Advertisements
Advertisements
Question
Verify the property: x × (y × z) = (x × y) × z by taking:
Advertisements
Solution
\[\text{We have to verify that} x \times (y \times z) = (x \times y) \times z . \]
\[(i) x = \frac{- 7}{3}, y = \frac{12}{5}, z = \frac{4}{9}\]
\[x \times (y \times z) = \frac{- 7}{3} \times (\frac{12}{5} \times \frac{4}{9}) = \frac{- 7}{3} \times \frac{16}{15} = \frac{- 112}{45}\]
\[(x \times y) \times z = (\frac{- 7}{3} \times \frac{12}{5}) \times \frac{4}{9} = \frac{- 28}{5} \times \frac{4}{9} = \frac{- 112}{45}\]
\[ \therefore \frac{- 7}{8} \times (\frac{15}{5} \times \frac{4}{9}) = (\frac{- 7}{8} \times \frac{15}{5}) \times \frac{4}{9}\]
\[\text{Hence verified .} \]
APPEARS IN
RELATED QUESTIONS
Verify the property: x × y = y × x by taking:
Verify the property: x × y = y × x by taking:
Verify the property: x × (y × z) = (x × y) × z by taking:
Verify the property: x × (y + z) = x × y + x × z by taking:
Name the property of multiplication of rational numbers illustrated by the following statements:
Name the property of multiplication of rational numbers illustrated by the following statements:
By what number should we multiply \[\frac{- 1}{6}\] so that the product may be \[\frac{- 23}{9}?\]
By what number should we multiply \[\frac{- 15}{28}\] so that the product may be\[\frac{- 5}{7}?\]
Which of the following is an example of distributive property of multiplication over addition for rational numbers?
Verify the property x × (y + z) = x × y + x × z of rational numbers by taking.
`x = (-2)/3, y = (-4)/6, z = (-7)/9`
