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Assignment Problems Notice
Please do not email me to get solutions and/or answers to these problems. I will not give them out under any circumstances nor will I respond to any requests to do so. The intent of these problems is for instructors to use them for assignments and having solutions/answers easily available defeats that purpose.
If you are looking for some problems with solutions you can find some by clicking on the "Practice Problems" link above.
If you are looking for some problems with solutions you can find some by clicking on the "Practice Problems" link above.
Section 3.2 : Interpretation of the Derivative
For problems 1 – 3 use the graph of the function, \(f\left( x \right)\), estimate the value of \(f'\left( a \right)\) for the given values of \(a\).
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- \(a = - 5\)
- \(a = 1\)
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- \(a = - 2\)
- \(a = 3\)
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- \(a = - 3\)
- \(a = 4\)
For problems 4 – 6 sketch the graph of a function that satisfies the given conditions.
- \(f\left( { - 7} \right) = 5\), \(f'\left( { - 7} \right) = - 3\), \(f\left( 4 \right) = - 1\), \(f'\left( 4 \right) = 1\)
- \(f\left( 1 \right) = 2\), \(f'\left( 1 \right) = 4\), \(f\left( 6 \right) = 2\), \(f'\left( 6 \right) = 3\)
- \(f\left( { - 1} \right) = - 9\), \(f'\left( { - 1} \right) = 0\), \(f\left( 2 \right) = - 1\), \(f'\left( 2 \right) = 3\), \(f\left( 5 \right) = 4\), \(f'\left( 5 \right) = - 1\)
For problems 7 – 9 the graph of a function, \(f\left( x \right)\), is given. Use this to sketch the graph of the derivative, \(f'\left( x \right)\).
- Answer the following questions about the function \(g\left( z \right) = 1 + 10z - 7{z^2}\).
- Is the function increasing or decreasing at \(z = 0\)?
- Is the function increasing or decreasing at \(z = 2\)?
- Does the function ever stop changing? If yes, at what value(s) of \(z\) does the function stop changing?
- What is the equation of the tangent line to \(f\left( x \right) = 5x - {x^3}\) at \(x = 1\).
- The position of an object at any time \(t\) is given by \(s\left( t \right) = 2{t^2} - 8t + 10\).
- Determine the velocity of the object at any time \(t\).
- Is the object moving to the right or left at \(t = 1\)?
- Is the object moving to the right or left at \(t = 4\)?
- Does the object ever stop moving? If so, at what time(s) does the object stop moving?
- Does the function \(R\left( w \right) = {w^2} - 8w + 20\) ever stop changing? If yes, at what value(s) of \(w\) does the function stop changing?
- Suppose that the volume of air in a balloon for \(0 \le t \le 6\)is given by\(V\left( t \right) = 6t - {t^2}\) .
- Is the volume of air increasing or decreasing at \(t = 2\)?
- Is the volume of air increasing or decreasing at \(t = 5\)?
- Does the volume of air ever stop changing? If yes, at what times(s) does the volume stop changing?
- What is the equation of the tangent line to \(f\left( x \right) = 5x + 7\) at \(x = - 4\)?
- Answer the following questions about the function \(Z\left( x \right) = 2{x^3} - {x^2} - x\).
- Is the function increasing or decreasing at \(x = - 1\)?
- Is the function increasing or decreasing at \(x = 2\)?
- Does the function ever stop changing? If yes, at what value(s) of \(x\) does the function stop changing?
- Determine if the function\(V\left( t \right) = \sqrt {14 + 3t} \) increasing or decreasing at the given points.
- \(t = 0\)
- \(t = 5\)
- \(t = 100\)
- Suppose that the volume of water in a tank for \(t \ge 0\) is given by \(\displaystyle Q\left( t \right) = \frac{{{t^2}}}{{t + 2}}\).
- Is the volume of water increasing or decreasing at \(t = 0\)?
- Is the volume of water increasing or decreasing at \(t = 3\)?
- Does the volume of water ever stop changing? If so, at what times(s) does the volume stop changing?
- What is the equation of the tangent line to \(g\left( x \right) = 10\) at \(x = 16\)?
- The position of an object at any time \(t\) is given by \(Q\left( t \right) = \sqrt {1 + 4t} \).
- Determine the velocity of the object at any time \(t\).
- Does the object ever stop moving? If so, at what time(s) does the object stop moving?
- Does the function \(Y\left( t \right) = 2{t^3} + 9t + 5\) ever stop changing? If yes, at what value(s) of \(t\) does the function stop changing?