What is the probability that it is a letter of the word 'MATHEMATICS'? (a) 4/13 (b) 9/26 (c) 5/13 (d) 11/26 The word 'MATHEMATICS has letters M, A, T, H, E, ...How many arrangements of letters can you make from the word mathematics? I calculate 39,916,800. That includes all arangements (1 - 11 letters) and treats each of the 2 a’s and the 2 t’s as separate. Original Name 4 y Related How many arrangements can be made with the letters of the word mathematics if M is at both extremes? muskegon obituaries this week The word MATHEMATICS consist of 11 letters: (M,M), (A,A), (T,T), H,E,I,C,S . Case 1: In this case 2 similar and 2 similar letters are selected, number of arrangements = 3 C 2 × \(\frac{4!}{2!\space2!}=756\) Case 2: In this case all 4 letters selected are different, number of arrangements = 8 C 4 × 4! = 1680 . Therefore, total number of arrangement …Now the total number of ways of arranging 4 letters is given by the sum of the number of ways in the three cases. ⇒ N = N 1 + N 2 + N 3 On substituting, we get ⇒ N = 1680 + 756 + 18 On adding, we get ⇒ N = 2454 Therefore, the number of ways in which four letters of the word MATHEMATICS can be arranged is 2454. So, the correct answer is option D.Feb 28, 2016 · In how many ways can the letters of the word ARRANGEMENTS be arranged? a) Find the probability that an arrangement chosen at random begins with the letters EE. b) Find the probability that the consonants are together. To find how many ways the letter can be arranged, it will be 12! / 2! * 2! * 2! *2! *2! ? Feb 28, 2016 · In how many ways can the letters of the word ARRANGEMENTS be arranged? a) Find the probability that an arrangement chosen at random begins with the letters EE. b) Find the probability that the consonants are together. To find how many ways the letter can be arranged, it will be 12! / 2! * 2! * 2! *2! *2! ? greg hightower if letters of the word MATHEMATICS are arranged then the probability that C come before E,E be - YouTube 0:00 / 4:15 if letters of the word MATHEMATICS are arranged then the probability... wwe randy orton naked pics Explanation for the correct option: Finding arrangement: Total number words in ‘MATHEMATICS’ is 11 Therefore arrangement will be 11! But letter ‘M, T & A’ are repeated twice therefore their arrangement is given by 2! for each letter Arrangement = p e r m u t a t i o n o f n o o f w o r d s t o t a l n u m b e r o f w o r d s r e p e a t e d The word MATHEMATICS consist of 11 letters: (M,M), (A,A), (T,T), H,E,I,C,S Case 1: In this case 2 similar and 2 similar letters are selected, number of arrangementsAnswer (1 of 10): In the word 'MATHEMATICS', we'll consider all the vowels AEAI together as one letter. Thus, we have MTHMTCS (AEAI). Now, we have to arrange 8 letters, out of …Best answer The word MATHEMATICS consist of 11 letters: (M,M), (A,A), (T,T), H,E,I,C,S Case 1: In this case 2 similar and 2 similar letters are selected, number of arrangements = 3C2 × 4! 2! 2! = 756 4! 2! 2! = 756 Case 2: In this case all 4 letters selected are different, number of arrangements = 8C4 × 4! = 1680 22 rims for chevy tahoeAnswer (1 of 10): In the word 'MATHEMATICS', we'll consider all the vowels AEAI together as one letter. Thus, we have MTHMTCS (AEAI). Now, we have to arrange 8 letters, out of …The problem can be thought of as distinct permutations of the letters GGGYY; that is arrangements of 5 letters, where 3 letters are similar, and the remaining 2 letters are similar: 5! 3!2! = 10 Just to provide a little more insight into the solution, we list all 10 distinct permutations:noun an act of arranging; state of being arranged. the manner or way in which things are arranged: a tactful arrangement of the seating at dinner. a final settlement; adjustment by agreement: The arrangement with the rebels lasted only two weeks. triangle swimsuits These can be very helpful when you're stuck on a problem and don't know how to "find the number of distinguishable arrangements of each of the following ""words.""". Do My Homework. Solved Find the number of distinguishable arrangements of. Determine the number of distinguishable arrangements for the words. SASKATOON. Good Question …Find the number of distinguishable arrangements of the letters score: UJI 10.3 2.33 of the letters of the word: Find the number of distinguishable arrangements SEXTILLION 907,200' distinguishable arrangements: There are 222 Tutors 93% Improved Their Grades 54741 Clients Get Homework HelpExplanation: If you pick any letter ( m, a, t, or h) for the first "letter slot" in the word, there are four different choices. Then, for the next "slot", you have three other letters to choose from to put in there, so that triples the combinations. That's already 4 ⋅ 3 possible ways, or 12. For the third slot, you only have two other letters ...Permutations P(n,r) (video lessons, examples and solutions) How To Solve Permutation Word Problems? Find P(7,3) and P(15,5) If a class has 28 students, how many different arrangements can 5 students give a presentationSolution: ‘CHAIR’ contains 5 letters. Therefore, the number of words that can be formed with these 5 letters = 5! = 5*4*3*2*1 = 120. Problem 2: Find the number of words, with or without meaning, that can be formed with the letters of the word ‘INDIA’. Solution: The word ‘INDIA’ contains 5 letters and ‘I’ comes twice.Total number ways of arranging MATHEMATICS letters = 11!