Assignment #5

Since the pumping rate can be modeled using a differentiable function, the functions of "f(3)=30" and "f(5)=30" are the same. This means that f(3)=f(5) and there's a different value for an x value between 3 and 5, in this case, "f(4)=25." There must be at least one point in between 3 and 5 where the rate is zero according to Rolle's Theorem.

Assignment #4

http://apcentral.collegeboard.com/apc/public/repository/ap07_calculus_ab_frq.pdf

Question five deals with related rates because a quantity is changing (the volume of the balloon) in relation to the other quantities in the problem (the balloon's radius). This is also all in respect to time.

Assignment #3

A derivative example that can be solved using the chain rule is "f(x)=(3x+1)^2." The derivative of this is "f '(x)= 6(3x+1)." To use the chain rule on “f(x)=(3x+1)^2,” you must multiply the whole function by two and subtract “1” from the exponent. You will start off by getting “2(3x+1).” You must then find the derivative of what is in the parenthesis, 3x+1, and multiply that to “2(3x+1).” The derivative of "3x+1" is "3." You may then simplify the function by multiplying the “2” and the “3.” If you wish to, you can even simplify the function further by distributing the “6” to the “3x+1.”

Assignment #2

The Intermediate Value Theorem says that a function must be continuous over a given interval. If f(x) (a function) is continuous over a given interval, then there is a value of that function, such as x, that lies within that interval as well. It is quite important to establish that the function is continuous because, otherwise, it will have holes, jumps, gaps, etc. This theorem is considered an existence theorem because it implies that a number exists but it does not give us the exact number.

Assignment 1

I am studying AP Calculus BC because I enjoy Math and wish to challenge myself in Calculus. I hope to get a better understanding of Calculus in general and obtain a great score on the AP Exam. Mathematics is in many professions, especially Business. I wish to use what I learned in AP Calculus BC to help me in the Business field.

Andreas Tsoumpariotis