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13 Nov 2019
1. Write the equation of the hyperbola. Center: (0, 0) Vertex: (0, 3) Focus: (0, 6 2. Convert from parametric to rectangular Parametric Equations: x = 6 cos θ , y = 6 sin θ 3. Sketch the curve represented by the parametric equations (indicated the the curve), and write the corresponding rectangular equation. Param etric Equations: x = t-6 , y = t2 d2y 4, Find and and find the slope and concavity (if possible) at the give parameter. Parametric Equations:--, y = t 2 Parameter: t=-2 r = 2sin 5. Sketch a graph of r 5 cos 6. Find the Cartesian coordinates of the points b. (2,r/3) Figure A 7. Find the area of the region described below and pictured in Figure A. The region bounded by the circle r-2 sin θ for- 6S Ï/2.
1. Write the equation of the hyperbola. Center: (0, 0) Vertex: (0, 3) Focus: (0, 6 2. Convert from parametric to rectangular Parametric Equations: x = 6 cos θ , y = 6 sin θ 3. Sketch the curve represented by the parametric equations (indicated the the curve), and write the corresponding rectangular equation. Param etric Equations: x = t-6 , y = t2 d2y 4, Find and and find the slope and concavity (if possible) at the give parameter. Parametric Equations:--, y = t 2 Parameter: t=-2 r = 2sin 5. Sketch a graph of r 5 cos 6. Find the Cartesian coordinates of the points b. (2,r/3) Figure A 7. Find the area of the region described below and pictured in Figure A. The region bounded by the circle r-2 sin θ for- 6S Ï/2.
Elin HesselLv2
4 Sep 2019