Answer:
There are 5040 different anagrams of FLORIDA.
Step-by-step explanation:
We are given the following in the question:
Anagram of FLORIDA.
Letters are:
F, L, O, R, I, D, and A
There are 7 letters.
Thus, the number of anagrams are given by n!, where n are the number of letters in the word.
Number of anagrams =
Thus, there are 5040 different anagrams of FLORIDA.
How many multiples? I'll give you the first 10
1- 5
2- 15
3- 25
4- 35
5- 45
6- 55
7- 65
8- 75
9- 85
10- 95
We can represent the three integers with x, x + 2, and x + 4
This shows that the integers ascend in two units at a time, which are consecutive even integers. Next we can just translate the equation straight through.
5(x+4)=2(x + x + 2 + 42)
5x + 20 = 2(2x + 44)
5x + 20 = 4x + 88
x = 68
The integers are 68, 70, and 72
Answer:
Factor
Step-by-step explanation:
Sum = Answer of an addition problem
Variable = 
or 
The factor should answer the question
12 times 2 is 24, and 24 times 2 is 48, so there was 48 cookies
