Calc AB Chapter 5 Review

Approximating Area Under a Curve

Definite Integrals

Indefinite Integrals

Net Change Theorem

Misc

300

The graph below represents f(x). Approximate the value of the integral expression below using an M₂rectangular approximation with evenly spaced rectangles.

int_(-4)^(4)f(x)dx

300

Evaluate:

int_0^3dx/(5x + 1)

1/5ln16

300

Evaluate:

int_()^()((1 +x)/x)^2dx

-1/x + 2lnabs(x) + x + C

300

If g(t) is a positive, differentiable function that represents the gallons per hour of water flowing through a dam, for t>=0, describe the meaning of the following expression.

int_0^24g(t)dt

The total gallons of water that have flowed through the dam in the first 24 hours. (or the net change in the gallons of water flowing in the first 24 hours)

300

The function below represents f(x). Evaluate the expression, providing an exact answer.

int_1^6abs(f(x))dx

7/2 + pi/2

400

What is the difference between the R₄ and L₄ rectangular approximations for the area under the curve, f(x), from 0 to 10.

400

int_(-2)^3 (1- abs(x))dx

-3/2

400

Evaluate:

int_()^() (2^t)/(2^t + 3)dt

1/ln2ln(2^t + 3) + C

Please note that the function inside the natural log is always positive.

400

A particle is traveling along a horizontal axis with a velocity of v(t) = cos(t), in inches per second. Create the integral expression that you would use to find the total distance the particle travels over the first 5 seconds IF YOU WERE SOLVING WITHOUT A GRAPHING CALCULATOR. You do not need to evaluate the expression!

int_0^(pi/2)v(t)dt + abs(int_(pi/2)^((3pi)/2)v(t)dt) + int_((3pi)/2)^5v(t)dt

int_0^(pi/2)v(t)dt - int_(pi/2)^((3pi)/2)v(t)dt + int_((3pi)/2)^5v(t)dt

400

Find F'(x) if

F(x) = int_sinx^(x^2)e^(t^2)dt

F'(x) = 2xe^(x^4) - cosxe^(sin^2x)

500

Approximate the value of the following expression using an M₄rectangular approximation with evenly spaced rectangles.

int_(2)^(14)x^2dx

903

500

Evaluate:

int_0^4x/sqrt(1 + 2x)dx

10/3

500

Evaluate (challenge problem!):

int_()^() x/(sqrt(1 - x^4))dx

1/2sin^(-1)(x^2) + C

500

If the velocity of a particle moving along a horizontal axis in miles per hour (where x>=0) is presented by

v(x) = -x^3 + 2x^2 - x + 2

Find the total distance traveled by the particle over the first 3 hours. Provide a simplified improper fraction with units as your final answer.

89/12 miles

500

The graph below represents f(x). Find the value(s) where a local minimum of g(x) occurs if

g(x) = int_(-2)^xf(t)dt

x = -1, 5