Breuken herleiden

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

\(-{2 \over 5}:x=-{2 \over 5}:{x \over 1}=-{2 \over 5}⋅{1 \over x}=-{2 \over 5x}\)

\({3 \over 4}:{a-6b \over b}={3 \over 4}⋅{b \over a-6b}={3b \over 4(a-6b)}={3b \over 4a-24b}\)

\({7 \over 5p}-{2 \over 5p}={5 \over 5p}={1 \over p}\)

\({4 \over x}-{8 \over 9x}={36 \over 9x}-{8 \over 9x}={28 \over 9x}\)

\({8 \over 2a}+{5 \over 9b}={72b \over 18ab}+{10a \over 18ab}={72b+10a \over 18ab}={36b+5a \over 9ab}\)

\(5+{2 \over 9x}={5 \over 1}+{2 \over 9x}={45x \over 9x}+{2 \over 9x}={45x+2 \over 9x}\)

\(4x-{7 \over 5x}={4x \over 1}⋅{5x \over 5x}-{7 \over 5x}={20x^2 \over 5x}-{7 \over 5x}={20x^2-7 \over 5x}\)

\({7a \over b}-{8 \over 4b}={28a \over 4b}-{8 \over 4b}={28a-8 \over 4b}={7a-2 \over b}\)

\({2q \over 9p}+{5p \over 7q}={14q^2 \over 63pq}+{45p^2 \over 63pq}={45p^2+14q^2 \over 63pq}\)

\({7a \over 6}+{a+2 \over 5}={35a \over 30}+{6(a+2) \over 30}={35a+6(a+2) \over 30}={41a+12 \over 30}\)

\({-8x-6 \over 4x-9}+7={-8x-6 \over 4x-9}+{7(4x-9) \over 4x-9}={-8x-6+7(4x-9) \over 4x-9}={-8x-6+28x-63 \over 4x-9}={20x-69 \over 4x-9}\)

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

\({8x^2+4x-6 \over 9x^2}={8x^2 \over 9x^2}+{4x \over 9x^2}-{6 \over 9x^2}=\frac{8}{9}+{4 \over 9x}-{2 \over 3x^2}\)

\({3a \over a}={3 \over 1}=3\)

\({p \over 3p}={1 \over 3}\)

\({-21a \over 24a}=-\frac{7}{8}\)

\({-30x \over -5x}=6\)

\({-8xy \over 10xz}=-{4y \over 5z}\)

\({14b \over 18ab}={7 \over 9a}\)

\({-25xyz \over -5yz}=5x\)

\({4ab \over b}+{2ac \over c}=4a+2a=6a\)

\({6 \over a}⋅{4 \over b}={24 \over ab}\)

\({p \over 2}⋅-{6 \over q}=-{6p \over 2q}=-{3p \over q}\)

\({9 \over 8}⋅x={9x \over 8}\)

\({9q \over p}⋅{p+5 \over 7}={9q(p+5) \over 7p}={9pq+45q \over 7p}\)