Earlier today I asked if there's an idiomatic way to count elements matching predicate function in Mathematica, as I was concerned with performance.

My initial approach for a given predicate `pred`

was the following:

```
PredCount1[lst_, pred_] := Length@Select[lst, pred];
```

and I got a suggestion to instead use

```
PredCount2[lst_, pred_] := Count[lst, x_/;pred@x];
```

I started profiling these functions, with different `lst`

sizes and `pred`

functions, and added two more definitions:

```
PredCount3[lst_, pred_] := Count[Thread@pred@lst, True];
PredCount4[lst_, pred_] := Total[If[pred@#, 1, 0] & /@ lst];
```

My data samples were ranges between 1 and 10 million elements, and my test functions were `EvenQ`

, `#<5&`

and `PrimeQ`

. The following graphs demonstrate time taken.

**EvenQ**

PredCount2 is slowest, 3 and 4 duke it out.

**Comparison predicate: #<5&**

I've selected this function, because it's close to what I need in my actual problem. Don't worry that this is a silly test function, it actually proves that the 4th function has some merit, which I actually ended up using it in my solution.

Same as `EvenQ`

, but 3 is clearly slower than 4.

**PrimeQ**

This is just bizarre. Everything is flipped. I'm not suspecting caching as the culprit here, since worst values are for the function computed last.

So, what's the right (fastest) way to count the number of elements in a list, that match a given predicate function?