db8
Yehyun Park
unit8db.docxMY Unit 7 DB POST
In my professional world, I manage a team of ten people. Each team member has a unique set of skills and responsibilities. To ensure that our team is working cohesively, I have created a graph to model the relationships between each team member. The graph includes the names of each team member, their respective roles, and the relationships between them. For example, one team member may be responsible for providing technical support to another team member, while another team member may be responsible for providing guidance and mentorship. By visualizing the relationships between each team member, I am able to better understand how each team member contributes to the success of the team as a whole. This graph also helps me to identify any areas of improvement, such as communication or collaboration, that need to be addressed in order to ensure that our team is working efficiently and effectively. An angle's vertex is the point where two of its rays (edges) or two of a polygon's edges meet. In the first case, the vertex stands in for the amount of gas money spent during a trip. Edges are the lines that link nodes in a network. Distance traveled along the road as measured by the perimeter of the image.
Matthew Goetzke posted Feb 4, 2023 9:06 PM
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My post last week was a graph of the 6 major workouts I do where I connected muscle groups that did not conflict in during workouts, and allowing for my physical therapy workouts, to allow for maximum rest between workouts. My physical therapy is mostly leg training, so just assume that physical therapy is a general leg workout. I now weighted them to represent what muscle groups were best to strengthen together, meaning opposing muscle groups weighed less than muscle groups that did not interact at all.
A = Upper Chest
B = Lower Chest
C = Upper Back
D = Lower Back
E= Biceps and Triceps
F = Core
G = Physical Therapy
H = Shoulders
Next I created a spanning tree. I know that this sub-graph is spanning tree because it connects all vertices, does not have a cycle, and does not repeat any edges. The total weight of this graph is 1+1+2+3+1+2+5 = 15.
My week 7 DB was a graph of a set of tasks I needed to complete which had several different variations on how I could do it. It looked like this:
A = Pay Bills(From Home)
B = Buy Groceries
C = Pick up Dry Cleaning
D = Go to the Post Office
E = Visit the Doctor
F = Car Serviced
The total weight of completing all my tasks would be: 5+4+2+5+5 = 21 Miles.
It would look like this:
