Find the Second Derivative d2ydx2 when y is given by:   x2+y2-2x+4y-20=0

Find the general solution of the ODE: x2(y′)2 + yy′(2x+y) + y2= 0

Find the general solution of the ODE: x2(y′)2 + yy′(2x+y) + y2= 0

Find the maximum and minimum values of x2+y2 subject to the constraint x2-8x+y2-4y=0 minimum value of...

Find the maximum and minimum values of x2+y2 subject to the constraint x2-8x+y2-4y=0 minimum value of x2+y2 maximum value of x2+y2

Find the maximum and minimum values of x2+y2 subject to the constraint x2-8x+y2-4y=0. The minimum value...

Find the maximum and minimum values of x2+y2 subject to the constraint x2-8x+y2-4y=0. The minimum value of x2+y2 is (?) The maximum value of x2+y2 is (?)

1) If z=Ln(x2+y2 ) , x=e-1 ,y=et the total derivative dz/dt will become-------------- Select one: A....

1) If z=Ln(x2+y2 ) , x=e-1 ,y=et the total derivative dz/dt will become-------------- Select one: A. dz/dt=2x/x2+ y2 . (-e-t) - 2x/(x2+ y2 ). et B. dz/dt=2x/x2+ y2 . (-e-t)+2x/(x2+ y2 ). e-t C. dz/dt=2x/x2+ y2 . (-e-t)+2x/(x2+ y2 ). et D. dz/dt=2x/x2+ y2 . (e-t)+2x/(x2+ y2 ). et 2) The second order partial derivative with respect to x of f(x,y)=cos(x)+xyexy+xsin(y) is------------- Select one: A. ∂/∂x(∂f/∂x) = 2y2exy + xy3exy B. ∂/∂x(∂f/∂x) = −cos(x) + 2y2exy + xy3exy + sin(y)...

Find the critical point of the function f(x,y)=x2+y2+xy+12x c=________ Use the Second Derivative Test to determine...

Find the critical point of the function f(x,y)=x2+y2+xy+12x c=________ Use the Second Derivative Test to determine whether the point is A. a local maximum B. a local minimum C. a saddle point D. test fails

Write the equation of the sphere in standard form. x2 + y2 + z2 + 2x...

Write the equation of the sphere in standard form. x2 + y2 + z2 + 2x − 4y − 2z = 10 Find its center and radius. center     (x, y, z) = radius   

A) Show that the equation represents a sphere, find its center and radius: x2+y2+z2-2x-4y+8z=15 B) Find...

A) Show that the equation represents a sphere, find its center and radius: x2+y2+z2-2x-4y+8z=15 B) Find the equation of the sphere if one of its diameters is between the points (2,0,0) and (0,6,0) C) Describe in words or with a drawing the region represented by x2+y2=9, z= -2 D) Find the length of the sides of the triangle that passes through the following points and determine if it is a rectangle, isosceles, equilateral: (5,3,4), (7,1,3), (3,5,3)

Find the solution to the initial-value problem: y''+4y=2sin(2x), y(0)=1, y'(0)=0

Find the solution to the initial-value problem: y''+4y=2sin(2x), y(0)=1, y'(0)=0

Find the minimum value of the function f(x,y)=2x+y, subject to the constraint x2+y2=5.

Find the minimum value of the function f(x,y)=2x+y, subject to the constraint x2+y2=5.

Find the absolute maximum value and absolute minimum value of f(x,y) = x2 +2y2−2x−4y+1 on the...

Find the absolute maximum value and absolute minimum value of f(x,y) = x2 +2y2−2x−4y+1 on the region D = {(x,y) ∈ R2 : 0 ≤ x ≤ 2,|y−1.5|≤ 1.5}