1. Sulfúrico
2. Flúor (hídrico) o (ico)
3. Pos o post (hídrico)
4. yodico o yoridico
5. Permaganico
6. biom (ico)
7. Nitrico
8. Fosforoso
9. Per-color (ico)
10. Flour (ico)
11. Niobico
12. Potasico
13. Titánico
14. Platoso
15. Vanad(ico)
The number of different 3-letter arrangements of letters is 15600 arrangements
The question has to do with permutations
<h3>What are permutations?</h3>
Permutations are the number of ways of arranging n objects in x ways. It is given by N = ⁿPₓ = n(n - 1)(n - 2)...(n - x + 1)
<h3>How many different 3-letter arrangements of letters are possible?</h3>
Since we have three initials for the luggage, and we have 26 letters of the alphabet. We have 26 letters to be permutted or arranged in 3 ways.
So, the number of arrangements is ²⁶P₃ = 26 × 25 × 24
= 15600 arrangements
So, the number of different 3-letter arrangements of letters is 15600 arrangements
Learn more about number of arrangements here:
brainly.com/question/27863219
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Answer:
csc^2x
Step-by-step explanation:
It's a trig identity where 1+cot^2x = csc^2x
Answer: Travis can buy 48 bags
Step-by-step explanation: I knew that each bag equaled 6 dollars so i multiplied 6 times 8 so that i can get 48 knowing that the bed was 45$ and Travis wanted to stay in the 15$ shipping category i added 48 + 45 and that totaled up to 93$ which is over 90$ and he wouldn't have to pay for the shipping and he gets his money worth.
Answer:
21: 35
Step-by-step explanation:
