How Many Ways are There to Order the Letters of Word NEVADA?
The 6 letters word NEVADA can be arranged in 360 distinct ways. The below detailed information shows how to find how many ways are there to order the letters NEVADA and how it is being calculated in the real world problems.
Distinguishable Ways to Arrange the Word NEVADA
The below step by step work generated by the word permutations calculator shows how to find how many different ways can the letters of the word NEVADA be arranged.
Objective:
Find how many distinguishable ways are there to order the letters in the word NEVADA.
Step by step workout:
step 1 Address the formula, input parameters and values to find how many ways are there to order the letters NEVADA.
Formula:
nPr =n!/(n1! n2! . . . nr!)
Input parameters and values:
Total number of letters in NEVADA:
n = 6
Distinct subsets:
Subsets : N = 1; E = 1; V = 1; A = 2; D = 1;
Subsets' count:
n1(N) = 1, n2(E) = 1, n3(V) = 1, n4(A) = 2, n5(D) = 1
step 2 Apply the values extracted from the word NEVADA in the (nPr) permutations equation
nPr = 6!/(1! 1! 1! 2! 1! )
= 1 x 2 x 3 x 4 x 5 x 6/{(1) (1) (1) (1 x 2) (1)}
= 720/2
= 360
nPr of word NEVADA = 360
Hence,
The letters of the word NEVADA can be arranged in 360 distinct ways.
Apart from the word NEVADA, 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.