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question 1 solve the recurrence relation a1 1 an nan-12 challenge try to figure out what the cartesian product of two
question 1 find several perfect matchings of the petersen graph2 find a closed form for the recurrence an an-1 4an-2
question the organization red delicious-crappy apples rdca distributes at farmers markets a variety of brochures on the
question 1 how many ways are there to distribute 28 doses of dye to 12 skeins of currently ugly but soon to be lovely
question 1 give an example of a graph that has a hamilton circuit but not an euler circuit explain2 show that for 3
question donated by david cox consider any convex polygon with at least four sides and decompose it into triangles by
question 1 prove or give a counterexample every multiple of 6 that is greater than or equal to 12 is the sum of two
question 1 a dance company has ten members how many different ways can a choreographer choose six dancers for a dance
question twelve hundred students at delta rdek university were surveyed about the summer olympics 620 wanted to watch
question 1 find a spanning tree of the graph at left in figure2 find a spanning tree of the graph at right in figure3
question 1 for each of the following closed forms write out the first several terms of the sequence at least five and
question 1 figure shows an actual street intersection create a graph and properly vertex-color it to find the smallest
question 1 find every simple graph g with five vertices and the property that if exactly one edge e is added the
question there is a colony of gnats who all wear hats each gnat wears a green white or red hat they are italian gnats
question 1 consider g 098765rarr4321 is it possible for g to be one-to one onto2 figure shows a 2times4 grid that has
question consider the word peach we will make lists from the letters in peach with repetition alloweda how many
question find the smallest number of vertices needed to create a graph that can be drawn with- an edge with
question 1 to what graph is knv isomorphic explain2 to what graph is cne isomorphic explain3 find z2 timesz34 true
question 1 prove using contradiction or the contrapositive that if the average age of four children is ten years old
question 1 use induction to prove the sum principle for n finite sets2 show that if z isin z and z2 z then z isin
question 1 in this problem we will count polynomialsa consider polynomials of the form ax where a isin n how many such
question 1 consider the set w of all words in the english alphabet sensical or otherwise what is w2 consider the set l
question 1 true or false any two graphs with the same degree sequence are isomorphic2 draw three different binary
question holder 1 was in the corner here holder 2 to the right of it and then diagonally up and left was holder 3
question lab assistant and la2 each want to have two cups of coffee la2 turns to the left and asks could you please