Find the domain of the function

g(x)=1/6-5x

x ¡Ù 6/5
x ¡Ù 1
x ¡Ý 6/5
x ¡Ù 0
These are my choices

Can't read your choices here... but isn't it (-infinity,+infinity)?

Sorry about that. Yes it is.

To find the domain of the function g(x) = 1/6 - 5x, we need to determine the values of x for which the function is defined.

When we have a rational function like g(x) = 1/6 - 5x, the domain consists of all real numbers except those that cause the denominator to be equal to zero. In this case, there is no denominator, so there are no restrictions on the domain based on that.

So, the domain of g(x) = 1/6 - 5x is the set of all real numbers, which can be expressed as (-∞, +∞).

Therefore, none of the provided choices (x ≥ 6/5, x ≥ 1, x ≤ 6/5, x ≥ 0) correctly expresses the domain of the given function. The correct answer is "All real numbers".