1
answer
0
watching
160
views
13 Nov 2019
Sample â £ Find the interval of convergence forZr-1)-x-- Do not test the end points 1. 3" 2. Find a power series for the functioncentered at c 1 3. Use the defnition (Taylors formula) to find the series centered at c - for () Do not find the interval of convergence. 4. Find the corresponding rectangular equation represented by the parametric equations 2 + cos θ and y = 2 + 5 sin θ by eliminating the parameter. x Find the ArcLength of the curve x=arcsint,yslnf-2, on the interval 5. 6. Find two sets of polar coordinates with 0 θ 2Ï for the point with rectangular coordinates 2,v2 7. Find the equation of the tangent line for the curve given by x-+2 and y--2t at the point where t =-5. Convert the polar equations to rectangular form. 8. 2Ï
Sample â £ Find the interval of convergence forZr-1)-x-- Do not test the end points 1. 3" 2. Find a power series for the functioncentered at c 1 3. Use the defnition (Taylors formula) to find the series centered at c - for () Do not find the interval of convergence. 4. Find the corresponding rectangular equation represented by the parametric equations 2 + cos θ and y = 2 + 5 sin θ by eliminating the parameter. x Find the ArcLength of the curve x=arcsint,yslnf-2, on the interval 5. 6. Find two sets of polar coordinates with 0 θ 2Ï for the point with rectangular coordinates 2,v2 7. Find the equation of the tangent line for the curve given by x-+2 and y--2t at the point where t =-5. Convert the polar equations to rectangular form. 8. 2Ï
Deanna HettingerLv2
30 Oct 2019