Question

Given that `2/3 xx "some fraction"=4/5` determine the 'some fraction': ?

Answer 1

The other fraction`=6/5`

Explanation:

Let the unknown fraction be `x` then we have:

`color(brown)(2/3 x = 4/5)`

Multiply both sides by `color(blue)(3/2)` giving:

`color(brown)(2/3color(blue)(xx3/2)xx x = 4/5color(blue)(xx3/2))`

`color(white)(..)`

But `color(brown)(2/3)color(blue)(xx3/2)=6/6=1` giving:

`x=4/5xx3/2`

`= 12/10`

`=6/5`

The other fraction`=x=6/5`
'~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
Check: `2/3xx6/5->4/5` Confirmed as correct.

Answer 2

The same thing but it looks different.

The other fraction is `6/5`

Explanation:

Given: `2/3 xx "some fraction"=4/5`

`"some fraction" = 4/5 -: 2/3`

Standard shortcut instruction is to turn `2/3` up the other way and multiply.

`"some fraction" = 4/5 xx 3/2`

`= (4xx3)/(5xx2) = 12/10`

Divide top and bottom by 2 giving:

`(12 -:2)/(10-:2)= 6/5`

So the other fraction is `6/5`