How many distinctly different “words” can be formed using the letters of the word “OTTAWA”?
Question 3 (20 points) (a) How many words with or without meaning, can be formed by using all the letters of the word, 'INSAN- ITY' using each letter exactly once? (b) How many words with or without meaning, can be formed by using all the letters of the word, 'TENNESSEE' using each letter exactly once?
#4 How many different words (letter sequences) can be obtained by rearranging the letters in the word MASSACHUSETTS?
How many 6-letter code words can be formed from the letters T, O, U, DL, Y if no letter is repeated? If letters can be repeated? If adjacent letters must be different? There are possible 6-letter code words if no letter is repeated. (Type a whole number.) There are possible 6-letter code words if letters can be repeated. (Type a whole number) There are possible 6-letter code words if adjacent letters must be different. (Type a whole number.)
I have 4 questions dont know can anyone help me with any of it? ii) Consider the 11 letter word MATHEMATICS a) How many distinct words can be formed by rearranging its letters? b) How many 4 letter words can be formed using the letters in the word MATHEMATICS, using letters no more often than they appear in the word? ii) Consider the equation where xi, x2, 13, T4,5 and re are non-negative integers a) How many solutions are there...
Consider the word "TUMBARUMBA" a)How many words can be made by arranging all 10 letters? b)How many of these words included TU as a subword?
How many ways can the letters of the word KITCHEN be arranged? How many ways can the letters of the word KITCHEN be arranged if the letters H, E, and N must remain next to each other in the order HEN? If all arrangements of the letters of the word KITCHEN are equally likely, what is the probability that an arrangement will have the letters H, E, and N next to each other in the order HEN? How many ways...
How many permutations can be made using all the letters in the word Connecticut?
How many different 10 letter words (real or imaginary) can be formed from the following lettersH,T,G,B,X,X,T,L,N,J
(a) How many ways are there to pick a sequence of two different letters of the alphabet that appear in the word TUBA? Words to watch for: The word "different" tells you that you may not repeat any letter, so (T, T is not an acceptable sequence. The word "sequence" tells you that the ordering is important here: U, B) and B, U) are not the same sequence. (b) How many ways are there to pick a sequence of two...
How many different letter arrangements can be formed from the letters PEPPER? Why the answer is not 6!? Don't just solve the question, if you do so , it goes to trash thank you. So explain why is not 6! and follow the comment