Odds Of 4 Of A Kind In Texas Holdem

1. Odds Of Two Four Of A Kind In Texas Holdem
2. Odds Of Getting 4 Of A Kind In Texas Hold Em
3. Odds Of Flopping 4 Of A Kind In Texas Hold Em
4. What Are The Odds Of Flopping 4 Of A Kind In Texas Holdem
5. Odds Of Hitting 4 Of A Kind In Texas Holdem
6. Odds Of 4 Of A Kind In Texas Hold'em
7. Odds Of 4 Of A Kind In Texas Holdem

The Texas Hold'em odds for each of the different situations have been given in both percentage and ratio odds, so use whichever format you feel comfortable with. Other poker odds charts. For more useful odds charts that you can use for when you are working out whether or not to call when on a drawing hand, use the following tables. The odds of getting a 4 of a kind given 7 cards (2 in your hand and 5 on the board) are (13. (48 choose 3)) / (52 choose 7) or 0.7. The probability of getting that specific 4 of a kind again are now (48 choose 3) / (52 choose 7) or 0.82. Best of all, being able to play free casino with all the opportunities that we mentioned earlier, is the option to play anywhere, anytime, no matter where you are Odds Of 4 Of A Kind In Texas Holdem or what time, since being online and have a 24 / 7 there are no limits. Thanks to all casinos in English online are now also have the option to enter a mobile casino with your phone or tablet.

Question: What is the probability of a 4 of a kind appearing on the board in texas holdem?

Solution:

1. All of the following computations assume that you know only your two hole cards, and no other cards are known to you. Thus, there are 50 unknown cards after you see your hole cards.
2. In the computations below, I'll use the symbol X for the card that does not fill the 4 of a kind, and an M for the cards that do fill the 4 of a kind.
3. If you do not hold a pair, the probability is different than if you do hold a pair. So, we need to analyze these two cases seperately. The probability (denoted P) of getting a paired hand in the hole is 3/51=.0588235 (your first card from the deck can be any card, while the second must match it; after you get your first hole card, there are 3 cards of the 51 remaining cards that match your hole card). Thus, the probability of getting a non-paired hand is 1-.0588235=.94117647.

Case 1. Let's analyze non-paired hole cards first.

• Scenario 1: XMMMM
  • Start with non-paired hole cards P=.94117647.
  • X can be any card (even one that pairs either of your hole cards), and there are 50 cards remaining in the deck, so it has P=50/50.
  • The first M, M1, can be any card not matching X (there are 3 that do match X) nor either of your hole cards (because if it did, no 4 of a kind on the board is possible; there are 6), and there are 49 cards remaining in the deck, so it has P=40/49.
  • The second M, M2, must match M1, and there are 48 remaining cards in the deck 3 of which match M1, so its has P=3/48
  • The third M, M3, must match M1, and there are 47 remaining cards in the deck 2 of which match M1, so its has P=2/47
  • The fourth M, M4, must match M1, and there are 46 remaining cards in the deck 1 of which match M1, so its has P=1/46.
  • Now multiplying .94117647*(50/50)*(40/49)*(3/48)*(2/47)*(1/46) gives us the probability that there will be a 4 of a kind on the board in the form XMMMM, or P=.00004442.
• Scenario 2: MXMMM
  • Start with non-paired hole cards P=.94117647.
  • M1 can be any card not matching either of your hole cards (there are 6), and there are 50 cards remaining in the deck, so it has probability P=44/50.
  • X can be any card not matching M1 (there are 3), and there are 49 cards remaining in the deck, so it has P=46/49.
  • M2 must match M1, and there are 48 remaining cards in the deck 3 of which match M1, so its has P=3/48.
  • M3 must match M1, and there are 47 remaining cards in the deck 2 of which match M1, so its has P=2/47.
  • M4 must match M1, and there are 46 remaining cards in the deck 1 of which match M1, so its has P=1/46.
  • Now, multiplying gives us the probability that there will be a 4 of a kind on the board in the form MXMMM, or P=.00004495.
• Scenario 3: MMXMM
  • Non-paired hole cards P=.94117647.
  • P(M1) = 44/50 (must not match either of your hole cards)
  • P(M2) = 3/49 (must match M1)
  • P(X) = 46/48 (must not match M1; there are only 2 cards left that do match M1)
  • P(M3) = 2/47 (must match M1)
  • P(M4) = 1/46 (must match M1)
  • Probability that there will be a 4 of a kind on the board in the form MMXMM is P=.00004495.
• Scenario 4: MMMXM
  • Non-paired hole cards P=.94117647.
  • P(M1) = 44/50 (must not match either of your hole cards)
  • P(M2) = 3/49 (must match M1)
  • P(M3) = 2/48 (must match M1)
  • P(X) = 46/47 (must not match M1; there is only 1 card left that does match M1)
  • P(M4) = 1/46 (must match M1)
  • Probability that there will be a 4 of a kind on the board in the form MMMXM is P=.00004495.
• Scenario 5: MMMMX
  • Non-paired hole cards P=.94117647.
  • P(M1) = 44/50 (must not match either of your hole cards)
  • P(M2) = 3/49 (must match M1)
  • P(M3) = 2/48 (must match M1)
  • P(M4) = 1/47 (must match M1)
  • P(X) = 46/46 (must not match M1; there are 0 cards left that match M1 since they are all on the board)
  • Probability that there will be a 4 of a kind on the board in the form MMMMX is P=.00004495.

