If I wanted to estimate \( \sqrt{59} \), the first step would be to find the two perfect squares that 59 lies between on the number line. The closest perfect square less than 59 is 49 (since \( 7^2 = 49 \)). The closest perfect square greater than 59 is 64 (since \( 8^2 = 64 \)). 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 square roots of the perfect squares to see how I would estimate \( \sqrt{59} \). The root of 59 is closest to 7.5 (because \( 7.5^2 = 56.25 \), which is less than 59, and \( 7.6^2 = 57.76 \), which is still less than 59, while \( 7.7^2 = 59.29 \), which is greater than 59). Therefore, \( \sqrt{59} \) is approximately between 7.7 and 7.8.
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_______. The closest perfect square greater than 59 is____ . I could then think about the number 59 and how close it is to the smaller perfect square and the lager perfect square. i could then take the__________ root of the perfect squares to see how i would estimate square root 59. the root of 59 is closest to_________
2 answers
only answers are 7, 8 , 6 or 9