Math, asked by ritik12336, 1 year ago

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Ques . If the first , second and last terms of AP are a , b and 2a respectively . Then its sum is

A) ab/2(b-a)

B) ab/( b-a)

C) 3ab / 2 (b-a)

D) None of these

Complete solution ✔✔✔✔✔

not just options otherwise reported ❎❎❎❎❎❎❎❎❎❎❎❎

Thanks


Anonymous: Same question posted 2 other times! Problems with the app?

Answers

Answered by harshitagarwal624
4

#hope it help uh.

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Answered by Anonymous
3

Answer:

C) 3ab / 2(b-a)

Step-by-step explanation:

a, b, 2a are in AP

=>  b - a = 2a - b      [ the common difference ]

=>  3a = 2b

The sum of the three numbers is then

S = a + b + 2a = 3a + b = 2b + b = 3b

Writing A for the expression in (A), we have

A = ab / 2(b-a)

  = 3ab / 2(3b-3a)           [ multiply numerator and denominator by 3 ]

  = 2b² / 2(3b-2b)           [ use 3a = 2b ]

  = 2b² / 2b

  = b

and this is NOT equal to the sum S = 3b.

B = ab / (b-a) = 2A = 2b, is also NOT equal to the sum S = 3b.

C = 3A = 3b = S.

So the answer is (C).

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