How do you find the 24th term of an arithmetic sequence?


  1. How do you find the 24th term of an arithmetic sequence?
  2. What is the 22nd term of the arithmetic sequence where a1 8 and a9 56 6 points?
  3. How do you find the 25th term of an arithmetic sequence?
  4. How do you find the 27th term of an arithmetic sequence?
  5. What is the 24th term of the arithmetic sequence when a1 8?
  6. How do you find the 15th term of an arithmetic sequence?
  7. How do you find the 29th term in a sequence?
  8. How do you find the 101st term?
  9. Which term of AP 27 24 21 is?
  10. Which term of the AP 24 21 18 is the first negative term?
  11. Which term of the AP 71 66 61 is the first negative term?
  12. How do you find the term of an arithmetic sequence?
  13. How do you find the arithmetic sequence?

How do you find the 24th term of an arithmetic sequence?

1 Answer56=8+(9−1)d.48=8d.6=d.The common difference is of 6 . We can now find the 24th term using the formula tn=a+(n−1)d.t24=8+(24−1)6.t24=146.Thus, the 24th term is 146 .May 9, 2016

What is the 22nd term of the arithmetic sequence where a1 8 and a9 56 6 points?

Summary: The 22nd term of the arithmetic sequence where a1 = 8 and a9 = 56 is 134.

How do you find the 25th term of an arithmetic sequence?

An easier way to see this equation is: Y = 4X – 9. To find the 25th term, just plug in 25 for X. Y = 4(25) – 9, making the 25th term in this sequence 91.

How do you find the 27th term of an arithmetic sequence?

0:492:25Find the 27th Term of an Arithmetic Sequence Given the first 4 TermsYouTubeStart of suggested clipEnd of suggested clipTerm must be equal to a sub 1 which is 7. Plus the quantity n minus 1 is the quantity 27.MoreTerm must be equal to a sub 1 which is 7. Plus the quantity n minus 1 is the quantity 27.

What is the 24th term of the arithmetic sequence when a1 8?

146The 24th term of the arithmetic sequence where a1 = 8 and a9 = 56 is 146.

How do you find the 15th term of an arithmetic sequence?

$n^{th}$ term of an A.P. is given by $a_n= a+(n-1)d$. In order to determine the 15th term of the given arithmetic sequence, we relate the given numbers with the general sequence of A.P. and Using the $n^{th}$ term formula, we find the 15th term in the given A.P.

How do you find the 29th term in a sequence?

1:312:43SOLVING THE 29th TERM IN ARITHMETIC SEQUENCE – YouTubeYouTube

How do you find the 101st term?

0:515:57Finding the 100th term in a sequence – Khan Academy – YouTubeYouTube

Which term of AP 27 24 21 is?

Here a = 24 and d = (21-24) =-3. Let the nth term of the given AP be the first negative term. ⇒3n>27⇒n>9. Hence, the 10th term is the first negative term of the given AP.

Which term of the AP 24 21 18 is the first negative term?

10th termHence, the 10th term is the first negative term of the given AP.

Which term of the AP 71 66 61 is the first negative term?

16th Term of an AP will be the first negative number!

How do you find the term of an arithmetic sequence?

Solution: To find a specific term of an arithmetic sequence, we use the formula for finding the nth term. Step 1: The nth term of an arithmetic sequence is given by an = a + (n – 1)d. So, to find the nth term, substitute the given values a = 2 and d = 3 into the formula.

How do you find the arithmetic sequence?

0:0611:06Arithmetic Sequences: A Formula for the ‘ n – th ‘ Term – YouTubeYouTube