Question

Find the first term and the common difference of the arithmetic sequence whose 6th term is 30 and 12th term is 54.

asked Nov 23, 2022 218k views

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Villapossu · Answer 1 · 2022-11-23T19:03:59+0000

Answer:

Given :-

6th term = 30

12th term = 54

To Find :-

First term

Common difference

Solution :-

We know that

$\sf \: a_(n) = a + (n - 1)d$

For 6th term

$\sf \: 30 = a + (6 - 1)d$

$\sf \: 30 = a + 5d$

For 12th term

$\sf \: a_(n) = a + (n - 1)d$

$\sf \: 54 = a + (12 - 1)d$

$\sf \: 54 = a + 11d$

On subtracting both

$\sf \: 54 - 30 = a + 11d - (a + 5d)$

$\sf \: 54 - 30 = a + 11d - a - 5d$

$\sf \: 24 = 6d$

$\sf \: (24)/(6) = d$

$\sf \: 4 = d$

Now

Using 2

$\sf \: 54 = a + 11d$

$\sf \: 54 = a + 11(4)$

$\sf \: 54 = a + 44$

$\sf \: 54 - 44 = a$

$\sf \: 10 = a$

Justin Lin · Answer 2 · 2022-11-27T08:37:45+0000

Answer:

10 and 4

Explanation:

The first term is a, common difference is d.

The 6th term:

a + 5d = 30

The 12th term:

a + 11d = 54

Solve the system by elimination:

11d - 5d = 54 - 30
6d = 24
d = 4

Find a:

a + 5*4 = 30
a + 20 = 30
a = 10

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Given :-

To Find :-

Solution :-

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