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\({4 \over p}:{3 \over q}={4 \over p}⋅{q \over 3}={4q \over 3p}\)

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

\({6 \over 7}:{a-8b \over b}={6 \over 7}⋅{b \over a-8b}={6b \over 7(a-8b)}={6b \over 7a-56b}\)

\({4 \over 2a}+{7 \over 2a}={11 \over 2a}\)

\({9 \over x}+{4 \over 5x}={45 \over 5x}+{4 \over 5x}={49 \over 5x}\)

\({5 \over 3x}+{9 \over 7y}={35y \over 21xy}+{27x \over 21xy}={35y+27x \over 21xy}\)

\(9-{5 \over 8a}={9 \over 1}-{5 \over 8a}={72a \over 8a}-{5 \over 8a}={72a-5 \over 8a}\)

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

\({6p \over q}-{4 \over 2q}={12p \over 2q}-{4 \over 2q}={12p-4 \over 2q}={6p-2 \over q}\)

\({3b \over 8a}+{9a \over 2b}={3b^2 \over 8ab}+{36a^2 \over 8ab}={36a^2+3b^2 \over 8ab}\)

\({9x \over 4}+{x+1 \over 3}={27x \over 12}+{4(x+1) \over 12}={27x+4(x+1) \over 12}={31x+4 \over 12}\)

\({-8a+4 \over 3a-1}-2={-8a+4 \over 3a-1}-{2(3a-1) \over 3a-1}={-8a+4-2(3a-1) \over 3a-1}={-8a+4-6a+2 \over 3a-1}={-14a+6 \over 3a-1}\)

\({5 \over a}⋅{6 \over b}={30 \over ab}\)

\({a \over 5}⋅{4 \over b}={4a \over 5b}\)

\({6 \over 7}⋅x={6x \over 7}\)

\({8y \over x}⋅{x+7 \over 6}={8y(x+7) \over 6x}={4y(x+7) \over 3x}={4xy+28y \over 3x}\)

\({6x^2-3x+90 \over 3x}={6x^2 \over 3x}-{3x \over 3x}+{90 \over 3x}=2x-1+{30 \over x}\)

\({3a^2-2a+4 \over a^2}={3a^2 \over a^2}-{2a \over a^2}+{4 \over a^2}=3-{2 \over a}+{4 \over a^2}\)

\({4p \over p}={4 \over 1}=4\)

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

\({-20p \over -45p}=\frac{4}{9}\)

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

\({20xy \over 28xz}={5y \over 7z}\)

\({-15b \over -20ab}={3 \over 4a}\)

\({28xyz \over -4yz}=-7x\)

\({2pq \over q}+{6pr \over r}=2p+6p=8p\)