Prove (i) commutative law for addition (ii) coommutative law for multiplication by taking any two rational numbers.

The addition of two rational number is a

In the case of irrational numbers - (i) State the commutative law for addition . By . Taking any 2 irrational numbers, prove the law, State the commutative law of multiplication By taking any 2 irrational numbers, prove the law,

For rational numbers (i) state the associative law on addition, By choosing and three rational numbers prove the law. (ii) State the associative law on multiplication . By choosing any three rational numbers prove the law.

In the case of irrational numbers (i) State the associative law for addition . By taking any three- irrational numbers, prove the law.

Write the component statements of the following compound statements and check whether the compound statement is true or false (i) Venus is the smallest and Jupiter is the largest planet of solar system. (ii) India is a country and Asia is a continent. (iii) Commutative law holds for addition and subtraction of rational number. (iv) Additive inverse exists for natural number and rational number (v) 32 is a multiple of 2, 3 and 4.

Express the following properties with variables x, y and z. (i) Commutative property of addition (ii) Commutative property of multiplication (iii) Associative property of addition (iv) Associative property of multiplication (v) Distributive property of multiplication over addition

If a=5/2, b=7/4, c=1/3 then verify associative law of multiplication of rational numbers

Write the component statements of the following compound statements and check whether the compound statement is true or false · (i) Venus is the smallest and. Jupiter is the largest planet of solar system. (ii) India is a country and Asia is a continent. (iii) Commutative law holds for addition and subtraction of rauonal number. (iv) Additive inverse exists for natural number and rational nutnber (v) 32 is a multiple of 2, 3 and 4.

There are ________ rational numbers between any two rational numbers.