Quote:
Originally Posted by OCCheetos
What makes you think that the Confederation line would be any better at handling those same 300 people coming from bus transfers and Park & Rides than it would be at handling transfers at Bayview? How is this situation any different than riders who would commute using OC Transpo routes as well as rural partner routes coming from areas like Richmond, Vars, Navan, an Cumberland?
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You obviously don't understand the issue despite my attempt to simplify it. I never said that the Confederation Line couldn't handle the people. What I said was that there would be more inefficiencies or wastage in the system the more overlap there is between the two networks, assuming that one can't get people to its final destination.
The two examples you give are scenarios which relate to the solutions I talk about. First, OC Transpo tries to set their Park and Rides as far out on the routes as possible so that they absorb those riders for the maximum length of the route. The peak period buses, now known as Connexion buses (the 200 series) will only take passengers to the closest stop along the LRT and have them transfer there. These are both examples of solution #2. Secondly, the regional buses all go into the downtown core and the vast majority of the passengers do not transfer to OC Transpo. That is an example of solution #1.
I agree with you regarding transferring along the Trillium Line. That just speaks to the incompatibility of the two networks on the same line. The two different types of trains are incompatible anyway and can't run on the same set of tracks. That's a red herring in this overall discussion anyway.
Regarding the comfort of passengers on a short route vs on a long route. Once again you've missed the point. The inefficiencies I talk about are not related to transfer time or train speed. This is all about duplicate or redundant capacity over different networks. This leads to more unused seats which is less efficient.
I think you're looking at this from the point of view of a passenger rather than as the operator of the transportation system. To the passenger it's irrelevant which train they're on and so the effectiveness is the same regardless of which option there is. However, it's the operator or operators who will incur additional costs.
Try imaging two trains running parallel to one another with the exception that one of the trains doesn't go all the way to everyone's final destination. If both trains initially start off with two cars full of passengers, but all the passengers on the first train have to transfer to the second train, that means that the second train needs to have four cars. The extra two cars on the second train would have been empty for the entire length of track that was duplicated by the two routes. Empty seats are a waste of resources which is inefficient. It would have been better for all passengers to get on the second train right at the beginning, maximizing its capacity, and eliminating the need for the second train to make its run over the entire length where the two trains follow the same path.
Anyway, to give you one more example where you as the passenger actually absorb the costs of the inefficiencies directly. Imagine that you live with your wife in Arnprior. You're friends with another couple who live in Bells Corners. You decide to go out for the evening downtown for a nice dinner, show, and then to the bar for some drinks. Because you all want to have the opportunity for a few drinks you decide to use taxis. A taxi that can hold 3 people costs $3/km. A taxi van that holds 6 people costs $6/km. The taxis from Arnprior will only take you as far as Bayview.
Do you:
A: Take the taxi from Arnprior all the way to Bayview where you will transfer to the Van that your friends have taken from Bell's Corners?
B. Take a taxi from Arnprior to Bells Corners where you transfer to a Van at your friends home?
For simplicity sake. Using 10 km between Arnprior to Bells Corners, 10 km Bells Corners to Bayview, and 10 km Bayview to Downtown.
A: $3x20 + $6x20 = $180
B: $3x10 + $6x20 = $150 (cheapest option which equates to transferring sooner and eliminating the redundant capacity)
Now, if you could have convinced the driver of the Arnprior to take you all the way to Downtown, it would have meant that your friends in Bells Corners could have taken the normal taxi instead of the van. Therefore:
Option C: $3x30 + $3x20 = $150 (once again cheaper than having the surplus capacity created by needing to use the van).