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\({7 \over p}:{2 \over q}={7 \over p}⋅{q \over 2}={7q \over 2p}\)

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

\({7 \over 3}:{x-5y \over y}={7 \over 3}⋅{y \over x-5y}={7y \over 3(x-5y)}={7y \over 3x-15y}\)

\({4 \over 5x}-{3 \over 5x}={1 \over 5x}\)

\({2 \over a}-{8 \over 4a}={8 \over 4a}-{8 \over 4a}={0 \over 4a}={0 \over a}\)

\({8 \over 2a}-{7 \over 3b}={24b \over 6ab}-{14a \over 6ab}={24b-14a \over 6ab}={12b-7a \over 3ab}\)

\(4-{6 \over 5a}={4 \over 1}-{6 \over 5a}={20a \over 5a}-{6 \over 5a}={20a-6 \over 5a}\)

\(9p-{7 \over 8p}={9p \over 1}⋅{8p \over 8p}-{7 \over 8p}={72p^2 \over 8p}-{7 \over 8p}={72p^2-7 \over 8p}\)

\({3x \over y}+{6 \over 5y}={15x \over 5y}+{6 \over 5y}={15x+6 \over 5y}\)

\({7y \over 8x}-{4x \over 3y}={21y^2 \over 24xy}-{32x^2 \over 24xy}={-32x^2+21y^2 \over 24xy}\)

\({a \over 2}+{a-4 \over 3}={3a \over 6}+{2(a-4) \over 6}={3a+2(a-4) \over 6}={5a-8 \over 6}\)

\({-3x+4 \over 7x-5}-2={-3x+4 \over 7x-5}-{2(7x-5) \over 7x-5}={-3x+4-2(7x-5) \over 7x-5}={-3x+4-14x+10 \over 7x-5}={-17x+14 \over 7x-5}\)

\({9 \over x}⋅{6 \over y}={54 \over xy}\)

\({p \over 4}⋅-{8 \over q}=-{8p \over 4q}=-{2p \over q}\)

\({9 \over 7}⋅a={9a \over 7}\)

\({6q \over p}⋅{p+7 \over 8}={6q(p+7) \over 8p}={3q(p+7) \over 4p}={3pq+21q \over 4p}\)

\({4p^2-2p+60 \over 2p}={4p^2 \over 2p}-{2p \over 2p}+{60 \over 2p}=2p-1+{30 \over p}\)

\({4x^2+8x+2 \over 9x^2}={4x^2 \over 9x^2}+{8x \over 9x^2}+{2 \over 9x^2}=\frac{4}{9}+{8 \over 9x}+{2 \over 9x^2}\)

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

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

\({12a \over 16a}=\frac{3}{4}\)

\({20p \over -4p}=-5\)

\({-12xy \over 32xz}=-{3y \over 8z}\)

\({25b \over -35ab}=-{5 \over 7a}\)

\({-30abc \over -5bc}=6a\)

\({5xy \over y}-{2xz \over z}=5x-2x=3x\)