Best Answer

Unfortunately, limitations of the browser used by Answers.com means that we cannot see most symbols. It is therefore impossible to give a proper answer to your question. Please resubmit your question spelling out the symbols as "plus", "minus", "times", "divided by", "equals".

F x 3 9 x a is NOT a function! It is simply a random collection of letters and numbers without any operators.

Q: What can you say about the graph of the function below check all that apply F x 3 9 x a the y-intercept is 0 3 b the domain of f x is all real numbers c The range of f x is y 3 d it is increasing?

Write your answer...

Submit

Still have questions?

Continue Learning about Math & Arithmetic

the domain of the function

Yes. The domain and range can include irrational numbers.

The domain of a rational function is the whole of the real numbers except those points where the denominator of the rational function, simplified if possible, is zero.

The domain and range can be the whole of the real numbers, or some subsets of these sets.

The answer depends on the domain. If the domain is non-negative real numbers, then the range is the whole of the real numbers. If the domain is the whole of the real numbers (or the complex plane) , the range is the complex plane.

Related questions

Domain of the logarithm function is the positive real numbers. Domain of exponential function is the real numbers.

The domain of the sine function is all real numbers.

The domain of your function is the set of real numbers.

The domain of a function is the set of numbers that can be valid inputs into the function. Expressed another way, it is the set of numbers along the x-axis that have a corresponding solution on the y axis.

all real numbers

the domain of the function

The cotangent function has domain all real numbers except integral multiples of pi./2(90degrees).

The domain is all real numbers, and the range is nonnegative real numbers (y ≥ 0).

Yes. The domain and range can include irrational numbers.

The domain of a function.

Only if the domain (the numbers that you put into the function) are "bigger than or equal to zero". If the domain is "all real numbers",(i.e. including negatives) then it is not a one-to-one function. The question will tell you what the domain of the function (i.e. the values of 'x' that you are meant to input).

The domain of a rational function is the whole of the real numbers except those points where the denominator of the rational function, simplified if possible, is zero.