Formula Quiz

d/dx[cotx] =

-csc^2x

d/dx[cscx] =

-cscxcotx

d/dx[cosx] =

-sinx

Definition of a continuity : F is continuous at x = c if and only if

1) F (c) is defined 2)lim as x → C F(x) exists 3) lim as x → C F(X) = F (c)

Let f be a function such that the second derivative of f exists on an open interval containing c. (Second derivatives test)

1) if f'(c) = 0 and f''(c)>0 then (c,f(c)) is a relative minimum of f 2) if f'(c) = 0 and f''(c) < 0, then (c, f(c)) is a relative maximum of f

csc^2x

1+cot^2x

sec^2x

1+tan^2x

(F^-1)' (a) =

1/f'(f^-1(a))

d/dx[lnx] =

1/x

d/dx[loga(x)] =

1/xln(a)

Sin(2x) =

2sinxcosx

Alternate form definition of a derivative f'(c) =

F'(c) = F(x) - F (C)/x-c as x →c

Mean Value Theorem

If a function f is... 1) continuous on [a,b] 2) and differentiable on (a,b), 3) then there exists a number c on (a,b) such that... 1) avg rate of change = instant rate at c 2) secant line (parallel) - tangant line 3) f'(c)=(f(b)-f(a))/(b-a)

Let c be a critical number of a function f that is continuous on the open interval I containing c. If f is differentiable on the interval, except at possibly x = c then f(c) can be classified as follows...(1st derivative test)

If f '(x) changes from a negative to a positive at c, then f(c) is a relative minimum of f. If f' (x) changes from a positive to a negative at c, then f(c) is a relative maximum of f

Intermediate Value Theorem

If f is continuous on [a,b] and k is a number between f(a) and f(b), then there exists at least one number c such that f(c)=k

Definition of a critical number

Let f be defined at c. If f'(c)=0, or if f' is undefined at c, then c is a critical number of f.

d/dx[a^x] =

a^x ln(a)

Cos(2x) = (there are three)

cos^2x-sin^2x or 1 - 2sin^2x or 2cos^2x -1

d/dx[sinx] =

cosx

Chain rule

d/dx f(g(x)) = f'(g(x)) g'(x)

Power Rule

d/dx x^n = nx^n-1

Derivative of a constant rule

d/dx[c] = 0

Constant Multiplier Rule

d/dx[cx^n] = (cn)(x)^n-1

Sums and Differences

d/dx[f(x) + g(x)] = [f'(x) + g(x)] and d/dx[f(x) - g(x)] = [f'(x) - g(x)]

Product Rule

d/dx[f(x) g(x)] = f'(x)g(x)+f(x)g'(x)

Quotiant Rule

d/dx[f(x)/ g(x)] = [f'(x)g(x)- (x)g'(x)]/g(x)^2

definition of e:

e = lim n->infinity (1+1/n)^n

d/dx[e^x] =

e^x

Average rate of change

f(b)-f(a)/b-a

Rolle's Theorem

if f(x) is.... 1) continuous on [a,b] and 2) differentiable on (a,b), and 3) if f(a)=f(b), then there is at least one point c on (a,b) where... 1) instant rate of change = 0 2) tangant is horizontal 3) f'(c) = 0

definition of a derivative f'a =

limit of [ f(a + h) - f(a) / h ] as h→0

Definition of a derivative f'(x) =

limit of [ f(x + h) - f(x) / h ] as h→0

d/dx[tanx] =

sec^2x

d/dx[secx] =

secxtanx

Pythagorean identity

sin²θ + cos²θ = 1

Definition of absolute value

|x| = x if x ≥ 0 and -x if x < 0