Lecture 13 Flashcards
Sections 3.4-3.6; Chain rule; trigonometric functions; inverse functions
What is the general formula for the chain rule?
f[g(x)]=f’[g(x)] * g’(x)
what is the derivative of sine?
cosine
what is the derivative of cosine?
-sine
what is the derivative of tan?
sec^(2)(x)
what is the formula to find the inverse derivative?
(f-1)’(x)=1/f’[(f-1)(x)]
what is the domain of tan
(-pi/2,pi/2)
what is the derivative of arcsin?
1/square root of 1+x^(2)
what is the derivative of arccos?
-1/square root of 1+x^(2)
if given a table, one for x, f(x) and f’(x), how do you find the inverse derivative of (f-1)’(3) for instance?
- write the inverse derivative formula
- plug the value into the inverse derivative formulas
- use the inverse derivative formula and the table to guide you starting from the right side of the denominator of the formula
a store sells 150 chocolates for $40 dollar. If the price were lowered to $35, they would sell 160 chocolates per month. S(p) is the number of chocolates sold each month when the price is p dollars. Multiple formulas are given to choose from. What should you do to choose the formula this scenario creates?
- find the difference in money
- find the difference in chocolate
- use those answers to piece together what the equation is
how do you find the equation of a quadratic given a function and an x value?
- plug the x value into the original function
- find the first derivative of the original function then plug in the x value
- find the second derivative of the original function then plug in the x value
- find the first derivative of the quadratic formula then plug in the x value
- find the second derivative of the quadratic formula then plug in the x value
- try to solve for one of the variables
- plug the variable value into another equation to find another variable
- keep plugging in what you know to find all the variables
- create the equation
