Revolutions of integrals

The region bounded by *see attached for equation* is revolved about the y axis. Find the volume that results. Please see attachment for details

Revolutions of integrals

see attached Find the surface area of a circle......etc

Revolutions of integrals

see attached

Partial Derivative and Double Integral

The problems are attached 1 -5 based on Chapter Partial Derivative - (Maximum & Minimum Values and Lagrange Multipliers 1. Locate all relative maxima, relative minima, and saddle points of the surface defined by the following function. 2. Consider the minimization of subject to the constraint of (a) Draw the ...continues

Double Integral

Attached is the problems with complete details and equations If possible can you provide graphs from 6 on that it's based on Chapter contain multiple integral 6. Consider the double integral where D is the region bounded the curves and .Evaluate it by (a) intergrating first with respect to y and then (b) first with ...continues

Maximum and minimum

Consider the minimization of *see attached for equation* subject to the constraint of *see attached for equation* (a) Graph the contour point of with y-axis and x-axis between -2 and 6.(on my paper there is a dot (between point (3,3) Estimate where extrema values may occur and compute the function values correspondi ...continues

Series of Calculus Questions

Please respond with a Microsoft Word document with the answers written in standard text. Thank you. Series of Various Calculour Questions Attached.

Calculus/ For OTA 103997 only

Please respond with a Microsoft Word document. Thank you. Please see attachment for actual questions and full formulas. 1. Decide whether Rolle's Theorem can be applied to on the interval [-1,3]. If Rolle's Theorem can be applied, find all the values, c, in the interval such that . If Rolle's Theorem cannot be a ...continues

Word problem

Dont really want you to give me answer, just thoery on how to complete these type of problems. Word problem with calculus Thank You (See Attached)

Finding a centroid

Find the centroid of a two dimensional shape that is formed by the intersection of the lines: y = x-3 and y = x^2