91Ó°ÊÓ

In Exercises 37–44, solve the inequality. $$ 2 \sqrt[3]{x}-5 \geq 3 $$

Find the real solution(s) of the equation. Round your answer to two decimal places when appropriate. (See Example 4.) \((x+10)^5=70\)

\(9 \sqrt[3]{11}+3 \sqrt[3]{11}\)

The domain and range of the function \(y=\sqrt[3]{x-h}+k\) are all real numbers.

\(8 \sqrt[6]{5}-12 \sqrt[6]{5}\)

In Exercises 35–46, determine whether the inverse of \(f\) is a function. Then find the inverse. $$ f(x)=\sqrt{x-6} $$

Find the real solution(s) of the equation. Round your answer to two decimal places when appropriate. (See Example 4.) \((x-5)^4=256\)

In Exercises 37–44, solve the inequality. $$ \sqrt[3]{x-4} \leq 5 $$

In Exercises 35–46, determine whether the inverse of \(f\) is a function. Then find the inverse. $$ f(x)=2 \sqrt[3]{x-5} $$

Find the real solution(s) of the equation. Round your answer to two decimal places when appropriate. (See Example 4.) \(x^5=-48\)