a b s l - p y = = 2 . 3 . 1 
 
 a c c e l e r a t e = = 1 . 8 . 1 
 
 a i o f i l e s = = 2 4 . 1 . 0 
 
 a l t g r a p h = = 0 . 1 7 . 5 
 
 a n n o t a t e d - d o c = = 0 . 0 . 4 
 
 a n n o t a t e d - t y p e s = = 0 . 7 . 0 
 
 a n t l r 4 - p y t h o n 3 - r u n t i m e = = 4 . 9 . 3 
 
 a n y i o = = 4 . 1 1 . 0 
 
 a r g b i n d = = 0 . 3 . 9 
 
 a s t t o k e n s = = 3 . 0 . 1 
 
 a u d i o r e a d = = 3 . 1 . 0 
 
 b r o t l i = = 1 . 2 . 0 
 
 c a c h e t o o l s = = 6 . 2 . 2 
 
 c e r t i f i = = 2 0 2 5 . 1 1 . 1 2 
 
 c f f i = = 2 . 0 . 0 
 
 c h a r s e t - n o r m a l i z e r = = 3 . 4 . 4 
 
 c l i c k = = 8 . 3 . 0 
 
 c n 2 a n = = 0 . 5 . 2 2 
 
 c o l o r a m a = = 0 . 4 . 6 
 
 c o n t o u r p y = = 1 . 3 . 2 
 
 c y c l e r = = 0 . 1 2 . 1 
 
 C y t h o n = = 3 . 0 . 7 
 
 d e c o r a t o r = = 5 . 2 . 1 
 
 d e s c r i p t - a u d i o t o o l s = = 0 . 7 . 2 
 
 D i s t a n c e = = 0 . 1 . 3 
 
 d o c s t r i n g _ p a r s e r = = 0 . 1 7 . 0 
 
 e i n o p s = = 0 . 8 . 1 
 
 e x c e p t i o n g r o u p = = 1 . 3 . 0 
 
 e x e c u t i n g = = 2 . 2 . 1 
 
 f a s t a p i = = 0 . 1 2 1 . 2 
 
 f f m p e g - p y t h o n = = 0 . 2 . 0 
 
 f f m p y = = 1 . 0 . 0 
 
 f i l e l o c k = = 3 . 2 0 . 0 
 
 f i r e = = 0 . 7 . 1 
 
 f l a t t e n - d i c t = = 0 . 4 . 2 
 
 f o n t t o o l s = = 4 . 6 0 . 1 
 
 f s s p e c = = 2 0 2 5 . 1 0 . 0 
 
 f u t u r e = = 1 . 0 . 0 
 
 g 2 p - e n = = 2 . 1 . 0 
 
 g o o g l e - a u t h = = 2 . 4 3 . 0 
 
 g o o g l e - a u t h - o a u t h l i b = = 0 . 4 . 6 
 
 g r a d i o = = 5 . 4 5 . 0 
 
 g r a d i o _ c l i e n t = = 1 . 1 3 . 0 
 
 g r o o v y = = 0 . 1 . 2 
 
 g r p c i o = = 1 . 7 6 . 0 
 
 h 1 1 = = 0 . 1 6 . 0 
 
 h t t p c o r e = = 1 . 0 . 9 
 
 h t t p x = = 0 . 2 8 . 1 
 
 h u g g i n g f a c e - h u b = = 0 . 3 6 . 0 
 
 i d n a = = 3 . 1 1 
 
 i m p o r t l i b _ r e s o u r c e s = = 6 . 5 . 2 
 
 i n d e x t t s   @   f i l e : / / / G : / L M d o w n l o a d e r / l m d _ d a t a _ r o o t / a p p s / i n d e x - t t s 2 
 
