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First, Second, Third, Fourth, Fifth, Sixth, Seventh, Eighth, Ninth, Tenth

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Q: What are the examples of ordinal numbers from 1 to 10?

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There are many ways to get a sum of 10. Here are some examples: -2+6+2=10 -8+1+1=10 -3+6+1=10 -1+3+6=10 -0+1+9=10

The two numbers 10 and -1: 10 × -1 = -10 10 + -1 = 10 - 1 = 9

2/4, 8/10 or any ration of numbers that have a common factor other than 1.

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There are no mixed numbers that are equal to 3. The only number equal to 3 is ' 3 ',which is not a mixed number.There are an infinite number of pairs of mixed numbers whose sum is 3.A few examples are:1-1/10 plus 1-9/101-3/10 plus 1-7/101-37/63 plus 1-26/63There are also an infinite number of pairs of mixed numbers whose difference is 3.A few examples are:5-1/10 minus 2-1/107-3/10 minus 4-3/108-19/37 minus 5-19/37There are also an infinite number of pairs of mixed numbers whose product is 3.A few examples are:1-1/5 times 2-1/21-3/5 times 1-7/81-4/5 times 1-2/3Sadly, there can't be any pair of mixed numbers whose quotient is 3.

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Ordinal numbers are defined as the way that numbers are ordered in a set of numbers. For example: 1; 2; 3. Examples can be found at the Maths Can Be Fun website.

Ordinal numbers refers to numbers in order, e.g. 1st, 2nd, 3rd, 4th and so on. Cardinal numbers refers to numbers as they are when counting - e.g. 1, 2, 3, 4 etc.

Cardinal utility is seen in instances where satisfaction can be measured in numbers like 1, 2, 3 and for example, someone may prefer 2 hamburgers to 1. In ordinal utility, it is impossible to quantify the utility according to numbers, but here, preference and rank come to play. Someone would rate a bicycle lower than a motorcycle.

examples of counting numbers = 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, ...

Use ordinal numbers: 0, 1, 2, ...

I think you mean ordinal data. Similar to the golf tournament, you need to determine where to "cut" (from the ordinal data) so as to divide the data into different categories (to the nominal data). For example, if the ordinal data range from 1 to 6 (where 1 = the best) and the cut is 3, then you convert all the numbers from 1 to 3 to "1" (which represents "good") and the all numbers from 4 to 6 to "2" (which represents "bad"). In other words, 1, 2, and 3 from the original ordinal data set are converted to "1" (ordinal data); whereas 4, 5, and 6 from the original date set now become "2" (ordinal data). Eddie T.C. Lam

1 and 789, or 10 and 78.9 are two examples.

It is an ordinal value. ----- Here's one way to see this. Suppose you start take birthday 1 January 2000 to be 1, birthday 2 January 2000 to be 2, ... , birthday 31 January 2000 to be 31, then birthday 1 February 2000 to be 32, and so on, number all of the birthdays until today, you will have a number of about 5104. If you need birthdays before 1 January 2000 you could use negative numbers. Clearly these numbers are ordered and form an ordinal scale.

I assume you mean the first three "counting" (ordinal) numbers, which are 1, 2, and 3. The sum is therefore 1 + 4 + 9 = 14.

There are many ways to get a sum of 10. Here are some examples: -2+6+2=10 -8+1+1=10 -3+6+1=10 -1+3+6=10 -0+1+9=10

Any number and its reciprocal. Examples: 1/2 and 2 1/3 and 3 1/10 and 10 1 million and 0.000001

Three examples: 1 and 924 or 10 and 92.4 or 100 and 9.24