Activity for General Sebast1anâ€
| Type | On... | Excerpt | Status | Date |
|---|---|---|---|---|
| Comment | Post #286709 |
@#36356 Maybe they *are* "intermediate terms", but remember, they are in between two values, making them means. If they have a common difference, then they form an arithmetic sequence, hence given the name "arithmetic means". Maybe they're both correct. (more) |
— | almost 2 years ago |
| Comment | Post #286709 |
@#36356 That's literally the term used in the book. And also, I just found the definition at the end of the module.
> Arithmetic means - terms $m_1$, $m_2$, $\dots$, $m_k$ between two numbers $a$ and $b$ such that $a$, $m_1$, $m_2$, $\dots$, $m_k$, $b$ is an arithmetic sequence.
So I did get it... (more) |
— | almost 2 years ago |
| Comment | Post #284773 |
Now *that*'s the kind of answer I'm looking for. (more) |
— | over 2 years ago |
| Comment | Post #284723 |
Welp, I tried. At least I gave what I want to reach. (more) |
— | over 2 years ago |
| Comment | Post #284723 |
@#53410 I think I got the gist. Seems clearer enough now. (more) |
— | over 2 years ago |
| Comment | Post #283947 |
Man, that's a great explanation that I peed my pants from it. Thanks for the explanation, it really helps! (more) |
— | over 2 years ago |
| Comment | Post #282375 |
Understandable. Have a great day. (more) |
— | almost 3 years ago |