How many terms of the AP 65, 60, 55, ........... be taken so that thei

1.	How many terms of the AP 65, 60, 55, ........... be taken so that their sum is zero ?
Answer» Answer 27 TERMS of the given AP are required so that their sum becomes 0 Given The AP is 65,60,55,........ To Find How many terms of the given AP to be taken so that their sum is 0 Solution Given , the AP 65 , 60 , 55 , ...…... Here , first term , a = 65 COMMON difference , d = -5 Let us consider sum upto ‘N’ terms be 0 Now we know that , $\sf \longrightarrow S_{n} = \dfrac{n}{2}\{ 2a + (n -1)d \} \\\\ \sf\implies 0 = \dfrac{n}{2} \{2\times 65 + (n - 1)(-5) \} \\\\ \sf\implies 0 = n\{ 130 - 5n + 5 \} \\\\ \sf\implies n\{135 - 5n \} = 0 \\\\ \sf\implies 5n -135= 0 \\\\ \sf\implies 5n = 135 \\\\ \sf\implies n = 27$ Thus 27 terms of the given AP must be taken so that their sum becomes 0

How many terms of the AP 65, 60, 55, ........... be taken so that their sum is zero ?

Answer»

Answer

27 TERMS of the given AP are required so that their sum becomes 0

Given

The AP is 65,60,55,........

To Find

How many terms of the given AP to be taken so that their sum is 0

Solution

Given , the AP

65 , 60 , 55 , ...…...

Here ,

first term , a = 65

COMMON difference , d = -5

Let us consider sum upto ‘N’ terms be 0

Now we know that ,

$\sf \longrightarrow S_{n} = \dfrac{n}{2}\{ 2a + (n -1)d \} \\\\ \sf\implies 0 = \dfrac{n}{2} \{2\times 65 + (n - 1)(-5) \} \\\\ \sf\implies 0 = n\{ 130 - 5n + 5 \} \\\\ \sf\implies n\{135 - 5n \} = 0 \\\\ \sf\implies 5n -135= 0 \\\\ \sf\implies 5n = 135 \\\\ \sf\implies n = 27$

Thus 27 terms of the given AP must be taken so that their sum becomes 0

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