What is Integration in Maths?
According to integration definition in Mathematics to find the whole, we generally add or sum up many parts to find the whole.
We know that Integration is basically a reverse process of differentiation, which is defined as a process where we reduce the functions into smaller parts.
To find the summation under a very large scale the process of integration is used.
We can use calculators for the calculation of small addition problems which is a very easy task to do. We use integration methods to sum up many parts in problems where the limits reach infinity.
Some Elementary Standard Integrals in Integration
Different Types of Integrals in Mathematics
Till now we have learned what Integration is. There are two types of Integrations or integrals in Mathematics
Definite Integral
Indefinite Integral
What is Definite Integral?
A Definite Integral has start and end values.
In simpler words there is an interval [a, b].
A definite integral is an integral that contains both the upper and the lower limits.
Definite Integral is also known as Riemann Integral.
Representation of a Definite Integral -
The variables a and b (called limits, bounds or boundaries) are put at the bottom and top of the S, like this:
In this article we are going to discuss what definite integral is, properties of definite integrals which will help you solve definite integral problems and how to evaluate definite integral examples.
Definition of Definite Integral
The Quantity
It is known as the definite integral of f(x) from limit a to b. In the above given formula, F(a) is known to be the lower limit value of the integral and F(b) is known to be the upper limit value of any integral.
There is also a little bit of terminology that we can get out of the way. The number a at the bottom of the integral sign is called the lower limit and the number b at the top of the integral sign is called the upper limit. Although variable a and variable b were given as an interval the lower limit does not always need to be smaller than the upper limit that is b here. The variables a and b are often known as the interval of integration. Let’s understand the concept in a better way by solving definite integral problems.
Properties of Definite Integrals
Area Above - Area Below
The integral adds the area above the axis but the integral subtracts the area below, to obtain a net value.
Adding of functions
The integral of the functions f and g (f+g) generally equals the integral of function f plus the integral of the function g:
Reversing the Interval
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When we reverse the direction of the interval it gives the negative of the original direction.
Interval of Zero Length
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When the interval of the integral starts and ends at the same place, in simpler words if the limit is same then the result is zero:
Adding Intervals
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We can also add two adjacent intervals together, here’s the formula:
These properties will help you solve definite integral problems and how to evaluate definite integral examples.
Let's evaluate definite integral examples and solve definite integral problems.
Questions to be Solved
Question 1) Solve the following definite integral.
\[\int_{-2}^{3} x^{3} dx\]
Solution)\[\int_{-2}^{3} x^{3} dx\]
\[\int_{-2}^{3} x^{3} dx = [\frac{x^{4}}{4}]_{-2}^{3}\]
= \[\frac{81}{4} - \frac{16}{4}\]
= \[\frac{65}{4}\]
= 16.25
Question 2) Evaluate the integral given below.
\[\int_{0}^{\frac{\pi}{2}} cosx dx\]
Solution) Given, \[\int_{0}^{\frac{\pi}{2}} cosx dx\]
= \[\int_{0}^{\frac{\pi}{2}} cosx dx\]
On evaluating the given question,
= \[sin(\frac{\pi}{2}) - sin(0)\]
We know that the value of sin 0 is equal to zero and the value of sin (\[\frac{\pi}{2}\]) is equal to 1.
Therefore , putting the values ,
= 1- 0
= 1
FAQs on Evaluating Definite Integrals
1. What is a definite integral in Mathematics and how does it differ from an indefinite integral?
A definite integral calculates the net area between a function's curve and the x-axis within specific limits, giving a single numeric value. In contrast, an indefinite integral yields a family of functions (antiderivatives) with a constant of integration. The definite integral is always computed over an interval [a, b] and does not include a constant.
2. What are the essential steps to evaluate a definite integral as per CBSE 2025-26 exam guidelines?
To evaluate a definite integral:
- Find the antiderivative (indefinite integral) of the given function.
- Substitute the upper limit into the antiderivative and record the value.
- Substitute the lower limit and record that value.
- Subtract the lower limit result from the upper limit result to get the answer: F(b) - F(a).
3. Why can a definite integral yield a negative value, and what does this indicate about the function?
A definite integral produces a negative value if the portion of the curve lies mainly below the x-axis within the integration interval. This signifies that the net accumulation (such as area or displacement) is in the negative direction, reflecting the sign convention in integration.
4. What are the key properties of definite integrals that simplify solving problems in board exams?
Major properties of definite integrals are:
- Linearity: The integral of a sum is the sum of integrals.
- Interval Splitting: Integral from a to c can be split into a to b, plus b to c.
- Reversing Limits: Switching upper and lower limits reverses the sign.
- Zero Interval: Integral is zero if both limits are equal.
5. What are common mistakes to avoid when evaluating definite integrals in board exams?
Avoid these frequent errors:
- Incorrect substitution of limits into the antiderivative
- Forgetting to change sign when reversing limits
- Missing the negative sign for areas below the x-axis
- Omitting the subtraction step F(b)–F(a) to reach the final value
6. How are definite integrals applied in real-life problems and in the CBSE syllabus?
Definite integrals model quantities like area, volume, total distance, and net change. In the CBSE syllabus, they are often used to solve word problems involving area under curves, displacement, and other accumulations, providing practical value to mathematical theory.
7. If the upper and lower limits of a definite integral are the same, why is the result always zero?
When both limits of integration are identical, the interval length is zero, so no area or accumulated value is enclosed. Therefore, the value of the definite integral is always zero, as nothing is being summed over an empty interval.
8. How does understanding different types of definite integrals assist in exam preparation?
Familiarity with types—such as polynomial, trigonometric, and exponential integrals—enables students to quickly select appropriate solution techniques. Recognising standard forms also allows for efficient use of properties and shortcuts during exams.
9. What strategies help in solving CBSE Class 12 board questions on evaluating definite integrals efficiently?
Effective strategies include:
- Practising standard and previous year questions from the syllabus
- Applying properties to simplify calculations
- Careful substitution and calculation of limits
- Interpreting integrals contextually in word problems for correct application
10. How can misconceptions about sign conventions and interval direction in definite integrals impact answers in CBSE board exams?
Misunderstanding the effect of reversing integration limits or correctly identifying positive/negative areas can lead to wrong answers. Always check the direction of integration and apply negative signs as per properties to match the CBSE evaluation criteria.
