Generally to make a grammar LL(1) you'll need to repeatedly left factor and remove left recursion until you've managed to get rid of all the non-LL things. Which you do first depends on the grammar, but in this case you'll want to start with left factoring
To left factor the rule
U -> Ufab | VSc | bS
you need to first substitute V giving
U -> Ufab | fadSc | fSc | UaSc | bS
which you then left factor into
U -> UX | fY | bS
X -> fab | aSc
Y -> adSc | Sc
now U is simple enough that you can eliminate the left recursion directly:
U -> fYZ | bSZ
Z -> ε | XZ
giving you
S -> bU | ad | d
U -> fYZ | bSZ
X -> fab | aSc
Y -> adSc | Sc
Z -> ε | XZ
Now you still have a left factoring problem with Y so you need to substitute S:
Y -> adSc | bUc | adc | dc
which you left factor to
Y -> adA | bUc | dc
A -> Sc | c
giving an almost LL(1) grammar:
S -> bU | ad | d
U -> fYZ | bSZ
X -> fab | aSc
Y -> adA | bUc | dc
Z -> ε | XZ
A -> Sc | c
but now things are stuck as the epsilon rule for Z means we need FIRST(X) and FOLLOW(Z) to be disjoint (in order to decide between the two Z rules). This is generally indicative of a non-LL language, as there's some trailing context that could be associated with more than one rule (via the S -> bU -> bbSZ -> bbbUZ -> bbbbSZZ exapansion chain -- trailing Zs can be recognized but either might be empty). Often times you can still recognize this language with a simple recursive-descent parser (or LL-style state table) by simply resolving the Z ambiguity/conflict in favor of the non-epsilon rule.
