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Can you please show in detail why or how?
EXAMPLE 6-9 Show that the hydrogenlike atomic...
i'll give you a like so please help me with this, for i am pretty lost...
i'll give you a like so please help me with this, for
i am pretty lost
thank you!
3. The variational method can be extended taking as a test function, a linear combination of atomic state functions for N electrons, in the potential q nuclei; this is : 6(1, 2, 3, ...,N) = -0,2;(1,2,3,..., N) where (1,2,3,...,N) represents the molecular state and 2(1,2,3,...,N) represents the atomic states of N electrons respectively and are orthogonal. The coefficients Care parameters to be...
4. An orbital of atomic hydrogen is described by the wave function, ¥(,0,4) = (20 -...
4. An orbital of atomic hydrogen is described by the wave function, ¥(,0,4) = (20 - 4) ze zo cos e (a) Consider the radial part, R(r), of this orbital. By considering the values of r for which R(r) = 0 identify the number of radial nodes (points where the R(r) = 0 when r IS NOT equal to 0 or oo). [3 marks) ( Consider the angular part, Y (0.). of this orbital. By considering the values of 0...
Can you please walk me through this problem in detail? 3cdclo sts publ shed st d...
Can you please walk me through this problem in detail?
3cdclo sts publ shed st d on the lik bewoon the evol cf maso ity and inal bahaw o men us ng 교 sa pe o roty incarcerated me the esoarchor do fed 1 171 v ont even s and 533 cvon s n which vío roo was a c dod that he mer ore in o ed in ach of sa ped me toox to ts and thosa wha...
(a) Show that (@) = sin e- is an eigenfunction of both Î, and Î", where...
(a) Show that (@) = sin e- is an eigenfunction of both Î, and Î", where = -1 1 a 1 22 sin + sin 020 sin0 and derive the corresponding eigenvalues. You may use the identity 1 a 1 sin sin 2 sin sin 0 80 sino 31 (sin 00 (5 marks) (6) Consider the function $(,0,4)= A - 1/200 sin 6e-ip, 20 where A is a constant and an is the Bohr radius. This is a hydrogen atom...
can you please explain both 31) The number of radial nodes present in the radial probability...
can you please explain both
31) The number of radial nodes present in the radial probability distribution curves for the orbital wave function with quantum numbers n = 4,1 = 0 and m=0 is: A)1 B2 C)3 D)4 32) Which pair of atomic orbitals possess the same number of radial nodes? A) Is and 3d B) 4s and 3s C) 3s and 3d D) 2s and 3d
can you explane how to get the final result with alot of details? J. dø |...
can you explane how to get the final result with alot of
details?
J. dø | de sine Yoo (8,9)Y? (0,0) = )Ga) S." de ("ao sino cos?o = G) (2m) () The next step is to calculate the radial integral, S R20 (*)Rxzx@"rºdr = (22.) [°¢©)(1-za) e zo pa Top (2[are dopo Lar (23) Cor] 3 De Then, after simplification we obtain, 13 9 9 !!. Rzo ()Rz(M)r’dr = F (22) 1-36 ,"1 = .
How did they find the derivative for the triangular function x(t) Can you show me please...
How did they find the derivative for the triangular function
x(t)
Can you show me please
I’m trying to understand
5.10. Consider the triangular wave x(t) shown in Fig. 5-14(a). Using the differentiation technique, find the triangular Fourier series of x(t) From Fig. 5-14(a) the derivative x'() of the triangular wave x(t) is, as shown in Fig. 5-14(b), (5.125) Using Eq. (5.117), Eq. (5.125) becomes COS cos k ?0t (5.126) To Ti Equating Eqs. (5.126 and (5.122), we have 2...
will someone please explain fairly thoroughly how to correctly solve number one? I seem to keep...
will someone please explain fairly thoroughly how to correctly
solve number one? I seem to keep getting the same answer no matter
what i do
1. The 1500 kg steel beam is supported by two ropes as shown below. tension in each cable? -30°.0, -25°. What is the Ticos - (T, sind, cosa = mg yo *T, (0.866) +/T, (0.5)) (0.9063) = 14700 (0.4226) A - T, (0.866) +J, (0.57(0.9063) =6212.45 O T, (0.866 +0.5) = 6854.72 Etx= - Ti...
1) (35 points) The wave function for a particle moving along x axis between the limits 0 and L is: (x)-C sin (nx xL) where n are 1, 2, 3, A) Determine the normalization constant C B) Why can'...
1) (35 points) The wave function for a particle moving along x axis between the limits 0 and L is: (x)-C sin (nx xL) where n are 1, 2, 3, A) Determine the normalization constant C B) Why can't n take the value of 0, briefly explain C) For n-3 determine the values of x (in terms of L) that correspond to a maximum or a minimum in the wave function D) For n-3 determine the values of x (in...
