9/4 is close to the square root of what integer?
its 5 your welcome sorry if that's wrong
Identify which condition is necessary for a number to be rational.
A. It must not be an endless decimal
B. It must not be negative
C. It must be written as a fraction
D. It must be able to be expressed as an integer divided by a nonzero integer
To find an integer close to the square root of 9/4, we can start by evaluating 9/4.
9 divided by 4 equals 2 with a remainder of 1, so 9/4 is equal to 2 and 1/4 or 2.25.
Next, we need to find an integer that is close to the square root of 2.25.
We can estimate the square root of 2.25 by taking the square root of the nearest perfect square numbers, which are 1 and 4.
The square root of 1 is 1, and the square root of 4 is 2.
Since 2.25 is closer to 2 than 1, we can conclude that the square root of 2.25 is close to 2.
Hence, 9/4 is close to the square root of 2.
To find a value close to the square root of an integer, we can start by finding the square root of the given number, which is 9/4.
√(9/4) is equal to 3/2 or 1.5.
Since it is requested to find an integer close to the square root, we can see that 1 is the closest integer to 1.5. Therefore, the integer close to the square root of 9/4 is 1.
wrong
wrong
I apologize for the incorrect response. Let's correct it:
To find a value close to the square root of an integer, we can start by finding the square root of the given number, which is 9/4.
√(9/4) is equal to √9/√4, which simplifies to 3/2.
Since it is requested to find an integer close to the square root, we can see that 2 is the closest integer to 3/2. Therefore, the integer close to the square root of 9/4 is 2.