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Sum of the first n natural numbers
Sum of squares of first n natural numbers
Sum of first n terms of an A.P.
Sum of infinite terms of a G.P.
Sum of n terms of a G.P.
Sum of the cubes of first n natural numbers
Arithmetic progressions, often abbreviated as AP, are a fundamental concept in mathematics. They appear in various real-world scenarios, from financial calculations to physics and engineering problems. Understanding how to find the sum of the first n terms of an arithmetic progression is a valuable skill that opens doors to solving a wide range of problems. In this blog, we will explore the sum of an arithmetic progression, understand the formula used to calculate it, solve examples, address common questions, explore real-life applications, and conclude with a deeper appreciation for this mathematical tool.
An arithmetic progression is a sequence of numbers in which the difference between any two consecutive terms is constant. This constant difference is called the common difference, denoted as 'd.' The sum of the first n terms of an arithmetic progression is the total obtained by adding the first n terms of the sequence.
The formula for finding the Sum of the first n terms of an arithmetic progression is given by:
=
Where is the first term of the sequence & is the common difference.
is the number of terms of which sum is required & represents the Sum of the first n terms of an arithmetic progression.
Identify the value of a, d, and n.
Use the above formula to calculate the Sum of the first n terms of an arithmetic progression.
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This calculator will help you find the sum of the first n terms of an arithmetic progression.
You must put the values a, d, and n in the input boxes.
After clicking the Calculate button, a step-by-step solution will be displayed on the screen.
You can access, download, and share the solution.
Find the sum of the first 10 terms of the arithmetic progression with the first term (a) as 3 and the common difference (d) as 4.
Given value of a = 3, d = 4, and n = 10
By using the above formula, Sum = = 210
So, the sum of the series is 210.
Determine the sum of the first 15 terms of an arithmetic progression where the first term (a) is 2 and the common difference (d) is -3.
Given value of a = 2, d = -3, and n = 15
By using the above formula, Sum = = -285
So, the sum of the series is -285.
APs are used in various fields, including finance (calculating interest), physics (describing motion), and computer science (algorithm design).
Yes, it works for increasing and decreasing APs; you'll have a negative common difference (d) for decreasing progressions.
Yes, you can use the formula for the nth term of an AP and then sum those terms. The formula mentioned here is a more direct method.
In that case, the arithmetic progression consists of identical terms, and the sum is simply n times the value of the first term (a).
In an arithmetic progression, the difference between consecutive terms is constant, while in a geometric progression, the ratio between successive terms is constant.
The concept of arithmetic progressions finds applications in various real-life scenarios, such as calculating interest in financial investments, predicting future values in physics, and designing efficient algorithms in computer science.
The sum of the first n terms of an arithmetic progression is a fundamental mathematical concept that bridges theory and practical applications. Armed with the formula and the ability to calculate it, you have a powerful tool for solving various problems across diverse fields. Through concepts like this, mathematics continues to empower us with the tools needed to explore and understand the world around us.
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