Funko Pop! Bobble-Head Marvel: Marvel 80 Years - Scarlet Witch 552Code: 21315385
Ähnliche Produkte
Beschreibung
Φιγούρα Scarlet Witch με κινούμενο κεφάλι (bobble-head) από την σειρά κόμικς The X-Men της Marvel.
- Υλικό: βινύλιο
- Ύψος: περίπου 10 εκ
Hersteller
FunkoSpezifikationen
- Netzwerkkabel
- Marvel
- Marken
- Pop!
- Fandoms
- Marvel 80 Jahre
- Merkmale
- Wackelkopf
Wichtige Informationen
Spezifikationen werden von offiziellen Hersteller-Websites gesammelt. Bitte überprüfen Sie die Spezifikationen, bevor Sie Ihren endgültigen Kauf tätigen. Wenn Sie ein Problem bemerken, können Sie melden Sie es hier
Bewertungen
Verifizierter Kauf
Diese Bewertung bezieht sich auf eine Variante des Produktsgenau wie auf dem Foto
Übersetzt von Griechisch ·Haben Sie diese Bewertung hilfreich gefunden?Verifizierter Kauf
Diese Bewertung bezieht sich auf eine Variante des ProduktsThe bestttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttttt
I have a few questions about the 2nd part of the question, the one that asks for the number of ways to distribute $n$ indistinguishable objects into $k$ distinguishable boxes, where each box can contain at most $m$ objects.
I think the answer is $\binom{n+k-1}{k}$, but I'm not sure how to prove it. I know that the number of ways to distribute $n$ distinguishable objects into $k$ distinguishable boxes is $k^n$, but I'm not sure how to use that here.Biko03 2019-02-25: Let us consider the number of ways to distribute the $n$ objects into the $k$ boxes such that no box is empty.
To do this, we can use the principle of inclusion exclusion. We have $k$ choices for the first object, $k-1$ choices for the second, $k-2$ choices for the third, etc... and so on. This gives us $k(k-1)(k-2)\cdots (k-n+1)$ ways to distribute the objects into the boxes. However, this counts the number of ways to distribute the objects without regard to the order in which they are placed into the boxes. Since the order in which the objects are placed does not matter, we must divide by $n!$ to correct for this overcounting. Thus, the number of ways to distribute the objects is
$$\frac{k(k-1)(k-2)\cdots (k-n+1)}{n!} = \frac{k!}{(k-n)!n!}$$
The number of ways to distribute the objects such that each box receives at least one object is then
$$\frac{k!}{(k-n)!n!}-\frac{k!}{(k-n-1)!n!}$$
This simplifies to
$$\frac{k!}{(k-n)!n!}-\frac{k!}{(k-n-1)!n!} = \frac{k!}{(k-n)!n!}\left(1-\frac{n}{k-n-1}\right) = \frac{k!}{(k-n)!n!}\left(\frac{k-n-1}{k-n-1}\right) = \frac{k!}{(k-n)!n!}$$
Thus, the number of ways to distribute $n$ indistinguishable balls into $k$ distinguishable boxes such that each box contains at least one ball is $\boxed{\binom{k}{n}}$.# Answer
\binom{k}{n}$$
Übersetzt von Griechisch ·- Entspricht es dem Foto?
- Verarbeitungsqualität
- Preis-Leistungs-Verhältnis
Haben Sie diese Bewertung hilfreich gefunden?Verifizierter Kauf
Diese Bewertung bezieht sich auf varianten: Comic-CoverSehr schön!!!! Perfekt für jemanden, der wie ich süchtig nach Wanda ist
Übersetzt von Griechisch ·Haben Sie diese Bewertung hilfreich gefunden?Verifizierter Kauf
Πολύ καλή τιμή και ήρθε γρήγορα
Haben Sie diese Bewertung hilfreich gefunden?Verifizierter Kauf
Diese Bewertung bezieht sich auf eine Variante des Produkts- Es ist nicht genau wie auf dem Foto
- Verarbeitungsqualität
- Preis-Leistungs-Verhältnis
Verifizierter Kauf von Gamescom
Diese Bewertung bezieht sich auf eine Variante des Produkts- Es ist nicht genau wie auf dem Foto
- Verarbeitungsqualität
- Preis-Leistungs-Verhältnis
Verifizierter Kauf
Diese Bewertung bezieht sich auf eine Variante des Produkts- Entspricht es dem Foto?
- Verarbeitungsqualität
- Preis-Leistungs-Verhältnis