đề đâu???

Ba câu đấy bạn

Đáp án là B

Ta có:

Hàm \(\Psi\)được gọi là hàm chuẩn hóa nếu: \(\int\Psi.\Psi^{\circledast}d\tau=1hay\int\Psi^2d\tau=1\)

Hàm \(\Psi\)chưa chuẩn hóa là: \(\int\left|\Psi\right|^2d\tau=N\left(N\ne1\right)\)

Để có hàm chuẩn hóa, chia cả 2 vế cho N,ta có:

\(\frac{1}{N}.\int\left|\Psi\right|^2d\tau=1\Rightarrow\frac{1}{N}.\int\Psi.\Psi^{\circledast}d\tau=1\)

Trong đó: \(\Psi=\frac{1}{\sqrt{N}}.\Psi\)là hàm chuẩn hóa; \(\frac{1}{\sqrt{N}}\)là thừa số chuẩn hóa

Ta có:

\(\frac{1}{N}.\int\Psi.\Psi^{\circledast}d\tau=\frac{1}{N}.\int\left|\Psi\right|^2d\tau=1\Leftrightarrow\frac{1}{N}.\iiint\left|\Psi\right|^2dxdydz=1\)

Chuyển sang tọa độ cầu, ta có: \(\begin{cases}x=r.\cos\varphi.sin\theta\\y=r.sin\varphi.sin\theta\\z=r.\cos\theta\end{cases}\)với \(\begin{cases}0\le r\le\infty\\0\le\varphi\le2\pi\\0\le\theta\le\pi\end{cases}\)

\(\Rightarrow\frac{1}{N}.\iiint\left(r.\cos\varphi.sin\theta\right)^2.e^{-\frac{r}{a_o}}.r^2.sin\theta drd\varphi d\theta=1\)

\(\Leftrightarrow\frac{1}{N}.\int\limits^{\infty}_0r^4.e^{-\frac{r}{a_o}}dr.\int\limits^{2\pi}_0\cos^2\varphi d\varphi.\int\limits^{\pi}_0sin^3\theta d\theta=1\)

\(\Leftrightarrow\frac{1}{N}.\frac{4!}{\left(\frac{1}{a_o}\right)^5}.\int\limits^{2\pi}_0\frac{\cos\left(2\varphi\right)+1}{2}d\varphi\int\limits^{\pi}_0\frac{3.sin\theta-sin3\theta}{4}d\theta=1\)(do \(\int\limits^{\infty}_0x^n.e^{-a.x}dx=\frac{n!}{a^{n+1}}\))

\(\Leftrightarrow\frac{1}{N}.24.a^5_o.\frac{4}{3}.\pi=1\)

\(\Leftrightarrow\frac{1}{N}=\frac{1}{32.a^5_o.\pi}\)

\(\Rightarrow\)Thừa số chuẩn hóa là: \(\frac{1}{\sqrt{N}}=\sqrt{\frac{1}{32.a^5_o.\pi}}\); Hàm chuẩn hóa: \(\Psi=\frac{1}{\sqrt{N}}.\Psi=\sqrt{\frac{1}{32.a^5_o.\pi}}.x.e^{-\frac{r}{2a_o}}\)

áp dụng dk chuẩn hóa hàm sóng. \(\int\psi\psi^{\cdot}d\tau=1.\)

ta có: \(\int N.x.e^{-\frac{r}{2a_0}}.N.x.e^{-\frac{r}{2a_0}}.d\tau=1=N^2.\int_0^{\infty}r^4e^{-\frac{r}{a_0}}dr.\int_0^{\pi}\sin^3\theta d\tau.\int^{2\pi}_0\cos^2\varphi d\varphi=N^2.I_1.I_2.I_3\)

Thấy tích phân I1 có dạng tích phân hàm gamma. \(\int^{+\infty}_0x^ne^{-ax}dx=\int^{+\infty}_0\frac{\left(\left(ax\right)^{n+1-1}e^{-ax}\right)d\left(ax\right)}{a^{n+1}}=\frac{\Gamma\left(n+1\right)!}{a^{n+1}}=\frac{n!}{a^{n+1}}.\)

.áp dụng cho I1 ta được I\(I1=4!.a_0^5=24a^5_0\). tính \(I2=\int_0^{\pi}\sin^3\theta d\theta=\int_0^{\pi}\left(\cos^2-1\right)d\left(\cos\theta\right)=\frac{4}{3}\). tính tp \(I3=\int_0^{2\pi}\cos^2\varphi d\varphi=\int_0^{2\pi}\frac{\left(1-\cos\left(2\varphi\right)\right)}{2}d\varphi=\pi\)

suy ra \(\frac{N^2.24a_0^5.\pi.4}{3}=1\). vậy N=\(N=\frac{1}{\sqrt{32\pi a_0^5}}\). hàm \(\psi\) sau khi chiuẩn hóa có dạng \(\psi=\frac{1}{\sqrt{\pi32.a_0^5}}x.e^{-\frac{r}{2a_0}}\)

Chọn A.    

