Answers to Implicit Differentiation Day 2 Homework 1. 2.

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Presentation transcript:

Answers to Implicit Differentiation Day 2 Homework 1. 2.

Answers to Implicit Differentiation Day 2 Homework 3. 4.

Quiz

Day one

How many licks does it take to get to the tootsie roll center of a tootsie pop?

1) Assume that your tootsie roll pop is a perfect sphere. Measure the circumference, in centimeters, and using the circumference formula determine the initial radius. (Round to three decimal places) 2) Using the radius found in question 1, find the initial volume of the tootsie roll pop. (Round to three decimal places)

Place the tootsie roll pop in your mouth and carefully suck for 60 seconds (your teacher will time you) then remove the pop and measure and record the circumference in the table below. Continue until the teacher calls for you to stop. (You may have to add lines to your table) Time (in seconds) Circumference (in cm) Radius (in cm) Volume (in cm 3 )

4.Complete the table by finding the corresponding radius and volume measurements. 5.Find the average rate of change of the radius for each of the intervals listed. a)t = 0 to t = 60 b)t = 60 to t = 120 c)t = 120 to t = What appears to be true about the average rate of change of the radius? 7.Find the average rate of change of volume for each of the intervals listed. a)t = 0 to t = 60 b)t = 60 to t = 120 c)t = 120 to t = Is the rate of change of volume constant?

Since the rate of change of volume varies over time, to find the instantaneous rate of change of volume of the sphere, written, find the derivative of the volume formula. Assuming the rate of change of the radius is constant (average rate of change = instantaneous rate of change), find the value of r and when t = 30 seconds.

Use your answers from Question 9 and Question 10, to find the rate at which the volume is decreasing when t = 30 seconds. Compare your answer to the average rate of change of volume found in Question 7a.