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iTiaax Group TitleBest ResponseYou've already chosen the best response.0
OABC is a square . \[rightarrowOA\]=a and \[rightarrowOC\]. P is the point on AB such that AP:PB = 2:1. Q is the point on BC such that BQ:QC = 1:3. R is the midpoint of OC. Find, in terms of a and b: a. \[rightarrowAB \] b. \[rightarrowAP \] c. \[rightarrowOP \] d. \[rightarrowOR \] e. \[rightarrowCQ \] f. \[rightarrowRQ \] g. Show that RQ is parallel to OP. h. How do the lengths of RQ and OP compare?
 one year ago

iTiaax Group TitleBest ResponseYou've already chosen the best response.0
dw:1359682163187:dw
 one year ago
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