Adding all 5 of these probabilities gives us a total probability that there will be any 4 of a kind on the board when holding a non-pair in the hole, or P=.0002297.

Odds Of Two Four Of A Kind In Texas Holdem

Case 2. Analyze paired hole cards.

• Scenario 1: XMMMM
  • Start with paired hole cards P=.05882353.
  • X can be any card (even one that pairs either of your hole cards), and there are 50 cards remaining in the deck, so it has P=50/50.
  • The first M, M1, can be any card not matching X (there are 3) nor either of your hole cards (because if it did, no 4 of a kind on the board is possible; there are 2), and there are 49 cards remaining in the deck, so it has P=44/49.
  • The second M, M2, must match M1, and there are 48 remaining cards in the deck 3 of which match M1, so its has P=3/48
  • The third M, M3, must match M1, and there are 47 remaining cards in the deck 2 of which match M1, so its has P=2/47
  • The fourth M, M4, must match M1, and there are 46 remaining cards in the deck 1 of which match M1, so its has P=1/46.
  • Now multiplying .05882353*(50/50)*(44/49)*(3/48)*(2/47)*(1/46) gives us the probability that there will be a 4 of a kind on the board in the form XMMMM, or P=.00000305.
• Scenario 2: MXMMM
  • Start with paired hole cards P=.05882353.
  • M1 can be any card not matching either of your hole cards (there are 2), and there are 50 cards remaining in the deck, so it has probability P=48/50.
  • X can be any card not matching M1 (there are 3), and there are 49 cards remaining in the deck, so it has P=46/49.
  • M2 must match M1, and there are 48 remaining cards in the deck 3 of which match M1, so its has P=3/48.
  • M3 must match M1, and there are 47 remaining cards in the deck 2 of which match M1, so its has P=2/47.
  • M4 must match M1, and there are 46 remaining cards in the deck 1 of which match M1, so its has P=1/46.
  • Now, multiplying gives us the probability that there will be a 4 of a kind on the board in the form MXMMM, or P=.00000307.
• Scenario 3: MMXMM
  • Paired hole cards P=.05882353.
  • P(M1) = 48/50 (must not match either of your hole cards)
  • P(M2) = 3/49 (must match M1)
  • P(X) = 46/48 (must not match M1; there are only 2 cards left that do match M1)
  • P(M3) = 2/47 (must match M1)
  • P(M4) = 1/46 (must match M1)
  • Probability that there will be a 4 of a kind on the board in the form MMXMM is P=.00000307.
• Scenario 4: MMMXM
  • Paired hole cards P=.05882353.
  • P(M1) = 48/50 (must not match either of your hole cards)
  • P(M2) = 3/49 (must match M1)
  • P(M3) = 2/48 (must match M1)
  • P(X) = 46/47 (must not match M1; there is only 1 card left that does match M1)
  • P(M4) = 1/46 (must match M1)
  • Probability that there will be a 4 of a kind on the board in the form MMMXM is P=.00000307.
• Scenario 5: MMMMX
  • Paired hole cards P=.05882353.
  • P(M1) = 48/50 (must not match either of your hole cards)
  • P(M2) = 3/49 (must match M1)
  • P(M3) = 2/48 (must match M1)
  • P(M4) = 1/47 (must match M1)
  • P(X) = 46/46 (must not match M1; there are 0 cards left that match M1 since they are all on the board)
  • Probability that there will be a 4 of a kind on the board in the form MMMMX is P=.00000307.

Odds Of Getting 4 Of A Kind In Texas Hold Em

Adding all 5 of these probabilities gives us a total probability that there will be any 4 of a kind on the board when holding a pair in the hole, or P=.00001513.

So, now we add the two probabilities together to get the total probability of a 4 of a kind appearing on the board regardless of if your hole cards are paired or not: .0002297+.00001513=.00023955, or 4174.46 to 1.

Odds Of Flopping 4 Of A Kind In Texas Hold Em

To put this in perspective, if you played 5 days a week, 8 hours a day in a live card room at 25 hands per hour, you would see 1000 hands a week. Furthermore, IF every hand went to the river OR if you rabbit-hunted every hand and looked at all the board cards regardless of if play dictated that they be shown, you'd see a 4 of a kind on the board once a month or so. Of course, since only approximately 20% of all hands go to the river, a full-time live card room player will only see about 2 or 3 a year.

Online players generally see twice as many hands as a player in a live card room; they will see twice as many 4 of a kinds on the board than will a player that plays the same amount of time in a live poker room.

What Are The Odds Of Flopping 4 Of A Kind In Texas Holdem

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Odds Of Hitting 4 Of A Kind In Texas Holdem

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Odds Of 4 Of A Kind In Texas Hold'em

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Odds Of 4 Of A Kind In Texas Holdem

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