Integration formula topic wise. Integration Formulas List
integration formula calculus formula is a most using formula for calculus in mathematic Actually, Integration is the reverse process of Differentiation. Therefore, it is essential to know the formula as well as the differential to solve the questions of integration. Integration Formulas is the process with the help of which any type of integration related questions can be solved easily.
Calculus is the biggest topic of Maths in class 12th. It covers about 44% part of
Mathematics which includes topics like Differential, Integration, Santana,
Derivative Equation etc. Among these, the biggest topic is Integration, which
is very interesting. It is impossible to study it or solve the question without
Integration Formulas.
Here all the integration formulas from Basic to Advance are displayed which help the
most in solving the questions.
- What is Integration?
- Sectional Method Formula | Method of Parts formula
- Integration Formula List | Integration Formulas in English
- Generally, integration is classified into four major parts, therefore, we will study Integration Formulas according to the classification.
- Basic integration formula
- Integration Formulas of Inverse Trigonometric functions:
- Advanced Integration Formulas
- Formula of Partial Fractions
- Special Integration Formula
What is
Integration?
In general, integration is the inverse process of differentiation, also known as
inverse differentiation. It is actually a process of working opposite to the
differential function which is called integration.
Thus, finding the integral of a function f (x) means finding a function f (x) whose
derivative is f (x). Some special facts regarding this are as follows.
f'(x).dx = f(x) + C
Integral:
The function whose integral is to be found is called integral.
Integration:
The method of finding the integral of a function is called Integration.
Integral:
The function whose derivative is integral is called the integral of the
integral.
| ∫ 1 dx | x + C |
| ∫ a dx | ax + C |
| ∫ xn dx | ((xn+1)/(n+1)) + C |
| ∫ sin x dx | – cos x + C |
| ∫ cos x dx | sin x + C |
| ∫ sec2x dx | tan x + C |
| ∫ cosec2x dx | – cot x + C |
| ∫ sec x (tan x) dx | sec x + C |
| ∫ cosec x ( cot x) dx | – cosec x + C |
| ∫ (1/x) dx | log |x| + C |
| ∫ ex dx | ex+ C |
| ∫ ax dx | (ax / log a) + C |
| ∫ tan x dx | log | sec x | + C |
| ∫ cot x dx | log | sin x | + C |
| ∫ sec x dx | log | sec x + tan x | + C |
| ∫ cosec x dx | log | cosec x – cot x | + C |
| ∫ 1 / √ ( 1 – x2 ) dx | sin – 1 x + C |
| ∫ 1 / √ ( 1 – x2 ) dx | cos – 1 x + C |
| ∫ 1 / √ ( 1 + x2 ) dx | tan – 1 x + C |
| ∫ 1 / √ ( 1 + x2 ) dx | cot – 1 x + C |
Sectional Method Formula | Method of Parts formula
Generally, the correct choice of u and v is to be done to find the integration by the block method. Therefore, a formula works in relation to this, which is represented by the name of ILATE. Its meaning is defined as follows.
- I = Inverse Trigonometry Function
- L = Logarithm Function
- A= Algebraic Function
- T = Trigonometry Function
- E = Exponential Function
Integration
Formula List | Integration Formulas in English
Integration
is the most important topic in Calculus, so, it is our responsibility to get
specific information about it so that it is easy to solve the question. Here
the list of all the formulas is provided in a systematic manner which is
essential for class 12.
