0

What is the lateral area of a triangular prism with base edges all equaling 4 feet and a height of 10 feet?

Updated: 12/23/2022

Wiki User

12y ago

Area of each triangular face = 4*sqrt(3) sq ft = 13.86 sq ft (to 2 dp)

Area of each rectangular face = 40 sq ft

Total area = 2*13.86 + 3*40 = 147.71 sq ft

Wiki User

12y ago

Earn +20 pts
Q: What is the lateral area of a triangular prism with base edges all equaling 4 feet and a height of 10 feet?
Submit
Still have questions?
Related questions

42

How many lateral edges does a triangular prism have?

a triangular prism has 5 sides.

How many lateral edges are there in a triangular prism?

It has 9 edges, 6 vertices and 5 faces

How many edges doe a triangular prism?

a triangular prism has 5 faces, and it has 8 edges &amp; 5 vertices. * * * * * Wrong answer, I am afraid.

How many edges are on a tetrahedron?

There are 6 edges on a tetrahedron. The triangular base has 3, plus one for each lateral face.43 edges

Which properties describe a triangular pyramid?

It is a 3D shape comprising a triangular base and three triangular lateral faces rising from its edges to meet at an apex above the base.

How many sides are on a triangular prism?

maybe it has 8 edges............ . Edges - as in corners? I make it nine. Edges as in faces? I make it five. A triangular prism has 5 edges * * * * * Edges are not corners! They are the "lines" where two faces meet. There are 9 edges in a triangular prism.

What has 9 edges 6 vertices 3 lateral faces and 2 bases?

A triangular prism is one possible answer.

What are the shapes of bases are in a triangular prism?

A triangular prism has two three-sided bases and three rectangular lateral faces. A triangular prism has five faces, six vertices and nine edges.

960.

What is a polyhedron with 1 base 4 lateral faces that meet at a common vertex and the edges of the base are all the same length?

The given description fits that of a triangular based pyramid which has 4 faces, 6 edges and 4 vertices

How do you find slant height given base edge and lateral edge?

Well, the lateral edges are equal to the height. Use the pathogorean theorem using a^2+b^2=c^2.