201+Ch+5+2014




 * Date || HW || Notes/ws ||
 * T 12/23 ||  ||   ||
 * M 12/22 || none ||  ||

key notes || key ||
 * Date || HW || Notes/ws ||
 * F 12/19 || in Library lab today. no hw ||  ||
 * Th 12/18 || Ch 5 Test today. ||  ||
 * W 12/17 || complete review packet and study || ws[[file:201_ch5_rev_ws2.docx]]
 * T 12/16 || complete 5.6 ws || ws[[file:201_5_6c_ws.pdf]]
 * M 12/15 || HW p338-340


 * 1) s 1-9, 11-13, 16-18, 24 || notes[[file:201_5_6notes2014.pdf]] ||


 * Date || HW || Notes/ws ||
 * F 12/12 || no hw ||  ||
 * Block W or Th || HW p331-332

(Due Monday--Friday in the library again) || notes ||
 * s 6, 10-13, 16-19, 21-23, 30, 31, 33, 34
 * T 12/9 || Meet in library computer lab today ||  ||
 * M 12/8 || HW

p322-323


 * 1) s 17-22, 25-27, 33, 35 || notes[[file:201_5_4notes2014.pdf]] ||

p307 11-17 p309 quiz #s 1-3 p313-314 #s 3-8, 12-17 || notes || Follow directions listed here: Skip # 7 Given: Isosceles triangle ABC with M the midpoint of hypotenuse BC. Prove: AM perpendicular to BC || ws key || key ||
 * Date || HW || Notes/ws ||
 * F 12/5 ||  ||   ||
 * Th 12/4 || HW due Monday (can either do tonight or in class tomorrow)
 * W 12/3 || complete ws
 * 1) 3 mark right angle and use Pythagorean theorem
 * 1) 8 Change completely
 * T 12/2 || Complete ws on page 2 #17 (do not prove) || ws[[file:201_5_1ws_B_Cbook_day2.doc]]
 * M 12/1 || HW

Use example 7 from notes to prove the midsegment theorem and

p298-299 #s 3-5, 15-19, 24 || notes ||