Part a:
The opening of the cup is the circular base of the cup which has a circumference equal to the length of the arc formed by angle θ = 9π/5 on the circular piece of paper from which the cone was made.
Thus, the circumference of the circle = Length of the arc formed by angle θ = 9π/5 at the center which is given by
[tex]C=r\theta \\ \\ =10\times \frac{9\pi}{5} \\ \\ =18\pi\approx56.55\ cm[/tex]
Part b:
The opening of the cup is the circular base of the cup which has a circumference equal to the length of the arc formed by angle θ = 9π/5 on the circular piece of paper from which the cone was made.
Recall that the circumference of a circle is given by [tex]C=2\pi r[/tex] and having obtained from part a that the circumference of the circular opening is [tex]18\pi[/tex] cm.
Thus,
[tex]2\pi r=18\pi \\ \\ \Rightarrow r=9\ cm[/tex]
Part c:
The height of the cup can be obtained by noticing that the radius, height and the slant height of the cup forms a right triangle with the height and the radius as the legs and the slant height as the hypothenus.
Using pythagoras theorem, the height of the cup is obtained as follows:
[tex]h^2+r^2=l^2[/tex]
where: h is the height, r is the radius and l is the slant height.
[tex]h^2+9^2=10^2 \\ \\ \Rightarrow h^2=100-81=19 \\ \\ \Rightarrow h= \sqrt{19} \approx4.36\ cm[/tex]
Part d
Recall that the volume of a cone is given by [tex]V= \frac{1}{3} \pi r^2h[/tex]
Thus, the volume of the cup is given by
[tex]V= \frac{1}{3} \pi\times9^2\times \sqrt{19} \\ \\ \approx369.7\ cm^3[/tex]
