Order each set of rational numbers from least to greatest: -4.5, -4 6/10 and -4.06

I'm not sure how to order these

To order the given set of rational numbers from least to greatest (-4.5, -4 6/10, and -4.06), we need to convert them to a common format.

1. Let's start with -4.5. Since it is already in decimal form, we don't need to convert it.

2. Next, let's convert -4 6/10 to decimal form:
-4 6/10 = -4 + 6/10 = -4 + 0.6 = -4.6

3. Lastly, let's convert -4.06 to fraction form:
We can write -4.06 as -4 - 6/100. Simplifying the fraction gives us -4 - 3/50.

Now that we have all the numbers in decimal form, we can order them from least to greatest:

-4.6 < -4.5 < -4 - 3/50

Therefore, the ordered set of rational numbers is:
-4.6, -4.5, -4 - 3/50

To order these rational numbers from least to greatest, we can use a technique called comparing the numbers or converting them to a common format. In this case, we have -4.5, -4 6/10, and -4.06.

First, let's convert -4 6/10 to decimal form. We can do this by dividing the numerator (6) by the denominator (10), which gives us 0.6. So, -4 6/10 can be written as -4.6.

Now we have -4.5, -4.6, and -4.06. To compare these numbers, we start from the leftmost digit and move to the right, comparing each place value.

Starting with the whole number part of the numbers, -4.5 and -4.6, we see that -4.6 is smaller because it has a larger absolute value. Next, we move to the tenths place. -4.5 has a smaller tenths place value (0) compared to -4.06, which has a tenths place value of 0. In this case, -4.06 is larger.

So, the final order from least to greatest is: -4.5, -4.06, -4.6.

Least to greates.means smaller to larger,

First number is= -4.5 or -4.50
Second number is = -46/10= -4.6 or -4.60
Third number is = -4.06
Order to write least to greatest = -4.6, -4.5, -4.06.
According to this:
...... -6, -5, -4, -3, -2, -1, 0, 1, 2, 3, 4, 5, 6.....
So the left hand side from zero in minus and -6 is smaller than -5, and-5 is smaller than -4, biggest number is -1 in left hand side.