There is a lot to say in answer to your question, however, since you asked, I will offer this "rule of thumb."

If you are using `do`

-notation and your generated values[1] are not used in the expressions that you are sequencing[1], then that code can transform to an Applicative style. Similarly, if you use one or more of the generated values in an expression that is sequenced, then you must use `Monad`

and `Applicative`

is not strong enough to achieve the same code.

For example, let us look at the following code:

```
do a <- e1
b <- e2
c <- e3
return (f a b c)
```

We see that in none of the expressions to the right of `<-`

do any of the generated values (`a`

, `b`

, `c`

) appear. Therefore, we can transform it to using Applicative code. Here is one possible transformation:

```
f <$> e1 <*> e2 <*> e3
```

and another:

```
liftA3 f e1 e2 e3
```

On the other hand, take this piece of code for example:

```
do a <- e1
b <- e2 a
c <- e3
return (f b c)
```

This code cannot use `Applicative`

[3] because the generated value `a`

is used later in an expression in the comprehension. This must use `Monad`

to get to its result -- attempt to factor it into `Applicative`

to get a feel for why.

There are some further interesting and useful details on this subject, however, I just intended to give you this rule of thumb whereby you can skim over a `do`

-comprehension and determine pretty quickly if it can be factored into `Applicative`

style code.

[1] Those that appear to the left of `<-`

.

[2] Expressions that appear to the right of `<-`

.

[3] strictly speaking, parts of it could, by factoring out `e2 a`

.