Page Content
- Classification
- Region
- Group
- Taxa, synonyms
- Bibliography
- Figures
Rhytiphora intricata
Rhytiphora intricata is the scientific name of a group of Lamiinae -also called lamiines or flat-faced longhorned beetles-
Rhytiphora intricata (Pascoe, 1864)
F.P. Pascoe is the author of the original taxon.
The type specimen used for original description is cited from South Australia.
Rhytiphora intricata (Pascoe, 1864) is the full name of the group-species in the taxonomic classification system.
The species is combined with the Rhytiphora genus ranked in the Pteropliini tribe of Lamiinae.
Classification
kingdom | |
Animalia | |
~1,200,000 sp. | |
phylum | |
Arthropoda | |
~1,000,000 sp. | |
class | |
Insecta | |
~830,000 sp. | |
order | |
Coleoptera | |
~350,000 sp. | |
family | |
Cerambycidae | |
~35,000 sp. | |
subfamily | |
Lamiinae | |
21,795 sp/ssp. | |
tribe | |
Pteropliini | |
2,132 sp/ssp. | |
genus | |
Rhytiphora | |
142 sp/ssp. | |
species | |
intricata | |
Region
World [1]
Distribution for Rhytiphora intricata
Group
intricata [1]
Subgroup of
Taxa, synonyms
1 taxon refers to Rhytiphora intricata
-
Penthea intricata Pascoe, 1864 [ type locality : South Australia ]
Bibliography
Some citations found in the bibliography excluding lists and catalogs except with nomenclatural act or image or data
-
Penthea intricata Pascoe • The J. Entomol. • 1864 • 2 (10) : 227 [ nov loc ]
-
Penthea intricata ; McKeown • Mem. Austral. Mus. • 1947 • 10 : 161 [ loc ]
-
Penthea (Penthea) intricata ; Breuning • Verl. Mus. G. Frey Tutz. München • 1961 • 4 : 275
-
Rhytiphora intricata ; Slipinski & Escalona • CSIRO Publ. • 2013 • 1 : 205 [ ill ]
-
Rhytiphora intricata ; Ashman & al. • Zootaxa • 2023 • 5312 (1) : 26, 30, 43 [ loc plh div ]details
Rhytiphora intricata ; Ashman & al. • Zootaxa • 2023 • 5312 (1) : 26, 30, 43
General information
- note
- host plant
Distribution
- Western Australia
- South Australia
- Victoria
Figures
Some references with images to see in bibliography
- Holotype of Rhytiphora intricata (Pascoe, 1864) • see Slipinski & Escalona, 2013