(d)/(a)-(b)/(a) - subtract fractions

(d)/(a)-(b)/(a) - step by step solution for the given fractions. Subtract fractions, full explanation.

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    Solution for the given fractions

    • d/a - b/a = ?
    • The common denominator of the two fractions is: a^2
    • d/a = (a*d)/(a*a) = (a*d)/(a^2)
    • b/a = (a*b)/(a*a) = (a*b)/(a^2)
    • Fractions adjusted to a common denominator
    • d/a - b/a = (a*d)/(a^2) - (a*b)/(a^2)
    • (a*d)/(a^2) - (a*b)/(a^2) = (a*d-(a*b))/(a^2)
    • (a*d-(a*b))/(a^2) = (a*d-(a*b))/(a^2)

    Solution for the given fractions

    $ \frac{d}{a }-\frac{ b}{a }=? $

    The common denominator of the two fractions is: a^2

    $ \frac{d}{a }= \frac{(a*d)}{(a*a)} = \frac{(a*d)}{(a^2)} $

    $ \frac{b}{a }= \frac{(a*b)}{(a*a)} = \frac{(a*b)}{(a^2)} $

    Fractions adjusted to a common denominator

    $ \frac{d}{a }-\frac{ b}{a }= \frac{(a*d)}{(a^2)} - \frac{(a*b)}{(a^2)} $

    $ \frac{(a*d)}{(a^2)} - \frac{(a*b)}{(a^2)} = \frac{(a*d-(a*b))}{(a^2)} $

    $ \frac{(a*d-(a*b))}{(a^2)} = \frac{(a*d-(a*b))}{(a^2)} $

    $ $

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