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When does the numbers end?
Numbers, in the context of counting, do not have an end. The concept of numbers is infinite, meaning they continue indefinitely without reaching a final number. This is due to the nature of the number system, which allows for the creation of larger and larger numbers through addition, multiplication, and other mathematical operations.
Why is rational numbers important?
Extending the set of all integers to included rational numbers give closure under division by non-zero integers. This allows equations such as 2x = 3 to be solved.
What is the importance of percentages?
Well one good thing that percentages do is they condense numbers so you can compare then more easily.
Why do the multiples of 2 5 and 10 form columns on the hundred grid whereas other numbers do not?
The multiples of 2, 5, and 10 form columns on the hundred grid because these numbers have factors that are powers of 2 and 5. This allows them to divide the grid evenly into columns. Other numbers may have factors that do not align with the grid structure, causing them to form irregular patterns rather than neat columns.
How do you calculate factors?
Read slowly. You must first find the smallest number that can be divided into the number you want to factor without leaving a remainder. Whatever the result is, you divide again by a number that allows you to divide it without leaving a remainder. You continue to divide until you have broken if you divide it any further the answer will be 1. The numbers that you have used to divide are then lined up side by side and you place periods (multiplication symbols) between each one. This symbolizes that in order to get the number you have just factored you must multiply the numbers in this way.
What is the property that allows you to regroup numbers when adding or multiplying the terms without changing the outcome?
Associative Property
Is the property that allows you regroup numbers when adding or multplying the terms without changing the outcome?
Associative property
What property allows the grouping of numbers in parentheses to change without changing the answer?
That would be the associative property. The associative property applies to addition and multiplication, but not to subtraction or division.
Which property of gases allows them to be stored at high concentrations in a bottle of air freshener?
Gases have a low density, allowing them to be compressed into a smaller volume at high pressures. This property allows gases to be stored at high concentrations in a bottle of air freshener.
How do hawks decompose?
Hawks decompose naturally. Their meat is eaten by lower creatures who are then eaten by larger ones. this allows the hawks body to get recycled.
What is the property that allows you to move parentheses in a problem and still get the same answer?
There is no property which allows you to do that in all cases. It is only possible in the case of the associative property for addition and multiplication. It does not work for subtraction or division.
The property that allows us to group numbers in an addition in anyway you want is called?
The commutative law for addition, ie a + b = b + a
What is the element that is found in all living things that allows a fungus to decompose?
Carbon.
Which type of waste treatment allows organic materials to decompose naturally?
Composting
What is the property that states that for thfree or more numbers their sum or product is always the same?
It is the combination of the commutative property: A x B = B x A And of the associative property: (A x B) x C = A x (B x C) ... that allows us to arrange factors (or numbers to be added) in any order.
What is the property that says you can change the grouping of addends?
The property that allows you to change the grouping of addends without changing the sum is called the associative property of addition. It states that you can regroup numbers being added or multiplied without affecting the final result.
Which property allows you to regroup addends?
The commutative property of addition and the commutative property of multiplication.
