ALL EMOTE WINNERS: please contact me ASAP and be ready to check your DMs! This is the second video I've edited with my new software, and I'm really happy with how everything is coming along. I'm halfway through my final exams and I'll be all done and free next week!! Much love everyone 💖
awesome video, i like the new editing! i always have to rewind to look at the opponents badges cause i forget so zooming in on them was a great touch😂 also, good luck on the exams!
I just started watching you when i came back to cr. i thought the 2.9 or 3.0 xbow cycle first i was watching the top global i forgot his youtube. but i know the name had a lemon but now im watching you how to play the x bow again. start grinding again thank you for the tips you gave I really appreciate it a lot and keep it up uploading 👍🏻.
@@sk_555 gl gl, remember that tensor categories generalize the structure of vector spaces and linear maps into a highly abstract framework where objects (like vector spaces) and morphisms (like linear transformations) form a category with additional structure, such as tensor products and associativity constraints. Fusion categories extend this by encoding rules for “fusion” of objects, akin to particle interactions or group representations, governed by algebraic rules like associativity via natural isomorphisms. Modular tensor categories add a topological layer, incorporating braiding and modularity properties, making them crucial for modeling non-Abelian anyons in topological quantum computation and topological quantum field theory. These structures unify ideas from linear algebra, topology, and category theory, offering a language to describe quantum symmetries, fault-tolerant quantum gates, and even invariants of knots and manifolds.
ALL EMOTE WINNERS: please contact me ASAP and be ready to check your DMs! This is the second video I've edited with my new software, and I'm really happy with how everything is coming along. I'm halfway through my final exams and I'll be all done and free next week!! Much love everyone 💖
How do I contact you?
awesome video, i like the new editing! i always have to rewind to look at the opponents badges cause i forget so zooming in on them was a great touch😂 also, good luck on the exams!
Also, when is ice spirit better than electro spirit?
New snowball evo might be huge for xbow, it allows it to retarget to the towers
Do you recommend evo skeletons instead of Tesla?
He guy's sk here baaccckk with another clash royale video.
( Xbows log was personal 💀0:02)
Needed this💪
Received your giveaway brother.. Thanks a lot and keep growing ❤
Thank you for participating
I just started watching you when i came back to cr. i thought the 2.9 or 3.0 xbow cycle first i was watching the top global i forgot his youtube. but i know the name had a lemon but now im watching you how to play the x bow again. start grinding again thank you for the tips you gave I really appreciate it a lot and keep it up uploading 👍🏻.
The lemon guy doesn't play anymore
what should i upgrade first to level 15. skelton , ice spirit or electro spirit
How do you know whether to use ice spirit or e spirit
Full cc series? Anyway great video❤
Mortar deck 100 - 0 for him you are the god of xbow
no evo tesla??😊
Nice editing
I'd love to win a giveaway to level up Xbow 🥺
7 WORDS : E S E N C I E
Last match was clynical in terms of micros🤯
Bros in Lachlan range calling it “upper ladder”😭😭💔
Call me a Royal Recruit the way I be hard when I'm counting
What the hell rk 😭 also I'm halfway through finals, getting straight cooked by linear algebra next week,,,
@@sk_555 gl gl, remember that tensor categories generalize the structure of vector spaces and linear maps into a highly abstract framework where objects (like vector spaces) and morphisms (like linear transformations) form a category with additional structure, such as tensor products and associativity constraints. Fusion categories extend this by encoding rules for “fusion” of objects, akin to particle interactions or group representations, governed by algebraic rules like associativity via natural isomorphisms. Modular tensor categories add a topological layer, incorporating braiding and modularity properties, making them crucial for modeling non-Abelian anyons in topological quantum computation and topological quantum field theory. These structures unify ideas from linear algebra, topology, and category theory, offering a language to describe quantum symmetries, fault-tolerant quantum gates, and even invariants of knots and manifolds.
No wayyy! I won!
@@AFarNebula congratulations and enjoy 🩷
Seems like every matchup is a hard counter in this matchup 😭
Yesssirrr ❤
I appreciate you Sinky 🫶
@ and I appreciate your videos bro, hope your exams are going good! 👊🏻