# 4applications Of The Derivative Part 1ap Calculus

Posted By admin On 29/12/21First Derivative Test (Inc, Dec, Max, Min) 2 First Derivatives Day 2 3 Second Derivatives (Concavity, POI) 4 Graph Sketching 5 Graph Sketching Again: 6: Relating f, f', f' AP Problems (f-prime AP Problems) 7 Review: 8 Quiz: 9: Review so Far November 10 Related Rates: 11 Related Rates Again: 12 Related Rates AP Problems 13 Optimization: 14. This is Part 1 of our AP Calculus AB unit test on derivatives. These questions cover the limit definition of derivatives, basic derivative operations (power rule, product rule, quotient rule, chain rule), derivatives of trig functions, and derivatives of logarithmic and exponential functions. Knowing these derivative operations will be necessary when analyzing the behavior of functions, as well as solving application oriented problems on the AP exam.

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The general procedure for curve sketching is based on the material learned in the last few sections. Essentially, the first and second derivatives are used to determine which of the following pieces will be used where to form the graph:

Then, intercepts and asymptotes are found to refine the graph and make it more accurate.

Example: Sketch a graph of *f* (*x*) = .

Step 1: Determine the domain of *f*.

In this case, *f* is undefined only at *x* = 3 and *x* = - 3, so the domain includes all *x* except those two points. These two points will turn out to be important, because places where the graph is undefined could potentially be vertical asymptotes or places where the function changes concavity or direction.

Step 2 Use the first derivative to find the critical points and determine the direction of the graph.

A) Find the critical points

*f'*(*x*) is undefined at *x* = - 3 and *x* = + 3, but these points are not part of the domain of *f*, so these are not considered critical points.

B) To determine the direction of *f*, find the sign of *f'*. Mark off on a number line the points at which *f'* can change sign. These include critical points and the points where *f* is undefined.

By inspection, (*x*^{2} -9)^{2} is always positive, so the sign of the derivative depends only on the sign of the numerator -2*x*. The sign of the derivative on the various intervals is filled in on the chart below with arrows to indicate the behavior of *f* (*x*).

## 4 Applications Of The Derivative Part 1ap Calculus Calculator

Step Three: Use the second derivative to find the concavity and the points of inflection.

A) First find where the second derivative equals zero

f'(x) = f'(x) = |

This is never equal to zero, but is undefined at *x* = - 3 and *x* = + 3.

B) Mark off the points where the concavity could change, which are the places where the second derivative is zero or undefined, or places where the function itself is undefined. Then determine the sign of the second derivative on those intervals.

Since (6*x*^{2} + 18) is always positive, the sign of the second derivative will match the sign of the term (*x*^{2} - 9):

## 4 Applications Of The Derivative Part 1ap Calculus 2nd Edition

Note that even though the concavity changes at *x* = - 3 and at *x* = + 3, these are not inflection points, since *f* is undefined there.

Step 4: Find the horizontal and vertical asymptotes

A) To find horizontal asymptotes, take limits of the function at infinity:

Thus, *y* = 0 is the horizontal asymptote of *f* as it approaches both negative and positive infinity.

B) Candidates for vertical asymptotes are places where *f* is undefined.

= + ∞ and |

= - ∞, |

so *x* = - 3 is a vertical asymptote. Also,

## 4 Applications Of The Derivative Part 1ap Calculus 14th Edition

so *x* = 3 is a vertical asymptote of *f*.

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Step 5: Find the exact coordinates of the *x* - and *y* - intercepts, the critical points, and the points of inflection.*x*-intercept: None, since could never equal zero*y*-intercept: (0,)

Critical Points: (0,)

Points of inflections: None

Step 6: Combine all of the evidence collected to graph the function

(0,) is both the *y*-intercept and the only critical point.The graph never crosses the *x*-axis. The information from the first and second derivative work tells us the following:

This means that *f* has the following behavior on the following intervals:

(- ∞, - 3): Increasing, Concave up

(- 3, 0): Increasing, Concave down

(0, 3): Decreasing, Concave down

(3,∞): Decreasing, Concave up

The line *y* = 0 is a horizontal asymptote at positive and negative infinity.The lines *x* = - 3 and *x* = 3 are the vertical asymptotes. The graph must look as follows: