True
newtest3
false
True (APEX) - Nini :-* GOOD LUCK .
On March 30, 1796, Gauss discovered that it was possible to construct a regular polygon with seventeen sides using a straightedge and compass. This was the first new construction of a regular polygon since the time of Euclid. The discovery, made when Gauss was only eighteen years old, persuaded him to make mathematics his career.
In conjunction with a straight edge and a protractor
Well, honey, you start by drawing a line with your ruler. Then, you put the point of your compass on one end of the line and draw an arc. Next, you put the point of your compass on where the arc intersects the line and draw another arc. Where those arcs meet is your 32-degree angle. Voila!
Yes.
True newtest3
yes
trueee
True...
false
A regular hexagon can be constructed using only a straightedge because it can be formed by connecting six equidistant points on a circle. While the hexagon itself does not contain circles, its vertices can be defined using simple geometric principles, such as dividing a circle into six equal parts and connecting those points with straight lines. Therefore, the construction relies on the properties of straight lines rather than the use of a compass to draw circles.
Measuring implies using a measuring device of some kind. If you mean to construct a hexagon without a protractor or ruler, that's different. Constructions in geometry require only a compass and a straightedge (a ruler, but you ignore the numbers). A hexagon can be made of 6 equilateral triangles; choose any length for the side and construct them connected together, using only the compass to set the length and the straightedge to draw straight lines between points.
Constructions that are impossible using only a compass and straightedge include Trisecting an angle Squaring a circle Doubling a cube
true
True -
True