A rectangular block L×100×H, with L≤100≤H, where L and

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A rectangular block $L \times 100 \times H$ , with $L \leq 100 \leq H$ , where L and H are integers, is cut into two non-empty parts by a plane parallel to one of the faces, so that one of the parts is similar to the original. How many possibilities are there for (L, H)?

Answer: Option B
:
B

We must cut the longest edges, so the similar piece has dimensions $L \times 100 \times k$ for some $1 \leq k < H$ .
The shortest edge of this piece cannot be L, so it must be k. Thus $L \times 100 \times H$ and $k \times L \times 100$ are similar.
Thus, $\frac{L}{k} = \frac{100}{L} = \frac{H}{100}$ .
So, HL = $100^{2}$ . $100^{2}$ = $2^{4} \times 5^{4}$
So $100^{2}$ has 25 factors, of which $\frac{(25 - 1)}{2} = 12$ pairs are $< 100$ .

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