Arithmetic Series help (AS Level)

  • Thread starter Thread starter CathyLou
  • Start date Start date
  • Tags Tags
    Arithmetic Series
AI Thread Summary
The discussion focuses on solving an arithmetic series problem involving the first three terms defined by (12-P), 2P, and (4P-5). The user seeks help with finding the value of P, which is determined to be 7. Following this, they confirm that to find the sixth term, they can substitute P into the equation to find the common difference, d. For the sum of the first 15 terms, the user is advised to use the general term formula, while part (d) can be approached by testing values for n to find terms less than 400. The conversation emphasizes the importance of showing work to receive effective assistance.
CathyLou
Messages
173
Reaction score
1
I'm totally stuck on the following question and so I'd very very grateful if someone could please tell me how to work it out.

The first three terms of an arithmetic series are (12-P), 2P and (4P-5) respectively, where P is a constant.

(a) Find the value of P.

(b) Show that the sixth term of the series is 50.

(c) Find the sum of the first 15 terms of the series.

(d) Find how many terms of the series have a value of less than 400.

Thank you.

Cathy
 
Physics news on Phys.org
You have to show some work in order to get help.
 
Present us some of your work. Write down the expression for the general term of an arithmetic sequence, and everything should be more clear. Set up a few equations, and see where they'll bring you.

Edit: late again. :smile:
 
Before I posted I had written the following in response to part a:

an = a1 + (n - 1)d

d = 2p - (12 - p)

d= (4p - 5) - 2p

2p - (12 - p) = (4p - 5) - 2p

4p = (4p - 5) + (12 - p)

Then I got d = 7 but I got confused over the value of p.

Am I working on the right lines?

Thanks for replying by the way! :smile:

Cathy
 
No, p should equal 7.
 
radou said:
No, p should equal 7.

Oh, okay, I get where I went wrong. Thank you.

So, for part b do I just substitute in p to the equation to find d?

Cathy
 
CathyLou said:
Oh, okay, I get where I went wrong. Thank you.

So, for part b do I just substitute in p to the equation to find d?

Cathy

Yes, you do. I.e., d must equal a3 - a2, and a2 - a1, doesn't matter which difference you take.
 
Thanks for your help.

I've now worked out parts a, b and c but I'm still unsure how to do d. Any hints would be really appreciated.

Cathy
 
Basically, you can solve part (d) unformally by trying to plug in different numbers n into an = a1 + (n - 1)*d and see which one is the greatest term which is less than 400.
 
  • #10
radou said:
Basically, you can solve part (d) unformally by trying to plug in different numbers n into an = a1 + (n - 1)*d and see which one is the greatest term which is less than 400.

Okay, thanks very much! :biggrin:

Cathy
 

Similar threads

Finding a and d from the Sum of an Arithmetic Series
Replies
2
Views
2K
Middle Terms in an Arithmetic Series
Replies
6
Views
2K
How to Solve Problems in Arithmetic Series Using Formulas?
Replies
2
Views
2K
Solve Series P: Sum of First n Terms & Arithmetic Progression
Replies
14
Views
3K
Multiplication of Taylor and Laurent series
Replies
12
Views
2K
Values of x for which a geometric series converges
Replies
1
Views
4K
Series, arithmatic progression.
Replies
2
Views
1K
Solving for the Sum of an Arithmetic Progression | m>n | AP Homework
Replies
4
Views
2K
B Arithmetic mean of an infinite number of points?
Replies
20
Views
2K
How Do We Solve These Tricky Number Series Problems?
Replies
11
Views
2K

Hot Threads

Recent Insights

Back
Top