If I wanted to estimate 59−−√

Question

If I wanted to estimate 59−−√

, the first step would be to find the two Response area squares that 59 lies Response area on the number line. The closest perfect square less than 59 is Response area. The closest perfect square greater than 59 is Response area. I could then think about the number 59 and how close it is to the smaller perfect square and the larger perfect square. I could then take the Response area root of the perfect squares to see how I would estimate 59−−√
. The 59−−√
is closest to Response area.
responses
8
9
non perfect
49
perfect
between
9
7
cube
6
square 64

Answer 1

The closest perfect square less than 59 is 49. The closest perfect square greater than 59 is 64. I could then take the square root of these perfect squares to estimate the square root of 59. The square root of 49 is 7, and the square root of 64 is 8. Therefore, the square root of 59 is closest to 8.

Answer 2

If I wanted to estimate 59−−√, the first step would be to find the two RESPONSE HERE squares that 59 lies RESPONSE HERE on the number line. The closest perfect square less than 59 is RESPONSE HERE. The closest perfect square greater than 59 is RESPONSE HERE. I could then think about the number 59 and how close it is to the smaller perfect square and the larger perfect square. I could then take the RESPONSE HERE root of the perfect squares to see how I would estimate 59−−√

. The 59−−√is closest to RESPONSE HERE

THESE ARE THE RESPONSES
8
9
non perfect
49
perfect
between
9
7
cube
6
square 64
WHERE I PUT RESPONSE HERE, ONE OF THESE RESPONSES GOES THERE.

Answer 3

If I wanted to estimate √59, the first step would be to find the two squares that 59 lies on the number line. The closest perfect square less than 59 is 49. The closest perfect square greater than 59 is 64. I could then think about the number 59 and how close it is to the smaller perfect square (49) and the larger perfect square (64). I could then take the square root of the perfect squares to see how I would estimate √59. The square root of 49 is 7, and the square root of 64 is 8. Therefore, the square root of 59 is closest to 8.

Answer 4

If I wanted to estimate 59−−√, the first step would be to find the two RESPONSE HERE squares that 59 lies RESPONSE HERE on the number line.

What will go here?

Answer 5

If I wanted to estimate √59, the first step would be to find the two squares that 59 lies on the number line.

Answer 6

you just repeat the question and answer goes between two and square.. and a RESPONSE goes between likes and on the

Answer 7

If I wanted to estimate √59, the first step would be to find the two squares that 59 lies between on the number line.

Answer 8

nvm thank you ....you just repeated it again with no answers

Answer 9

I apologize for the confusion. To find the two squares that 59 lies between on the number line, the closest perfect square less than 59 is 49, and the closest perfect square greater than 59 is 64.