X, z!'GSP!/:/2 ` 49 A  BXCo  B  CCo4"9# C  BXA E  C+C@`^ec p1 BBtyp p2 CBY^ p3 C2Bpu p4 CrB p5 CC3EJ p6 CCBQs4  p6 J 5lAdjust the slope and intercept of the line until you think you have reduced the sum of the areas of the six squares. Then double-click the table below to see if you succeeded. Continue until you find a minimum.gX0hHH0ɜP(  UUUU=; p6   Bill Finzer January, 1993UUU0wtk3Y0kk@] p6   Least Squares Regression Game h S @^ S1 t' j6 BXCoCCo?3'9 y-axis BXCoBXA?qq h4m9?#  y-intercept  BXB]'cMenu q-intercept BBB?' z-intercept CBC´?'b  e-intercept C2BC2?' k1intercept CrBCr¼?'b  r1intercept CC3C? D'Jq w1intercept CCBC`?  11intercept BXBCG!?5%F?5%F_e'Menu t1intercept BBCB?sy' c1intercept CBCB?X^' h1intercept C2BCB?ou' p1intercept CrBCB?' u1intercept CC3CC3? ' cor z1intercept CCBDCB? M&` slopeercept  CDqC  g3d  mlopeercept BXBCDqC ?'Menu given linet BXBCDqC @B`nesd  N1ven linet B߾B?ty S1ven linet C B@Y^ W1ven linet CXzCBAp u A1ven linet CBB49 E1ven linet CFC3CinNV J1ven linet CiCBDb`sqc 21ven linet BBB߾BB߾BBB!9Ev~b 31ven linet CBC BC BCB":F[ 41ven linet C2CzCCXzCCzCCXzCBC2B#;Gr 51ven linet CrC /CC /CBCrB$<H7 61ven linet CCtCFCtCFC3CC3%=I GlG  71ven linet CC.CiC.CiCBCCB&>J  11ven linet  ?ыBArea(Polygon 2) = fƞw @w@+p -@xz@@'$0.27 square cm x@ K( 21ven linet  ?z!HArea(Polygon 3) = fƞw @w@+p -@xz@@'$0.05 square cm x@ L)5 31ven linet  ?ƿyFfArea(Polygon 4) = fƞw @w@+p -@xz@@'$1.61 square cm x@ M6B 41ven linet  ?q&]Area(Polygon 5) = fƞw @w@+p -@xz@@'$0.83 square cm x@ NCO 51ven linet  ?iv0Area(Polygon 6) = fƞw @w@+p -@xz@@'$0.99 square cm x@ OP\ 61ven linet  ?$Area(Polygon 7) = fƞw @w@+p -@xz@@'$1.42 square cm x@ P< 71ven linet   @(эSum of areas of squares = w @w@+p -@xz@@'$5.18 square cm x@  QRSTUV. 1ven linet fwSum of areas of squaresH?k! `bPIBcXcC1W