/ (2!*2!*2!) = 4989600. Two Ms come together = 10!/ (2!*2!) = 907200. Two Ms don't come together = 4989600-907200 = 4082400. Deepa said: (Oct 28, 2014) Number of ways of arranging these letters = 4!/2! = 2! And than the answer was = 10080*2*1 = 20160. Salman Khan said: (Jan 2, 2015)Solution. The problem is easily solved by the multiplication axiom, and answers are as follows: The number of four-letter word sequences is 5 ⋅ 4 ⋅ 3 ⋅ 2 = 120. The number of three-letter word sequences is 5 ⋅ 4 ⋅ 3 = 60. The number of two-letter word sequences is 5 ⋅ 4 = 20. We often encounter situations where we have a set of n ...Correct option is C) In the word 'MATHEMATICS', we treat the vowels AEAI as one letter. Thus, we have MTHMTCS (AEAI). Now, we have to arrange 8 letters, out of which M occurs twice, T occurs twice and the rest are different. ∴ Number of ways of arranging these letters = (2!)(2!)8! =10080. houses for rent for dollar500 a month If the letters of the word 'MATHEMATICS' are arranged arbitrarily, the probability that C comes before E,E before H,H before I and I before S, is A 751 B 241 C 1201 D 79201 Hard Solution Verified by Toppr Correct option is D) Given wold is MATHEMATICS ⇒11 character no. of m's = no.of A's = no.of T's = 2 ∴ Total possible outcomes = 2!2!2!11!29-Nov-2021 ... In mathematics, permutation is also known as the process of organizing a group in which all the members of a group are arranged into some ... cremona international music academy Solution (By Examveda Team) In the word 'MATHEMATICS', we treat the vowels AEAI as one letter. Thus, we have MTHMTCS (AEAI). Now, we have to arrange 8 letters, out of which M occurs twice, T occurs twice and the rest are different. 8! ( 2!) ( 2!) Now, AEAI has 4 letters in which A occurs 2 times and the rest are different.Solved Find the number of distinguishable arrangements of. Determine the number of distinguishable arrangements for the words. SASKATOON. Good Question (199). lesbien pussy licking The letters of the word MATHEMATICS can be arranged in 4989600 distinct ways. Apart from the word MATHEMATICS, you may try different words with various lengths with or without repetition of letters to observe how it affects the nPr word permutation calculation to find how many ways the letters in the given word can be arranged.In this calculation, the statistics and probability function permutation (nPr) is employed to find how many different ways can the letters of the given word be arranged. This word permutations calculator can also be called as letters permutation, letters arrangement, distinguishable permutation and distinct arrangements permutation calculator.In mathematics, a permutation of a set is, loosely speaking, an arrangement of its members into a sequence or linear order, or if the set is already ordered, a rearrangement of its elements. The word "permutation" also refers to the act or process of changing the linear order of an ordered set. manifold replacement cost jeep patriot For the next two parts, we will fix the first letter of the word as C and T in order to find out the different arrangements possible. Complete step-by-step answer: The …Solved Find the number of distinguishable arrangements of. Determine the number of distinguishable arrangements for the words. SASKATOON. Good Question (199). The word DEVELOPMENT comes at the position of 1257. So the rank of the word "DEVELOPMENT" is 1257. Example : The letters of the word ZENITH are written in all possible orders. If all the words are written in a dictionary, what is the rank or order of the word ZENITH ? Solution : No. of new words formed with the letters of the word. ZENITH … anason cayi emziren anneler Math is important because it is used in everyday life. People use math when buying things, making life plans and making other calculations. Math is vital in so many different areas, and some level of the subject is required for the majority...Could use some work with understanding simplifying and not just answering the question. Don't hesitate to download it, you should take this app if you have problems for mathematics, also, It is very easy to find he answers. How many arrangements are there of the word MATHEMATICS? Rule: Start with