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\({9 \over x}:{7 \over y}={9 \over x}⋅{y \over 7}={9y \over 7x}\)

\(-{9 \over 7}:p=-{9 \over 7}:{p \over 1}=-{9 \over 7}⋅{1 \over p}=-{9 \over 7p}\)

\(-{7 \over 8}:{x-4y \over y}=-{7 \over 8}⋅{y \over x-4y}=-{7y \over 8(x-4y)}=-{7y \over 8x-32y}\)

\({7 \over 6a}+{2 \over 6a}={9 \over 6a}={3 \over 2a}\)

\({3 \over a}+{5 \over 9a}={27 \over 9a}+{5 \over 9a}={32 \over 9a}\)

\({5 \over 4x}-{9 \over 3y}={15y \over 12xy}-{36x \over 12xy}={15y-36x \over 12xy}={5y-12x \over 4xy}\)

\(7-{5 \over 6p}={7 \over 1}-{5 \over 6p}={42p \over 6p}-{5 \over 6p}={42p-5 \over 6p}\)

\(2a+{7 \over 6a}={2a \over 1}⋅{6a \over 6a}+{7 \over 6a}={12a^2 \over 6a}+{7 \over 6a}={12a^2+7 \over 6a}\)

\({8x \over y}-{6 \over 7y}={56x \over 7y}-{6 \over 7y}={56x-6 \over 7y}\)

\({5b \over 8a}+{9a \over 6b}={15b^2 \over 24ab}+{36a^2 \over 24ab}={36a^2+15b^2 \over 24ab}={12a^2+5b^2 \over 8ab}\)

\({3p \over 8}+{p+2 \over 7}={21p \over 56}+{8(p+2) \over 56}={21p+8(p+2) \over 56}={29p+16 \over 56}\)

\({4a+5 \over 2a+8}-1={4a+5 \over 2a+8}-{1(2a+8) \over 2a+8}={4a+5-1(2a+8) \over 2a+8}={4a+5-2a-8 \over 2a+8}={2a-3 \over 2a+8}\)

\({8 \over x}⋅{9 \over y}={72 \over xy}\)

\({a \over 4}⋅{2 \over b}={2a \over 4b}={a \over 2b}\)

\(-{1 \over 7}⋅p=-{p \over 7}\)

\({6b \over a}⋅{a-2 \over 9}={6b(a-2) \over 9a}={2b(a-2) \over 3a}={2ab-4b \over 3a}\)

\({3a^2-9a+60 \over 3a}={3a^2 \over 3a}-{9a \over 3a}+{60 \over 3a}=a-3+{20 \over a}\)

\({6x^2-4x-8 \over 2x^2}={6x^2 \over 2x^2}-{4x \over 2x^2}-{8 \over 2x^2}=3-{2 \over x}-{4 \over x^2}\)

\({8x \over x}={8 \over 1}=8\)

\({a \over 7a}={1 \over 7}\)

\({-25x \over -40x}=\frac{5}{8}\)

\({24x \over -4x}=-6\)

\({-12ab \over 14ac}=-{6b \over 7c}\)

\({-8q \over 12pq}=-{2 \over 3p}\)

\({-32abc \over -4bc}=8a\)

\({7xy \over y}+{4xz \over z}=7x+4x=11x\)