Is this in greatest to least: .363, .333, .33, .309?
Yes, you're right.
Thank you for your help Ms. Sue. I knew I could count on you. I appreciate your help.
You're welcome, Mike.
I am wrong. Very Wrong.
To arrange the given numbers in greatest to least order, you can compare the decimal values.
Starting with the provided numbers:
.363, .333, .33, .309
To compare decimals, we look at the whole number part first. In this case, all the decimal numbers have a whole number part of 0.
Next, we compare the tenths place, which is the first decimal place after the decimal point.
Looking at the tenths place:
.363 has a tenths value of 3
.333 has a tenths value of 3
.33 has a tenths value of 3
.309 has a tenths value of 0
Since the tenths values are all the same except for .309, we move on to the hundredths place, which is the second decimal place after the decimal point.
Looking at the hundredths place:
.363 has a hundredths value of 6
.333 has a hundredths value of 3
.33 has a hundredths value of 3
.309 has a hundredths value of 9
Now we can see that the hundredths value of .309 is greater than both .333 and .33. So, we can determine that .309 is the greatest number among the given values.
So, the arrangement from greatest to least is: .309, .363, .333, .33