(^)
- LP Now wait a sDialogecon^ d, we can check Coding^ Comments^
that be sthat on here. We'ine? Yesd be look. [places pening at it in on force ...would
diagcenteredram an on thd rotatese origin] the pen around an axis
C
W
Ne"visuw Eal" warranpisode. Ext. cellent example of a
Wstrut Wmug
1
2
sin
2
2 cos
JH Which way we going? RQCl RQCl = RC = Multipequest for Cly by the slariine. fication
KJ Yeahright? , because if here's your angle, MC comModified Claimplementary an relates togles and elaborates (^)
on LP’s orispecifying thginal claim in 105 bye angle.
L109. KJ YeahP Yep. ... Sp Sp Sp = Support
at th110. JHe force diag How'd yramou know the an] gle? [ all look^ RQCl^
KJ Welgoing to be thl, you'd ue angle wse it, if you...with the arm, isnell it's 't it?
[mdiagramotions alon with his peng the horizon] tal axis of the force
MC comModified Claimplementary an relates togles. Nam (^) ely, take
the sand thine ofe lev ther “e anarmgle betw.” een the force
112. JHYou break Wel it dowl, it's [the ann. gle] ninety degrees. MC Mocomdified Claimplementary an relates togles. “You break (^) it
- KJ The wall arm, that's ninety degrees, down” is actually a procedural claim.
but not the force. AC Alternactinchalleng at a 90ate Claimge is “but not”. T angl. The ime. plicit he force is not
t's go114. JHing t Ito be ne's going to be ggative, rightoing clock? wise, so MC^ Modiand gified Cves the direction olaim relating backf a “b to 112, roken - KJ Yeah Sp dow n” vector.
- L116. JHP P Slus...wo then what's plould be mus? inus the weight of RQCl^
the m118. Jug.H So w (^) hat, 3? [begins writing equation Cl^
3] 119. LP Umm, no. It wouldn't be... RQCl Ch^ This challenge is answered in the next
episode.
Table 3-21. Group 4B, Episode 16, lines 105-119, Revised Coding.