[" 7.For "3s" orbital of hydrogen atom,t...

[" 7.For "3s" orbital of hydrogen atom,the normalised wave "],[" function is "],[qquad psi_(3,x)=(1)/(81sqrt(3 pi)((1)/(a_(0)))^(3/2)[27-(18r)/(a_(0))+(2r^(2))/(a_(0)^(2))]e^((-r)/(3a_(0))))],[" If distance between the radial nodes is d,calculate the value "],[" of "(d)/(173a_(0))" ."]

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For 3s orbital of hydrogen atom, the normalised wave function is Psi_(3s)=(1)/((81)sqrt(3pi))((1)/(a_(o)))^(3//2)[27-(18r)/(a_(o))+(2r^(2))/(a_(o)^(2))]e^((-r)/(3a_(o))) If distance between the radial nodes is d, calculate rthe value of (d)/(1.73a_(o))

[" The Schrodinger wave equation "],[" for hydrogen atom is: "],[qquad [psi_(2s)=(1)/(4sqrt(2 pi))((1)/(a_(0)))^(3/2)(2-(r_(0))/(a_(0)))e^((-r_(0))/(a_(0))),],[" where "a_(0)" is Bohr's radius.If the "],[" radial node is "2s" be at "r_(0)," then the "],[" value of "(r_(0))/(a_(0))" is "]]

The wave function of 3s electron is given by Psi_(3s)=1/(81sqrt(3)prod)(1/a_(0))^(3//2)[27-18(r/a_(0))+2(r/a_(0))^(2)]e^(-r//3a_(0)) It has a node at r=r_(0) , Find out the relation between r_(0) and a_(0)

The wave inction of 3s electron is given by Psi =(1)/(81 sqrt(3)pi) ((1)/(a_(0)))^(3//2)[ 27-18 ((r )/(a_(0)))+2((r )/(a_(0)))^(3)] e^(r//3a_(0)) It has a node at r=r_(0) . Find the relation between r_(0) and a_(0) .

For the wave function Psi= (sqrt2)/(81sqrtpi a_(0)^(3//2))[6 - (r)/(a_(0))](r)/(a_(0)) xx e^(-r//3a_(0)) "sin"theta dot"cos"phi Identify the orbital .

[" 7.For "3s" orbital of hydrogen atom,the normalised wave "],[" function is "],[qquad psi_(3,x)=(1)/(81sqrt(3 pi)((1)/(a_(0)))^(3/2)[27-(18r)/(a_(0))+(2r^(2))/(a_(0)^(2))]e^((-r)/(3a_(0))))],[" If distance between the radial nodes is d,calculate the value "],[" of "(d)/(173a_(0))" ."]

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