Unit 6 Integration and accumulation of change

formula for area of a trapezoid

A=1/2h(b1+b2)

Area of a circle

A=πr²

(6.7) Antiderivatives = backwards derivative

don't forget pablo! +C

Derivatives and integrals are ____ of each other

inverses. They cancel eachother out

Antiderivative of 1/x

ln|x| anytime natural log is your antiderivative, remember to use absolute value bars

Trapezoidal Sum

An approximation method a= 1/2 (b1+b2)h

(6.2) Left and Right riemann sums

An approximation method. a=bh

On a trapezoid estimation, when does it underestimate?

when the function is concave down

On a trapezoid estimation, when does it overestimate?

when the function is concave up

Antiderivative of xⁿ

xⁿ+1 / n+1

Fundamental Theorem of Calculus

∫ f(t) dt on interval a to x = f(x) & ∫ f(x) dx on interval a to b = F(b) - F(a)

(6.1) Area under a curve

∫ f(x) dx integrate over interval a to b (accumulation of change)

(6.4) Accumulation Functions ex: F(x) = ∫ t^3 on interval 2 to x dt find F'(x)

F'(x) = x^3 (replace t with x)

On a decreasing function, which riemann sum overestimates?

The left riemann sum

On an increasing function, which riemann sum underestimates?

The left riemann sum

On a decreasing function, which riemann sum underestimates?

The right riemann sum

On an increasing function, which riemann sum overestimates?

The right riemann sum

(6.6) properties of definite integrals

super easy concept, just review