How does A show r=-1?
If r=-1, the term number would just alternate negative and positive, but be the same. Say I made a=-2 (a<0), if r=-1, t1=-2, t2=2, t3=-2, t4=2 etc
For example, I said for mine, a=-1 (as a<0) and said r=-2 (r<-1)
From graph A, you could see t1=-1, t2=2, t3=-4 as the y coordinate is increasing each time with graph a?
Ok, yeah, I got my explanation completely wrong
But, it is B! I'll explain why.
Let's take a sequence where a = -1 and r = -2.
The sequence is as follows: -1, 2, -4, 8, -16, 32, -64, 128, -256, 512.
Option B properly shows this (because of its curve). B shows that the initial values will be small in the whole scheme of all 10 values. Then, as n increases, tn becomes larger and larger! Whenever r > 1 or r < -1, remember, the tn values simply get larger and larger forever! (larger, meaning, even in terms of negative numbers).
Option A shows that the tn values will continue to increase and decrease by steady amounts indefinetly. Have a look. Option A makes it look like the sequence is = -1, 2, -4, 6, -8, 10, -12, 14, -16, 18. This isn't correct.
I know this is a very weird and quite basic explanation without much maths behind it, however, do you see my point? Option B shows the tn values will form a curve and as the tn values increase, so too will the differences between successive terms! The differences between successive terms will not remain somewhat constant (like an arithmetic sequence). Option A Looks more like a sequence which is neither arithmetic, nor geometric.
I hope this clears up the confusion!
Please let me know your perception and why you might think I'm wrong
Home
Help
Search
Login
