Breuken herleiden

\({4 \over x}:{5 \over y}={4 \over x}⋅{y \over 5}={4y \over 5x}\)

\({8 \over 9}:a={8 \over 9}:{a \over 1}={8 \over 9}⋅{1 \over a}={8 \over 9a}\)

\({8 \over 5}:{p+3q \over q}={8 \over 5}⋅{q \over p+3q}={8q \over 5(p+3q)}={8q \over 5p+15q}\)

\({5 \over 7x}+{6 \over 7x}={11 \over 7x}\)

\({9 \over a}-{5 \over 2a}={18 \over 2a}-{5 \over 2a}={13 \over 2a}\)

\({6 \over 9a}+{2 \over 5b}={30b \over 45ab}+{18a \over 45ab}={30b+18a \over 45ab}={10b+6a \over 15ab}\)

\(7+{5 \over 6p}={7 \over 1}+{5 \over 6p}={42p \over 6p}+{5 \over 6p}={42p+5 \over 6p}\)

\(3a+{8 \over 7a}={3a \over 1}⋅{7a \over 7a}+{8 \over 7a}={21a^2 \over 7a}+{8 \over 7a}={21a^2+8 \over 7a}\)

\({3x \over y}+{2 \over 6y}={18x \over 6y}+{2 \over 6y}={18x+2 \over 6y}={9x+1 \over 3y}\)

\({7y \over 4x}+{8x \over 9y}={63y^2 \over 36xy}+{32x^2 \over 36xy}={32x^2+63y^2 \over 36xy}\)

\({5x \over 8}+{x+9 \over 3}={15x \over 24}+{8(x+9) \over 24}={15x+8(x+9) \over 24}={23x+72 \over 24}\)

\({6a+7 \over -9a-1}-5={6a+7 \over -9a-1}+{-5(-9a-1) \over -9a-1}={6a+7-5(-9a-1) \over -9a-1}={6a+7+45a+5 \over -9a-1}={51a+12 \over -9a-1}\)

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

\({5x^2+7x-8 \over 9x^2}={5x^2 \over 9x^2}+{7x \over 9x^2}-{8 \over 9x^2}=\frac{5}{9}+{7 \over 9x}-{8 \over 9x^2}\)

\({5a \over a}={5 \over 1}=5\)

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

\({20x \over -35x}=-\frac{4}{7}\)

\({-45x \over 5x}=-9\)

\({12ab \over -15ac}=-{4b \over 5c}\)

\({30b \over 35ab}={6 \over 7a}\)

\({27abc \over -3bc}=-9a\)

\({4xy \over y}-{6xz \over z}=4x-6x=-2x\)

\({5 \over p}⋅{6 \over q}={30 \over pq}\)

\({a \over 3}⋅{8 \over b}={8a \over 3b}\)

\({2 \over 5}⋅x={2x \over 5}\)

\({4y \over x}⋅{x+3 \over 8}={4y(x+3) \over 8x}={y(x+3) \over 2x}={xy+3y \over 2x}\)