In answer to your main question: For a very simple grammar, it may be possible to determine whether it is LL(1) without constructing FIRST and FOLLOW sets, e.g.

A → A + A | a

is not LL(1), while

A → a | b

is.

But when you get more complex than that, you'll need to do some analysis.

A → B | a

B → A + A

This is not LL(1), but it may not be immediately obvious

The grammar rules for arithmetic quickly get very complex:

expr → term { '+' term }

term → factor { '*' factor }

factor → number | '(' expr ')'

This grammar handles only multiplication and addition, and already it's not immediately clear whether the grammar is LL(1). It's still possible to evaluate it by looking through the grammar, but as the grammar grows it becomes less feasable. If we're defining a grammar for an entire programming language, it's almost certainly going to take some complex analysis.

That said, there are a few obvious telltale signs that the grammar is not LL(1) — like the A → A + A above — and if you can find any of these in your grammar, you'll know it needs to be rewritten if you're writing a recursive descent parser. But there's no shortcut to verify that the grammar *is* LL(1).