the factorial of the number of letters in the word. Then, for each indistinguishable letter in the word, divide by the factorial of the number of times that letter occurs in the word. "MATHEMATICS" is an 11-letter word. Jul 10, 2019 · The word MATHEMATICS has eleven letters, including seven consonants and four vowels. Choose two of the eleven positions for the As, one of the remaining nine positions for the E, and one of the remaining eight positions for the I. Determine the number of distinguishable arrangements for the words. SASKATOON. Good Question (199). Gauth Tutor Solution. user avatar image ... To determine what the math problem is, you will need to look at the given information and figure out what is being asked. Once you know what the problem is, you can solve it using the given information. … trenton nj train station to newark airport For all 3 cases, we get number of ways to arrange vowels as 3 (10) = 30 ways. Now remaining 6 consonants out of which 2 are T's are to be arranged, which can be done in 2!6! = 360 ways. Hence required number of words are (1). (30) (360) = 1080. Student review 100% (1 rating) Thorough explanationThe correct solution is as provided by you and it should be 11!/ (2!*2!*2!) MATHEMATICS = MM AA TT HEICS. So, total 11 letters to be arranged in 11! ways and divided by 2! each for the duplicates created by MM, AA, TT which can be arranged among themselves in 2! ways. = 11!/ (2!*2!*2!) whenpercent27s the next full.moon With repetition: (a) The number of permutations (arrangements) of n different objects, taken r at a time, when each object may occur once, twice, thrice ….. upto r times in any arrangement. = The number of ways of filling r places where each place can be filled by any one of n objects. The number of permutations = The number of ways of ...For the case both T's before both A's : We can picture the permutation as follows : (7) T (7) T (7) A (7) A (7) (Remaining letters: M H E M I C S - total 7) Each of the brackets are …As a student who is still okay with math, this helped a lot. Complete lifesaver, only gripe is having to pay to see the steps. There is a few expressions they can't yet solve like word sums and the language you can choose to read word sums. microsoft edge install Mathematic can be arranged in 453,600 different ways if it is ten letters and only use each letter once. Assuming all vowels will be together 15,120 arrangements. … pregnant and rejected by my alpha mate read online free Find the number of distinguishable arrangements of the letters score: UJI 10.3 2.33 of the letters of the word: Find the number of distinguishable arrangements SEXTILLION 907,200' distinguishable arrangements: There are 222 Tutors 93% Improved Their Grades 54741 Clients Get Homework HelpQuestion: The letters in the word MATHEMATICS are arranged randomly What is the probability that the first letter is E? What is the probability that the first ...Solved Find the number of distinguishable arrangements of. Determine the number of distinguishable arrangements for the words. SASKATOON. Good Question (199). Solved Find the number of distinguishable arrangements of. Determine the number of distinguishable arrangements for the words. SASKATOON. Good Question (199). tonightpercent27s lotto results How many arrangements of letters can you make from the word mathematics? I calculate 39,916,800. That includes all arangements (1 - 11 letters) and treats each of the 2 a’s and the 2 t’s as separate. Original Name 4 y Related How many arrangements can be made with the letters of the word mathematics if M is at both extremes? How many arrangements are there of the word MATHEMATICS? Rule: Start with the factorial of the number of letters in the word. Then, for each indistinguishable letter in the word, divide by the factorial of the number of times that letter occurs in the word. "MATHEMATICS" is an 11-letter word. switch for a ceiling fan Q. Consider the letters of the word 'MATHEMATICS'. Possible number of words taking all letters at a time such that at least one repeating letter is at odd position in each word is … real mermaid pictures Jul 10, 2019 · The word MATHEMATICS has eleven letters, including seven consonants and four vowels. Choose two of the eleven positions for the As, one of the remaining nine positions for the E, and one of the remaining eight positions for the I. Number of letter = n = 4 Since 2A, p1 = 4 Number of words = 4!/2! = 12 Thus, Total no of words starting with A, G, & I = 24 + 12 + 12 = 48 Hence, 49th …Correct option is C) In the word 'MATHEMATICS', we treat the vowels AEAI as one letter. Thus, we have MTHMTCS (AEAI). Now, we have to arrange 8 letters, out of which M occurs twice, T occurs twice and the rest are different. ∴ Number of ways of arranging these letters = (2!)