Difference between revisions of "Joe wants to find all the four-letter words that begin and end with the same letter. How many combinations of letters satisfy this property?"

Latest revision as of 15:16, 30 October 2024

There are $26$ choices for the first letter, $26$ for the second, and $26$ for the third. The last letter is determined by the first letter. Thus, there are $26^3 = \boxed{17576}$ such combinations.

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Revision as of 16:12, 12 June 2022 (view source) Potato noob101 (talk \| contribs) (Created page with "There are <math>26</math> choices for the first letter, <math>26</math> for the second, and <math>26</math> for the third. The last letter is determined by the first letter. T...")		Latest revision as of 15:16, 30 October 2024 (view source) Charking (talk \| contribs) (added deletion request)
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	There are <math>26</math> choices for the first letter, <math>26</math> for the second, and <math>26</math> for the third. The last letter is determined by the first letter. Thus, there are <math>26^3 = \boxed{17576}</math> such combinations.		There are <math>26</math> choices for the first letter, <math>26</math> for the second, and <math>26</math> for the third. The last letter is determined by the first letter. Thus, there are <math>26^3 = \boxed{17576}</math> such combinations.
		+	{{delete\|long title}}

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Difference between revisions of "Joe wants to find all the four-letter words that begin and end with the same letter. How many combinations of letters satisfy this property?"

Latest revision as of 15:16, 30 October 2024