One Morning at the Coffeehouse

Question

The three bears are regular customers at the Goldilock's (see illustration). When Goldilock brought the cake as ordered by the Bear family, Little bear asked her if she can divide the big round cake into 3 equal pieces. So the girl marked 3 equally distanced points along the cake's perimeter. Then made 3 straight cuts with the tip of the knife on the middle (removing the candle first) and slicing through the markers.

After the bears had eaten their equal shares, they ordered another whole cake. The young bear was hurrying so he asked if Goldilock can divide it again equally as before, but this time with just two cuts. To do that, she bent the knife into a 120 degrees angle and sliced down through with the knife vertex on the center where a candle was to make a 1/3 piece. Next, she divided the bigger part exactly in two for the 2nd cut.

After the bears had eaten their equal shares, they ordered another whole cake. The young bear was really in a hurry so he asked if Goldilock can divide it again equally as before but this time with just one single cut. While she hopes that that was the last order they made today, she gladly did as the bear requested. How did Goldilock manage to do it with one straight cut?

Answer 1

Not sure if this is a valid solution either, but

Goldilock can fold the knife according to the diagram below:

The shape of the knife outside the cake (the two diagonal segments on the top) does not matter, since it won't cut anything. The arrows are there to show the path of the knife; the knife ends at the center of the cake where it meets the point of the first fold.

Answer 2

I don't know if this is a valid solution, but with lateral thinking puzzles you can never be 100% sure:

You can do this division here in two ways:

Either by bending a really long knife in that shape ($BCB'$) or by folding the cake in half and do one straight cut along $BC$.

Answer 3

As long as we are allowed to bend the knife and it is at least as long as twice the diameter of the cake, then bend the knife into a U shape (where the curve extends beyond the diameter of the cake) and slice the knife through the edge of the cake's cylinder - rather than downward against a face of the cake.

The knife, against a sufficiently firm cake, will slice the single layer cake into a 3-layer cake where each slice is of the same size and mass.

Answer 4

I think bending the knife in the following fashion would get portions which could be divided among the three bears.

Answer 5

She broke knife in half (removing the handle) and placed the 2 pieces together, but one in each hand. She then cut from the edge before separating the blades when reaching the centre of the cake.

Answer 6

So that's my solution. Prerequisite : the cake has to be extremely elastic and resistant, and the knife should be something like the Goemon's zantetsu-ken nagareboshi katana. The idea is pretty simple btw, putting the cake in a curve surface (I'm not a mathematician so I don't know how much exactly the surface has to be curved) its complessive diameter will be reduced if we look the cake from a top-down perspective (the same of the cutting knife). In that way, the length of the bent blade (see reference picture) will be enough to cut the cake in 3 equal parts.

Edit: you could also simply slice the second half of the blade in two divergent blades forming three 60° angles

Answer 7

She marked 3 equally distanced points x,y,z along the perimeter. Then warp the hot cake so that all the markers meet at a point. Slicing straight from center to meeting point could fairly divide into 3 equal size and shape pieces.

Answer 8

I don't think anyone has suggested this yet.

The cake is a layer cake with two layers. Goldilocks cuts of a piece size 1/3 and then splits the remainder by separating the top and bottom layers, so the 2/3 piece becomes two 1/3 pieces.

Answer 9

Goldilock bends the knife to 90^o. The cut is initiated by passing through the outer two-thirds from top to bottom, and then continues half way around the cake before twisting the knife 180^o and rotates it 180^o before finishing the round cut, leaving one-third in the centre and two one-third pieces on the outside. This cannot be a straight cut per say, but a single cut with a twist of the wrist between each part of the action.