Look at several examples of rational numbers in the form p
q
(q ≠ 0), where p and q are
integers with no common factors other than 1 and having terminating decimal
representations (expansions). Can you guess what property q must satisfy?
Answers
Step-by-step explanation:
The property that q must satisfy in order that the rational numbers in the
The property that q must satisfy in order that the rational numbers in the from
The property that q must satisfy in order that the rational numbers in the from q
The property that q must satisfy in order that the rational numbers in the from qp
The property that q must satisfy in order that the rational numbers in the from qp
The property that q must satisfy in order that the rational numbers in the from qp , where p and q are integers with no
The property that q must satisfy in order that the rational numbers in the from qp , where p and q are integers with no common factor other than 1, have maintaining decimal representation is
The property that q must satisfy in order that the rational numbers in the from qp , where p and q are integers with no common factor other than 1, have maintaining decimal representation is prime factorization of q has only powers of 2 or power of 5 or both .
The property that q must satisfy in order that the rational numbers in the from qp , where p and q are integers with no common factor other than 1, have maintaining decimal representation is prime factorization of q has only powers of 2 or power of 5 or both . i.e 2
The property that q must satisfy in order that the rational numbers in the from qp , where p and q are integers with no common factor other than 1, have maintaining decimal representation is prime factorization of q has only powers of 2 or power of 5 or both . i.e 2 m
The property that q must satisfy in order that the rational numbers in the from qp , where p and q are integers with no common factor other than 1, have maintaining decimal representation is prime factorization of q has only powers of 2 or power of 5 or both . i.e 2 m ×5
The property that q must satisfy in order that the rational numbers in the from qp , where p and q are integers with no common factor other than 1, have maintaining decimal representation is prime factorization of q has only powers of 2 or power of 5 or both . i.e 2 m ×5 n
The property that q must satisfy in order that the rational numbers in the from qp , where p and q are integers with no common factor other than 1, have maintaining decimal representation is prime factorization of q has only powers of 2 or power of 5 or both . i.e 2 m ×5 n , where m=1,2,3,⋯ or n=1,2,3,⋯
I hope it's helpful
itzMannat
Answer:
5/7 is a rational number staisfied all these property