Three point of measurement coordinates are collected on a circle (X,Y,Z): P1(14,21,8), P2(45,22,8) and P3(65,19,8) (all...

in cartesian coordinates, the three corners of a triangle are P1=(0,4,4), P2=(4,-4,4), and P3=(2,2,-4) a) find...

in cartesian coordinates, the three corners of a triangle are P1=(0,4,4), P2=(4,-4,4), and P3=(2,2,-4) a) find the area of the triangle b) find the shortest distance from the origin

IN C++ - most of this is done it's just missing the bolded part... Write a...

IN C++ - most of this is done it's just missing the bolded part... Write a program that creates a class hierarchy for simple geometry. Start with a Point class to hold x and y values of a point. Overload the << operator to print point values, and the + and – operators to add and subtract point coordinates (Hint: keep x and y separate in the calculation). Create a pure abstract base class Shape, which will form the basis...

A point in the x-y plane is represented by its x-coordinate and y-coordinate. Design a class,...

A point in the x-y plane is represented by its x-coordinate and y-coordinate. Design a class, “pointType”, that can store and process a point in the x-y plane. You should then perform operations on the point, such as setting the coordinates of the point, printing the coordinates of the point, returning thex-coordinate, and returning the y-coordinate. Also, write a program to testvarious operations on the point. x-y plane and you designed the class to capture the properties of a point...

Let the 2D point p have coordinates (x,y) with respect to the orthonormal coordinates system given...

Let the 2D point p have coordinates (x,y) with respect to the orthonormal coordinates system given by the origin o = (0,0) and the two basis vectors b1 = (1,0) and b2 = (0,1). The coordinate system is rotated by 45 degree. What are the new coordinates of the point p with respect to the new coordinates system? Provide an illustration!

1) Convert the point (x,y,z)=(−2,5,3) to spherical coordinates. Give answers as positive values, either as expressions,...

1) Convert the point (x,y,z)=(−2,5,3) to spherical coordinates. Give answers as positive values, either as expressions, or decimals to one decimal place. (ρ,θ,ϕ)= 2) Convert the point (r,θ,z)=(2,2π,4) to Cartesian coordinates. Give answers either as expressions, or decimals to at least one decimal place. (x,y,z)= 3) Convert the point (ρ,θ,ϕ)= (5,5π/3,3π/4) to Cartesian coordinates. Give answers either as expressions, or decimals to at least one decimal place. (x,y,z) =

Suppose the receiving stations X, Y, and Z are located on a coordinate plane at the...

Suppose the receiving stations X, Y, and Z are located on a coordinate plane at the point (3,7), (-15,-6), and (-7,2) respectively. The epicenter of an earthquake is determined to be 10 units from X, 13 units from Y and 5 units from Z. Where on the coordinate plane is the epicenter located? Find the coordinates of the epicenter. Please show work, I actually want to learn how to solve this problem.

Use spherical coordinates to calculate the triple integral of ?(?, ?, ?)=?f(x, y, z)=y over the...

Use spherical coordinates to calculate the triple integral of ?(?, ?, ?)=?f(x, y, z)=y over the region ?^2+?^2+?^2≤10, ∫∫∫?? ??=

In ▲XYZ, ∠X = 52° and ∠Y = 57°. One circle passes through Y, Z, and...

In ▲XYZ, ∠X = 52° and ∠Y = 57°. One circle passes through Y, Z, and the incenter of ▲XYZ, and a second circle passes through X, Z, and the circumcenter of ▲XYZ. What is the degree measure of the acute angle the two circles intersect at? this is all the information of this question

- write N-S equations for incompressible flows in cartesian coordinates in long form (in x,y,z coordinates)...

- write N-S equations for incompressible flows in cartesian coordinates in long form (in x,y,z coordinates) (1 point) - also write continuity equation and N-S equations for incompressible flows in polar coordinates in long form (in r,θ,z) (since one of your friends ask you can find it easily in online resources or in books) (1 point) - Write down N-S equations in x direction for Planar Couette- Pouseille flow and derive an equation for velocity variation using boundary layer conditions...

Suppose you are looking at a field [m[x,y],n[x,y]] which has one singualrity at a point P...

Suppose you are looking at a field [m[x,y],n[x,y]] which has one singualrity at a point P and no other singularities. While studying the singulairty, you center a circle of radius r on the point P and no other singularites. While studying the singularity, you center a circle of radius r on the point P and parameterize this circle in the counter-clockwise direction as Cr;{x[t],y[t]}. You calculate (integralCr) -n[x[t],y[t]]x'[t] + m[x[t], y[t]]y'[t]dt and find that it is equal to -1 +...