Yes,a rational number can be on a number line :D
Rational.
well every integer fraction whole number natural number are rational number's surely rational numbers are represented on a number line and as rational numbers are the real numbers
It is rational.
The number line includes all rational numbers but also has irrational ones. It is the REAL number line. The square root of non-perfect squares are on it and pi is also on it and they are not rational.
because the # line shows the rational #'s in order from least to greatest
The line is usually taken to mean that the decimals under the line repeat. And yes, such a number is rational, since it can be converted into a fraction (with whole numerator and denominator).
The same as you would a rational number. Its distance from zero will represent the number, whether it is rational or irrational.
Yes it can be because a rational number is a number that can be written as a ratio with a fraction with denominator on top and numerator on bottom. You can turn the ratio into decimal or any ways you can and you can find it on a number line...
No. The real number line corresponds to rational AND irrational numbers.
Yes.
Real numbers can be rational or irrational because they both form the number line.
The Density Property states that, between two rational numbers on a number line there is another rational number. Mark some fractions on a number line. No matter how dense the number line is, there still is another number between the two numbers.