\({6 \over 8 a} + {7 \over 8 a} = {13 \over 8 a}\)

\({8 \over x} - {6 \over 9 x} = {72 \over 9 x} - {6 \over 9 x} = {66 \over 9 x} = {22 \over 3 x}\)

\({9 \over 4 x} + {2 \over 3 y} = {27 y \over 12 x y} + {8 x \over 12 x y} = {27 y + 8 x \over 12 x y}\)

\(8 + {3 \over 2 p} = {8 \over 1} + {3 \over 2 p} = {16 p \over 2 p} + {3 \over 2 p} = {16 p + 3 \over 2 p}\)

\({3 a \over b} - {7 \over 6 b} = {18 a \over 6 b} - {7 \over 6 b} = {18 a - 7 \over 6 b}\)

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

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

\({-10 a \over 12 a} = -\frac{5}{6}\)

\({-36 x \over 4 x} = -9\)

\({-20 x y \over 25 x z} = -{4 y \over 5 z}\)

\({6 b \over 10 a b} = {3 \over 5 a}\)

\({-15 x y z \over 5 y z} = -3 x\)

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

\(6 x - {9 \over 2 x} = {6 x \over 1} ⋅ {2 x \over 2 x} - {9 \over 2 x} = {12 x^{2} \over 2 x} - {9 \over 2 x} = {12 x^{2} - 9 \over 2 x}\)

\({9 q \over 8 p} - {3 p \over 5 q} = {45 q^{2} \over 40 p q} - {24 p^{2} \over 40 p q} = {-24 p^{2} + 45 q^{2} \over 40 p q}\)

\({5 \over a} ⋅ {3 \over b} = {15 \over a b}\)

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

\({4 \over 9} ⋅ x = {4 x \over 9}\)

\({7 y \over x} ⋅ {x + 5 \over 4} = {7 y (x + 5) \over 4 x} = {7 x y + 35 y \over 4 x}\)

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

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

\(-{3 \over 8} : {p + 4 q \over q} = -{3 \over 8} ⋅ {q \over p + 4 q} = -{3 q \over 8 (p + 4 q)} = -{3 q \over 8 p + 32 q}\)

\({8 x \over 9} + {x + 1 \over 2} = {16 x \over 18} + {9 (x + 1) \over 18} = {16 x + 9 (x + 1) \over 18} = {25 x + 9 \over 18}\)

\({-8 x + 4 \over -6 x - 7} - 5 = {-8 x + 4 \over -6 x - 7} + {-5 (-6 x - 7) \over -6 x - 7} = {-8 x + 4 - 5 (-6 x - 7) \over -6 x - 7} = {-8 x + 4 + 30 x + 35 \over -6 x - 7} = {22 x + 39 \over -6 x - 7}\)

\({6 x^{2} + 5 x + 4 \over 2 x^{2}} = {6 x^{2} \over 2 x^{2}} + {5 x \over 2 x^{2}} + {4 \over 2 x^{2}} = 3 + {5 \over 2 x} + {2 \over x^{2}}\)