Which poker combinations are there and which one is the strongest? A poker hand therefore always consists of the best combination of your own cards and three or four of the five cards on the table. In total, it is always about the best 5 cards.
A combination of the 5 highest consecutive
cards (10 to A) of the same suit (symbol) is the highest poker hand there is.
For example: 10 of hearts, Jack of hearts, Queen of hearts, King of hearts and
Ace of hearts.
A combination of 5 consecutive cards of
the same suit. For example 4,5,6,7,8 of hearts. If there are more players with
a straight flush, the highest card value wins.
of a Kind
4 cards of the same rank and the highest
card possible. For example 6-6-6-6-A.
Three cards of equal value combined with
two other cards of equal value. For example, 8-8-8–6-6. With several full
houses, the value of the three equal cards is decisive. If that is also equal,
then the pair is decisive.
5 cards of the same suit, for example 5
cards of clubs. The order or value of the cards does not matter. Again, if
several players have a flush, the highest card counts and then the next, etc.
5 consecutive cards. The suit doesn’t
matter, it can be a mix. For example 7,8,9,10, J of hearts, spades, clubs. For
example, a straight of 9-10-JQK is worth more than a straight of 6-7-8-9-10.
of a Kind
A combination of 3 cards of the same rank.
For example, three sixes or three women. A poker combination always consists of
five cards, so the two highest remaining cards belong to it, for example
A combination where you have two pairs and
a fifth, highest possible card. For example 10-10-8-8-J.
A pair with three separate cards added.
For example: 3-3-6-JK.
Don’t have a poker hand as described
above? If you have five cards with which you cannot make a combination, you
have a high card, the lowest poker combination. An example of this is:
Is poker a game of chance, a game of skill
or even a mind game? Every player thinks differently about this, but the
fascinating thing is that the casino game contains elements of all three.