Here is UNEXPLANABLE 2.0! It really has my head spinning 😅 Follow me on Instagram: magicsteveuk

The explanation is actually pretty simple. After the piles are combined into two sets of eight cards, each pile contains two face-up Aces and six face-down cards. Flipping one pile reverses this, and dealing the cards into alternate piles doesn't change their order, it just makes the 16 cards consist of two intermingled series whose order hasn't changed (as if you performed a perfect riffle shuffle). Then dealing the cards into four piles sorts the cards into alternating series- piles 1 and 3 match, and piles 2 and 4 match. Thus when combining the piles, they need to be reversed, and this is the reason for "rolling" the four piles together. So for example if pile 1 has face-up Ace(s) and the rest face-down, pile 2 automatically has face-down Ace(s) and the rest face-up, and thus the two piles must be reversed, and so on. At the end, all of the Aces are in the original configuration along with the indifferent cards.

I believe the simple reason that the trick works is that it is only ever the four aces at the start that are face up. The piles of 3 cards added are face down. The packets are selected in pairs so this does not change the original orientation. The cards can go through as many steps as you like but the basic orientation does not change. It’s not a maths thing it’s simply the orientation of the four aces never changes, shuffling only changes the order not the base orientation as these are swapped in pairs of packets with each packet containing a single ace. David S

Also works if you deal the four aces (or any same four numbers) face down and put the 3 cards face up on top of them. Then it’s a set-up, but has more of a surprise to it all and might lend itself to storytelling better.

Recently stumbled across your channel and subscribed.Tried this trick and cant believe it worked.Hope to see some more awesome content in the future.All the best.

I've seen a different version of this trick but this one is better imo. Great work

Teach us some practical card controls please

Fantastic this Steve learning lots from your channel I'm looking forward to performing these tricks on the Family at Xmas thank you🙏

Another awesome trick for an amateur to add to their routine! Love your channel and thanks!

Thanks Steve, you r my hero 😊

Mind-blowing

I think impossible self-working tricks have become my new favourite type of card tricks. Being that there is very little trickery [or even sleight of hand skill] used, it for some reason impresses me more that they are more ingenious.

What a cool trick! I'll be doing this one at get togethers this year! And I'm right there with you, Steven! I should've paid more attention in math class, too! LOL

wow ! def legit a awesome trick... Gonna start adding that one right away.

This trick also works if you put 6 cards on top of the Aces. Which makes the trick seem even more impressive.

That is insane 😳 Mindblown🎉 😮 Thanks for sharing 🎩 ✨️

Hey there, Uncle Steve, lol. This is really slick. I thought this trick was something like the cheek to cheek trick. Lol. But i was wrong. I read 2 or 3 comments who i believe have the right answer as to how / why this trick works like it does. The 4 aces are the only cards in the beginning that are face up. I also think things change when dealing 4 piles, one card at a time. Well, maybe that doesn't matter, 😊. There is no math involved. I just did the trick back wards, and it worked. I put the 4 aces face- down, and I put 3 cards face-up on each ace. I did the trick the same way, and the 4 aces were the only 4 cards face down. Lol. Thanks, man. Blessings to you and your family.

if you look through the final 4 piles as you turn them over you can see you are putting the aces back the same way and all the other cards are going back the opposite way. Freaken clever trick

this man clearly punched a kangaroo recently.

Thank you for that tutorial Mr Steve I really enjoyed that mind-blowing trick it really is strange how that works I have no clue myself LOL but I will definitely be performing this one again I really do appreciate the video until next time take care of yourself your friend Billy Simmons

Excellent, Hi Steve, I can explain it up until you do every other card , that’s when I cannot , I will be doing this until I can understand it , but excellent.

❤ Thanks for sharing!

fantastic trick, nice n easy with an amazing result 👍

Amazing. Another winner.

I hate to be this guy but this is an extremely well-known trick that can absolutely be explained; others in the comments have already broken it down

Very nice, sir!

