ASK YOUR TEACHER PRACTICE ANOTHER The concentration \( C \) of a chemical in the bloodstream thours after injection into muscle tissues is given by the following function. \[ C(t)=\frac{6 t}{64+t^{3}}, \quad t \geq 0 \] (a) Complete the table and use it to approximate the time when the concentration is greatest. (Round your answers to three decimal places.) \( t \geq \) \( \square \) hr (b) Use a graphing utility to graph the concentration function and use the graph to approximate the time when the concentration is the greatest. (Round your answer to two decimal places.) \( t \approx \) \( \square \) hr (c) Use calculus to determine analytically the time when the concentration is greatest. \( t= \) \( \square \) hr

To complete the task, let's explore the concentration function more closely. For part (a) and (b), you'll typically want to create a table by selecting time values and calculating the concentration \( C(t) \) for those times. For example, you might choose \( t = 0, 1, 2, 3, 4, 5 \). After calculating, you might find that the concentration starts to rise, peaks, and then begins to fall, which will let you estimate when the concentration is greatest. For part (c), to find the time when the concentration is greatest, you can use calculus. You'll first differentiate \( C(t) \) with respect to \( t \) and then set the derivative \( C'(t) \) to zero to find the critical points. You can then use the second derivative test to confirm that it's indeed a maximum. 1. Calculate the derivative: \[ C'(t) = \frac{(64+t^3)(6) - (6t)(3t^2)}{(64+t^3)^2} = 0 \] Solve the equation to find the critical points. 2. Usually, setting \( C'(t) = 0 \) arises in the form \( C'(t) = 0 \) leading you towards some time values where concentration peaks. After solving this, check back with the original function to ensure it's indeed a maximum concentration. This should lead to your answer for part (c). Enjoy your calculations—science can be super fun!