AP Calculus AB Jeopardy Jeopardy Template

Limits/Cont

Derivatives

Derivative Applications

Function Analysis with Derivatives

RANDOM!!!

100

This is the limit as x --> pi of sin(x).

What is 0?

100

This is the limit form of the derivative -- "when mom calls you by your full name"

What is [the lim as h --> 0 stuff. if i want to put fractions i have to pay this company $20 and i'm not gonna do that out of principle. sorry]

100

This is the derivative of f^-1(x).

What is 1/(f'(f^-1(x))?

100

This theorem states that every function that is continuous on an interval [a,b] has an absolute maximum and an absolute minimum somewhere on that interval.

What is the extreme value theorem?

100

These are Mr. Lester's cats names.

Who are Kenai, Mabel, and Luna?

200

This is the name for the limit technique I would employ if my limit is of indeterminate form but has an irrational expression in the numerator or denominator.

What is rationalization / multiplying by the conjugate on top and bottom?

200

This is the derivative of sin(3x⁵).

What is 15x⁴cos(3x⁵)?

200

This is the name of a limit technique in which I use denominators to convert out of an indeterminate form.

What is L'Hopital's rule?

200

This is the name for all x-values for which f' is 0 or undefined.

What are critical numbers of f?

200

These two men are credited with inventing calculus. You will need both names.

Who are Newton and Liebniz?

300

This is the limit technique I would employ if x were approaching infinity for an expression whose numerator and denominator were both polynomials.

What is [i would look at the degrees and do some BOBO BOTNO EATSDC type stuff]?

300

This is the derivative of tan(x)/sqrt(x).

What is [yeah i'll just write it on the board]?

300

These are the general steps I should follow on a related rates problem.

What are:
1. Write down a formula involving all parts.

2. Take the implicit derivative w.r.t. time (t).

3. Plug in everything I know.

4. Solve for what I don't know.

300

If f is concave down, this is true about f'.

What is f' is decreasing?

300

This b-adjective is often used by Mr. Lester to describe any upcoming assessment.

What is "biblical?"

400

This theorem states that if on an interval [a,b] containing c, that if h(x) < f(x) < g(x), and as x --> c, both h(x) --> L and g(x) --> L, that f(x) --> L must be true as well.

What is the squeeze theorem? [kick out anyone who said sandwich theorem]

400

This is the derivative of 2^xcos(x²).

What is 2^xln(2)cos(x²) + 2^x(-sin(x²)(2x))?

400

This is how I can tell if a particle is slowing down.

What is the signs of velocity and acceleration are different?

400

If f' is increasing, this must be true about f.

What is f is concave up?

400

This is the last name of the man who actually proved L'Hopital's rule, although it was published in L'Hopital's book.

Who is Bernoulli?

500

This theorem states that if a function f(x) is cont. on [a,b], and f(a) > k > f(b) or f(a) < k < f(b), that there must exist an x-value c, a < c < b, such that f(c) = k.

What is the intermediate value theorem?

500

This is dy/dx if y³sin(x) + sec(y) = 13.

What is (-y³cos(x))/(3y²sin(x) + sec(y)tan(y))?

500

Find a linear approximation for the cube root of 29 using a tangent line constructed at x = 27. Answer must be given as a fraction.

What is 83/27?

500

State the Mean Value Theorem and its conditions verbatim (or close enough).

What is [i will judge]

500

This is how many multiple choice questions in total are on Monday's exam.

What is 27?