Question

Find the differential of the function.
z = e⁻⁴ˣ cos(4πt)
dz =___dx+___

Answer 1

To find the differential of the given function, take the partial derivative of z with respect to x and multiply it by dx, and then take the partial derivative of z with respect to t and multiply it by dt.

Step-by-step explanation:

The given function is z = e-4xcos(4πt).

To find the differential of the function dz, we need to take the partial derivative of z with respect to x and multiply it by dx, and then take the partial derivative of z with respect to t and multiply it by dt.

The partial derivative of z with respect to x is -4e-4xcos(4πt), so the first term in the differential is -4e-4xcos(4πt)dx.

The partial derivative of z with respect to t is -4πe-4xsin(4πt), so the second term in the differential is -4πe-4xsin(4πt)dt.