Math, asked by cjacob856, 8 months ago

In a decreasing AP the sum of all its terms except the first term is equal to - 36 the sum of all its terms except the last term is zero and the the difference of the tenth and the 6th term is equal to - 6. What will be the first term of the AP. ​

Answers

Answered by studyomaster
2

Answer:

16

Step-by-step explanation:

Let S be the sum of the series of the A.P. Let 'a' is the first term and 'l' is the last term.

Since it is given that in a decreasing AP the sum of all its terms except the first term is equal to −36, therefore, S=−36+a.

Also since the sum of all its terms except the last term is zero therefore, S=0+l.

and hence

S=−36+a=0+l

⇒−36+a=0+l

⇒a=l+36

Also it is given that the difference of the tenth and the sixth term is −16. Therefore, T

10

−T

6

=−16.

Since, T

10

=a+(10−1)d=a+9d

T

6

=a+(6−1)d=a+5d

Substituting the values in T

10

−T

6

=−16, we get

T

10

=a+(10−1)d=a+9d

T

6

=a+(6−1)d=a+5d

a+9d−a+5d=−16

4d=−16

d=−4

In general, l=a+(n−1)d

Substitute l=a−36 and d=−4 in l=a+(n−1)d

36=(n−1)(4)

n−1=9

n=10

So, n=10

We got d=−4 and n=10 and it is mentioned as decreasing AP.

From the given sum which was 0 except the last term and negative except the first term, so 'a' has to be positive.

Let a=16 then the AP becomes

16,12,8,4,0,−4,−8,−12,−16,−20 which satisfies all the above conditions and therefore the first term of the AP is 16.

Hence, A is the correct option.

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