Answer to Question #226426 in Optics for Muhammad Ali

Question #226426

A ladder 7.00 m long leans against a wall inside a spaceship. From the point of view of a person on the ship, the base of the ladder is 2.50 m from the wall. The spaceship moves past the Earth with a speed of 0.94c in a direction parallel to the floor of the ship. What is the length of the ladder as seen by an observer on Earth?

Expert's answer

Given:

"l=7.00\\:\\rm m"

"l_x=2.50\\:\\rm m"

We have

"l_y=\\sqrt{l^2-l_x^2}=\\sqrt{7.00^2-2.50^2}=6.54\\:\\rm m"

The Lorentz transformations give

"l_x'=l_x\\sqrt{1-v^2\/c^2}=2.50\\sqrt{1-0.94^2}=0.853\\:\\rm m""l_y'=l_y=6.54\\:\\rm m"

Hence, the length of the ladder as seen by an observer on Earth

"l'=\\sqrt{l_x'^2+l_y'^2}=\\sqrt{0.853^2+6.54^2}=6.59\\:\\rm m"

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Answer to Question #226426 in Optics for Muhammad Ali

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