Last modified by Akiyoshi Yamakawa on 2026/02/26 20:31
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edited by Akiyoshi Yamakawa
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edited by Akiyoshi Yamakawa
on 2026/02/26 20:31
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1 1  = 琉大2025物理大問2A問3の計算式 =
2 2  
3 -**世間に、計算途中式の資料が見当たらないので、途中式を書いてみました。(by A.YK)**
3 +(% style="font-size:18px;" %)**世間に、計算途中式の資料が見当たらないので、途中式を書いてみました。(by A.YK)**
4 4  
5 -* **最初の落下までの時間をt,,0,,とおき、高さhの障害物の位置まで移動するのにかかる時間をt、
6 -床に衝突する直前の鉛直方向速さをV,,y ,,とおくと、反発係数e=1/2より、衝突直後の鉛直方向速さu=1/2V,,y,,であり、**
5 +* (% style="font-size:18px;" %)**最初の落下までの時間をt,,0,,とおき、高さhの障害物の位置まで移動するのにかかる時間をt、
6 +床に衝突する直前の鉛直方向速さをV,,y ,,とおくと、反発係数e=1/2より、衝突直後の鉛直方向速さu=1/2V,,y,,であり、
7 + **
7 7  **  [[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\frac{1}{2}g{t_0}^2=8h]] より、[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?{t_0}=4\sqrt{\frac{h}{g}}||height="33" width="83"]]
8 8  
9 9  **  [[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?vt=L]] より、[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?t=||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?vt=L"]][[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\frac{L}{v}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?vt=L" height="30" width="19"]]
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10 10  
11 11  **  [[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\frac{1}{2}m{v_y}^2=mg8h]] より、[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?u=\frac{1}{2}v_y=2\sqrt{gh}||height="26" width="130"]]
12 12  
13 -* **時刻tでの高さyが障害物の高さhよりも上であればよいので、
14 +* (% style="font-size:18px;" %)**時刻tでの高さyが障害物の高さhよりも上であればよいので、**(%%)**
14 14   **
15 -** [[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<u(t-t_0)-\frac{1}{2}g(t-t_0)^2]]  **これに、上記のu、t、t,,0,,を代入すると、**
16 +** [[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<u(t-t_0)-\frac{1}{2}g(t-t_0)^2]]  (% style="font-size:18px;" %)**これに、上記のu、t、t,,0,,を代入すると、**(%%)
16 16  \\[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\sqrt{gh}(||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\sqrt{gh}(\frac{L}{v}-4\sqrt{hg})-\frac{1}{2}g(\frac{L}{v}-4\sqrt{hg})^2" height="20" width="76"]][[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\frac{L}{v}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\sqrt{gh}(\frac{L}{v}-4\sqrt{hg})-\frac{1}{2}g(\frac{L}{v}-4\sqrt{hg})^2" height="31" width="20"]][[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?-4\sqrt{\frac{h}{g}})-\frac{1}{2}g(||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\sqrt{gh}(\frac{L}{v}-4\sqrt{hg})-\frac{1}{2}g(\frac{L}{v}-4\sqrt{hg})^2" height="35" width="123"]][[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\frac{L}{v}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\sqrt{gh}(\frac{L}{v}-4\sqrt{hg})-\frac{1}{2}g(\frac{L}{v}-4\sqrt{hg})^2" height="31" width="20"]][[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?-4\sqrt{\frac{h}{g}})^2||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\sqrt{gh}(\frac{L}{v}-4\sqrt{hg})-\frac{1}{2}g(\frac{L}{v}-4\sqrt{hg})^2" height="35" width="79"]]
17 17  \\[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\frac{L}{v}\sqrt{gh}-8h-\frac{1}{2}g\frac{L^2}{v^2}-8h+4\frac{L}{v}\sqrt{gh}" height="14" width="35"]] [[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\frac{L}{v}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\sqrt{gh}(\frac{L}{v}-4\sqrt{hg})-\frac{1}{2}g(\frac{L}{v}-4\sqrt{hg})^2" height="31" width="20"]] [[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\sqrt{gh}-8h-\frac{1}{2}g\frac{L^2}{v^2}-8h+4||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\frac{L}{v}\sqrt{gh}-8h-\frac{1}{2}g\frac{L^2}{v^2}-8h+4\frac{L}{v}\sqrt{gh}" height="42" width="250"]][[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\frac{L}{v}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\sqrt{gh}(\frac{L}{v}-4\sqrt{hg})-\frac{1}{2}g(\frac{L}{v}-4\sqrt{hg})^2" height="31" width="20"]][[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\sqrt{gh}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\frac{L}{v}\sqrt{gh}-8h-\frac{1}{2}g\frac{L^2}{v^2}-8h+4\frac{L}{v}\sqrt{gh}" height="21" width="40"]]
