ࡱ > i k h 9 R C bjbj )h $( l \ \ \ p $ . $ p 1 ^ 0 0 0 0 0 0 0 $ 53 U5 1 E \ 1 c Y1 c c c \ / c 0 c c 6 - \ / R 5p . / o1 0 1 . ` 5 5 / c p p 3 ( LӀX ȩ l xX Y Ѽ, ¥ǴY P J u n K w a n , M . D . D e p a r t m e n t o f C a r d i o l o g y , I n h a U n i v e r s i t y H o s p i t a l lp hخ 1D 0x ɄD tǔ ¥ lpX Ѽ | UXՌ ttX0 t ¥ lp \ ,x 0XY tt DՔX. t ̹D tȔ tt1 LӀ t\ l| 1 0 0 % ̹q \. t\ L 3 ( D t ¥lpX 3 ( | t ǔ 3 ( LӀX @ X ` . 0 3 ( LӀ 0tX tt1 L0| tǩ\ g a t e d s e q u e n t i a l 3 D e c h o c a r d i o g r a p h y A D D I N E N R f u 1 ) \ tǔ ͐| 3 6 0 ij ¤t |\ ij <\ X tt1 ( r o t a t e d s e q u e n t i a l 2 D i m a g e s ) D Ŕ o f f - l i n e <\ 3 ( l1D h<\h 3 ( D Ŕ )t. t )@ ¥0| ٳT( s y n c h r o n i z a t i o n ) t| Xp 0| D 0 Lm ٳ ¥ lpX 3 ( | 0L ι@ t p t| t ļ ( x% D l. 췘 <|ܴ h X 3 ( | \ՈX U\ Ŵ <\ T XՔ 3 ( LӀ A D D I N E N R f u 2 ) Xt \ 8t tհ0 X . ҈ \ @ T 3 ( L0x L i v e 3 D E c h o ( P h i l l i p s , C o ) X <\ 0 3 ( LӀ@ DPX T , tijX D D nj . t\ 3 ( LӀX tǩt \ ǔ Lx ? 3 ( LӀ <\ XՌ J@ ֬ t| Uֈ X0 } J. 0 X@ 3 ( LӀ| ǔ ¥lpX 3 ( D tȔ ij\ xtT. 0| \ D Ō s u r g i c a l v i e w | X0 \ <\ tǩ T ( F i g 1 ) . 췘 3 ( LӀ ǔ Ŕ ¥ lpX 3 ( D \ ǔ xij \ՈX U\ ¥ ȴX d a t a | D ǔ `x U U tD Xp tٳ XX tD m D ǔ D . \ @ 3 D 0 \ hخ 3 ( LӀX D tǩX )X D !X 0D 3 ) XՔ T ι@ ȩ 1t . 췘 Ȉ 3 ( LӀX \֩ij 买 @ t| ` . t 3 ( LӀ ǔ ij lX tǩij @ t ǔ @ , tij, @ @ s y s t e m ij 0tX tt1 L0 DPX D tհX \ 0 x 8ij xt ` . 췘 4 ɔ\ x@ ι@ Xt ¥X tt1 4 ut8 䲔 t. p $ƫٳHX tt1 L0 tǩ hخ tt1 L X \Ĭ1D \͌TX0 t \ x 3 ( l1( 3 D m e n t a l r e c o n s t r u c t i o n ) D \ ¥ lpX 3 ( 0XY ( 3 D g e o m e t r i c a s s u m p t i o n ) 8䴴8 Ǵ T tX ¥lp \ 3 ( ļ e@ DՔ1D | J䲔 t. Ȑ x@ 3 ( L \ 0 D t <ǘ xt 0 }JD <\ . t| X0 t ȩX 1D UxX0 \ ι@ l ܴ | X t| X ¥ XD X XՔp Ǵ 3 ( LӀ| tǩ\ t UX䲔 t ǝ| ` <\ . 3 ( LX D tǩ\ l 1 . Q u i c k a c q u i s i t i o n o f w h o l e c a r d i a c v o l u m e 3 ( LӀ ¥X 3 ( D Ŕp Ǵ M R I C T @ DPX )t } Xp D UXՔp x ij 买 D XX h } `t ` ǔ D . ҈ X D \ X L 3 ( LӀ| tǩh<\h tt1 L| tǩ` X U Do D \ՈX U\ D 貕¬