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What is rational numbers but not integer?
A rational number is any number of the form p/q where p and q are integers and q is not zero. If p and q are co=prime, then p/q will be rational but will not be an integer.
Are all integers rational?
Yes, all integers are rational.Yes.Rational numbers are those numbers which can be expressed in the form (p/q) where 'q' is not equal to 0.since 'q' can be 1, every integer can be expressed in this form and hence is a rational number.For example, the integer 3 can be expressed as 3/1 which is of the (p/q) form.
What is an example of a situation in which it is appropriate to use a rational number but not an integer?
When the number can be expressed as a ratio of the form p/q where p and q are integers and in their simplest form, q >1.
What is the converse of If a number is a whole number then it is an integer?
"If a number is an integer, then it is a whole number." In math terms, the converse of p-->q is q-->p. Note that although the statement in the problem is true, the converse that I just stated is not necessarily true.
What is the difference between modular arithmetic and ordinary arthmetic?
given any positive integer n and any integer a , if we divide a by n, we get an integer quotient q and an integer remainder r that obey the following relationship where [x] is the largest integer less than or equal to x
if p is an p integer and q is a nonzero integer?
if p is an integer and q is a nonzero integer
What statement is true if P is an Integer and Q is a nonzero integer?
Any fraction p/q where p is an integer and q is a non-zero integer is rational.
Which of the following statements is true if p is an integer and q is a nonzero integer?
Then p/q is a rational number.
What is rational numbers but not integer?
A rational number is any number of the form p/q where p and q are integers and q is not zero. If p and q are co=prime, then p/q will be rational but will not be an integer.
What statement is true if p is an integer and q is a nonzero integer fraction?
Any fraction p/q where p is an integer and q is a non-zero integer is rational.
Why doesn't prime factorization work on addition?
This is because a factor is defined in terms of multiplication, not addition. One integer, p, is a factor of another integer, q, if there is some integer, r (which is not equal to 1) such that p*r = q.
Why is there sometimes a remainder in division?
Because sometimes there will be things leftover and you can't split it all up in the question.
Meaning of non-integer rational numbers?
non integer rational numbers means the numbers in p/q form and this value is not a perfect integer. ex: 22/7
Are all integers rational?
Yes, all integers are rational.Yes.Rational numbers are those numbers which can be expressed in the form (p/q) where 'q' is not equal to 0.since 'q' can be 1, every integer can be expressed in this form and hence is a rational number.For example, the integer 3 can be expressed as 3/1 which is of the (p/q) form.
Given that p is an integer q -12 and the quotient of p q is -3 find p.?
If: q = -12 and p/q = -3 Then: p = 36 because 36/-12 = -3
How do you know if a number is irrational?
Let Q be all the rational numbers, where Q={m/n:m is an integer and n is a natural}Every number does not belong to Q is irrational.
What is an example of a situation in which it is appropriate to use a rational number but not an integer?
When the number can be expressed as a ratio of the form p/q where p and q are integers and in their simplest form, q >1.
