Answer Happy

Find the critical points of the following function. Use the Second Derivative Test to determine (f possible) whether each corical point corresponds to a local maximum, a local minimum, or a saddle point. If the Second Derivative Testi determine the behavior the at the Exy)=5+2x²+3² What are the critical points? Select the corect choice below and, if necessary, 18 in the answer box within your choice OA The critical points) isare (Type an ordered pair. Use a comma to separate answers as needed) OB There are no oftical points Use the Second Derivative Test to find the local maxima. Select the correct choice below and, if necessary, fit in the answer box to complete your choice OA The test shows that the local maximum (maxima) i (e) at (Type an ordered par. Use a comma to separate answers as needed) OB. The test does not reveal any local maxima and there are no critical points for which the test is inconclusive, so there are no local maxima OC. The test does not reveal any local maxima, but there is at least one critical point for which the test is inconclusive Use the Second Derivative Test to find the local minima. Select the comect choice below and, if necessary, in the answer box to complete your choice. A The test shows that the local minimum (minima)(a) at (Type OB. The last does not reveal any local minima and there are no ortical points for which the test is inconclusive, so there are no local minima OC The test does not reveal any local minima, but there is at least one critical point for which the test is inconclusive. Use the Second Derivative Test to find the sadde points. Select the correct choice below and, if necessary, fill in the answer box to complete your choice an ordered pair. Use a comma to separate newes as needed.) A The test shows that the saddle points) isare at (Type an ordered pair Use a comme to separate answers as needed.) 5. The test does not reveal any saddle points and there are no critical points for which the test is inconclusive, so there are no saddle points