Answer:
√17 good luck
Explanation:
The function c(x) = √x is a continuous and increasing function over the interval [0, ∞), which means that its minimum and maximum values on the given domain interval [1/121, 17] will occur at its endpoints.
At x = 1/121, we have c(1/121) = √(1/121) = 1/11.
At x = 17, we have c(17) = √17.
Therefore, the minimum value of c(x) on the given domain interval is 1/11, and the maximum value is √17.