722/L=dd +(I)   1Courier New1Symbol New1Courier New1Courier NewTimes New RomanTimes New Roman1Courier New1Courier New1Courier New1Courier NewXxEVXxEVXxEVXxEV?/ <```@@@?~~~~~ԱޱޱԱ޿޿ph (((Pdd{ d<  p {2 5W̡(z7t?}U@vS~ k ,\@i Z)Ϭ@3???, @ӿh!  @ @R̯xNjxv\9v@{v@@033333??@^ߛOw?HzG???H9Ic@HV@@?@ @@@ ?zXS?@?@?@]IZl"\p(\?;(\?@@dddddddddddddddddddddddddddddddddddddddd 52???$$$Oӂ̴]??? 1Va/j?bn1$ ^]}????bn1$/j?YYYYYYYPEEg]FE a*cos(E) a*sin(E)F (x,y,z) = (a*cos(E),a*sin(E),F)bPbP42???$$$??A#ڹ0srq)\(????9QH?XE\E`EdEh El!Ep"Er]KE] a*cos(E) a*sin(E)Fa*cos(E)+L*cos(E)Eseg (a*cos(E),a*sin(E),F) to (a*cos(E)+L*cos(E),a*sin(E)+L*sin(E),F)a*sin(E)+L*sin(E)F52???$$${;0 xPW???]I[T?]Iv7????]I[T?YYYY YYYSEd]8UEa*cos(E)+L*cos(E)a*sin(E)+L*sin(E)F2(x,y,z) = (a*cos(E)+L*cos(E),a*sin(E)+L*sin(E),F)42???$$$??io(؇Ό(%h? ?̌????9QH?t#Ex$E|%E&E'E(E)EИ]w]{]000 a*cos(E)%seg (0,0,0) to (a*cos(E),a*sin(E),F) a*sin(E)F52???$$$Gʄ &??? 1Va/j?bn1$ ^]}@???bn1$/j@ YY Y$Y(Y,Y0Y,{]]VE a*cos(E) a*sin(E)F+L"(x,y,z) = (a*cos(E),a*sin(E),F+L)42???$$$??Ee`7&U^俔ir?Gz@???9QH? *E+E,E-E.E/E0E(]]L] a*cos(E) a*sin(E)F a*cos(E)5seg (a*cos(E),a*sin(E),F) to (a*cos(E),a*sin(E),F+L) a*sin(E)F+L52???$$$ΜB,8i???#K>PKf/?#K>PKf/????#K>PKf/?4Y8Y4j|Times New Roman:ESpherical Coordinates: E = Theta, F = Phi, A = the radiusuT:@4 %S?ۉ@j6G@Times New Roman;ECylindrical Coordinates: is Theta, z is z, A the radius f wm.孚|Z=!u>=P@Z @Times New Roman`(a*cos(E)+L*cos(E),a*sin(E)+Z?@9pQcV! ?1Courier New >E(x,y,z) = (a*cos(E)+L*cos(E),a*sin(E)+L*sin(E),F)in(F)+L*siZ?@9pm +:?1Courier New @?Esegment (0,0,0)--(a*cos(E),a*sin(E),F)sin(F),a*cos(F)))sinZI/?HWbg4kL{?1Courier New ?E(x,y,z) = (a*cos(E),a*sin(E),F+L)(F)+l)a*sin(E)sin(F)+L*siZst?8S>?1Courier New @Esegment (a*cos(E),a*sin(E),F)-->(a*cos(E),a*sin(E),F+L))sinZPm?fЂfWPH͇?1Courier New hAE(x,y,z) = (a*cos(E)-L*sin(E),a*sin(E)+L*cos(E),F)L*cos(E),a ZPm?fЂ,R~%=?1Courier New BEsegment (a*cos(E),a*sin(E),F)-->(a*cos(E)-L*sin(E),a*sin(E)+ Z-?hbw[/}?1Courier New BEx = Acos(t); y = Asin(t); z = uZX^i?dH(11˛\?1Courier New @@@h!@