Menampilkan Bidang Diagonal Kubus dengan Geogebra
FACE
Face is the area that confined
the inner parts and the outer
parts.
FACE ABCD
FACE CDHG
FACE ADHE
FACE EFGH
FACE BCGF
FACE ABEF
So, the number of cubes face are six (6)
EDGE
the faces of cubes cross
at a line
EDGE AE
EDGE CD
EDGE AB
EDGE DA
EDGE BC
EDGE EH
EDGE GH
EDGE EF
EDGE CG
EDGE DH
EDGE BF
EDGE FG
So, the number of cubes edge are 12
VERTEX
The edges of cubes meet at a
point.
Vertex A
Vertex D
Vertex B
Vertex E
Vertex C
Vertex F
Vertex G
Vertex H
So, the number of cubes vertex are
twelve (12)
FACE DIAGONAL
The face diagonal is a segment that
connecting two vertices facing each other on a
face of the cubes
Face Diagonal AH
Face diagonal GD
Face diagonal ED
Face diagonal AF
Face diagonal CH
Face diagonal BE
Face diagonal ac
Face Diagonal EG
Face diagonal DB
Face Diagonal BG
Face Diagonal HF
Face Diagonal FC
So, the number face diagonal of cubes are 12
Face is the area that confined
the inner parts and the outer
parts.
FACE ABCD
FACE CDHG
FACE ADHE
FACE EFGH
FACE BCGF
FACE ABEF
So, the number of cubes face are six (6)
EDGE
the faces of cubes cross
at a line
EDGE AE
EDGE CD
EDGE AB
EDGE DA
EDGE BC
EDGE EH
EDGE GH
EDGE EF
EDGE CG
EDGE DH
EDGE BF
EDGE FG
So, the number of cubes edge are 12
VERTEX
The edges of cubes meet at a
point.
Vertex A
Vertex D
Vertex B
Vertex E
Vertex C
Vertex F
Vertex G
Vertex H
So, the number of cubes vertex are
twelve (12)
FACE DIAGONAL
The face diagonal is a segment that
connecting two vertices facing each other on a
face of the cubes
Face Diagonal AH
Face diagonal GD
Face diagonal ED
Face diagonal AF
Face diagonal CH
Face diagonal BE
Face diagonal ac
Face Diagonal EG
Face diagonal DB
Face Diagonal BG
Face Diagonal HF
Face Diagonal FC
So, the number face diagonal of cubes are 12