Math  /  Algebra

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Write the domain in Interval notation. g(x)=log(3x)g(x)=\log (3-x)
The domain is \square .

Studdy Solution

STEP 1

1. The function g(x)=log(3x) g(x) = \log(3-x) involves a logarithm.
2. The domain of a logarithmic function is the set of all x x such that the argument of the logarithm is positive.

STEP 2

1. Identify the argument of the logarithm.
2. Set up the inequality for the argument to be positive.
3. Solve the inequality.
4. Write the solution in interval notation.

STEP 3

Identify the argument of the logarithm in the function g(x)=log(3x) g(x) = \log(3-x) .
The argument is 3x 3-x .

STEP 4

Set up the inequality for the argument to be positive:
3x>0 3-x > 0

STEP 5

Solve the inequality 3x>0 3-x > 0 :
3>x 3 > x
This can also be written as:
x<3 x < 3

STEP 6

Write the solution in interval notation. Since x x must be less than 3, the interval is:
(,3) (-\infty, 3)
The domain of the function g(x)=log(3x) g(x) = \log(3-x) is (,3)\boxed{(-\infty, 3)}.

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