Both triangles, the first (Triangle 1) and second (Triangle 2), depict two arrangements of shapes, each of which apparently forms a 13 unit × 5 unit right-angled triangle, but Triangle 2 has one missing square in it.Both Triangle 1 and Triangle 2 are made up of the same four components, namely:
1) Red right-angled triangle with a measurement of 8 unit x 3 unit.
2) Blue right-angled triangle with of measurement of 5 unit x 2 unit.
3) Green L-shaped figure consisting of 8 square unit.
4) Yellow L-shaped figure consisting of 7 square unit.
However, notice that Triangle 2 has one missing square.
How can this be?
The key to the puzzle is the fact that neither Triangle 1 nor Triangle 2 has the same area as the combined area of its components.
Let’s measure the areas of the four components:
1) Red right-angled triangle. Area = 0.5 x 8 x 3 = 12 square unit
2) Blue right-angled triangle. Area = 0.5 x 5 x 2 = 5 square unit
3) Green L-shaped figure. Area = 8 square unit
4) Yellow L-shaped figure. Area = 7 square unit
Combined area of the four components = 12 + 5 + 8 + 7 = 32 square unit
BUT
Calculated area for Triangle 1 (or Triangle 2 if you ignore the missing square) = 0.5 x 13 x 5 = 32.5 square unit, or so it seems.
So, the combined area of the four components does not tally with the calculated area of Triangle 1 or Triangle 2.
So what does this mean?
The red triangle has a ratio of 8:3 while the blue triangle has a ratio of 5:2. This means these two hypotenuse lines do not have the same gradient. So the apparent combined hypotenuse in both Triangle 1 and Triangle 2 are actually bent. In other words, the hypotenuse in the red triangle is not parallel (in the same straight line) as the hypotenuse in the blue triangle for both Triangle 1 and Triangle 2.
Note the grid point where the red and blue hypotenuses meet in Triangle 1, and compare it to the same point in Triangle 2; the edge is slightly over or under the mark. Overlaying the hypotenuses from Triangle 1 and Triangle 2 results in a very thin parallelogram with the area of exactly one square, the same area “missing” from Triangle 2.
Got it?
Source: wikipedia.org, marktaw.com
Source: wikipedia.org, marktaw.com
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8 comments:
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