EA FC 24 is just getting started with promos but players already have plenty to choose from via Squad Building Challenges, including the Dynamic Duos SBC that can net them the Jeffinho and Caio Henrique cards for Ultimate Team.
If you're done chasing that card you wanted from the latest Team of the Week or are simply looking for a more specific one to fill your roster, then this SBC is right for you, as it will net you two cards for cheap!
As the name suggests, Dynamic Duos usually feature players who have developed a strong partnership, whether at a club level or with the national team.
In this case, neither Jeffinho and Caio Henrique have played a ton of games together, however, both are Brazilian, play for Ligue 1 clubs, and are complimentary cards (one being a LW and the other a LB), making them a perfect pairing.
5So if you want to know more about this double SBC, we got everything you need to know to complete the Dynamic Duos SBC.
Dynamic Duos SBC
This special SBC features two players, as we've mentioned. These are:
Dynamic Duos Jeffinho
Dynamic Duos Caio Henrique
Start Date: Wednesday, 11 October.
Expiry Date: Tuesday, 24 October.
SBC Requirements
You will need to submit one squad for each player, however, you will get a bonus reward for completing both the Jeffinho Dynamic Duos and the Caio Henrique Dynamic Duos.
The requirements are as follows:
Caio Henrique SBC
- Number of players from Brazil: Min 1
- Minimum OVR of 86: Min 1
- IF Players: Min 1
- Squad Rating: Min 84
- Number of players in the Squad: 11
Reward: 1 x Caio Henrique Dynamic Duos.
Jeffinho SBC
- Number of players from Ligue 1 Uber Eats: Min 1
- Minimum OVR of 86: Min 1
- IF Players: Min 1
- Squad Rating: Min 84
- Number of players in the Squad: 11
Reward: 1 x Jeffinho Dynamic Duos.
You'll get a Premium Gold Pack for completing both.
Cost: 59,000 Coins
Solutions
Check our solutions for each Dynamic Duos SBC, depending on whether you want Caio Henrique or Jeffinho.
Caio Henrique SBC
Jeffinho SBC
This are just one of the many solutions that can be found by using the easySBC AI. To get your own solution, go try it out at easysbc.io.