18 -\\[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?0<6\sqrt{gh}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?0<6\sqrt{gh}\frac{L}{v}-17h-\frac{1}{2}g\frac{L^2}{v^2}" height="24" width="90"]][[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\frac{L}{v}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\sqrt{gh}(\frac{L}{v}-4\sqrt{hg})-\frac{1}{2}g(\frac{L}{v}-4\sqrt{hg})^2" height="31" width="20"]][[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?-17h-\frac{1}{2}g\frac{L^2}{v^2}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?0<6\sqrt{gh}\frac{L}{v}-17h-\frac{1}{2}g\frac{L^2}{v^2}" height="42" width="130"]]** これを、vの二次不等式に直すと、**
19 -\\[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?0>34v^2-12\sqrt{\frac{g}{h}}Lv+\frac{g}{h}L^2||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?0>34v^2-12\sqrt{gh}v+\frac{g}{h}" height="40" width="200"]]  **さらに、=0の二次方程式としてvを求めると、**
20 -\\[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?v={\frac{6\sqrt{\frac{g}{h}}L\pm\sqrt{36\frac{g}{h}L^2-34\frac{g}{h}L^2}}{34}=\frac{(6\pm\sqrt{2})\sqrt{\frac{g}{h}}L}{34}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?v=\frac{6\frac{g}{h}\pm\sqrt{36\frac{g}{h}-34\frac{g}{h}}}{34}=\frac{(6\pm\sqrt{2})\sqrt{\frac{g}{h}}}{34}" height="65" width="474"]]  **vの下限なので、-の方をとって、**
21 -\\[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?v=\frac{(6-sqrt{2})}{34}\sqrt{\frac{g}{h}}L=\frac{(6-sqrt{2})(6+sqrt{2})}{34(6+sqrt{2})}\sqrt{\frac{g}{h}}L=\frac{34}{34(6+\sqrt{2})}\sqrt{\frac{g}{h}}L=\frac{1}{(6+\sqrt{2})}\sqrt{\frac{g}{h}}L||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?v=\frac{(6-sqrt{2})}{34}\sqrt{\frac{g}{h}}}=\frac{(6-sqrt{2})(6+sqrt{2})}{34(6+sqrt{2})}}\sqrt{\frac{g}{h}}=\frac{34}{34(6+\sqrt{2})}\sqrt{\frac{g}{h}}=\frac{1}{(6+\sqrt{2})}\sqrt{\frac{g}{h}}" height="55" width="747"]]  **・・・答え**
22 -\\**注:次元解析して速度の単位になっていることも確認! (% style="font-size: 18px; font-family: Georgia, serif" %)√(% style="font-size:18px;" %){(m/s^^2^^)/m)}m=m/s(%%)**
19 +\\[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?0<6\sqrt{gh}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?0<6\sqrt{gh}\frac{L}{v}-17h-\frac{1}{2}g\frac{L^2}{v^2}" height="24" width="90"]][[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\frac{L}{v}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?h<2\sqrt{gh}(\frac{L}{v}-4\sqrt{hg})-\frac{1}{2}g(\frac{L}{v}-4\sqrt{hg})^2" height="31" width="20"]][[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?-17h-\frac{1}{2}g\frac{L^2}{v^2}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?0<6\sqrt{gh}\frac{L}{v}-17h-\frac{1}{2}g\frac{L^2}{v^2}" height="42" width="130"]]** (% style="font-size:18px;" %)これを、vの二次不等式に直すと、(%%)**
20 +\\[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?0>34v^2-12\sqrt{\frac{g}{h}}Lv+\frac{g}{h}L^2||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?0>34v^2-12\sqrt{gh}v+\frac{g}{h}" height="40" width="200"]]  (% style="font-size:18px;" %)**さらに、=0の二次方程式としてvを求めると、**(%%)
21 +\\[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?v={\frac{6\sqrt{\frac{g}{h}}L\pm\sqrt{36\frac{g}{h}L^2-34\frac{g}{h}L^2}}{34}=\frac{(6\pm\sqrt{2})\sqrt{\frac{g}{h}}L}{34}||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?v=\frac{6\frac{g}{h}\pm\sqrt{36\frac{g}{h}-34\frac{g}{h}}}{34}=\frac{(6\pm\sqrt{2})\sqrt{\frac{g}{h}}}{34}" height="65" width="474"]]  (% style="font-size:18px;" %)**vの下限なので、-の方をとって、**(%%)
22 +\\[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?v=\frac{(6-sqrt{2})}{34}\sqrt{\frac{g}{h}}L=\frac{(6-sqrt{2})(6+sqrt{2})}{34(6+sqrt{2})}\sqrt{\frac{g}{h}}L=\frac{34}{34(6+\sqrt{2})}\sqrt{\frac{g}{h}}L=\frac{1}{(6+\sqrt{2})}\sqrt{\frac{g}{h}}L||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?v=\frac{(6-sqrt{2})}{34}\sqrt{\frac{g}{h}}}=\frac{(6-sqrt{2})(6+sqrt{2})}{34(6+sqrt{2})}}\sqrt{\frac{g}{h}}=\frac{34}{34(6+\sqrt{2})}\sqrt{\frac{g}{h}}=\frac{1}{(6+\sqrt{2})}\sqrt{\frac{g}{h}}" height="55" width="747"]](% style="font-size:18px;" %)**・・・答え**(%%)
23 +\\**注:次元解析して速度の単位になっていることも確認! **[[image:http://www.dietpanda.com/cgi-bin/mimetex.cgi?\sqrt{\frac{g}{h}}L{\rightarrow}\sqrt{\frac{m/s^2}{m}}{\cdot}m=m/s||alt="http://www.dietpanda.com/cgi-bin/mimetex.cgi?{t_0}=4\sqrt{\frac{h}{g}}" height="40" width="224"]]