Question

How do you solve `\frac { c - 9} { 4} = \frac { c - 5} { 2}`?

Answer 1

`c=1`

Explanation:

`"multiply both sides by the "color(blue)"lowest common multiple of 4 and 2"`

`"the lowest common multiple of 4 and 2 is 4"`

`cancel(4)^1xx(c-9)/cancel(4)^1=cancel(4)^2xx(c-5)/cancel(2)^1`

`rArrc-9=2(c-5)larrcolor(blue)"distribute"`

`c-9=2c-10`

`"subtract 2c from both sides"`

`c-2c-9=cancel(2c)cancel(-2c)-10`

`rArr-c-9=-10`

`"add 9 to both sides"`

`-c cancel(-9)cancel(+9)=-10+9`

`rArr-c=-1`

`"multiply both sides by "-1`

`rArrc=1" is the solution"`

Answer 2

`c=1`

Explanation:

`(c-9)/4=(c-5)/2`

With cross multiplication:-

`:.2(c-9)=4(c-5)`

`:.2c-18=4c-20`

`:.2c-4c=-20+18`

`:.-2c=-2`

`:.-c=-2/2`

`:.-c=-1`

multiply L.H.S and R.H.S. by`-1`

`:.-1xx-c=-1xx-1`

`:.c=1`

~~~~~~~~~~~~
check by substituting `x=1`

`:.((1)-9)/4=((1)-5)/2`

`:.cancel(-8)^-2/cancel 4^1=cancel(-4)^-2/cancel2^1`

`:.-2/1=-2/1`

`:.-2=-2`