w10q2
.pdf
keyboard_arrow_up
School
University of Texas *
*We aren’t endorsed by this school
Course
310P
Subject
Mathematics
Date
Apr 3, 2024
Type
Pages
6
Uploaded by treyashmore on coursehero.com
10/23/23, 3:22 PM
Platonic Solids Practice: Fa23 - MODERN MATHEMATICS: PLAN II (55330)
https://utexas.instructure.com/courses/1366856/quizzes/1838624
1/6
Platonic Solids Practice Due
Oct 25 at 11:59pm
Points
1
Questions
4
Available
until Nov 15 at 11:59pm
Time Limit
None
Allowed Attempts
Unlimited
Instructions
Attempt History
Attempt
Time
Score
KEPT
Attempt 3
less than 1 minute
1 out of 1
LATEST
Attempt 3
less than 1 minute
1 out of 1
Attempt 2
1 minute
0.98 out of 1
Attempt 1
13 minutes
0.65 out of 1
Correct answers are hidden.
Score for this attempt: 1
out of 1
Submitted Oct 23 at 3:22pm
This attempt took less than 1 minute.
Unlimited attempts
Take the Quiz Again
0.2 / 0.2 pts
Question 1
What is the definition of a regular solid?
A solid is regular if all faces are polygons and if there's an even number of
vertices.
10/23/23, 3:22 PM
Platonic Solids Practice: Fa23 - MODERN MATHEMATICS: PLAN II (55330)
https://utexas.instructure.com/courses/1366856/quizzes/1838624
2/6
A solid is regular if all faces are regular polygons and if the same number
of faces join at each vertex.
A solid is regular if all faces are matching regular polygons and if the same
number of faces join at each vertex.
A solid is regular if it has perfect symmetry from all angles. A solid is regular if all faces are matching regular polygons. 0.2 / 0.2 pts
Question 2
How many regular solids are there?
Infinitely many None Three Five 0.3 / 0.3 pts
Question 3
Complete this chart showing the numbers of vertices, edges, and faces of
each of the Platonic solids.
Vertices
Edges
Faces
Tetrahedron
4
6
4
10/23/23, 3:22 PM
Platonic Solids Practice: Fa23 - MODERN MATHEMATICS: PLAN II (55330)
https://utexas.instructure.com/courses/1366856/quizzes/1838624
3/6
Answer 1:
Answer 2:
Answer 3:
Answer 4:
Answer 5:
Answer 6:
Answer 7:
Answer 8:
Cube
8
12
6
Octahedron
6
12
8
Dodecahedron
20
30
12
Icosahedron
12
30
20
4
6
4
8
12
6
6
12
Your preview ends here
Eager to read complete document? Join bartleby learn and gain access to the full version
- Access to all documents
- Unlimited textbook solutions
- 24/7 expert homework help