Show that the origin is a spiral point of the system x' = -y - x(sqrt(x2...

Consider the linear system x' = x cos a − y sin a y'= x sin...

Consider the linear system x' = x cos a − y sin a y'= x sin a + y cos a where a is a parameter. Show that as a ranges over [0, π], the equilibrium point at the origin passes through the sequence stable node, stable spiral, center, unstable spiral, unstable node.

Find the linear approximation of the function f(x, y, z) = sqrt x2 + y2 +...

Find the linear approximation of the function f(x, y, z) = sqrt x2 + y2 + z2 at (3, 6, 6) and use it to approximate the number sqrt3.01^2 + 5.97^2 + 5.98^2 . (Round your answer to five decimal places.) f(3.01, 5.97, 5.98)

-find the differential and linear approximation of f(x,y) = sqrt(x^2+y^3) at the point (1,2) -use tge...

-find the differential and linear approximation of f(x,y) = sqrt(x^2+y^3) at the point (1,2) -use tge differential to estimate f(1.04,1.98)

Solve the given nonlinear plane autonomous system by changing to polar coordinates. x' = [y −...

Solve the given nonlinear plane autonomous system by changing to polar coordinates. x' = [y − x/sqrt(x^2+y^2)](16 − x2 − y2) y'= [-x-y/sqrt(x^2+y^2)](16 − x2 − y2) X(0) = (1, 0)

Find the differential of f(x,y)=sqrt(x2+y3) at the point (2,3). Then use the differential to estimate f(2.04,2.96).

Find the differential of f(x,y)=sqrt(x2+y3) at the point (2,3). Then use the differential to estimate f(2.04,2.96).

Find the integral that represents: The volume of the solid under the cone z = sqrt(x^2...

Find the integral that represents: The volume of the solid under the cone z = sqrt(x^2 + y^2) and over the ring 4 ≤ x^2 + y^2 ≤ 25 The volume of the solid under the plane 6x + 4y + z = 12 and on the disk with boundary x2 + y2 = y. The area of ​​the smallest region, enclosed by the spiral rθ = 1, the circles r = 1 and r = 3 & the polar...

Find the point on the curve y = sqrt(x) is closest to the point (3, 0)...

Find the point on the curve y = sqrt(x) is closest to the point (3, 0) , and find the value of this minimum distance. Use the Second Derivative Test to show that this value is a minimum. Show work

A lamina occupies the part of the disk x2 + y2 ≤ 9 in the first...

A lamina occupies the part of the disk x2 + y2 ≤ 9 in the first quadrant. Find the center of mass of the lamina if the density at any point is proportional to the square of its distance from the origin. Hint: use polar coordinates(x, y) =

A lamina occupies the part of the disk x2+y2≤1x2+y2≤1 in the first quadrant and the density...

A lamina occupies the part of the disk x2+y2≤1x2+y2≤1 in the first quadrant and the density at each point is given by the function ρ(x,y)=5(x2+y2)ρ(x,y)=5(x2+y2). A. What is the total mass? B. What is the moment about the x-axis? C. What is the moment about the y-axis? D, Where is the center of mass? E. What is the moment of inertia about the origin?

Let (X,Y) be chosen uniformly from inside the circle of radius one centered at the origin....

Let (X,Y) be chosen uniformly from inside the circle of radius one centered at the origin. Let R denote the distance of the chosen point from the origin. Determine the density of R. From there, determine the density of the random variable R2 = X2 + Y2.