(iv) Use the gauge function to transform the potentials and discuss the physical implications of this transformation...
1.Please discuss the health implications of one of the conditions associated with physical inactivity, 2. one barrier to physical activity that that population faces, 3. one coping strategy persons can implement to overcome that specific barrier.
Please solve 12.5 and 12.6 Apply the gauge transformation generated by taking 12.5 to the potentials (12.64), where B is taken to be parallel to the z-axis, and show that the transformed time-independent Schrödinger equation, for a spinless particle of charge q-e and mass m, is mx2m 2m 12.6 By substituting into the Schrödinger equation of the previous problem, show that the energy eigen- values are given by h2k2 2m E(2r Io 0,1,2.... where (B/)B is the Larmor angular frequency....
Discuss IoT implications on consumer and enterprise use cases?
There are several implications to the use of provider and employer identification. Please discuss the positive and negative implications.
Discuss the key architectural design implications normally associated with a decision to use local systems as opposed to a central heating-cooling system. List and describe five (5) attributes that you associate with use of a local system and five (5) attributes that you associate with use of a central system.
Page 4 IV. (10) Use the Laplace transform to solve the IVP y" - 2y + y = f(t), y(0) = 1, 7(0) = 1, where t<3 f(t) = t-3, t3 You may use the partial fraction decomposition 70-28+1) -1,2 = (+*++* - , but you need to show all the steps needed to arrive to the expression (+28+1) in order to receive credit.
Describe the composition, function, and purpose of physical, mechanical, and biochemical barriers. Discuss the importance of normal flora in relation to opportunistic infections. Describe the process of inflammation.
Page 4 IV. Use the Laplace transform to solve the IVP y' - 2y + y = f(t), y(0) = 1, v/(0) = 1, where (10) 0, t <3 f(t) = t-3, 3 You may use the partial fraction decomposition 16–25+1) 5+(9–1 = (-) + ? + - , but you need to show all the steps needed to arrive to the expression - 022-28+1) in order to receive credit.
Use the time-shifting property and the result for the Fourier Transform of a cosine function to calculate the Fourier Transform of a sine function. Show that the phase response at positive and negative frequencies matches the expected result for a sine function.
Discuss how organizations should analyze the security implications of the embedded systems that they use. What are the consequences of having unprotected Linux operating systems installed on embedded systems? What steps should an organization take to secure the embedded systems that integrate with their technology architecture?