Verify that $x \times (y - z) = x \times y - x \times z$, if

$x = \dfrac{4}{5}, y = \dfrac{-7}{4}$ and $z = 3$

To prove:

$x \times (y - z) = x \times y - x \times z$

Taking LHS:

$x \times (y - z)\\[1em] =\dfrac{4}{5} \times \Big(\dfrac{-7}{4} - 3\Big)\\[1em] =\dfrac{4}{5} \times \Big(\dfrac{-7}{4} - \dfrac{3}{1}\Big)$

LCM of 4 and 1 is 2 x 2 = 4.

$=\dfrac{4}{5} \times \Big(\dfrac{-7 \times 1}{4 \times 1} - \dfrac{3 \times 4}{1 \times 4}\Big)\\[1em] =\dfrac{4}{5} \times \Big(\dfrac{-7}{4} - \dfrac{12}{4}\Big)\\[1em] =\dfrac{4}{5} \times \Big(\dfrac{-7 - 12}{4}\Big)\\[1em] =\dfrac{4}{5} \times \Big(\dfrac{-19}{4}\Big)\\[1em] =\Big(\dfrac{4 \times -19}{5 \times 4}\Big)\\[1em] =\Big(\dfrac{-76}{20}\Big)\\[1em] =\Big(\dfrac{-19}{5}\Big)$

Taking RHS:

$x \times y - x \times z\\[1em] =\dfrac{4}{5} \times \dfrac{-7}{4} - \dfrac{4}{5} \times 3\\[1em] = \dfrac{4 \times -7}{5 \times 4} - \dfrac{4 \times 3}{5 \times 1}\\[1em] =\dfrac{-28}{20} - \dfrac{12}{5}\\[1em] =\dfrac{-7}{5} - \dfrac{12}{5}\\[1em] =\dfrac{-7 - 12}{5}\\[1em] =\dfrac{-19}{5}$

∴ LHS = RHS

$x \times (y - z) = x \times y - x \times z$