Last Term of Arithmetic Progression given Sum of Last N Terms Calculator

✖The Sum of Last N Terms of Progression is the summation of the terms starting from the end to the nth term of a given Progression.ⓘ Sum of Last N Terms of Progression [S_n(End)]			+10% -10%
✖The Index N of Progression is the value of n for the nth term or the position of the nth term in a Progression.ⓘ Index N of Progression [n]			+10% -10%
✖The Common Difference of Progression is the difference between two consecutive terms of a Progression, which is always a constant.ⓘ Common Difference of Progression [d]			+10% -10%

✖The Last Term of Progression is the term at which the given Progression terminates.ⓘ Last Term of Arithmetic Progression given Sum of Last N Terms [l]

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Last Term of Arithmetic Progression given Sum of Last N Terms Solution

STEP 0: Pre-Calculation Summary

Formula Used

Last Term of Progression = (Sum of Last N Terms of Progression/Index N of Progression-(Common Difference of Progression*(1-Index N of Progression))/2)
l = (S_n(End)/n-(d*(1-n))/2)
This formula uses 4 Variables

Variables Used

Last Term of Progression - The Last Term of Progression is the term at which the given Progression terminates.
Sum of Last N Terms of Progression - The Sum of Last N Terms of Progression is the summation of the terms starting from the end to the nth term of a given Progression.
Index N of Progression - The Index N of Progression is the value of n for the nth term or the position of the nth term in a Progression.
Common Difference of Progression - The Common Difference of Progression is the difference between two consecutive terms of a Progression, which is always a constant.

STEP 1: Convert Input(s) to Base Unit

Sum of Last N Terms of Progression: 800 --> No Conversion Required
Index N of Progression: 6 --> No Conversion Required
Common Difference of Progression: 4 --> No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

l = (S_n(End)/n-(d*(1-n))/2) --> (800/6-(4*(1-6))/2)

Evaluating ... ...

l = 143.333333333333

STEP 3: Convert Result to Output's Unit

143.333333333333 --> No Conversion Required

FINAL ANSWER

143.333333333333 ≈ 143.3333 <-- Last Term of Progression

(Calculation completed in 00.004 seconds)

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< Last Term of Arithmetic Progression Calculators

Last Term of Arithmetic Progression given Pth and Qth Terms

LaTeX Go Last Term of Progression = ((Pth Term of Progression*(Index Q of Progression-1)-Qth Term of Progression*(Index P of Progression-1))/(Index Q of Progression-Index P of Progression))+(Number of Total Terms of Progression-1)*((Qth Term of Progression-Pth Term of Progression)/(Index Q of Progression-Index P of Progression))

Last Term of Arithmetic Progression given Sum of Last N Terms

LaTeX Go Last Term of Progression = (Sum of Last N Terms of Progression/Index N of Progression-(Common Difference of Progression*(1-Index N of Progression))/2)

Last Term of Arithmetic Progression given Sum of Total Terms

LaTeX Go Last Term of Progression = ((2*Sum of Total Terms of Progression)/Number of Total Terms of Progression)-First Term of Progression

Last Term of Arithmetic Progression

LaTeX Go Last Term of Progression = First Term of Progression+((Number of Total Terms of Progression-1)*Common Difference of Progression)

Last Term of Arithmetic Progression given Sum of Last N Terms Formula

LaTeX Go

Last Term of Progression = (Sum of Last N Terms of Progression/Index N of Progression-(Common Difference of Progression*(1-Index N of Progression))/2)
l = (S_n(End)/n-(d*(1-n))/2)

What is an Arithmetic Progression?

An Arithmetic Progression or simply AP is a sequence of numbers such that successive terms are obtained by adding a constant number to the first term. That fixed number is called the common difference of the Arithmetic Progression. For example, the sequence 2, 5, 8, 11, 14,... is an Arithmetic Progression with first term is 2 and common difference is 3. An AP is a convergent sequence if and only if the common difference is 0, otherwise an AP is always divergent.

How to Calculate Last Term of Arithmetic Progression given Sum of Last N Terms?

Last Term of Arithmetic Progression given Sum of Last N Terms calculator uses Last Term of Progression = (Sum of Last N Terms of Progression/Index N of Progression-(Common Difference of Progression*(1-Index N of Progression))/2) to calculate the Last Term of Progression, The Last Term of Arithmetic Progression given Sum of Last N Terms formula is defined as the term at which the given Arithmetic Progression terminates and calculated using the sum of the last n terms of the Arithmetic Progression. Last Term of Progression is denoted by l symbol.

How to calculate Last Term of Arithmetic Progression given Sum of Last N Terms using this online calculator? To use this online calculator for Last Term of Arithmetic Progression given Sum of Last N Terms, enter Sum of Last N Terms of Progression (S_n(End)), Index N of Progression (n) & Common Difference of Progression (d) and hit the calculate button. Here is how the Last Term of Arithmetic Progression given Sum of Last N Terms calculation can be explained with given input values -> 36.66667 = (800/6-(4*(1-6))/2).

FAQ

What is Last Term of Arithmetic Progression given Sum of Last N Terms?

The Last Term of Arithmetic Progression given Sum of Last N Terms formula is defined as the term at which the given Arithmetic Progression terminates and calculated using the sum of the last n terms of the Arithmetic Progression and is represented as l = (S_n(End)/n-(d*(1-n))/2) or Last Term of Progression = (Sum of Last N Terms of Progression/Index N of Progression-(Common Difference of Progression*(1-Index N of Progression))/2). The Sum of Last N Terms of Progression is the summation of the terms starting from the end to the nth term of a given Progression, The Index N of Progression is the value of n for the nth term or the position of the nth term in a Progression & The Common Difference of Progression is the difference between two consecutive terms of a Progression, which is always a constant.

How to calculate Last Term of Arithmetic Progression given Sum of Last N Terms?

The Last Term of Arithmetic Progression given Sum of Last N Terms formula is defined as the term at which the given Arithmetic Progression terminates and calculated using the sum of the last n terms of the Arithmetic Progression is calculated using Last Term of Progression = (Sum of Last N Terms of Progression/Index N of Progression-(Common Difference of Progression*(1-Index N of Progression))/2). To calculate Last Term of Arithmetic Progression given Sum of Last N Terms, you need Sum of Last N Terms of Progression (S_n(End)), Index N of Progression (n) & Common Difference of Progression (d). With our tool, you need to enter the respective value for Sum of Last N Terms of Progression, Index N of Progression & Common Difference of Progression and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.

How many ways are there to calculate Last Term of Progression?

In this formula, Last Term of Progression uses Sum of Last N Terms of Progression, Index N of Progression & Common Difference of Progression. We can use 3 other way(s) to calculate the same, which is/are as follows -

Last Term of Progression = First Term of Progression+((Number of Total Terms of Progression-1)*Common Difference of Progression)
Last Term of Progression = ((Pth Term of Progression*(Index Q of Progression-1)-Qth Term of Progression*(Index P of Progression-1))/(Index Q of Progression-Index P of Progression))+(Number of Total Terms of Progression-1)*((Qth Term of Progression-Pth Term of Progression)/(Index Q of Progression-Index P of Progression))
Last Term of Progression = ((2*Sum of Total Terms of Progression)/Number of Total Terms of Progression)-First Term of Progression

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