 i n f l e c t = = 7 . 5 . 0 
 
 i p y t h o n = = 8 . 3 7 . 0 
 
 j e d i = = 0 . 1 9 . 2 
 
 j i e b a = = 0 . 4 2 . 1 
 
 J i n j a 2 = = 3 . 1 . 6 
 
 j o b l i b = = 1 . 5 . 2 
 
 j s o n 5 = = 0 . 1 0 . 0 
 
 j u l i u s = = 0 . 2 . 7 
 
 k a l d i f s t = = 1 . 7 . 1 7 
 
 k e r a s = = 2 . 9 . 0 
 
 k i w i s o l v e r = = 1 . 4 . 9 
 
 l a z y _ l o a d e r = = 0 . 4 
 
 l i b r o s a = = 0 . 1 0 . 2 . p o s t 1 
 
 l l v m l i t e = = 0 . 4 1 . 1 
 
 M a r k d o w n = = 3 . 1 0 
 
 m a r k d o w n - i t - p y = = 4 . 0 . 0 
 
 m a r k d o w n 2 = = 2 . 5 . 4 
 
 M a r k u p S a f e = = 3 . 0 . 3 
 
 m a t p l o t l i b = = 3 . 8 . 2 
 
 m a t p l o t l i b - i n l i n e = = 0 . 2 . 1 
 
 m d u r l = = 0 . 1 . 2 
 
 m o d e l s c o p e = = 1 . 2 7 . 0 
 
 m o r e - i t e r t o o l s = = 1 0 . 8 . 0 
 
 m p m a t h = = 1 . 3 . 0 
 
 m s g p a c k = = 1 . 1 . 2 
 
 m u n c h = = 4 . 0 . 0 
 
 n e t w o r k x = = 3 . 4 . 2 
 
 n l t k = = 3 . 9 . 2 
 
 n u m b a = = 0 . 5 8 . 1 
 
 n u m p y = = 1 . 2 6 . 2 
 
 o a u t h l i b = = 3 . 3 . 1 
 
 o m e g a c o n f = = 2 . 3 . 0 
 
 o p e n c v - p y t h o n = = 4 . 9 . 0 . 8 0 
 
 o r j s o n = = 3 . 1 1 . 4 
 
 p a c k a g i n g = = 2 5 . 0 
 
 p a n d a s = = 2 . 3 . 2 
 
 p a r s o = = 0 . 8 . 5 
 
 p e f i l e = = 2 0 2 3 . 2 . 7 
 
 p i l l o w = = 1 1 . 3 . 0 
 
 p l a t f o r m d i r s = = 4 . 5 . 0 
 
 p o o c h = = 1 . 8 . 2 
 
 p r o c e s = = 0 . 1 . 7 
 
 p r o m p t _ t o o l k i t = = 3 . 0 . 5 2 
 
 p r o t o b u f = = 3 . 1 9 . 6 
 
 p s u t i l = = 7 . 1 . 3 
 
 p u r e _ e v a l = = 0 . 2 . 3 
 
 p y a s n 1 = = 0 . 6 . 1 
 
 p y a s n 1 _ m o d u l e s = = 0 . 4 . 2 
 
 p y c p a r s e r = = 2 . 2 3 
 
 p y d a n t i c = = 2 . 1 1 . 1 0 
 
 p y d a n t i c _ c o r e = = 2 . 3 3 . 2 
 
 p y d u b = = 0 . 2 5 . 1 
 
 P y g m e n t s = = 2 . 1 9 . 2 
 
 p y i n s t a l l e r = = 6 . 1 6 . 0 
 
 p y i n s t a l l e r - h o o k s - c o n t r i b = = 2 0 2 5 . 1 0 
 
 p y l o u d n o r m = = 0 . 1 . 1 
 
 p y p a r s i n g = = 3 . 2 . 5 
 
 p y p h e n = = 0 . 1 7 . 2 
 
 p y s t o i = = 0 . 4 . 1 
 
 p y t h o n - d a t e u t i l = = 2 . 9 . 0 . p o s t 0 
 
 p y t h o n - m u l t i p a r t = = 0 . 0 . 2 0 
 
 p y t z = = 2 0 2 5 . 2 
 
 p y w i n 3 2 - c t y p e s = = 0 . 2 . 3 
 
 P y Y A M L = = 6 . 0 . 3 
 
 r a n d o m n a m e = = 0 . 2 . 1 
 
 r e g e x = = 2 0 2 5 . 1 1 . 3 
 
 r e q u e s t s = = 2 . 3 2 . 5 
 
 r e q u e s t s - o a u t h l i b = = 2 . 0 . 0 
 
 r i c h = = 1 4 . 2 . 0 
 
 r s a = = 4 . 9 . 1 
 
 r u f f = = 0 . 1 4 . 5 
 
 s a f e h t t p x = = 0 . 1 . 7 
 
 s a f e t e n s o r s = = 0 . 5 . 2 
 
 s c i k i t - l e a r n = = 1 . 7 . 2 
 
 s c i p y = = 1 . 1 5 . 3 
 
 s e m a n t i c - v e r s i o n = = 2 . 1 0 . 0 
 
 s e n t e n c e p i e c e = = 0 . 2 . 1 
 
 s h e l l i n g h a m = = 1 . 5 . 4 
 
 s i x = = 1 . 1 7 . 0 
 
 s n i f f i o = = 1 . 3 . 1 
 
 s o u n d f i l e = = 0 . 1 3 . 1 
 
 s o x r = = 1 . 0 . 0 
 
 s t a c k - d a t a = = 0 . 6 . 3 
 
 s t a r l e t t e = = 0 . 4 9 . 3 
 
 s y m p y = = 1 . 1 4 . 0 
 
 t e n s o r b o a r d = = 2 . 9 . 1 
 
 t e n s o r b o a r d - d a t a - s e r v e r = = 0 . 6 . 1 
 
 t e n s o r b o a r d - p l u g i n - w i t = = 1 . 8 . 1 
 
 t e r m c o l o r = = 3 . 2 . 0 
 
 t e x t s t a t = = 0 . 7 . 1 1 
 
 t h r e a d p o o l c t l = = 3 . 6 . 0 
 
 t o k e n i z e r s = = 0 . 2 1 . 0 
 
 t o m l k i t = = 0 . 1 3 . 3 
 
 t o r c h = = 2 . 4 . 1 + c u 1 2 1 
 
 t o r c h - s t o i = = 0 . 2 . 3 
 
 t o r c h a u d i o = = 2 . 4 . 1 + c u 1 2 1 
 
 t o r c h v i s i o n = = 0 . 1 9 . 1 + c u 1 2 1 
 
 t q d m = = 4 . 6 7 . 1 
 
 t r a i t l e t s = = 5 . 1 4 . 3 
 
 t r a n s f o r m e r s = = 4 . 5 2 . 1 
 
 t y p e g u a r d = = 4 . 4 . 4 
 
 t y p e r = = 0 . 2 0 . 0 
 
 t y p i n g - i n s p e c t i o n = = 0 . 4 . 2 
 
 t y p i n g _ e x t e n s i o n s = = 4 . 1 5 . 0 
 
 t z d a t a = = 2 0 2 5 . 2 
 
 u r l l i b 3 = = 2 . 5 . 0 
 
 u v i c o r n = = 0 . 3 8 . 0 
 
 w c w i d t h = = 0 . 2 . 1 4 
 
 w e b s o c k e t s = = 1 5 . 0 . 1 
 
 W e r k z e u g = = 3 . 1 . 3 
 
 w e t e x t = = 0 . 1 . 0 
 
 