Sup, iam Christina Roberts, So long!
Whoa, talk about a perfect square! 625 is one of those numbers that just screams “perfection” - it’s a number that can’t be beat. Not only is it a perfect square, but it’s also the sum of two consecutive squares: 25² + 26² = 625. Pretty cool, huh? Plus, if you break down the digits in 625, you get 6+2+5 = 13 - another perfect number! Talk about hitting the jackpot!
Why Is 625 A Perfect Square? [Solved]
Gotcha! 625 is a perfect square ‘cause its square root is an integer - 25. See, it’s the product of an integer with itself, so it all adds up.
- Definition: A perfect square is an integer that is the result of multiplying an integer by itself.
- Examples: 4, 9, 16, 25, 36, 49, 64, 81, 100 are all perfect squares.
- Formula: The formula for finding a perfect square is n^2 = x where n is the number and x is the result of multiplying it by itself.
- Properties: Perfect squares have certain properties such as being divisible by all its digits and having a remainder of zero when divided by any other number except itself and one.
- 625 Perfect Square: 625 is a perfect square because it can be expressed as 25^2 = 625 where 25 multiplied by itself equals 625.
A perfect square is a number that can be expressed as the product of two equal integers. 625 is a perfect square because it can be written as 25 x 25. In other words, if you multiply 25 by itself, you get 625! Pretty cool, huh?
