Determine k so that k2 + 4k + 8, 2k2 + 3k + 6, 3k2 + 4k + 4 are three consecutive terms of an AP. - Mathematics

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Determine k so that k² + 4k + 8, 2k² + 3k + 6, 3k² + 4k + 4 are three consecutive terms of an AP.

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Solution

Since k² + 4k + 8, 2k² + 3k + 6

And 3k² + 4k+ 4 are consecutive terms of an AP.

∴ 2k² + 3k + 6 – (k² + 4k + 8)

= 3k² + 4k + 4 – (2k² + 3k + 6) ......[Common difference]

⇒ 2k² + 3k + 6 – k² – 4k – 8 = 3k² + 4k + 4 – 2k² – 3k – 6

⇒ k² – k – 2 = k² + k – 2

⇒ – k = k

⇒ 2k = 0

⇒ k = 0

Concept: Arithmetic Progression

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Chapter 5: Arithematic Progressions - Exercise 5.3 [Page 53]

Q 11 Q 10 Q 12

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NCERT Mathematics Exemplar Class 10

Chapter 5 Arithematic Progressions
Exercise 5.3 | Q 11 | Page 53

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Determine k so that k2 + 4k + 8, 2k2 + 3k + 6, 3k2 + 4k + 4 are three consecutive terms of an AP. - Mathematics

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