AP Calculus BC Formulas to Memorize
Average Anything on [a,b]
(1/a-b) ʃ(from a to b) (anything)dx
Average Acceleration on [a,b]
(1/a-b) ʃ(from a to b) a(t)dx
Average Rate of Change on [a,b]
(1/a-b) ʃ(from a to b) f'(x)dx
Average Velocity on [a,b]
(1/a-b) ʃ(from a to b) v(t)dx
1st F.T.C.
(1st line)
Definition of Continuity
(bottom line)
Trig Derivatives
(with x' at the end if implicit differentiation)
Definition of Derivative
= f'(x)
Intermediate Value Theorem
If f is continuous on [a,b] and f(a) < k < f(b) or f(b) < k < f(a), then there is at least one c in (a,b) such that f(c)=k
Mean Value Theorem
If f(x) is continuous on [a,b] and differentiable on (a,b), then there exists an x-value such that f'(x) = f(a)-f(b) / a-b
Relative Extremum (Min/Max)
a high/low point relative to the points around it; can only occur at a critical value
Acceleration Function for an Object in Free Fall
a(t) = -32 ft/sec^2
2nd F.T.C.
d/dx ʃ(from u to v) g(t) dt = g(v)*v'-g(u)*u'
Differential Form of the Derivative
dy = f'(x)dx
Position Function for an Object in Free Fall
s(t) = -16t^2+v0t+s0
Absolute Extremum (Min/Max)
the highest/lowest point on a given interval; can occur at a critical value OR and endpoint
Trig Integrals
ʃcosu du = sinu + c ʃsinu du = -cosu + c ʃsec^2u du = tanu + c ʃcsc^2u du = -cotu + c ʃsecutanu du = secu + c ʃcscucotu du = -cscu + c
