Find the difference of two mixed number `3(1)/8` and `2(1)/8`
Solution:
The given mixed numbers are `3(1)/8` and `2(1)/8`
Initially to perform any operations on mixed numbers we must convert it to fraction
` 3(1)/8` in fraction
Multiply 3 and 8 and add with 1
=`3(1)/8`
= `(24+1)/8`
=`25/8`
` 2(1)/8` in fraction
Multiply 2 and 8 and add with 1
= 2`1/8`
= `(16+1)/8`
=`17/8`
3`1/8` -2`1/8` =`25/8` -`17/8`
=`(25-17)/8`
=`8/8`
This can be simplified has
=1