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प्रश्न
Show that the progression given below is an AP. Find the first term, common difference and next term.
`sqrt(2), sqrt(8), sqrt(18), sqrt(32)`,....
योग
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उत्तर
The given progression `sqrt(2), sqrt(8), sqrt(18), sqrt(32)`,....
This sequence can be written as `sqrt(2), 2sqrt(2), 3sqrt(2), 4sqrt(2)`,....
Clearly, `2sqrt(2) - sqrt(2) = 3sqrt(2) - 2sqrt(2)`
= `4sqrt(2) - 3sqrt(2)`
= `sqrt(2)` ...(Constant)
Thus, each term differs from its preceding term by `sqrt(2)`.
So, the given progression is an AP.
First term = `sqrt(2)`
Common difference = `sqrt(2)`
Next term of the AP = `4sqrt(2) + sqrt(2)`
= `5sqrt(2)`
= `sqrt(50)`
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अध्याय 5: Arithmetic Progression - EXERCISE 5A [पृष्ठ २६०]
