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

\(-{8 \over 9}:a=-{8 \over 9}:{a \over 1}=-{8 \over 9}⋅{1 \over a}=-{8 \over 9a}\)

\(-{8 \over 9}:{a-2b \over b}=-{8 \over 9}⋅{b \over a-2b}=-{8b \over 9(a-2b)}=-{8b \over 9a-18b}\)

\({5 \over 9x}+{6 \over 9x}={11 \over 9x}\)

\({4 \over p}-{8 \over 7p}={28 \over 7p}-{8 \over 7p}={20 \over 7p}\)

\({7 \over 3p}+{9 \over 6q}={14q \over 6pq}+{9p \over 6pq}={14q+9p \over 6pq}\)

\(3-{8 \over 7x}={3 \over 1}-{8 \over 7x}={21x \over 7x}-{8 \over 7x}={21x-8 \over 7x}\)

\(6x+{7 \over 3x}={6x \over 1}⋅{3x \over 3x}+{7 \over 3x}={18x^2 \over 3x}+{7 \over 3x}={18x^2+7 \over 3x}\)

\({7a \over b}-{4 \over 5b}={35a \over 5b}-{4 \over 5b}={35a-4 \over 5b}\)

\({3b \over 9a}+{8a \over 5b}={15b^2 \over 45ab}+{72a^2 \over 45ab}={72a^2+15b^2 \over 45ab}={24a^2+5b^2 \over 15ab}\)

\({9x \over 7}+{x-6 \over 3}={27x \over 21}+{7(x-6) \over 21}={27x+7(x-6) \over 21}={34x-42 \over 21}\)

\({7a-9 \over -2a-6}+5={7a-9 \over -2a-6}-{-5(-2a-6) \over -2a-6}={7a-9+5(-2a-6) \over -2a-6}={7a-9-10a-30 \over -2a-6}={-3a-39 \over -2a-6}\)

\({6a^2-2a+40 \over 2a}={6a^2 \over 2a}-{2a \over 2a}+{40 \over 2a}=3a-1+{20 \over a}\)

\({x^2+5x-6 \over 2x^2}={x^2 \over 2x^2}+{5x \over 2x^2}-{6 \over 2x^2}=\frac{1}{2}+{5 \over 2x}-{3 \over x^2}\)

\({5p \over p}={5 \over 1}=5\)

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

\({10x \over 35x}=\frac{2}{7}\)

\({6x \over 3x}=2\)

\({-20pq \over -36pr}={5q \over 9r}\)

\({-6b \over 27ab}=-{2 \over 9a}\)

\({-14xyz \over -2yz}=7x\)

\({6ab \over b}+{2ac \over c}=6a+2a=8a\)

\({7 \over p}⋅{8 \over q}={56 \over pq}\)

\({x \over 4}⋅-{8 \over y}=-{8x \over 4y}=-{2x \over y}\)

\({5 \over 8}⋅a={5a \over 8}\)

\({2b \over a}⋅{a+4 \over 3}={2b(a+4) \over 3a}={2ab+8b \over 3a}\)