Define a sequence....

Define a sequence.

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Ori sequence in plasmid refers to sequence

for antibody resistance

from which replication will start In plasmid

for restriction site

Both (a) and (b)

One useful way of defining sequences is by a recursion relation. Many recurrence relations can be transformed to some know sequences, say GP or sometimes nth term can be found by algebraic jugglery Some chochlates are distributed between 25 children in such a way that first child gets 5 chocolates , second child gets 7 choloates and in (n -a)^(th) child . The total number of chocolates distributed is

3250

2525

2750

3025

One useful way of defining sequences is by a recursion relation. Many recurrence relations can be transformed to some know sequences, say GP or sometimes nth term can be found by algebraic jugglery Let {a_(n)} + 2a_(2) + 3a_(3) + …+ (n-1) a_(n-1) = n^(2) a_(n). n ge 2 The value of a_(786) is

`(1)/(789)`

`(1)/(393)`

`(2)/(393)`

`(1)/(1572)`

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Consider the sequence defined by a_(n)=an^(2)+bn+* If a_(1)=1,a_(2)=5,anda_(3)=11, then find the value of a_(10).

One useful way of defining sequences is by a recursion relation. Many recurrence relations can be transformed to some know sequences, say GP or sometimes nth term can be found by algebraic jugglery If 'a_(1)' = 1, a_(n) - a_(n-1) = 1 for every positive integer greater than 1, then a_(1) + a_(2) + a_(3) + ...a_(100) rquals

The given figure represent a sequence in cell division The missing stage in the above sequence is

In the reaction sequence

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Define a sequence.

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Ori sequence in plasmid refers to sequence

One useful way of defining sequences is by a recursion relation. Many recurrence relations can be transformed to some know sequences, say GP or sometimes nth term can be found by algebraic jugglery Let {a_(n)} + 2a_(2) + 3a_(3) + …+ (n-1) a_(n-1) = n^(2) a_(n). n ge 2 The value of a_(786) is

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MODERN PUBLICATION-SEQUENCES AND SERIES-CHECK YOUR UNDERSTANDING