Every integer is a rational number but a rational number need not be an integer

State whether the statements given are True or False. Every integer is a rational number but every rational number need not be an integer.

Give an example to satisfy the following statements : All integers are rational numbers but all rational numbers need not be integers.

Every natural number is a rational number but a rational number need not be a natural number

Every fraction is a rational number but a rational number need not be a fraction.

In each of the following state if the statement is true (T) or false (F): (i) The quotient of two integers is always an integer. (ii) Every integer is a rational number. (iii) Every rational number is an integer. (iv) Every fraction is a rational number. (v) Every rational number is a fraction. (vi) If a/b is a rational number and m any integer, then a/b=(axxm)/(bxxm) (vii) Two rational numbers with different numerators cannot be equal. (viii) 8 can be written as a rational number with any integer as denominator. (ix) 8 can be written as a rational number with any integer as numerator. (x) 2/3 is equal to 4/6dot

Are the following statement true or false? Give reasons for your answers : (i) Every whole number is a natural number. (ii) Every integer is a rational number. ( iii) Every rational number is an integer.

State whether the statements given are True or False. Every natural number is a rational number but every rational number need not be a natural number.

Every fraction is a rational number.

Every fraction is a rational number.

Are the following statements true or false? Give reasons for your answer? Every whole number is a natural number Every integer is a rational number. Every rational number is an integer. Every natural number is a whole number. Every integer is a whole number Every rational number is a whole number