1,2,3,4,6, 8,12,16,24 ,48
252 2x126 2x2x63 2x2x3x3x7
2.2.3 and
Factors can be listed as factor pairs. With square numbers, one of those pairs will be the same number twice. When written as a list, only one of them will be used, leaving an odd number of factors.
These are the factor pairs of 1218: 1218,1 609,2 406,3 203,6 174,7 87,14 58,21 42,29
First, multiply the consecutive numbers. Your total will be the highest factor.
So, when two negative numbers multiply, their product is a positive number (Remember the rule: minus x minus = plus). So, both the numbers in the factor pair should be either negative or positive to give a positive number as a product. For example: (-3 and -6) and (-2 and -9) form factor pairs for 18.
Factor pairs are any two numbers being multiplied to give you a certain number. Examples for 20: 1x20, 20x1, 2x10, 10x2, 4x5, and 5x4 are all factor pairs for 20.
252 2x126 2x2x63 2x2x3x3x7
"Distinct" in this case means different. Sometimes factors are repeated. Square numbers have a factor pair that is the same number twice. When we write out the list of numbers, we don't write that number twice. The factor pairs of 100 are (100,1)(50,2)(25,4)(20,5)(10,10) The distinct factors of 100 are 1, 2, 4, 5, 10, 20, 25, 50, 100
It's not really. The process is essentially the same. It's just a matter of where on the page you write the numbers.
2.2.3 and
17
Write down four pairs of numbers with a quotient of 12.1.) 12 divided by 12.) 24 divided by 23.) 60 divided by 54.) 36 divided by 3
The product of two numbers is the resulting number when they are multiplied together. As there is an infinite amount of numbers it would be impossible to write out the result of the product of all pairs of numbers
One factor pair of square numbers would be the same number twice. When you list them, you only write it once.
write these numbers using prime factors. give your anwser using powers. 99= ( ) x ( ) x ( ) =( ) x ( ) help need my homework to be in soon xx
Factors can be listed as factor pairs. With square numbers, one of those pairs will be the same number twice. When written as a list, only one of them will be used, leaving an odd number of factors.