What is the simplified form of the following expression?
square root of one-one hundred forty-fourth
The simplified form of the expression "square root of one-one hundred forty-fourth" is 12.
The expression "square root of one-one hundred forty-fourth" can be simplified as follows:
The square root of 1/144 can be found by writing 1/144 in exponent form as follows:
(1/144)^(1/2)
To simplify further, we can express 1/144 as a perfect square:
1/144 = (1/12)^2
Now, the expression becomes:
((1/12)^2)^(1/2)
Using the exponent rule, we can multiply the exponents:
(1/12)^(2 * 1/2) = (1/12)^1 = 1/12
Therefore, the simplified form of the expression "square root of one-one hundred forty-fourth" is 1/12.
To simplify the expression for the square root of one-one hundred forty-fourth, we need to find the square root and reduce it to its simplest form.
First, let's simplify the expression "one-one hundred forty-fourth." This means we want to find the square root of 1/144.
To find the square root, we can express 1/144 as a fraction under the square root symbol. The square root of a fraction is equal to the square root of the numerator divided by the square root of the denominator.
The square root of 1 is 1, and the square root of 144 is 12. Therefore, the simplified form of the expression "one-one hundred forty-fourth" is:
1/12.
So, the simplified form of the original expression "square root of one-one hundred forty-fourth" is:
square root of 1/12.
Note that we can simplify further by rationalizing the denominator (eliminating the square root in the denominator), but without further information on the purpose of simplification, we will leave it as square root of 1/12.