The integral of a function around a closed curve in the complex plane is known as a contour integral. The value of the contour integral depends on the function being integrated and the curve over which the integration is performed.

The function in this case is f(z) = z^3(z + 4).

(a) For the circle |z| = 2, we can parameterize the curve as z = 2e^(it), where t ranges from 0 to 2π. The integral then becomes:

∫f(z) dz = ∫_0^2π (2e^(it))^3(2e^(it) + 4) * 2ie^(it) dt

This integral can be evaluated using standard techniques of complex analysis.

(b) For the circle |z + 2| = 3, we can parameterize the curve as z = -2 + 3e^(it), where t ranges from 0 to 2π. The integral then becomes:

∫f(z) dz = ∫_0^2π ((-2 + 3e^(it))^3(-2 + 3e^(it) + 4) * 3ie^(it) dt

Again, this integral can be evaluated using standard techniques of complex analysis.

Note: The actual computation of these integrals can be quite involved and may require the use of the residue theorem or other advanced techniques of complex analysis.

Question

The integral of a function around a closed curve in the complex plane is known as a contour integral. The value of the contour integral depends on the function being integrated and the curve over which the integration is performed.

The function in this case is f(z) = z^3(z + 4).

(a) For the circle |z| = 2, we can parameterize the curve as z = 2e^(it), where t ranges from 0 to 2π. The integral then becomes:

∫f(z) dz = ∫_0^2π (2e^(it))^3(2e^(it) + 4) * 2ie^(it) dt

This integral can be evaluated using standard techniques of complex analysis.

(b) For the circle |z + 2| = 3, we can parameterize the curve as z = -2 + 3e^(it), where t ranges from 0 to 2π. The integral then becomes:

∫f(z) dz = ∫_0^2π ((-2 + 3e^(it))^3(-2 + 3e^(it) + 4) * 3ie^(it) dt

Again, this integral can be evaluated using standard techniques of complex analysis.

Note: The actual computation of these integrals can be quite involved and may require the use of the residue theorem or other advanced techniques of complex analysis.

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The integral of a function around a closed curve in the complex plane is known as a contour integral. The value of the contour integral depends on the function being integrated and the curve over which the integration is performed.

The function in this case is f(z) = z^3(z + 4).

(a) For the circle |z| = 2, we can parameterize the curve as z = 2e^(it), where t ranges from 0 to 2π. The integral then becomes:

∫f(z) dz = ∫_0^2π (2e^(it))^3(2e^(it) + 4) * 2ie^(it) dt

This integral can be evaluated using standard techniques of complex analysis.

(b) For the circle |z + 2| = 3, we can parameterize the curve as z = -2 + 3e^(it), where t ranges from 0 to 2π. The integral then becomes:

∫f(z) dz = ∫_0^2π ((-2 + 3e^(it))^3(-2 + 3e^(it) + 4) * 3ie^(it) dt

Again, this integral can be evaluated using standard techniques of complex analysis.

Note: The actual computation of these integrals can be quite involved and may require the use of the residue theorem or other advanced techniques of complex analysis.

Find the value of the integral ZCdzz3(z + 4)taken in counterclockwise around the circle (a) |z| = 2, (b) |z + 2| = 3.

Question

Find the value of the integral

Solution

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