(2!)8! =10080.Jan 3, 2016 · 3 Answers Sorted by: 1 For part b, arrange the consonants MTHMTCS in 7! 2! 2! ways and then arrange the vowels AEAI, together with XXXX, meaning four blanks or no vowels, in 8! 2! 4! ways, into the 8 gaps before between and after the consonants. Then multiply the results. Share Cite Follow answered Jan 2, 2016 at 22:21 David Quinn 32.4k 3 18 48 psikolojinin bozuk oldugunu nasil anlariz Word problems in permutations and combinations: Formulas, solved examples and quiz for practice questions in GMAT & GRE. Solve step-by-step The step-by-step format is easy to follow and helps readers understand the process. To determine the number of ways the word "mathematics" can be arranged, we can use the formula for permutations with repetition. The formula is: n! / (r1! * r2! * ... * rk!) where n is the total number of items, and r1, r2, ..., rk are the number of items of each type. For the word "mathematics", we have:Jan 3, 2016 · 3 Answers Sorted by: 1 For part b, arrange the consonants MTHMTCS in 7! 2! 2! ways and then arrange the vowels AEAI, together with XXXX, meaning four blanks or no vowels, in 8! 2! 4! ways, into the 8 gaps before between and after the consonants. Then multiply the results. Share Cite Follow answered Jan 2, 2016 at 22:21 David Quinn 32.4k 3 18 48 Now the total number of ways of arranging 4 letters is given by the sum of the number of ways in the three cases. ⇒ N = N 1 + N 2 + N 3 On substituting, we get ⇒ N = 1680 + 756 + 18 On adding, we get ⇒ N = 2454 Therefore, the number of ways in which four letters of the word MATHEMATICS can be arranged is 2454. So, the correct answer is option D. i joist prices In mathematics, a permutation of a set is, loosely speaking, an arrangement of its members into a sequence or linear order, or if the set is already ordered, a rearrangement of its elements. The word "permutation" also refers to the act or process of changing the linear order of an ordered set.Permutations P(n,r) (video lessons, examples and solutions) How To Solve Permutation Word Problems? Find P(7,3) and P(15,5) If a class has 28 students, how many different arrangements can 5 students give a presentationDetermine mathematic. In order to determine what the math problem is, you will need to look at the given information and find the key details. Once you have found the key details, you will be able to work out what the problem is and how to solve it. similarities between middle school and high school Mathematics is the study of numbers, shapes, and patterns. It is used to describe and explain the physical world around us. Do math Learning math can be fun and rewarding! Business Math Exam 2 Questions Flashcards ... Determine the number of distinguishable arrangements for the words. SASKATOON. Good Question (199). Gauth Tutor Solution. …We can picture the permutation as follows : (7) T (7) T (7) A (7) A (7) (Remaining letters: M H E M I C S - total 7) Each of the brackets are empty spaces for now. We need to pick 7 out of the total 7 X 5 = 35 spaces; that will ensure both T's being before both A's.Dec 6, 2020 · Step 1 Given: The different letter arrangements are calculated from the word MATHEMATICS as follows, Step 2 The formula is calculated as below, n P r = n! n 1! n 2! … n k! Step 3 The value of the input parameters and values as follows, tufts menpercent27s lacrosse roster Determine the number of distinguishable arrangements for. Find the number of distinguishable left-to-right arrangements of the letters: For each number, name its opposite. a. Write these words as numbers.5/5 highly recommend, i love it and use it all the time, i loved! Thank you very much for this great tool, great app to help with math and understand it too, the textbooks were extremely helpful. I have been using it for about 4 years, this is a life saver, well more like 5 hour saver from math.A permutation is a mathematical technique that determines the number of possible arrangements in a set when the order of the arrangements matters. Common mathematical problems involve choosing only several items from a set of items in a certain order. Permutations are frequently confused with another mathematical technique called combinations. stool donation ohioTo determine the number of ways the word "mathematics" can be arranged, we can use the formula for permutations with repetition. The formula is: n! / (r1! * r2! * ... * rk!) where n is the total number of items, and r1, r2, ..., rk are the number of items of each type. For the word "mathematics", we have:A permutation is an ordered arrangement. The number of ordered arrangements of r objects taken from n unlike objects is: n P r = n! . (n – r)! Example. In the Match of the Day’s goal of the month competition, you had to pick the top 3 goals out of 10. Since the order is important, it is the