Find the Sum of n terms of Arithmetic Sequence a = 6, n=93, and d=1
Created By : Abhinandan Kumar
Reviewed By : Rajashekhar Valipishetty
Last Updated : Mar 21, 2023
Make use of our handy arithmetic sequence calculator and Find the Sum of n terms of Arithmetic Sequence a = 6, n=93, and d=1. After clicking on the calculate button you will get the desired output i.e. 4836.0 for the given inputs in a matter of seconds.
Sum of Arithmetic Sequence a = 6, n=93, and d=1 is 4836.0
Steps to find sum of n terms of arithmetic sequence:
sum of n terms of arithmetic sequence formula:-
Sn = `n/2 (2a+(n-1)d)`
where:
- sn is the sum of n terms
- a is first term
- n is total number of terms
- d is common difference
Input values are:-
a = 6
n = 93
d = 1
Put values into formula
S93 = `n/2 (2a+(n−1)d)`
S93 = `93/2 * ( 2*6 + ( 93 - 1)*1 )`
S93 = 4836.0
Here is the detailed procedure to find the sum of first n terms of Arithmetic Sequence a = 6, n=93, and d=1. Let’s jump into the process and learn the calculation along with the output of sum of n terms of AP:
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At first, we need to figure out the given values to find the sum of first n terms of AP ie., a = 6, n=93, and d=1.
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Now, take the sum of n terms of Arithmetic progression formula ie., S = n/2 * [2a₁ + (n-1)d] and substitute the input values.
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After that, we get S = 93/2 * [2(6) + (93-1)1].
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Now, simply the above expression to get the sum of first n terms of Arithmetic sequence for a = 6, n=93, and d=1 is S5 = 4836.0
Example for Finding Sum of n terms of Arithmetic Sequence
FAQs on How to find Sum of n terms of A.P for a = 6, n=93, and d=1
1. Where Can I Find the Sum of n terms of Arithmetic Sequence a = 6, n=93, and d=1?
You can Find the Sum of n terms of Arithmetic Sequence a = 6, n=93, and d=1 from our online tools ie., arithmetic sequence calculator.
2. Do I Get the Result for the Sum of n terms of A.P for a = 6, n=93, and d=1 easily using a calculator?
Yes, you will get the Result for the Sum of n terms of A.P for a = 6, n=93, and d=1 easily using our handy arithmetic calculator tool. The output is S5 = 4836.0
3. What is the formula for finding the sum of n terms of arithmetic progression?
The formula for determining the sum of n terms of arithmetic progression is S = n/2 * [2a₁ + (n-1)d].