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%
|
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