Question

sum of first 55term in an A.P IS 3300 find 28th term

Answer 1

hope it helps uh...
last step can be quite confusing...
we know...
28th term can be written as a + 27d..
rest is quite simple ❤

Answer 2

Answer:-

$\boxed{ \bf{t_{28} = 60}}$

Step - by - step explanation :-

To find :-

Find 28th term of the given AP.

Given :-

55th term is 3300.

Solution:-

Let first term of this AP is "a"

Common difference is "d"

According to the question-

$\: \bf{s_{55} = 3300} \\ \\ \bf{ \frac{55}{2} \bigg(2a + (55 - 1)d \bigg) = 3300} \\ \\ \bf{\frac{55}{2} \bigg(2a + 54d \bigg) = 3300} \\ \\ \bf{ 55(a + 27d) = 3300} \\ \\ \bf{a + 27d \: = 60 }\: \: \: ......(1)$

And also ,

We know that,

$\bf{t_{28} \: = a \: + (28 - 1)d} \\ \\ \bf{ t_{28} \: = a + 27d \: } \: ......(2)$

On comparing eq (1) and (2)

We get,

$\boxed{ \red{\bf{t_{28} = 60}}}$

Hope it helps you.