The university where Ms. Clark got her undergraduate degree.
What is Houston Baptist University?
100
6x
What is the derivative of 3x^2?
100
The limit as x->2 of (x+8).
What is 10?
100
The slope of a tangent line.
What is a derivative?
200
A particular Christmas movie has a miracle involving Santa that takes place on this street in NYC.
What is 34th?
200
Ms. Clark competed in these two sports in college.
Who is cross country and track?
200
8x + 4
What is the derivative of 4x^2 + 4x + 2?
200
The limit of sinx/x as x->0.
What is 1?
200
This is what the graph of f does if f ' is positive.
What is increases?
300
What famous 1954 Christmas movie stars Danny Kaye and Bing Crosby putting on a musical show to save an old war hero's inn in Vermont?
What is White Christmas?
300
The candy that is Ms. Clark's favorite.
What is Starburst?
300
-1/4
What is the slope of the tangent line of y = 1/x at x = 2?
300
The three reasons why a limit does not exist.
What is the oscillating behavior, unbounded behavior, differing behavior?
300
A y-value that a function approaches from either side of a certain x-value.
What is a limit?
400
One of the most popular Christmas songs that was actually written for Thanksgiving.
What is Jingle Bells?
400
Loves this fantasy author.
What is J.R.R. Tolkien?
400
y' = e^x + ln(3)3^x
Find the derivative of y = e^x + 3^x + sqrt{6}
400
The limit of (x-5)/(x^3+2) as x->Infinity.
What is 0?
400
What theorem states: the function f(x) is continuous on [a,b], the first derivative exists on the interval (a,b) and f(a)=f(b); then there exists a number c on (a,b) such that f'(c)=0
What is Rolle's Theorem?
500
7 out of 10 of these British things get gifts each Christmas from people who love them.
What are dogs?
500
Doesn't like this snack that most people enjoy (hint: it's usually salty).
What is popcorn?
500
2(3x^2+4)(9x^2 + 4)
Find the derivative of (3x^3 + 4x)^2
500
The three conditions of continuity.
What is f(c) is defined, limit of f(x) as x->c exists, and limit=f(c)?
500
What theorem states: A function f(x) is continuous on [a,b] and the first derivative exists on the interval (a,b), then there exists a number c such that f'(c)= (f(b) - f(a)) / (b - a)