What is the Least Number of Planes that Can Enclose a Solid? What is the Name of the Solid? - Mathematics

What is the least number of planes that can enclose a solid? What is the name of the solid?

Sum

The least number of planes that can enclose a solid is 4.
The name of the solid is Tetrahedron.

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Chapter 19: Representing 3-D in 2-D - Exercise 19 [Page 220]

Chapter 19 Representing 3-D in 2-D
Exercise 19 | Q 8 | Page 220

If a net of a 3-D shape has six plane squares, then it is called ______

Which 3-D shapes do the following nets represent? Draw them

A cuboid has atleast 4 diagonals.

Identify the nets given below and mention the name of the corresponding solid in the space provided.

The name of the solid in figure is ______.

If we rotate a right-angled triangle of height 5 cm and base 3 cm about its height a full turn, we get ______.

Out of ______ faces of a triangular prism, ______ are rectangles and ______ are triangles.

Draw the nets of the following:

Tetrahedron

In the figure of a cube, Give the edges that are neither parallel nor perpendicular to edge BC.

What is a net of a three-dimensional object?