g(x)=1-5x if the domain of the function of g is {x-3 is less than or equal to x which is less than or equal to 2} what is the smallest value of the range
show work please
To find the smallest value in the range of the function g(x), we first need to determine the range itself.
Given that the domain of g(x) is {x-3 ≤ x ≤ 2}, we need to evaluate the function for the smallest and largest values within this domain. The smallest value for x in the domain is x = x-3 = -3.
Substituting this into the function, we have:
g(-3) = 1 - 5(-3)
g(-3) = 1 + 15
g(-3) = 16
Therefore, the smallest value in the range is 16.