Math, asked by sayanthkrishna, 7 months ago

prove that the sum of consecutive odd numbers starting from 1 is the square of the number of odd numbers added​

Answers

Answered by ankita2006mishra
2

Answer:

The total of any set of sequential odd numbers beginning with 1 is always equal to the square of the number of digits, added together. If 1,3,5,7,9,11,…, (2n-1) are the odd numbers, then; Sum of first odd number = 1. Sum of first two odd numbers = 1 + 3 = 4 (4 = 2 x 2).

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