I can't find the video with 2M views. 🧐Please provide link, I'd like to see the original one too. Thanks

Wow you’ve done it again Uncle Steve 👍

Brilliant 😊😊😊😊

My friend. You are need 4 cards in a 16 card game of 4 piles of 4. The order after you put one over the other one puts everything in order because they are even and 4x4 is 16. The best way to understand it is do it without mixing, because it really doesn’t matter and deal the cards one beside the other and you’ll understand it better than my explanation. Great trick though I didn’t see it at first. I’ve been dealing to my self for 11 hours after I got it jajaja. Abrazo!

Is that full deck of 52? I love card tricks like these!! Thank you for sharing can't wait to show my family

You have a special brain😮👍

Very cool!

Nice!

Etonnant non! Bravo.

Nice

damn dude! someone owns a cat ha ha. Great video

It’s like the British Magical Nate Bargatze.

1) The Aces face the opposite direction from the rest of the cards. 2) You flip half of the deck (let's call one half on the left the A cards, and the half on the right the B cards). 3) By alternately dealing, effectively performing a Faro shuffle, the cards get merged into one pile ABABABAB etc. etc. Let's assume the B side gets flipped. 4) You then deal this deck into four piles. The piles will be four A cards, four B cards, four A cards, and lastly four B cards. 5) By alternately flipping the four piles back into one, you effectively undo the flip from step 2). Try it only with the four Aces, or use two visibly different / distinct decks (one for A, the other for B) to see what I mean.

No he has a rabbit.

Great

As stated below ... no actual "math" is involved in this trick. If you want to make the algorithm easier to follow ... just put ONE face-down card on those aces.

Stop overloading my old head with reputation making routines It could explode all over my computer work station

No mathematics here. Two bundles with access are flipped once and then flipped back again!

It’s not maths here it’s just the illusion created by flipping cards over twice and getting everything in the same order again Nice trick though

Consider the cards in each original pile named as follows: (a1 a2 a3 a4) (a5 a6 a7 a8) (b1 b2 b3 b4) (b5 b6 b7 b8) Grab two piles and shuffle them, and the other two piles and shuffle them. It doesn't matter which piles you grab due to symmetry. It also doesn't matter what order you shuffle them into as only the orientation of the cards matters. You can think of this symmetry as assigning the Ace to one of the random numbers in each pile. flip one of the shuffled piles. It doesn't matter which one you flip. (call the flipped cards A instead of a) now you have two piles: (A1 A2 A3 A4 A5 A6 A7 A8) (b1 b2 b3 b4 b5 b6 b7 b8) Deal them alternating between the two piles. (A1 b1 A2 b2 A3 b3 A4 b4 A5 b5 A6 b6 A7 b7 A8 b8) Now deal them in 4 piles: (A1 A3 A5 A7) (b1 b3 b5 b7) (A2 A4 A6 A8) (b2 b4 b6 b8) Flip the first pile 3 times, the second pile 2 times, and the third pile 1 time. (a1 a3 a5 a7) (b1 b3 b5 b7) (a2 a4 a6 a8) (b2 b4 b6 b8) Now all the piles have the same orientation as they did in the original piles. The order of cards in each pile may have changed, but the orientation is the same. If you want to make it easy to empirically show this, grab A-4 in each suit and look at the arrangement of the cards after each step.

Im definitely not that person either thanks for sharing

It is math. But pretty cool trick

It's done because of something called the Gilbreath principle. If you really want me to explain it to you then I will do for £1,000,000,000 or £1,000,000 and an IOU to pay me £2.20 a week for perpetuity. Hopefully everyone can see that the second option is obviously better for you but it's up to you which you go for. Anyway if you'd really like to know those are your options. 😂

UNEXPLENABLE??? NOt

👍👍

It cannot be explained because it's math. 🙄

you have a cat?