Question 1159929
6. LM is a tangent drawn to circle O, JK=2, and LK=9. If MK is perpendicular to JL, what is the value of MK?
7. Given M<AEDA=35, mBC=30, and m<F=65, what is the mAC?
https://docs.google.com/document/d/15YVcau3h66TYhBpf6IN_VtPFuIyLQgLV6d8C0IYgvYo/edit
Thank you very much and stay safe.
<pre>For # 6., you don't need to do anything that woman tells you.  It's way too UNNECESSARY. This is done as follows:

Δs MLK and MKJ are right-triangles, so they’re similar, and share a COMMON side, or both have a REFLEXIVE side, MK
We then get: {{{matrix(1,3, MK/KL, "=", JK/MK)}}}
{{{matrix(1,3, MK/9, "=", 2/MK)}}} ------ Substituting 9 for KL and 2 for JK
{{{matrix(1,3, (MK)^2, "=", 9(2))}}} ------ Cross-multiplying
{{{highlight_green(matrix(1,5, MK, "=", sqrt(18), "=", highlight(3sqrt(2))))}}}
I wonder when she'll learn how to do math problems, and STOP confusing these people or making these problems so COMPLEX and time-consuming!
</pre>=========================================================
<pre>For # 7., C is not shown. I can guess where it is, but I'd rather you make the entire graph viewable!