9/4 is closer to the square root of what integer?
To find the square root of an integer that is closest to 9/4, we can calculate the square root of the numerator (9) and the square root of the denominator (4):
√9 = 3
√4 = 2
Since the square root of 9 is closer to 9/4 than the square root of 4, we can conclude that 9/4 is closer to the square root of 9, which is 3.
To find the square root of an integer that is closer to the fraction 9/4, we can calculate the square root of both the numerator and denominator separately and then divide them.
Let's first find the square root of 9, which is √9 = 3.
Next, let's find the square root of 4, which is √4 = 2.
Now, we divide the square root of the numerator by the square root of the denominator: 3/2.
Therefore, 9/4 is closer to the square root of 9/4 ≈ 3/2.