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?

Find the linear approximation of the function f(x, y, z) = x2 + y2 + z2...

Find the linear approximation of the function f(x, y, z) = x2 + y2 + z2 at (6, 2, 9) and use it to approximate the number 6.012 + 1.972 + 8.982 . (Round your answer to five decimal places.) f(6.01, 1.97, 8.98) ≈