perplexus.info :: Numbers : Year Yearn 6

Year Yearn 6 (Posted on 2023-12-11)

It is evident that: 2023= 7*17². Thus, 2023 is expressible in the form P*QR².
Determine the three integers following 2023 having this property.
What are the three integers preceding 2023 that have this property?

Submitted by K Sengupta

Rating: 5.0000 (1 votes)

Solution: (Hide)

3 integers following 2023 that have this property are: 2025,2028, and 2048.
3 integers preceding 2023 that have this property are: 1936, 1944, and 2000.

1936 = 1 * 44^2 = 4 * 22^2 1944 = 6 * 18^2 2000 = 5 * 20^2 2025 = 1 * 45^2 = 9 * 15^2 2028 = 3 * 26^2 2048 = 2 * 32^2 = 8*+6^2
For an explanation, refer to the solution submitted by Larry in this location.

Comments: ( You must be logged in to post comments.)

Subject	Author	Date
Computer Solution	Larry	2023-12-11 09:02:36
computer solution	Charlie	2023-12-11 08:32:07

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