1. A point is located at x= 3m and y = 4m. Find the location of...

Given any Cartesian coordinates, (x,y), there are polar coordinates (?,?)(r,θ) with −?2<?≤?2.−π2<θ≤π2. Find polar coordinates with...

Given any Cartesian coordinates, (x,y), there are polar coordinates (?,?)(r,θ) with −?2<?≤?2.−π2<θ≤π2. Find polar coordinates with −?2<?≤?2−π2<θ≤π2 for the following Cartesian coordinates: (a) If (?,?)=(18,−10)(x,y)=(18,−10) then (?,?)=((r,θ)=(  ,  )), (b) If (?,?)=(7,8)(x,y)=(7,8) then (?,?)=((r,θ)=(  ,  )), (c) If (?,?)=(−10,6)(x,y)=(−10,6) then (?,?)=((r,θ)=(  ,  )), (d) If (?,?)=(17,3)(x,y)=(17,3) then (?,?)=((r,θ)=(  ,  )), (e) If (?,?)=(−7,−5)(x,y)=(−7,−5) then (?,?)=((r,θ)=(  ,  )), (f) If (?,?)=(0,−1)(x,y)=(0,−1) then (?,?)=((r,θ)=( ,))

The Cartesian coordinates of a point are given. (a)    (5 3 , 5)(i) Find polar coordinates (r,...

The Cartesian coordinates of a point are given. (a)    (5 3 , 5)(i) Find polar coordinates (r, θ) of the point, where r > 0 and 0 ≤ θ < 2π. (r, θ) =       (ii) Find polar coordinates (r, θ) of the point, where r < 0 and 0 ≤ θ < 2π. (r, θ) =       (b)     (1, −3) (i) Find polar coordinates (r, θ) of the point, where r > 0 and 0 ≤ θ <...

given the polar curve r = 2(1+cos theta) find the Cartesian coordinates (x,y) of the point...

given the polar curve r = 2(1+cos theta) find the Cartesian coordinates (x,y) of the point of the curve when theta = pi/2 and find the slope of the tangent line to this polar curve at theta = pi/2

1) Point R has cylindrical coordinates (5, pi/6, 4). Plot R and describe its location in...

1) Point R has cylindrical coordinates (5, pi/6, 4). Plot R and describe its location in space using rectangular or cartesian coordinates. Please explain and show your steps. 2) Describe the surface with cylindrical equation r =6. Please explain and show your steps. Thank you

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.

1. You are given the point P in the cartesian coordinates (−4, −4). Write the point...

1. You are given the point P in the cartesian coordinates (−4, −4). Write the point in polar coordinates given the restrictions: (a) r > 0, and 0 ≤ θ < 2π. (in these programs, r = 0 is just defined to be the origin). (b) r<0andθ∈[0,2π) (c) Write the point in polar coordinates that represent the same point P but that is different than the previous parts.

Find the slope of the tangent line at each given polar curve at each point specified...

Find the slope of the tangent line at each given polar curve at each point specified by the values of θ. r = 8 − sin(θ) r = 1/θ r = 9 + 4 cos(θ) θ = π/3 θ = π Thank you!

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) =

A point charge of -1 µC is located at the origin. A second point charge of...

A point charge of -1 µC is located at the origin. A second point charge of 6 µC is at x = 1 m, y = 0.5 m. Find the x and y coordinates of the position at which an electron would be in equilibrium. a.) x=? b.) y=?

3) a) Find a polar equation for the circle x^2 + (y -2)^2 = 4. b)Find...

3) a) Find a polar equation for the circle x^2 + (y -2)^2 = 4. b)Find the arc length of the polar curve r = 3^θ from θ=0 to θ=2.