12 7x5 = 35 7+5 = 12
Each integer is a whole number and each whole number is an integer. So the set of all integers is the same as the set of all whole numbers. By the equivalence of sets, integers and whole numbers are the same.
They are not. Counting numbers are a proper subset of whole numbers. Negative integers (-1, -2, -3 etc) are whole numbers but they are not counting numbers.
The set of integers is the same as the set of whole numbers.
1 and 0 are the two whole numbers with their sum same as their difference
because you can get a positive number as EITHER a product of 2 positive numbers OR the product of the negatives of the SAME 2 numbers; the product of 2 negative numbers is positive.
2 and 2
The product of the same two numbers, is the number's square.
The product of numbers is the same as the multiplication of numbers
they are the same because they both have whole numbers
The product of 0.3 and 3 is 0.9. To calculate this, you simply multiply 0.3 by 3. When multiplying a decimal by a whole number, you can ignore the decimal point temporarily and multiply the numbers as if they were whole numbers. The final product will have the same number of decimal places as the total number of decimal places in the numbers being multiplied.
No. Prime numbers are a subset of whole numbers.
Whole numbers are the same as integers. Whole numbers are a proper subset of rational numbers.
No, they are not.
Just multiply the numerator by the whole number, and keep the same denominator. After you do that, chances are that you'll have to simplify the fraction to a mixed number.
Each integer is a whole number and each whole number is an integer. So the set of all integers is the same as the set of all whole numbers. By the equivalence of sets, integers and whole numbers are the same.
Each integer is a whole number and each whole number is an integer. So the set of all integers is the same as the set of all whole numbers. By the equivalence of sets, integers and whole numbers are the same.
No. Whole numbers cannot be irrational.