Calculeopardy: Chapter 5

First Derivative

Second Derivative

Implicit Derivatives

Optimization (Go from 100 to 500 please)

Most-Trivia

100

How does one determine where critical points are, and what do they tell us about the original function?

By finding the zeroes of the first derivative, and they tell you where (possible) minima and maxima of the original function are.

100

You are given a critical point of a function and told that f''(x) > 0. What do you know about this critical point?

(This is the second derivative test.)

It is an absolute minimum.

100

What is the derivative of x with respect to x?

100

List the four steps to solving an optimization problem:

1. Write the equation for the quantity that you wish to maximize or minimize.

2. Use the constraints given by the problem to relate your variables.

3. Rewrite the equation from (1) in terms of one variable using the results of (2).

4. Use candidates test to find extrema.

100

Which is the largest country by land area?

Russia

200

A function's derivative is negative, and then zero, and then positive. What does this information tell you? Your answer should have three pieces!

The function was decreasing, reached a local minimum, and then started increasing.

200

The second derivative of a function goes from positive, to zero, to negative. What do you know about this interval?

The zero is a point of inflection because the graph when from concave up to concave down.

200

What is the derivative of y with respect to x?

y' or dy/dx

200

We wish to build a box whose base is a square of dimensions x with height h. Its volume must be 36 cubic feet. The material used to build the bottom of the box costs $8/ft² and the material for the sides only $6/ft². Write an equation C(x) which gives the cost of the box as a function of one two variables: x and h.

This is step 1 in the optimization process.

C(x) = 8(2x²)+6(4xh)

200

Which is the most populous country?

India

300

Find the critical point(s) of the function

f(x) = 2x² - 4x + 3

(1, 0)

300

The slopes of the tangent lines of a function are getting smaller. What does this tell you about the first and second derivatives of said function?

f'(x) is decreasing and f''(x) is negative.

300

It is known that x² + y² = 1. Find dy/dx. (This is the equation of the unit circle.)

y' = -x/y

300

We wish to build a box whose base is a square of dimensions x with height h. Its volume must be 36 cubic feet. The material used to build the bottom of the box costs $8/ft² and the material for the sides only $6/ft². Use the constraint to identify the relationship between x and h.

This is step 2 in the optimization process.

x²h=36, or h = 36/x²

300

Which is the single largest religion by number of believers?

Sunni Islam

400

Find the critical point(s) of the function and classify as a local minimum or a local maximum.

f(x) = -1x² + 6x - 2

(3, 0), local maximum

400

See insert 1.

II and III.

400

See insert 3.

400

This is step 3 in the optimization process.

C(x) = 8(2x²)+6(4x)(36/x²) = 16x² + (864/x)

400

Which is the smallest country?

Vatican City

500

Find the critical point(s) of the function and classify as a local minimum or a local maximum.

f(x) = (x-2)³+4

(2, 0), neither a local minimum nor a local maximum.

500

See insert 2.

II only.

500

See insert 4.

C, 2.

500

We wish to build a box whose base is a square of dimensions x with height h. Its volume must be 36 cubic feet. The material used to build the bottom of the box costs $8/ft² and the material for the sides only $6/ft². Determine the dimensions (x and h) which will minimize the cost of the box.

C(x) has critical point at x = 3, and its bounds are x = 0 and x = 6. C(0) is undefined, C(6) is $720, and C(3) is $432, so x = 3. Since h = 36/x², h = 4.

500

Within five years, how old was the oldest person who has ever lived?

Jeanne Louise Calment, 2/21/1875 - 04/08/1997 (122 years)