)}capmϰ,*B@{49onot" ϰzt0@#Gzizzazo % DD C{49doni" ϰzt0@#Fzizzazo % DBXC49P" ϰzt0@#Ezizzazo % DBXCo ucer ϰzt0@#Azizzazo % D XBig Smooch ProductionsnsbHHXb`XEhbb!v!ϰzt0@#Azizzazo % D8D - Area of a TriangleLEl$<\CHVhp\g޴leHH!4\T,! ϰzt0@#Azizzazo % DC$C7ns ϰzt0@#Bzizzazo % DCC7QfVk ϰzt0@#Czizzazo % DBB>r! ϰzt0@#qzizzazo % D;  PQ%UVMeasure the area of the triangle _______________ Try sliding D along the line. Measure the area of the triangle again. What happened? What lengths remain the same as you move D? Construct a line parallel to AD through B. Construct the point E at the intersection of the line CD and the line you just drew. ADEB is a parallelogram. How does the area of the parallelogram compare to the area of the triangle? ________________________________hPMeasure the area of the triangle _______________ Try sliding D along the line. Do49 \" ϰzt0@#Gzizzazo % DD Coz39 " ϰzt0@#qzizzazo % DBXCD C?39 " ϰzt0@#pzizzazo % DBXCoBXC?s  ϰzt0@#jzizzazo % DC$C7CC7?39ld " ϰzt0@#rzizzazo % DD CD Co? 39) " ϰzt0@#qzizzazo % DBXCoD Co? PV' ϰzt0@#kzizzazo % D@BCNB? QV? ϰzt0@ #Dzizzazo % DCaBP  ϰzt0@#mzizzazo % DCaBC$C7?PsRe  ϰzt0@#nzizzazo % DCaBCC7?Sq " ϰzt0@#1zizzazo % D?CC7CaBC$C7