
Portal (Knife) Value in MM2 (2026)
The current Portal (Knife) value in MM2 for 2026 is x2 T1 Rares. It is a rare weapon with 2/10 demand; value data was updated July 11, 2026.
- Value
- x2 T1 Rares
- Category
- Weapon
- Rarity
- RARE
- Tier
- Not ranked
- Demand
- 2/10
- Stability
- Stable
- Ranged value
- N/A
- Rarity Score
- 2
- Origin
- Hallows 2020 (Unboxed)
- Side
- Knife
- Year
- 2020
- Event
- Halloween
- Last change in value
- —
- Data updated
- July 11, 2026
Portal (Knife) value history
Not enough history yet for this chart.
- Lowest
- —
- Highest
- —
- Current
- —
Community value and market price use different scales. Volume reflects BloxSwaps trade activity where available.
About Portal (Knife)
How to get Portal (Knife) in MM2
Portal (Knife) can be obtained via 2020 Halloween Box - Unbox.
What Portal (Knife) looks like
Its blade is made up of a black frame with a silver outline that has triangular points by the edge. Inside the frame is a red portal with a swirly design over it, hence the name. The guard is silver, and the handle is black with two silver beams and a screw in the center.
Portal (Knife) trivia
It has a partner gun under the same name. However, its counterpart is an uncommon instead of a rare.
Portal (Knife) value FAQ
What is the current Portal (Knife) value in MM2?
The current Portal (Knife) value in MM2 is x2 T1 Rares. It originally came from Hallows 2020 (Unboxed). Community values can change, so review the update date and demand before trading. A separate third-party reference value is x3 T1 Rares (MM2V); our primary estimate follows Supreme Values community data.
Is Portal (Knife) rare?
Portal (Knife) is listed as RARE rarity with a rarity score of 2. Rarity is only one part of value; demand and supply also affect what traders may offer.
How do you get Portal (Knife) in MM2?
Portal (Knife) can be obtained via 2020 Halloween Box - Unbox.
Is Portal (Knife) stable in value?
Its current stability is listed as Stable. A less stable estimate deserves extra caution because recent trades may fall across a wider range.





