1 Answer

Mohsin Awan · Answer 1 · 2023-12-01T08:09:27+0000

Answer:

Given that,

$\sum ^(30)_(n\mathop=2)(3n-1)$

Simplifying we get,

$\sum ^(30)_{n\mathop{=}2}(3n-1)=\sum ^(30)_{n\mathop{=}2}3n+\sum ^(30)_{n\mathop{=}2}1$
$=3\sum ^(30)_{n\mathop{=}2}n+\sum ^(30)_{n\mathop{=}2}1$

we have that,

$\sum ^n_(n\mathop=1)1=n$

If n is from 2 to n we get,

$\sum ^n_{n\mathop{=}2}1=n-1$

Also,

$\sum ^k_(n\mathop=1)n=(k(k+1))/(2)$

If n is from 2 to n we get,

$\sum ^k_(n\mathop=2)n=(k(k+1))/(2)-1$

Using this and substituting in the required expression we get,

$=3\lbrack(30*31)/(2)-1\rbrack+30-1$
=3(464)+29

Answer is: 1421

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