Can you please help me solve this question with its all the parts? (8%) Problem 9:...
Can you please help me solve this question with its all the
parts?
(8%) Problem 9: The length of nylon rope from which a mountain climber is suspended has a force constant of 1.2 x 104N/m. > * 25% Part (a) What is the frequency, in Hz, at which he bounces, given his mass and the mass of his equipment is 84 kg? f=1 Grade Summary Deductions 0% Potential 100% sino 7 8 9 HOME JT ( E^^ 4 5...
i'll give you a like so please help me with this, for
i am pretty lost
thank you!
3. The variational method can be extended taking as a test function, a linear combination of atomic state functions for N electrons, in the potential q nuclei; this is : 6(1, 2, 3, ...,N) = -0,2;(1,2,3,..., N) where (1,2,3,...,N) represents the molecular state and 2(1,2,3,...,N) represents the atomic states of N electrons respectively and are orthogonal. The coefficients Care parameters to be...
4. An orbital of atomic hydrogen is described by the wave function, ¥(,0,4) = (20 - 4) ze zo cos e (a) Consider the radial part, R(r), of this orbital. By considering the values of r for which R(r) = 0 identify the number of radial nodes (points where the R(r) = 0 when r IS NOT equal to 0 or oo). [3 marks) ( Consider the angular part, Y (0.). of this orbital. By considering the values of 0...
Can you please walk me through this problem in detail?
3cdclo sts publ shed st d on the lik bewoon the evol cf maso ity and inal bahaw o men us ng 교 sa pe o roty incarcerated me the esoarchor do fed 1 171 v ont even s and 533 cvon s n which vío roo was a c dod that he mer ore in o ed in ach of sa ped me toox to ts and thosa wha...
(a) Show that (@) = sin e- is an eigenfunction of both Î, and Î", where = -1 1 a 1 22 sin + sin 020 sin0 and derive the corresponding eigenvalues. You may use the identity 1 a 1 sin sin 2 sin sin 0 80 sino 31 (sin 00 (5 marks) (6) Consider the function $(,0,4)= A - 1/200 sin 6e-ip, 20 where A is a constant and an is the Bohr radius. This is a hydrogen atom...
can you please explain both
31) The number of radial nodes present in the radial probability distribution curves for the orbital wave function with quantum numbers n = 4,1 = 0 and m=0 is: A)1 B2 C)3 D)4 32) Which pair of atomic orbitals possess the same number of radial nodes? A) Is and 3d B) 4s and 3s C) 3s and 3d D) 2s and 3d
can you explane how to get the final result with alot of
details?
J. dø | de sine Yoo (8,9)Y? (0,0) = )Ga) S." de ("ao sino cos?o = G) (2m) () The next step is to calculate the radial integral, S R20 (*)Rxzx@"rºdr = (22.) [°¢©)(1-za) e zo pa Top (2[are dopo Lar (23) Cor] 3 De Then, after simplification we obtain, 13 9 9 !!. Rzo ()Rz(M)r’dr = F (22) 1-36 ,"1 = .
How did they find the derivative for the triangular function
x(t)
Can you show me please
I’m trying to understand
5.10. Consider the triangular wave x(t) shown in Fig. 5-14(a). Using the differentiation technique, find the triangular Fourier series of x(t) From Fig. 5-14(a) the derivative x'() of the triangular wave x(t) is, as shown in Fig. 5-14(b), (5.125) Using Eq. (5.117), Eq. (5.125) becomes COS cos k ?0t (5.126) To Ti Equating Eqs. (5.126 and (5.122), we have 2...
will someone please explain fairly thoroughly how to correctly
solve number one? I seem to keep getting the same answer no matter
what i do
1. The 1500 kg steel beam is supported by two ropes as shown below. tension in each cable? -30°.0, -25°. What is the Ticos - (T, sind, cosa = mg yo *T, (0.866) +/T, (0.5)) (0.9063) = 14700 (0.4226) A - T, (0.866) +J, (0.57(0.9063) =6212.45 O T, (0.866 +0.5) = 6854.72 Etx= - Ti...
1) (35 points) The wave function for a particle moving along x axis between the limits 0 and L is: (x)-C sin (nx xL) where n are 1, 2, 3, A) Determine the normalization constant C B) Why can't n take the value of 0, briefly explain C) For n-3 determine the values of x (in terms of L) that correspond to a maximum or a minimum in the wave function D) For n-3 determine the values of x (in...
Can you please help me solve this question with its all the
parts?
(8%) Problem 9: The length of nylon rope from which a mountain climber is suspended has a force constant of 1.2 x 104N/m. > * 25% Part (a) What is the frequency, in Hz, at which he bounces, given his mass and the mass of his equipment is 84 kg? f=1 Grade Summary Deductions 0% Potential 100% sino 7 8 9 HOME JT ( E^^ 4 5...
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