\[L\]

free to move in the \[xy\]

plane, with the ends of the line remaining on the axes. What will be the equation of the curve traced out by M?The triangles formed by the ends of the rod, the midpoint and the origin are isosceles.

The coordinates of the midpoint are

\[)L/2 cos \alpha , L/2 sin \alpha )\]

.
Now use the identity \[cos^2 \theta + sin^2 \theta =1\]

to give \[x^2+y^2 =L^2/4\]

.\[M\]

will trace out the quarter of a circle in the first quadrant, radius \[L/2\]

whose sides touch the axes.