I think you want to ask What does Barbiers Theorem says about a figure of constant width. Such a nice theorem establishes that if you have a compact figure C in the plane, that is closed and bounded, and C has constant width w, then the perimeter of C is "pi times w"
Yes its diameter is its width which is constant where ever it's measured inside the circle
No. A square on its side will have a width equal to its side length. On its vertex, its width will be larger: up to sqrt(2) times as large.
Using Pythagoras' theorem its width is 6 units in length.
Use Pythagoras' theorem
length = 7.2 units and width = 5.4 units Solved by means of Pythagoras' theorem.
34 cm (with the help of Pythagoras' theorem)
The full width at half maximum (FWHM) of a Gaussian distribution is the width of the curve at half of its maximum height. A smaller FWHM indicates a narrower curve, while a larger FWHM indicates a wider curve. The FWHM impacts the shape of the curve by determining how spread out or concentrated the data points are around the mean. A smaller FWHM results in a sharper peak and a more concentrated distribution, while a larger FWHM leads to a broader curve with a more spread out distribution of data points.
A Reuleaux triangle is a shape that, like a circle, has a constant width. Unlike standard polygons, its sides are outward curves rather than straight lines, the curve a maximum directly across from each vertice.
With Pythagoras' theorem: diagonal2- length2 = width2
The dimensions are 27cm by 36 cm, solved with the help of Pythagoras' theorem
15 cm Solved through Pythagoras' theorem.
Bow or crown. Bow is probably used more often when the board bends in the width. Crown can be across the width of the board or in the length. A board will often curve with the grain, following the curve of the tree rings.