no
It is infinite
A straight line with no end points such as the number line
A number line extends infinitely in both directions, proven with two small arrows on either end It is numbers... in a line!!!! :)
well, a line consists of an infinite number of points the three important points on a line are start (the origin of the line) end (the end of the line) midpoint (halfway across the line)
I can't physically show you a number line, but I can describe it! A number line is a straight line where numbers are placed at equal intervals. It starts at zero in the middle, with negative numbers to the left and positive numbers to the right, stretching infinitely in both directions.
If you start with a small number like -14 and end with 98, you can show that the numbers on the number line continue and don't come randomly. Also, it is understood better than a non-sequenced line.
We assume you are graphing on a number line, not an x-y plane. Draw an "open" circle (not filled in) at -4, and a line from it across to the right end of the number line. Put an arrow on the end of the line to show that the graph continues to the right.
No. However, it does have to have a beginning number. beside the beginning number, on the actual line, you would put an arrow on the end of it, because numbers are infinite in both directions.
No, not necessarily. A number line can start and end wherever you need it. But if you are including both positive and negative numbers, then there needs to be a position for zero.
Infinitely many. There an infinite number of points on a line and each point can be an end point of two rays.
The arrows at the ends of a number line indicate that the line extends forever in both directions (i.e. towards positive infinity and negative infinity)...since there is no largest or smallest real number.