Respuesta :
simply distribute the denominator.
[tex] \bf \cfrac{3x-7}{12}\implies \cfrac{3x}{12}-\cfrac{7}{12}\implies \stackrel{\textit{simplified}}{\cfrac{x}{4}-\cfrac{7}{12}} [/tex]
The fraction as a difference 3x-7/12 will be ( 36x - 7 ) / 12.
How can we take division in terms of fraction?
There is a fraction, containing numerator(upper value) and denominator(lower value).
Suppose we've to divide 'a' by 'b'
We write it as: [tex]a \div b[/tex]
This can be written in fraction form as:
[tex]a\div b = \dfrac{a}{b} = {a} \times \dfrac{1}{b}[/tex]
We have been given
3x - ( 7 / 12)
Solving by simply distribute the denominator.
[12 (3x ) - 7 ] /12
( 36x - 7 ) / 12
Therefore, the fraction as a difference 3x-7/12 will be ( 36x - 7 ) / 12.
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