201+Ch+5+2012

Have a nice break! ||  || 2nd worksheet is optional AND STUDY! || Review notes packet packet key ws ws key ||
 * Date || HW || Notes/ws ||
 * F 12/21 || no hw
 * Th 12/20 || Ch 5 Test today! ||  ||
 * W 12/19 || Complete packet
 * T 12/18 || HW p338-340
 * 1) s 1-9, 11-13, 16-18, 24 || notes[[file:201_5_6notes.pdf]] ||
 * M 12/17 || no hw ||  ||

HW p331-332 12/12 & 12/13 || Complete honors problem if you did not finish. Otherwise, no hw ||  || p322-323 p307 #s 11-17 p309 quiz #s 1-3 p313-314 #s 3-8, 12-17, 24, 26 || notes ||
 * Date || HW || Notes/ws ||
 * F 12/14 || Reminder Ch 5 Test next Thursday!
 * s 6, 10-13, 16-19, 21-23, 30, 31, 33, 34 || notes[[file:201_5_5notes2012.pdf]] ||
 * Block W & Th
 * T 12/11 || HW
 * 1) s 17-22, 25-27, 33, 35 || notes[[file:201_5_4notes2012.pdf]] ||
 * M 12/10 || HW

Skip #s 7, 11, 12 Change the directions for #8 completely Given: Isosceles right triangle, ABC, where M is the midpoint of the hypotenuse (A is the right angle) Prove: AM is perpendicular to BC (forgive my notation) || ws KEY Use example 7 from notes to prove the midsegment theorem and p298-299 #s 3-5, 15-19, 24 DUE FRIDAY!! || notes KEY to the proof from hw
 * Date || HW || Notes/ws ||
 * F 12/7 || Complete worksheet
 * Direction Notes for those who were absent**:
 * 1) 3 needs a right angle mark
 * [|Details]
 * [[file:mrshayden/201_5_1ws.pdf|Download]]
 * 36 KB
 * [|Details]
 * [[file:mrshayden/201_5_1ws_key.pdf|Download]]
 * 92 KB ||
 * Th 12/6 || no class ||  ||
 * W 12/5 || HW
 * [|Details]
 * [[file:mrshayden/201_5_1notes2012.pdf|Download]]
 * 326 KB
 * [|Details]
 * [[file:mrshayden/5_1hw_proof_key.pdf|Download]]
 * 81 KB ||