It is discontinuous on the interval [a, b].

It is continuous on the interval [a, b].

It is differentiable on the interval [a, b].

It is constant on the interval [a, b].

As the derivative of f(t) from a to x.

As the sum of f(t) from a to x.

As the definite integral from a to x of f(t) dt.

As the product of f(t) from a to x.

The slope of the tangent line to f(t).

The area under the curve of f(t) from a to x.

The rate of change of the area under f(t) with respect to x.

The maximum value of f(t) on the interval [a, x].

The Intermediate Value Theorem.

The Mean Value Theorem for Integrals.

The Fundamental Theorem of Algebra.

The Pythagorean Theorem.

F'(x) is less than f(x).

F'(x) is unrelated to f(x).

F'(x) is equal to f(x).

F'(x) is always greater than f(x).

The concepts of algebra and geometry.

The concepts of sequences and series.

The concepts of derivatives and integrals.

The concepts of limits and continuity.

It provides a method to calculate limits.

It establishes a connection between differentiation and integration.

It explains the behavior of polynomial functions.

It solves all algebraic equations.

Every continuous function is periodic.

Every continuous function is bounded.

Every continuous function has an antiderivative.

Every continuous function has a derivative.

As a method to find derivatives.

As a notation for the area under a curve.

As a way to solve differential equations.

As a tool for graphing functions.

They are unrelated concepts.

Integrals are a type of antiderivative.

Integrals and antiderivatives are connected through the Fundamental Theorem.

Antiderivatives are more complex than integrals.