find surface area and volume using carestian equation and not parametric (use disc method for the volume) An asteroi...
find arc length
An asteroid is particular mathematical curve: a hypocycloid with four cusps. It is formed by rolling a circle (shown in black) inside a fixed circle (shown in blue) with four time the radi trajectory of an asteroid is shown in Figure 1 us. The Figure 1: Trajectory of an asteroid
An asteroid is particular mathematical curve: a hypocycloid with four cusps. It is formed by rolling a circle (shown in black) inside a fixed circle (shown in...
please solve it using "Cartesian method"
An asteroid is particular mathematical curve: a hypocycloid with four cusps. It is formed by rolling a circle (shown in black) inside a fixed circle (shown in blue) with four time the radius. The trajectory of an asteroid is shown in Figure Figure 1: Trajectory of an asteroid If the radius of the fixed circle is a, then the equation of an asteroid is given by 2/3 2/3 2/3 Equation of an asteroid that...
An asteroid is particular mathematical curve: a hypocycloid with four cusps. It is formed by rolling a circle (shown in black) inside a fixed circle (shown in blue) with four time the radius. The trajectory of an asteroid is shown in Figure1. Figure 1: Trajectory of an asteroid If the radius of the fixed circle is a, then the equation of an asteroid is given by Equation of an asteroid that needs to considered for this project is a. Use...
An asteroid is particular mathematical curve: a hypocycloid with four cusps. It is formed by rolling a circle (shown in black) inside a fixed circle (shown in blue) with four time the radi trajectory of an asteroid is shown in Figure 1 us. The Figure 1: Trajectory of an asteroid Figure 1: Trajectory of an asteroid If the radius of the fixed circle is a, then the equation of an asteroid is given by 2/3 2/32/3 Equation of an asteroid...
In order to successfully complete this project, you need to study the following topics in the course textbook: - Volume using Cross Sections (Section 6.1) Volume using -Arc Length (Section 6.3) - Areas of Surfaces of Revolution (Section 6.4) Shells (Section 6.2) General Comments about t This project is designed to be done in groups of 3. The project report is reflection of your investigation on the questions. This means your report should begin with an introductory paragraph in which...
Consider a cylindrical capacitor like that shown in Fig. 24.6. Let d = rb − ra be the spacing between the inner and outer conductors. (a) Let the radii of the two conductors be only slightly different, so that d << ra. Show that the result derived in Example 24.4 (Section 24.1) for the capacitance of a cylindrical capacitor then reduces to Eq. (24.2), the equation for the capacitance of a parallel-plate capacitor, with A being the surface area of...