I have started learning Haskell from Introduction to FP using Haskell by Richard Bird, but I am stuck in proving the following: pair (f, g) . h = pair (f . h, g . h) The definitions of pair is the ...
Is there a better way to express (\(a, b) -> a < b) with function composition? I feel like I'm missing something and experimenting with curry only confused me more.
Sometimes I have two functions of the form: f :: a -> (b1,b2) h :: b1 -> b2 -> c and I need the composition g. I solve this by changing h to h': h' :: (b1,b2) -> c Can you please ...