Find the first 5 terms of the arithemitic sequence whose seventh term is 22 and whose eleventh term is 6.
1 answer:
Answer:
- The first 5 terms of the arithemitic sequence are 46, 42, 38, 34 and 30.
Step-by-step explanation:
<u>Given that</u>:
- The arithemitic sequence whose seventh term is 22 and whose eleventh term is 6.
<u>To Find</u>:
- The first 5 terms of the arithemitic sequence.
<u>We know that</u>:
Where,
- aₙ = nth term
- a = First term
- n = Number of terms
- d = Common difference
<u>We have</u>:
Seventh term = 22
⟶ a + (7 - 1)d = 22
⟶ a + 6d = 22
⟶ a = 22 - 6d
Evelenth term = 6
⟶ a + (11 - 1)d = 6
⟶ a + 10d = 6
Substituting the value of a.
⟶ 22 - 6d + 10d = 6
⟶ 22 + 4d = 6
⟶ 4d = 6 - 22
⟶ 4d = - 16
⟶ d = - 16/4
⟶ d = - 4
In equation (i).
⟶ a = 22 - 6d
Putting the value of d.
⟶ a = 22 - 6(- 4)
⟶ a = 22 + 24
⟶ a = 46
<u>Now we have to find the first 5 terms</u>:
- a = 46
- a + d = 46 + (- 4) = 46 - 4 = 42
- a + 2d = 46 + 2(- 4) = 46 - 8 = 38
- a + 3d = 46 + 3(- 4) = 46 - 12 = 34
- a + 4d = 46 + 4(- 4) = 46 - 16 = 30
<u>Hence</u>,
- The first 5 terms of the arithemitic sequence are 46, 42, 38, 34 and 30.
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