Monday brings a recent set of NYT Pips puzzles to start out your week. At this time’s grid encompasses a balanced mixture of equal, greater-than, less-than, and not-equal circumstances unfold throughout 15 dominoes per issue, with the identical zone structure throughout all three ranges however escalating strategic calls for. We have got hints, step-by-step walkthroughs, and full options for Simple, Medium, and Onerous issue ranges.
Learn how to Play Pips
Pips is a domino placement puzzle the place you fill a grid of color-coded zones. Every zone has a situation you could fulfill utilizing the pip values in your dominoes. The twist: you could use each domino and meet each situation to win.
Zone Circumstances:
- = All pips on this zone should equal the identical quantity
- Not Equal All pips should be completely different numbers
- > Pips should be higher than the listed quantity
- < Pips should be lower than the listed quantity
- Precise Quantity Pips should complete that actual worth
- No Colour Free house, any domino worth works
Click on or faucet dominoes to rotate them. Every puzzle has a number of legitimate options.
At this time’s Simple Pips
At this time’s Medium Pips
At this time’s Onerous Pips
Fast Hints (No Spoilers)
Beginning Level: The teal (0) zone is your solely absolute anchor. Place the 1/0 domino there first, bridging into pink (=), and all the pieces else unfolds from that constraint.
Key Perception: The orange (not-equal) zone touches six completely different zones and should comprise six distinctive pip values. Observe each worth positioned in orange fastidiously — duplicates will break the puzzle.
Watch Out For: The purple zones seem in three separate situations (4, 6, and a pair of), every with completely different exact-number necessities. Don’t confuse them. Additionally, the teal (=) zone should match the teal (0) zone’s worth for consistency, so it should be 0.
Step-by-Step Walkthrough
- 1.Lock within the teal (0) zone first. The 1/0 domino is the one one that may bridge pink (=) and teal (0) with a 0 on the teal facet. Place it horizontally. This forces the pink (=) worth to 1, for the reason that 4/1 domino additionally bridges into pink from purple (4).
- 2.Place the 4/1 domino horizontally throughout purple (4) and pink (=). The 4 satisfies purple’s exact-4 situation. The 1 confirms pink’s equal-value sample.
- 3.Place the 1/1 domino solely throughout the pink (=) zone. This completes the pink zone with all cells displaying 1.
- 4.Now deal with the teal (=) zone. Three dominoes bridge into it from orange (>4), navy (<4), and inexperienced (4): 5/0, 3/0, and 4/0. All three should share the identical worth on the teal facet. The one constant worth is 0, matching the teal (0) zone. Place all three vertically: 5/0 in orange (>4) and teal (=), 3/0 in navy (<4) and teal (=), 4/0 in inexperienced (4) and teal (=).
- 5.Place the two/6 domino vertically within the uncolored zone and pink (>2) zone. The 6 satisfies the greater-than-2 situation in pink. The uncolored zone has no restrictions.
- 6.Place the 1/3 domino horizontally in pink (=) and purple (6). The 1 matches pink’s equal worth. The three goes into purple (6), which wants an actual complete of 6 from its two cells.
- 7.Place the three/3 domino vertically in purple (6) and orange (not-equal). The three in purple (6) pairs with the adjoining 3 to succeed in the precise complete of 6. In orange (not-equal), that is your first distinct worth.
- 8.Place the 6/0 horizontally in navy (6) and orange (not-equal). The 6 satisfies navy’s exact-6 situation. In orange (not-equal), 6 is a brand new distinct worth.
- 9.Place the two/2 vertically in orange (not-equal) and inexperienced (2). The two satisfies inexperienced’s exact-2 situation. In orange (not-equal), 2 is a brand new distinct worth.
- 10.Place the 0/2 vertically in teal (=) and purple (2). The 0 matches teal’s equal worth. The two satisfies purple’s exact-2 situation.
- 11.Place the three/5 horizontally in pink (3) and teal (10). The three satisfies pink’s exact-3 situation. The 5 contributes to teal’s exact-10 complete.
- 12.Place the 5/5 horizontally in teal (10) and orange (not-equal). The 5+5=10 completes teal’s exact-10 requirement. In orange (not-equal), 5 is one other distinct worth.
- 13.Place the 4/4 horizontally in orange (not-equal) and navy (4). The 4 satisfies navy’s exact-4 situation. In orange (not-equal), 4 is the ultimate distinct worth — bringing the entire to 6 distinctive numbers (2, 3, 4, 5, 6, and the 0 from earlier), satisfying the not-equal situation.
Onerous Pips Resolution
Final likelihood to unravel independently
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- 1.Place the 4/1 domino horizontally within the purple (4) zone and pink (=) zone
- 2.Place the 1/1 domino horizontally within the pink (=) zone
- 3.Place the 1/0 domino horizontally within the pink (=) zone and teal (0) zone
- 4.Place the two/6 domino vertically within the uncolored (no situation) zone and pink (>2) zone
- 5.Place the 5/0 domino vertically within the orange (>4) zone and teal (=) zone
- 6.Place the three/0 domino vertically within the navy (<4) zone and teal (=) zone
- 7.Place the 4/0 domino vertically within the inexperienced (4) zone and teal (=) zone
- 8.Place the 1/3 domino horizontally within the pink (=) zone and purple (6) zone
- 9.Place the three/3 domino vertically within the purple (6) zone and orange (not-equal) zone
- 10.Place the 6/0 domino horizontally within the navy (6) zone and orange (not-equal) zone
- 11.Place the two/2 domino vertically within the orange (not-equal) zone and inexperienced (2) zone
- 12.Place the 0/2 domino vertically within the teal (=) zone and purple (2) zone
- 13.Place the three/5 domino horizontally within the pink (3) zone and teal (10) zone
- 14.Place the 5/5 domino horizontally within the teal (10) zone and orange (not-equal) zone
- 15.Place the 4/4 domino horizontally within the orange (not-equal) zone and navy (4) zone
Puzzle Debrief
Total Problem: Reasonable problem throughout all three ranges.
Trickiest Puzzle: Onerous – The orange (not-equal) zone is the actual entice right here. With six distinct pip values required throughout a number of bridging dominoes, one incorrect placement cascades into an unsolvable state. The three separate purple zones (4, 6, 2) additionally demand cautious consideration since they give the impression of being an identical at a look however have completely different exact-number targets.
Our Take: At this time’s set is a strong Monday exercise. The zone structure is an identical throughout all three difficulties, which suggests fixing Simple offers you a roadmap for Medium and Onerous — however the escalating circumstances pressure you to suppose extra fastidiously about every placement. The orange (not-equal) zone in Onerous is the standout problem, requiring meticulous monitoring of used values. A satisfying puzzle for a Monday morning.
Tomorrow’s Pips drops at midnight. See you then.
