If a function is continuous over [a,b] and f(a) = m and f(b) = n, then there must be some f(c) such that m<f(c)<n

French guy who invented a rule of how to deal with limits which are indeterminate

The volume of a sphere

This kind of Reimann sum overestimates if a function is decreasing

f(a)+integral from a to b of f'(x) 

Brendon always eats less than or equal to Pakawat, and Pakawat always eats less than or equal to Kevin. If Brendon ate 10 hamburgers, and Kevin ate 10 hamburgers, how many hamburgers did Pakawat eat?  (name of theorem)

Type of discontinuity when the limit as x --> a = number / infinity

A 4 sided rectangle (e.g. one of the sides is not a wall or a river) always has the greatest area when it has this shape

Trapezoidal sum with 3 or 6 intervals - this is closer to the actual value of a definite integral

area bounded by the x-axis, sinx and cos x from 0 to pi/2

The derivative of the integral from 1 to t² of sinx

Identities are useful. Such as this one: 

? = 1/2 + cos(2x)/2

type of problem such as.... a 6 foot ladder is sliding down a wall. The top of the ladder contacting the wall is sliding at a rate of 1 ft per second. What is the speed that the bottom of the ladder is moving away from the wall when the top of the ladder is 4 feet from the ground?

For a question like the antiderivative of: 

(3x³ - 2x₂ - 8)/ (2x²-4x)

this is what you do first. 

Name of the technique to find the volume of revolution when there are two functions