I7;=,dd +(I)   1Courier New1Symbol New1Courier New1Courier NewTimesr NewTimes New Roman1Courier New1Courier New1Courier New1Courier NewX%VX%VX%VX%V ?/ <```@@@?~~~~~ԱޱޱԱ޿޿ph (((Pdd{  d< p {2 2le@2le2le@xJתxJת@GrX???@@@@@@033333??@^ߛOw?̌???:8Ic@V@@?@ @@@?@@@@@@@@@@dddddddddddddddddddddddddddddddddddddddd 2???$$$????????0H@7B?2345678$d d%pVe:@/@{9F|O (WpVe:@/@_}? (W0-(2y^2-16x-8y-40)2y^2-16x-8y-40=0GF3X\FShome6\Facu2??@$$$@????????@%D -12pi/4ty6\ALehnen\Courses\2???$$$L> L> @??????L> @L> 9:<=> ?@Pt  %tt10-5ollegeAlgebra\2??@$$$nT@p= ףp=????????nT@p= ףp= P  -3+(p-2)^2/8Ppi/42???$$$p= ףp=nT@@??????<2? ABC D$E(F,G t%,  | 8 -12 -3+(p-2)^2/8p%[3X@2???$$$p= ףp=nT@p= ףp=??????<2? Ęș̚ЛԜ؝  `%,%$ l -5p -3+(p-2)^2/8p2??@$$$p= ףp=????????p= ףp=0H4I8J@|T\(??????<2? %% %$%(%h4>t2t -3+(p-2)^2/8p"-3+(p-2)^2/8+1/sqrt(1+(2-p)^2/16)p+(2-p)/sqrt(16+(2-p)^2)xyzJXT@p= ףp=pVe:@/@@@@@@@@@@@@@@@@@@@@@@@@@@@@RW$RW$RW$Animate on P to move on the Parabolax%䟆Hw~n@2Py.ڃ@Times New Roman 2y^2-16x-8y-40=0(W`|W|ZFZFWX?Y@gZb$@N\@Hù@1Courier New%(x,y) = (-1,2)@1[<[ԟS( @$Km"?(?1Courier New%(1)x + (0)y = -542-E4?"M=ЄGIYi@iE$nL@1Courier NewT%(x,y) = (-3+(p-2)^2/8,P)[[1AA@VVSh]ǒP@CkO@1Courier New %segment (-1,2)-->(-3+(p-2)^2/8,p)/VVl@ }7@1Courier New Ĥ%segment (-5,p)<--(-3+(p-2)^2/8,p)/VV|i9y@kAg@1Courier New |%(x,y) = (-5,p)a\3XVV>A @DƢ@1Courier New 4%(x,y) = (-3+(p-2)^2/8+(2+(p-2)^2/8)cos(t),p+(2+(p-2)^2/8)sinVV |ס@Gwr@1Courier New %segment (-1,2)--(-5,p)Qx3XRVV/\&6@wD@1Courier New % y = P+4/(p-2)*(x+3-(p-2)^2/8) VV)uʢ@@1Courier New \% (x,y) = (-3,1+0.5P)VVxL*^@Vg@1Courier New % segment (-3+(p-2)^2/8,p)-->(-3+(p-2)^2/8+1/sqrt(1+(2-p)^2/16VVOe@CJyM@1Courier New @@@h!@