User talk:Lond6846

Welcome!
Hello, Lond6846, and welcome to Wikipedia! My name is Ian and I work with the Wiki Education Foundation; I help support students who are editing as part of a class assignment.

I hope you enjoy editing here. If you haven't already done so, please check out the student training library, which introduces you to editing and Wikipedia's core principles. You may also want to check out the Teahouse, a community of Wikipedia editors dedicated to helping new users. Below are some resources to help you get started editing. If you have any questions, please don't hesitate to contact me on my talk page. Ian (Wiki Ed) (talk) 21:25, 18 January 2017 (UTC)

Hello
Hi Michelle, Have a good night--Noeer Alotaibi (talk) 03:16, 26 January 2017 (UTC)

Ordinal data article
Hi Michelle. I created a section in my sandbox for us to use for drafting the ordinal data article. Mw011235 (talk) 19:21, 9 February 2017 (UTC)

I just added a section for the references we're thinking of using for the article. Mw011235 (talk) 00:42, 11 February 2017 (UTC)

Hi Michelle. Now that we have some peer review feedback to think about, I wanted to suggest that we also move our discussion of revisions and moving the article to the mainspace over to the talk page for the sandbox with our draft. If you're not already watching that page, I just wanted you to know I was going to start putting my thoughts down there for your consideration. I haven't put anything there yet, but I probably will sometime today. Thanks! Mw011235 (talk) 18:25, 24 February 2017 (UTC)

Cram101
You added a source to Ordinal data, but the "book" you fiund is copied from Wikipedia. The wording of their entry on ordinal data is the same as the lead was before you edited it. This is circular referencing. See WP:PUS for more on these "books". Fences &amp;  Windows  20:02, 14 February 2017 (UTC)

Learning to make an equation
$$ r = \frac{ \sum_{i,j} \left (u_i - \bar u\ \right ) \left (v_j - \bar v\ \right )p_{ij}} {\sqrt{ \left \lbrack \sum_i ( u_i - \bar u\ \right )^2p_{i+} \rbrack \lbrack \sum_i ( v_j - \bar v\ )^2p_{+j} }} $$