Math, asked by sonuyadav80gmailcom, 1 year ago

in an AP of so term the sum of first 10 term is 210 and the some of its last is term is 2565.find the AP.

Answers

Answered by spagent000016
2

Consider a and d as the first term and the common difference of an A.P. respectively.


n th term of an A.P., an = a + ( n – 1)d


Sum of n terms of an A.P., S n = n/ 2 [2a + (n – 1)d]


Given that the sum of the first 10 terms is 210.


⇒ 10 / 2 [2a + 9d ] = 210


⇒ 5[ 2a + 9 d ] = 210


⇒2a + 9d = 42 ----------- (1)


15 th term from the last = ( 50 – 15 + 1 ) th = 36 th term from the beginning


⇒ a36 = a + 35d


Sum of the last 15 terms = 15/2 [2a36 + ( 15 – 1)d ] = 2565


⇒ 15 / 2 [ 2(a + 35d) + 14d ] = 2565


⇒ 15 [ a + 35d + 7d ] = 2565


⇒a + 42d = 171 ----------(2)


From (1) and (2), we have d = 4 and a = 3.


Therefore, the terms in A.P. are 3, 7, 11, 15 . . . and 199.



Answered by Anonymous
0

   \underline{  \underline{\bf{Answer}}}  :  -  \\   \implies \: 3, \: 7 \:, 11 \: ,15, \: ..........,199 \\ \\   \underline{\underline{ \bf{Step - by  - step \: explanation \: }}} :  -  \\  \\

According to the question:-

 \bf{sum \: of \: first \: 10 \: terms \:( s_{10})   = 210} \\   210 =  \frac{10}{2} \bigg (2a + (101)d \bigg) \: \\   \\ 2a + 9d = 42 \: .........(1)\\   \\ \bf{sum \: of \: last \: 15 \: terms \: ( s_{15})= 2565} \\ \\  s_{50} -s_{35} = 2565  \\  \\ 2565 =  \frac{50}{2}  \bigg(2a + (50 - 1)d \bigg)  -  \frac{35}{2} \bigg(2a + (35 - 1)d \bigg) \\  \\ 2565 = 25(2a + 49d) - 35(a + 17d)  \\  \\  2565 = 50a + 1225d - 35a - 595d \\  \\ after \: solving \: this \:  \\  \\ a + 42d = 171 \:  ...........(2) \\  \\ from \: eq(1) \: and \: (2) \\  \\eq (1) \times 42 - \: eq (2) \times 9 \\  \\ we \: get \:  \\  \\ a = 3 \: d = 4 \\

Hence required AP is →

3,7,11,15,....,199

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