Determine k so that k+2, 4k-6 and 3k-2 are three consecutive terms of A.P.

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Rajan@2021Guru

Asked: March 31, 20212021-03-31T09:15:43+05:30 2021-03-31T09:15:43+05:30In: CBSE

Determine k so that k+2, 4k-6 and 3k-2 are three consecutive terms of A.P.

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We have a question from arithmetic progression chapter in which we are to find the value of k so that k+2, 4k-6 and 3k-2 are three consecutive terms of A.P.

Book – RS Aggarwal, class 10, chapter 5B, question no 1

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MathsMentor · Answer 1 · 2021-03-31T22:35:10+05:30

MathsMentor Guru

2021-03-31T22:35:10+05:30Added an answer on March 31, 2021 at 10:35 pm

It is given that k+2,4k−6,3k−2 are the consecutive terms of A.P, therefore, by arithmetic mean property we have, first term+third term is equal to twice of second term that is:(k+2)±(3k−2)=2(4k−6)

Determine k so that k+2, 4k-6 and 3k-2 are three consecutive terms of A.P.

1 Answer

It is given that k+2,4k−6,3k−2 are the consecutive terms of A.P, therefore, by arithmetic mean property we have, first term+third term is equal to twice of second term that is:(k+2)±(3k−2)=2(4k−6)

⇒4k=8k−12

⇒4k−8k=−12

⇒−4k=−12

⇒4k=12

⇒k=12/4

=3

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Determine k so that k+2, 4k-6 and 3k-2 are three consecutive terms of A.P.

1 Answer

It is given that k+2,4k−6,3k−2 are the consecutive terms of A.P, therefore, by arithmetic mean property we have, first term+third term is equal to twice of second term that is:(k+2)±(3k−2)=2(4k−6)

⇒4k=8k−12

⇒4k−8k=−12

⇒−4k=−12

⇒4k=12

⇒k=12/4

​=3

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=3

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