I have attached a pdf drawing just to clarify my question. I am also trying to understand why the 6 seconds for the BPDU propagation delays since the worst case scenario is when we loose the first root switch and only BPDU must only go through 5 switches to reach the last switch, BPDU propagation delay should correspond to 5 switches. The illustrated data span a range of density 80-7180/ha, of mean diameter 2-67 cm, and of stand height 4-54 m, indicating the stability of the relationship. My question is how can used the value 6 as Message_age_overestimate with 7 bridge when the age between the root bridge and the first bridge is 0, the max age when reaching the last switch should be set to 5 not 6. = ((lost_msg + 1) x hello) + ((BPDU_Delay x (dia – 1)) I picked a tree that was on the small side of what I would normally climb in the woods and got the stand set up. = End-to-end_BPDU_propa_delay + essage_age_overestimate The X-1 Treestand has adjustable foot stirrups on its large 31 x 21 platform so you can get a tight fit around your boots and make for an easy climb. For example: for walnut with a stem diameter of 0.60m, its crown diameter is 13.27m, and its z ratio is 22.12. This path may or may not pass through the root. The data can be used to plan tree spacings and to calculate basal area. = (dia – 1) x overestimate_per_bridge (1 as per Cisco standard) The diameter of a binary tree is the length of the longest path between any two nodes in a tree. The area has located in longitude 51° 33 2' to 54° 29 51' and latitude 36° 33 29' to 36° 37 20' and the minimum height above sea level in this series is about 70 m and the maximum is about 632 m. If we consider that the Message_age_overestimate is When this protocol mentions that the maximum diameter is 7, does that means that a maximum of 7 or 8 bridges allowed in a spanning-tree domain. I am having some difficulties to understand the spanning-tree protocol.
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