What is the Difference Between Derivative and Integral?
🆚 Go to Comparative Table 🆚The main difference between a derivative and an integral lies in the information they provide about a function and their applications in calculus.
- Derivative: The derivative of a function is a measure of the rate of change of the function at a specific point. It represents the slope of the function's graph at any given point. Derivatives are used to analyze instantaneous values, such as velocities, accelerations, and forces, which are defined as instantaneous rates of change of some other quantity.
- Integral: The integral of a function is a measure of the area under the curve of the function over a specific range of values. It is used to accumulate the discrete values of a function over a certain interval. Integrals are essential tools for solving problems involving infinite sums and are widely used in the physical sciences for modeling natural phenomena.
In summary:
- Derivatives provide information about the rate of change and slope of a function at a specific point.
- Integrals provide information about the area under the curve of a function over a specific interval.
These two concepts are interconnected, as the derivative and integral of a function can be used to "cancel" or reverse each other's effects. This relationship is known as the fundamental theorem of calculus, which states that taking the derivative and then the integral of a function or taking the integral and then the derivative of a function will result in the original function.
On this pageWhat is the Difference Between Derivative and Integral? Comparative Table: Derivative vs Integral
Comparative Table: Derivative vs Integral
The difference between a derivative and an integral can be summarized in the following table:
Feature | Derivative | Integral |
---|---|---|
Definition | A derivative is a measure of the rate of change of a function with respect to a variable. | An integral is a measure of the area under the curve of a function. |
Process | Differentiation is the process of finding the derivative of a function. | Integration is the process of finding the integral of a function. |
Application | Derivatives are used to find slopes, velocities, and other rates of change. | Integrals are used to find areas, volumes, and other measures of accumulated value. |
Considered | Derivatives are considered at a point. | Definite integrals of functions are considered over an interval. |
Linearity | Both differentiation and integration satisfy the property of linearity, meaning that the derivative of a linear combination of functions is the linear combination of their derivatives, and the integral of a linear combination of functions is the linear combination of their integrals. | |
Uniqueness | Differentiation of a function is unique, meaning that the derivative of a function is the same regardless of the variable used. | Integration of a function may not be unique, as the value of the integration constant C is arbitrary. |
Read more:
- Derivative vs Differential
- Differentiation vs Derivative
- Integration vs Differentiation
- Definite vs Indefinite Integrals
- Derivatives vs Equity
- Derivatives vs Futures
- Riemann Integral vs Lebesgue Integral
- Difference Equation vs Differential Equation
- Dedifferentiation vs Redifferentiation
- Inclusion vs Integration
- Algebra vs Calculus
- Integration vs Summation
- Fundamental vs Derived Quantities
- Integration vs Assimilation
- Differential Rate Law vs Integrated Rate Law
- Inflectional vs Derivational Morphology
- Calculus vs Geometry
- Discrete Function vs Continuous Function
- Difference vs Different