Understanding Functions and Definite Integrals

A function only works with integers.

A function maps an input to a corresponding output.

A function is a type of equation.

A function outputs a random number.

f(x) = x - 1

f(x) = x cubed

f(x) = x + 1

f(x) = x squared

Using a polynomial

Using a derivative

Using a definite integral

Using a logarithm

The average of f(t) values

The sum of f(t) values

The definite integral of f(t) from -2 to x

The derivative of f(t)

By subtracting the area of a triangle from a rectangle

By dividing the area of a rectangle by two

By adding the areas of a rectangle and a triangle

By multiplying the width and height of the rectangle

15 square units

16 square units

21 square units

10 square units

4 square units

3 square units

6 square units

5 square units

16 square units

20 square units

21 square units

25 square units

Functions can be defined using definite integrals.

Functions cannot be graphed.

Functions can only be defined using algebraic expressions.

Functions are always linear.

It provides a new way to calculate outputs based on areas.

It simplifies the function.

It makes the function more complex.

It limits the function to integers.