Statistics for Basic Calculus Concepts

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Description	Answer	% Correct
Describes the (tangent) slope of the original graph	Derivative	77%
Limit (as x approaches 0) of [1-Cos(x)] / (x)	0	69%
Limit (as x approaches 0) of [Sin(x)] / (x)	1	68%
Derivative of Sine	Cosine	62%
Derivative of the Answer Above	Sine	60%
Finding the area under the curve of an expression	Integral	57%
Describes a value that the graph either converges or diverges to.	Limit	54%
Derivative of the Answer Above	Negative Cosine	52%
Derivative of the Answer Above	Negative Sine	52%
If a function is continuous on a closed interval [a,b], and "k" is any number between f(a) and f(b), there is at least one number "c" in [a,b] such that f(c) = k	Intermediate Value Theorem	26%
Graph Discontinuity where the function exists but the limit does not exist.	Jump	25%
If you have a function f, and two numbers "a" and "b" produce the same numerical output "k", then there has to be at least one relative minimum or maximum between "a" and "b"	Mean Value Theorem	25%
"0/0"	Indeterminate Form	15%
Graph Discontinuity where neither the function or the limit exist.	Infinite	15%
Graph Discontinuity where the limit exists but the function does not exist.	Removable	15%
Graph Differentiability (x^2/3)	Cusp	10%
Graph Differentiability (\|x\|)	Corner	7%
Graph Differentiability (x^1/3)	Vertical Tangent	4%
Δy / Δx	Secant Slope	2%