Approximate square root of 12 to the nearest tenth.
The correct answer and explanation is:
Answer: The approximate square root of 12 to the nearest tenth is 3.5.
Explanation:
To find the square root of 12, we want a number which, when multiplied by itself, equals 12.
- Understanding Square Roots:
The square root of a number xx is a number yy such that y2=xy^2 = x. Here, we want yy such that y2=12y^2 = 12. - Estimating the Square Root:
First, identify perfect squares near 12:- 32=93^2 = 9
- 42=164^2 = 16
- Narrowing Down Between 3 and 4:
Try numbers between 3 and 4:- 3.42=3.4×3.4=11.563.4^2 = 3.4 \times 3.4 = 11.56 (less than 12)
- 3.52=3.5×3.5=12.253.5^2 = 3.5 \times 3.5 = 12.25 (just above 12)
- Rounding to the Nearest Tenth:
The value 3.53.5 is a good approximation of 12\sqrt{12} when rounded to one decimal place. - More Precise Calculation (Optional):
Using a calculator, 12≈3.4641\sqrt{12} \approx 3.4641. Rounded to the nearest tenth, this is 3.53.5.
Summary:
- Square roots of numbers between perfect squares are estimated by checking squares of decimal numbers.
- For 12\sqrt{12}, the value is between 3 and 4 because 32=93^2 = 9 and 42=164^2 = 16.
- Checking 3.423.4^2 and 3.523.5^2 shows the square root is slightly less than 3.5 but rounds to 3.5 when rounded to one decimal.
- Therefore, 12≈3.5\sqrt{12} \approx 3.5 (nearest tenth).