permutation formula which we use.Solution for If a "word" is any arrangement of 3 different letters, how many 3-letter "words" can be formed from the letters B, O, N, and K, where each letter… drilling rig components and function ppt Extension 1 Mathematics. Multiplication Rule If one event can occur in m ways, a second event in n ways and a third event in r, then the three events can occur in m × n × r ways. Example Erin has 5 tops, 6 skirts and 4 caps ... Eg.1 How many different arrangements of the word sanal ayakkabi para kazanma The letters of the word MATHEMATICS can be arranged in 4989600 distinct ways. Apart from the word MATHEMATICS, you may try different words with various lengths with or …How many arrangements are there of the word MATHEMATICS? Rule: Start with the factorial of the number of letters in the word. Then, for each indistinguishable letter in the word, divide by the factorial of the number of times that letter occurs in the word. "MATHEMATICS" is an 11-letter word.In how many ways can the letters of the word ARRANGEMENTS be arranged? a) Find the probability that an arrangement chosen at random begins with the letters EE. b) Find the probability that the consonants are together. To find how many ways the letter can be arranged, it will be 12! / 2! * 2! * 2! *2! *2! ?Step 1 Given: The different letter arrangements are calculated from the word MATHEMATICS as follows, Step 2 The formula is calculated as below, n P r = n! n 1! n 2! … n k! Step 3 The value of the input parameters and values as follows, crane toilets An arrangement can be regarded as a function $ \phi $ given on $ Z _ {n} = \ { 1 \dots n \} $ and taking values in $ A $: $ \phi ( k ) = a _ {i _ {k} } $, $ k = 1 \dots n $. The …Feb 28, 2016 · In how many ways can the letters of the word ARRANGEMENTS be arranged? a) Find the probability that an arrangement chosen at random begins with the letters EE. b) Find the probability that the consonants are together. To find how many ways the letter can be arranged, it will be 12! / 2! * 2! * 2! *2! *2! ? Math Advanced Math How many distinct arrangements can be made with the letters in the word TALLAHASSEE? arrangements Additional ... Question. Transcribed Image Text: How many distinct arrangements can be made with the letters in the word TALLAHASSEE? arrangements Additional Materials. Expert Solution. Want to see the full answer? Check … houses for rent 19111 Could use some work with understanding simplifying and not just answering the question. Don't hesitate to download it, you should take this app if you have problems for mathematics, also, It is very easy to find he answers.In this calculation, the statistics and probability function permutation (nPr) is employed to find how many different ways can the letters of the given word be arranged. This word …Now the total number of ways of arranging 4 letters is given by the sum of the number of ways in the three cases. ⇒ N = N 1 + N 2 + N 3 On substituting, we get ⇒ N = 1680 + 756 + 18 On adding, we get ⇒ N = 2454 Therefore, the number of ways in which four letters of the word MATHEMATICS can be arranged is 2454. So, the correct answer is option D.Now I understand Math even better without the feeling the uneasiness of solving math problems and equations. THIS IS THE BEST, your app is amazing and really great for a little extra school help. Though others math problems can't be solved it is already great enough as it as, still thanks!). am i jamaican if my parents are A permutation is an arrangement of objects in a definite order. The members or elements of sets are arranged here in a sequence or linear order. For example, the permutation … dignities astrology Aug 7, 2019 · In math, an array refers to a set of numbers or objects that will follow a specific pattern. An array is an orderly arrangement (often in rows, columns or a matrix) that is most commonly used as a visual tool for demonstrating multiplication and division . Now I want to ask about how many distinct permutations can be made from the letters of the word MATH? and how many of these permutations starts with the ...Arrangement In general, an arrangement of objects is simply a grouping of them. The number of "arrangements" of items is given either by a combination (order is ignored) or permutation (order is significant). The division of space into cells by a collection of hyperplanes (Agarwal and Sharir 2000) is also called an arrangement. See also owen haleypercent27s games retro bowl How many arrangements are there of all letters in mathematics? The word MATHEMATICS consists of 2 M's 2 A's 2 T's 1 H 1 E 1 I 1 C and 1 S. Therefore a total of 4989600 words can be formed using all the letters of the word MATHEMATICS. Therefore a total of 453600 words which begin with C can be formed using all the letters of the word ...The number of ways in which four letters of the word MATHEMATICS can be arranged is given by: A 136 B 192 C 1680 D 2454 Medium Solution Verified by Toppr Correct option is D) Two pairs of identical letters can be arranged in 3C 22!2!4! ways. Two identical letters and two different letter can be arranged in 3C 1× 7C 2× 2!4! ways. turbine blades mounted to a rotating disc The correct solution is as provided by you and it should be 11!