So berechnen Sie Hexagonal Prism
learn.whatIsHeading
A hexagonal prism has two regular hexagonal bases connected by six rectangular faces. It appears in honeycomb structures, pencils, and crystals.
Formel
A_base = (3√3/2)a²; V = A_base × h; LSA = 6ah; TSA = 2A_base + 6ah
- a
- side length (regular hexagon) (length)
- h
- height of prism (length)
- V
- volume (length³)
Schritt-für-Schritt-Anleitung
- 1Base area = (3√3/2) × a²
- 2Volume = Base area × height
- 3Lateral surface = 6 × a × h
- 4Total surface = 2 × Base + Lateral
Gelöste Beispiele
Eingabe
a = 4, h = 10
Ergebnis
Volume = (3√3/2)×16×10 = 415.69
Eingabe
a = 5, h = 8
Ergebnis
Volume ≈ 519.62
Häufig gestellte Fragen
Why is the hexagonal prism so common in nature?
Honeycombs use hexagonal prisms because they tile efficiently and require minimal material for maximum volume.
How many faces, edges, and vertices does a hexagonal prism have?
8 faces (2 hexagons + 6 rectangles), 18 edges, and 12 vertices.
Is a hexagonal prism the same as a hexagonal cylinder?
No, a prism has flat rectangular sides, while a cylinder would have curved sides.
Bereit zur Berechnung? Probieren Sie den kostenlosen Hexagonal Prism-Rechner aus
Probieren Sie es selbst aus →