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\({9 \over a}:{4 \over b}={9 \over a}⋅{b \over 4}={9b \over 4a}\)

\({6 \over 7}:a={6 \over 7}:{a \over 1}={6 \over 7}⋅{1 \over a}={6 \over 7a}\)

\(-{3 \over 2}:{x-6y \over y}=-{3 \over 2}⋅{y \over x-6y}=-{3y \over 2(x-6y)}=-{3y \over 2x-12y}\)

\({7 \over 2p}-{3 \over 2p}={4 \over 2p}={2 \over p}\)

\({4 \over x}-{3 \over 5x}={20 \over 5x}-{3 \over 5x}={17 \over 5x}\)

\({2 \over 7p}-{5 \over 6q}={12q \over 42pq}-{35p \over 42pq}={12q-35p \over 42pq}\)

\(6-{3 \over 4a}={6 \over 1}-{3 \over 4a}={24a \over 4a}-{3 \over 4a}={24a-3 \over 4a}\)

\(7a-{8 \over 5a}={7a \over 1}⋅{5a \over 5a}-{8 \over 5a}={35a^2 \over 5a}-{8 \over 5a}={35a^2-8 \over 5a}\)

\({2x \over y}-{7 \over 3y}={6x \over 3y}-{7 \over 3y}={6x-7 \over 3y}\)

\({2y \over 6x}+{7x \over 8y}={8y^2 \over 24xy}+{21x^2 \over 24xy}={21x^2+8y^2 \over 24xy}\)

\({7a \over 2}+{a+8 \over 3}={21a \over 6}+{2(a+8) \over 6}={21a+2(a+8) \over 6}={23a+16 \over 6}\)

\({-6x-2 \over 3x-8}-4={-6x-2 \over 3x-8}-{4(3x-8) \over 3x-8}={-6x-2-4(3x-8) \over 3x-8}={-6x-2-12x+32 \over 3x-8}={-18x+30 \over 3x-8}\)

\({5 \over p}⋅-{2 \over q}=-{10 \over pq}\)

\({a \over 3}⋅{6 \over b}={6a \over 3b}={2a \over b}\)

\({1 \over 8}⋅x={x \over 8}\)

\({3b \over a}⋅{a+7 \over 9}={3b(a+7) \over 9a}={b(a+7) \over 3a}={ab+7b \over 3a}\)

\({x^2+2x+30 \over x}={x^2 \over x}+{2x \over x}+{30 \over x}=x+2+{30 \over x}\)

\({6p^2+3p-9 \over 2p^2}={6p^2 \over 2p^2}+{3p \over 2p^2}-{9 \over 2p^2}=3+{3 \over 2p}-{9 \over 2p^2}\)

\({2a \over a}={2 \over 1}=2\)

\({a \over 2a}={1 \over 2}\)

\({-25p \over 30p}=-\frac{5}{6}\)

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

\({25ab \over 45ac}={5b \over 9c}\)

\({24y \over 27xy}={8 \over 9x}\)

\({-18xyz \over -3yz}=6x\)

\({4ab \over b}+{5ac \over c}=4a+5a=9a\)