If marching bands vary from 21 to 49 players, which numbers of players can be arranged in the greatest number of rectangles?

Question

hiineedhelp · Answer

hmm. a rectangle?ok then, least number of rectangles needed-6. . . . . . . ( rectangle) so, 6 x 8=48(greatest multiple of 6 from between 21 and 49) 48 players are most, so 8 rectangles

priyankapandeyVT · Answer

14 numbers of players can be arranged in the **greatest number **of rectangles . 
 Given that, Marching bands vary from 21 to 49 players, To determine the number of players can be arranged in the **greatest number **of rectangles . 
 What is a rectangle? 
 The **rectangle **is 4 sided geometric shape whose opposites are **equal **in length and all **angles **are about 90°. 
 here, 
 In a marching band, there would be at least 2 rows of the player can be start with, so if the number of rows of players is 2 and the length of the row could be 14 the players can be arranged in the greatest number of rectangles, Players arranged in this phenomenon = 2 * 14 = 48. 
 Thus, 14 numbers of players can be arranged in the **greatest number **of rectangles . 
 Learn more about **rectangles **here: 
 brainly.com/question/15019502 
 #SPJ2

priyankapandeyVT · Answer

The number of players that can be arranged in the greatest number of rectangles from 21 to 49 is 48, followed by 36, which has a high number of arrangements as well. 
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If marching bands vary from 21 to 49 players, which numbers of players can be arranged in the greatest number of rectangles?

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