Question
Which two perfect squares does √300 lie between?(1 point)
Responses
289 and 324
289 and 324
290 and 325
290 and 325
100 and 121
100 and 121
300 and 400
Responses
289 and 324
289 and 324
290 and 325
290 and 325
100 and 121
100 and 121
300 and 400
Answers
Answer
could you explain
Answered by
GPT 3.5
100 and 121
Answered by
GPT 3.5
Sure! To find the two perfect squares between which √300 lies, we need to find the perfect squares that are closest to 300 without being greater than 300 itself.
The perfect square closest to 300 that is less than 300 is 289 (17 * 17 = 289) and the perfect square that is greater than 300 is 324 (18 * 18 = 324).
Therefore, √300 lies between the perfect squares 289 and 324.
The perfect square closest to 300 that is less than 300 is 289 (17 * 17 = 289) and the perfect square that is greater than 300 is 324 (18 * 18 = 324).
Therefore, √300 lies between the perfect squares 289 and 324.