Calculus Jeopardy

Derivatives

Integrals

Limits

History

Anything goes

100

The derivative is f'(x)=3x^2.

What is f(x)=x^3

100

You always add this at the end of antiderivatives.

What is "+C"

100

This is what happen when the left and right limits don't equal.

What is this limit does not exist

100

One of the two people responsible for inventing Calculus.

Who is Isaac Newton or

Gottfried Leibniz

100

This is the line that touches a graph at a point and continues in the direction the graph was going at that point.

What is a tangent line?

200

This is the power rule for finding derivatives.

What is y'=n*x^n-1

200

This is what you find when calculating a definite integral.

What is the area under a graph.

200

This is the limit as x approaches 3 of 2(x-4)^2

What is 2

200

The century that calculus was invented.

What is the 17th century

200

This is the result of the following: ∫(7x+9)dx

What is (7/2)x²+9x+c

300

The formula you need to use when finding the derivative of two functions multiplied.

What is the product rule...y'=uv'+u'v

300

This is another name for the antiderivative.

What is the indefinite integral?

300

If y= (x²-4)/(x-2), this is what occurs when x=2

What is a hole?

300

These are the two main concepts that were included in the Calculus created by Newton and Leibnitz.

What are derivatives and integrals?

300

This is what d²y/dx² means.

What is the second derivative.

400

This is the rule used for differentiating composite functions.

What is the chain rule?

400

This is what we get when we integrate 1/(2x-1)dx

What is (1/2)*ln[2x-1]+c

400

This is the limit of 1/x as x approaches negative infinity.

What is zero?

400

This is where Leibniz was from.

What is Germany?

400

This is the area enclosed by y=x² and the y-axis between [0,3] is revolved around the y-axis

What is (9/2)*pi

500

A function is not differentiable where it has this.

What is a cusp, discontinuity, or a vertical tangent line.

500

The derivative of this equation is sec²(x)

What is tan(x)+c

500

The limit as this expression approaches 2 is infinity.

Answers will vary, but one example is

1/(x-2)²

500

This was the first nationality of the people on record to use concepts found in calculus before it was actually called Calculus.

What are the Greeks?

500

These are two different types of discontinuity.

What are point, step, or infinite discontinuity.