give an example to satisfy the following statement all integers are rational numbers but all rational numbers need not to be integers
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yes treatment is accurate
consider an integer 2
consider a rational number 1/4
now we know that in case of integer to there is nothing is denominator of two so we can assume the denominator to be 1 and hence it that is integer is expressed in the form of
p/q which is the general form of a rational number so we can say that each and every integer is a rational number
on the other hand 1/4 which is a rational number cannot be called as an integer because it has denominator other than 1
consider an integer 2
consider a rational number 1/4
now we know that in case of integer to there is nothing is denominator of two so we can assume the denominator to be 1 and hence it that is integer is expressed in the form of
p/q which is the general form of a rational number so we can say that each and every integer is a rational number
on the other hand 1/4 which is a rational number cannot be called as an integer because it has denominator other than 1
raminder1:
hey
Answered by
3
The integers like -1,-2,-3,-4,-5,3,5,100,-6,-7,45,-8............are all rational numbers but the rational numbers like √4,2/4,√9,√16,√25.....are not integers.
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