Indefinite Integrals (original) (raw)
Last Updated : 14 May, 2026
Integration is the inverse process of differentiation. Instead of finding the derivative of a function, we start with a derivative and work backwards to find the original function. This is also known as anti-differentiation.
Note that a constant added to any function doesn't affect its derivative, which is why the result of integration always includes a constant C, known as the constant of integration.
If f(x) is a continuous function on an interval I, an indefinite integral of f is a function F(x) such that:
**F ′(x) = f(x) for all x ∈ I
This relationship is expressed using the integral symbol without upper and lower limits:
**∫f(x) dx = F(x) + C
Where ∫ is the symbol for integral.
The table below represents the symbols and meanings related to integrals.
| Symbol/Term | Meaning |
|---|---|
| \int f(x)dx | Integral of f with respect to x |
| f(x) in \int f(x)dx | Integrand |
| x in \int f(x)dx | Variable of integration |
| Integral of f(x) | A function such that F'(x) = f(x) |
Formulas for Indefinite Integrals
There are certain formulas and rules which, when kept in mind, help us simplify the calculating and do it fast. Some of these formulas are
- ∫ 1 dx = x + C
- ∫ P dx = Px + C
- ∫ xⁿ dx = xⁿ⁺¹ / (n + 1) + C
- ∫ ex dx = ex + C
- ∫ ax dx = ax / ln a + C
- ∫1/x dx = ln |x| + C
- ∫ cos x dx = sin x + C
- ∫ sin x dx = -cos x + C
- ∫ sec x dx = tan x + C
Finding Indefinite Integral
Various different methods are used to calculate the indefinite integrals,
- Normal indefinite integrals are solved using direct **integration formulas.
- Integrals with rational functions are solved using the **partial fractions method.
- Indefinite integrals can be solved using the **substitution method.
- **Integration by parts is used to solve the integral of the function where two functions are given as a product.
**Example: Find the indefinite integral ∫ x3 cos x4 dx.
**Solution:
Using the substitution method.
Let x4 = t
⇒ 4x3 dx = dtNow, ∫ x3 cos x4 dx
= 1/4∫cos t dt
= 1/4 (sin t) + C
= 1/4 sin (x4 ) + C
Properties of Indefinite Integrals
Indefinite integrals have various properties some of the various properties of Indefinite Integral are,
**Property of Sum
**∫ [f(x) + g(x)]dx = ∫ f(x)dx + ∫ g(x)dx
**Property of Difference
**∫ [f(x) × g(x)]dx = ∫ f(x)dx × ∫ g(x)dx
**Property of Constant Multiple
**∫ k f(x)dx = k∫ f(x)dx
Some of the other properties of the indefinite integral are,
- ∫ f(x) dx = ∫ g(x) dx if ∫ [f(x) - g(x)] dx = 0
- ∫ [k₁f₁(x) + k₂f₂(x) + ...+knfn(x)]dx = k₁∫ f₁(x)dx + k₂∫ f₂(x)dx + ... + kₙ∫ fₙ(x)dx
Indefinite Integral vs Definite Integral
| Aspect | Indefinite Integrals | Definite Integrals |
|---|---|---|
| Definition | Integration of a function without any bounds. | Integration of a function over a specific interval (bounded by lower and upper limits). |
| Notation | ∫ f(x) dx = F(x) + C | ∫abf(x) dx = F(b) - F(a) |
| Result | Gives a function + constant (F(x) + C) | Gives a numerical value (F(b) − F(a)) |
| Geometric Meaning | Family of curves (general solution). | Area under the curve between x = a and x = b. |
| Use Case | Used to find the general form of the antiderivative of a function. | Used to find the exact value of the accumulated quantity between specific limits. |
Solved Examples
**Example 1: Find the integral for the given function f(x), f(x) = sin(x) + 1.
**Solution:
Given f(x) = sin(x) + 1
sin(x) is a standard function, and it's anti-derivative is,
∫ f(x)dx
= ∫ (sin(x) + 1)dx
= \int sin(x)dx + \int 1dx
= -cos(x) + x + C
**Example 2: Find the integral for the given function f(x), f(x) = 2eˣ. .
**Solution:
Given f(x) = 2ex
ex is a standard function, and it's anti-derivative is,
= \int f(x)dx
= \int 2e^xdxUsing the property 1 mentioned above,
= 2\int e^xdx
= 2ex + C
**Example 3: Find the integral for the given function f(x), f(x) = 5x - 2.
**Solution:
Given f(x) = 5x-2
Using reverse power rule
= \int f(x)dx
= \int 5x^{-2}dxUsing property 1 mentioned above,
= 5\int x^{-2}dx
= \frac{-5}{x} + C
**Example 4: Find the integral for the given function f(x), f(x) = sin(x) + 5cos(x).
**Solution:
Given f(x) = sin(x) + 5cos(x)
sin(x) and cos(x) are standard functions, and its integral is,
= \int f(x)dx
= ∫ (sin(x) + 5cos(x))dx
= \int sin(x)dx + 5\int cos(x)dx
= -cos(x) + 5sin(x) + C
**Example 5: Find the integral for the given function f(x), f(x) = 5x - 2 + x4 + x.
**Solution:
Given f(x) = 5x-2 + x4 + x
Using reverse power rule
= \int f(x)dx
= \int (5x{-2} + x^4 + x)dx
= \int (5x{-2} + x^4 + x)dx
= 5\int x^{-2}dx + \int x^4dx + \int xdx
= \frac{-5}{x} + \frac{x^5}{5} + \frac{x^2}{2}