- ∫1 dx = x + C
- ∫ a dx = ax+ C
- ∫ (1/x) dx = ln |x| + C
- ∫ ex dx = ex+ C
- ∫ sin x dx = – cos x + C
- ∫ cos x dx = sin x + C
- ∫ sec2x dx = tan x + C
- ∫ csc2x dx = -cot x + C
- ∫ sec x (tan x) dx = sec x + C
- ∫ csc x ( cot x) dx = – csc x + C
- ∫cosec2x.dx = -cotx + C
- ∫secx.tanx.dx = secx + C
- ∫cosecx.cotx.dx = -cosecx + C
- ∫tanx.dx =log|secx| + C
- ∫cotx.dx = log|sinx| + C
- ∫secx.dx = log|secx + tanx| + C
- ∫cosecx.dx = log|cosecx – cotx| + C
- ∫ ax dx = (ax/ln a) + C ; a>0, a≠1
Generally,
integration is classified into four major parts, therefore, we will study
Integration Formulas according to the classification.
- Method of
Transformation - Method of
Substitution - Method of
Parts - Method of
Partial Fractions
Basic integration formula
- ∫ xn.dx = x(n + 1)/(n + 1)+ C
- ∫1.dx = x + C
- ∫ ex.dx = ex + C
- ∫1/x.dx = log|x| + C
- ∫ ax.dx = ax /loga+ C
- ∫ ex[f(x) + f'(x)].dx = ex.f(x) + C
Integration Formulas of Inverse Trigonometric functions:
- ∫1/√(1 – x2).dx = sin-1x + C
- ∫ /1(1 – x2).dx = -cos-1x + C
- ∫1/(1 + x2).dx = tan-1x + C
- ∫ 1/(1 +x2 ).dx = -cot-1x + C
- ∫ 1/x√(x2 – 1).dx = sec-1x + C
- ∫ 1/x√(x2 – 1).dx = -cosec-1 x + C
Advanced Integration Formulas
- ∫1/(x2 – a2).dx = 1/2a.log|(x – a)(x +
a| + C - ∫ 1/(a2 – x2).dx =1/2a.log|(a + x)(a –
x)| + C - ∫1/(x2 + a2).dx = 1/a.tan-1x/a + C
- ∫1/√(x2 – a2)dx = log|x +√(x2
– a2)| + C - ∫ √(x2 – a2).dx =1/2.x.√(x2
– a2)-a2/2 log|x + √(x2 – a2)| + C - ∫1/√(a2 – x2).dx = sin-1 x/a + C
- ∫√(a2 – x2).dx = 1/2.x.√(a2
– x2).dx + a2/2.sin-1 x/a + C - ∫1/√(x2 + a2 ).dx = log|x + √(x2
+ a2)| + C - ∫ √(x2 + a2 ).dx =1/2.x.√(x2
+ a2 )+ a2/2 . log|x + √(x2 + a2 )| + C
| sin2 x | ( 1 – cos 2x ) / 2 |
| cos2 x | ( 1 + cos 2x ) / 2 |
| sin3 x | ( 3 sin x – sin 3x ) / 4 |
| cos3 x | ( 3 cos x + cos 3x ) / 4 |
| tan2 x | sec2 x – 1 |
| sin2 x + cos2 x | 1 |
| tan2 x | cosec2 x – 1 |
| 2sin A . sin B | cos(A – B) + cos(A + B) |
| 2sin A . cos B | sin(A + B) + sin(A – B) |
| 2cos A . sin B | sin(A + B) – sin(A – B) |
| 2cos A . cos B | cos(A + B) + cos(A – B) |
| Sin 3x | 3sin x – 4sin3 x |
| Cos 3x | 4cos3 x – 3cos x |
| Tan 3x | ( 3tan x – tan3 x ) / ( 1 – 3tan2 x ) |
| sin 2x | 2sin x • cos x = 2tan x / (1+tan2 x ) |
| cos 2x | cos2 x – sin2 x = (1- tan2 x ) / ( 1+tan2 x ) |
| cos 2x | 2cos2 x −1 = 1 – 2sin2 x |
| tan 2x | ( 2tan x ) / (1−tan2 x ) |
| sec 2x | sec2 x / (2-sec2 x ) |
| Cosec 2x | (sec x . Cosec x ) / 2 |
Formula of Partial Fractions
Special Integration Formula