/ (2!*2!*2!) MATHEMATICS = MM AA TT HEICS. So, total 11 letters to be arranged in 11! ways and divided by 2! each …We have the word MATHEMATICS. It has 11 letters. Out of 11, there are 8 unique and 3 of them occur twice. We need to arrange 4 letters from the word Now we …Word problems in permutations and combinations: Formulas, solved examples and quiz for practice questions in GMAT & GRE. Solve step-by-step The step-by-step format is easy to follow and helps readers understand the process. A permutation is a mathematical technique that determines the number of possible arrangements in a set when the order of the arrangements matters. Common mathematical problems involve choosing only several items from a set of items in a certain order. Permutations are frequently confused with another mathematical technique called combinations. welding space for rent near me In linguistics, "syntax" refers to the rules that govern the ways in which words combine to form phrases, clauses, and sentences.The term "syntax" comes from the Greek, meaning "arrange together." The term is also used to mean the study of the syntactic properties of a language.To determine the number of ways the word "mathematics" can be arranged, we can use the formula for permutations with repetition. The formula is: n! / (r1! * r2! * ... * rk!) where n is the total number of items, and r1, r2, ..., rk are the number of items of each type. For the word "mathematics", we have: 3 Answers Sorted by: 1 For part b, arrange the consonants MTHMTCS in 7! 2! 2! ways and then arrange the vowels AEAI, together with XXXX, meaning four blanks or no vowels, in 8! 2! 4! ways, into the 8 gaps before between and after the consonants. Then multiply the results. Share Cite Follow answered Jan 2, 2016 at 22:21 David Quinn 32.4k 3 18 48Determine mathematic. In order to determine what the math problem is, you will need to look at the given information and find the key details. Once you have found the key details, you will be able to work out what the problem is and how to solve it. jigging rap Now the total number of ways of arranging 4 letters is given by the sum of the number of ways in the three cases. ⇒ N = N 1 + N 2 + N 3 On substituting, we get ⇒ N = 1680 + 756 + 18 On adding, we get ⇒ N = 2454 Therefore, the number of ways in which four letters of the word MATHEMATICS can be arranged is 2454. So, the correct answer is option D.As a student who is still okay with math, this helped a lot. Complete lifesaver, only gripe is having to pay to see the steps. There is a few expressions they can't yet solve like word sums and the language you can choose to read word sums.Consider all possible arrangements of the word "PROBLEM". If a word is picked at random, find the probability that. (a) the word starts with a vowel. (b) the word ends with a consonant. Hi, The letters of the word problem are distinct so there are 7! different arrangements of the letters. Choose one at random. bursa ozel hastane muayene ucretleri The number of letters in the word PARK is 4. Thus, the number of words that can be arranged with these 4 letters = The number of permutations with 4 words = 4! words = 4 × 3 × 2 × 1 = 24 words Answer: 24 words clay county ky busted newspaper The problem can be thought of as distinct permutations of the letters GGGYY; that is arrangements of 5 letters, where 3 letters are similar, and the remaining 2 letters are similar: 5! 3!2! = 10 Just to provide a little more insight into the solution, we list all 10 distinct permutations:Solution: 'CHAIR' contains 5 letters. Therefore, the number of words that can be formed with these 5 letters = 5! = 5*4*3*2*1 = 120. Problem 2: Find the number of words, with or without meaning, that can be formed with the letters of the word 'INDIA'. Solution: The word 'INDIA' contains 5 letters and 'I' comes twice. donut spare tire The word MATHEMATICS consist of 11 letters: (M,M), (A,A), (T,T), H,E,I,C,S Case 1: In this case 2 similar and 2 similar letters are selected, number of arrangementsThe word MATHEMATICS consist of 11 letters: (M,M), (A,A), (T,T), H,E,I,C,S . Case 1: In this case 2 similar and 2 similar letters are selected, number of arrangements …Solution for If a "word" is any arrangement of 3 different letters, how many 3-letter "words" can be formed from the letters B, O, N, and K, where each letter… jordan sweats