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

is 54.

User Sam Goldman
by
2.5k points

2 Answers

27 votes
27 votes

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

User Icvader
by
3.0k points
24 votes
24 votes

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

User Jako Basson
by
2.6k points