(^)
- MK. OK, so donDia't we drawlog this here...we Coding^ Comments
draw tension here, right? C Relates towhere ona physics claime draw her reco abous inrder ro tht he tenow anle, bsiond ut is. - R110. MKM. Not. Right? ... RQSp Sk RQSp = RBegins a Skeptequest for Sical question upport
- RM. Not like that, do you? Sk Continues qu109. estions started in
it, di112. MRdn't he, on. Yeah his force di, that's how he [profagrams? essor] drew^ B^
[Draw113. MKing as. A she snd then the npeaks.] ormal right here. W
(MC^ )
The Claimdrawing of is im the Tplicit inable: the
(^) T
N
This midea startodifed iied Cn 108. laim extends the
- MK114. RM. O. Rh, yeahight?. Ck Sp MKHe ag Checkrees with her. s for consensus before
continuing.
Table 3-25. Group 4A, Episode 17, lines 108-115.
In Group 2D, group member SU, who makes no Claims, provides Grounds that
support the Claims. A complete Physics Description must contain adequate, correct
grounds. SU’s contribution to this solution is not accomplished by Claims, but by
carefully referring to the hard data of the problem statement.
(^) Dialog Coding Comments
- KE What else we gotta write up there? Oh,
we gotta write the question.
RQC step of“the questio the probln” refemers to-solving the first
strategy. RQC =Claim. Request for
SU Yeah46. LS Question (^) , what's the question? What is Ak Ak = Acknowledgment.
our qsister. uestion? We're trying to impress our little RQC^
SU Well, I can48. LS How can we im't Table... press the little sister? Ak G This couThis questiold be a Rn is bQCl. ased on the
problem statement.