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1. a) Given a digraph G = (V,E), prove that if we add a constant k to the length of every arc coming out from the root node r, the shortest path tree remains the same. Do this by using potentials:
i) Show there is a potential y* for the new costs for which the paths in the tree to each node v have cost y*v, and
ii) explain why this proves it. What is the relationship between the shortest path distances of the modified problem and those of the original problem?
b) Can adding a constant k to the length of every arc coming out from a non-root node produce a change in the shortest path tree? Justify your answer.
Find the x and y intercepts for the following equations: 3y=3x -y=-x-4 2x+3y=6 y=5
6x^7-2x^3+4x-16 / 3x^2-7x+9
#question.help.
There's a nice way to show why the expresion for the area of a circle of radius R is: Pi * R 2 . It has an comman relationship with the experation for the circumference of a
show that, sin 90 degree = 2 cos 45 degree sin 45 degree
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Ashow that sec^2x+cosec^2x cannot be less than 4
tan30+cos30
I dont understand arcsin and arccos and how to find the domain...help?
The Limit : In the earlier section we looked at some problems & in both problems we had a function (slope in the tangent problem case & average rate of change in the rate of chan
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