(a) Đúng.

(b) Sai, phenol phản ứng thế brom dễ hơn benzen.

(c) Đúng.

(d) Đúng.

(e) Sai, dung dịch phenol không làm đổi màu quỳ tím.

(g) Đúng.

Chọn B

\(n_{NO}=n_{N_2O}=0,15\)

Bảo toàn e

a) Ta có:   Mật độ xác suất tìm thấy electron trong vùng không gian xung quanh hạt nhân nguyên tử:

    D(r) = R²(r) . r²

             = 416/729 . a₀^-5 . r² . (2 - r/3a₀)² . e^-2r/3a₀ . r²

           = 416/729 . a₀^-5 . (4r⁴ - 4r⁵/3a₀ + r⁶/9a₀²) .  e^-2r/3a₀

      Khảo sát hàm số D(r) thuộc r

          Xét:  d D(r)/ dr = 416/729 . a₀^-5 . [(16r³ - 20r⁴/3a₀ + 2r⁵/3a_0²) .  e^-2r/3a₀  -  (4r⁴ - 4r⁵/3a₀ + r⁶/9a_0²) . 2/3a₀  . e^-2r/3a₀ ]

                          = 416/729 . a₀^-5 . e^-2r/3a₀  . r³ . (16a₀³ - 28r/3a₀ + 14r²/9a₀² - 2r³/27a₀³)

                          = 832/19683 . a₀^-8 . e^-2r/3a₀  . r³ . (-r³ +21r².a₀ - 126r.a₀² +216a₀³)

                          = - 832/19683 . a₀^-8 . e^-2r/3a₀  . r³ . (r - 6a₀).(r - 3a₀).(r - 12a₀)

           d D(r)/ dr = 0. Suy ra r =0; r =3a₀ ; r = 6a₀; r = 12a₀

           Với r = 0 : D(r) =0

                  r =3a₀ : D(r) = 416/9 .a^-1 . e^-2

                  r =6a₀ : D(r) = 0

                  r =12a₀ : D(r) = 425984/9.a^-1 . e^-8

^{b) Ai vẽ câu này rồi cho   up lên với, cám ơn mọi người trước nhé!}  

a)Mật độ xác suất có mặt electron tỷ lệ với |R_3P|².r²

D_(r)=|R_3P|².r²  =D _(r)=\(\frac{416}{729}\) .a₀^-5.(2r²- \(\frac{r^3}{3a_0}\)).\(^{e^{-\frac{2r}{3a_0}}}\)

   Lấy đạo hàm của D theo r để khảo sát mật độ xác suất :

    D' _(r)= \(\frac{416}{729}\) .a₀^-5.2.(2r²-\(\frac{r^3}{3a_0}\)).(4r-\(\frac{r^2}{a_0}\)).\(^{e^{-\frac{2r}{3a_0}}}\)+\(\frac{416}{729}\) .a₀^-5.(2r²-\(\frac{r^3}{3a_0}\))².(-\(\frac{2}{3a_0}\)).\(^{e^{-\frac{2r}{3a_0}}}\) 

           =\(\frac{832}{729}\). a₀^-6.\(^{e^{-\frac{2r}{3a_0}}}\). (2r²-\(\frac{r^3}{3a_0}\)) .[(4r-\(\frac{r^2}{a_0}\)).a₀ -\(\frac{1}{3}\). (2r²-\(\frac{r^3}{3a_0}\))]

            =\(\frac{832}{729}\). a₀^-6.\(^{e^{-\frac{2r}{3a_0}}}\).r³.(2- \(\frac{r}{3a_0}\)).(\(\frac{r^2}{9a_0}-\frac{5r}{3}+4a_0\))

=>D’_(r)=0   => r=0 ,r=3a₀ ,r=6a₀ ,r=12a₀.

Với:r=0      =>D_(r)=0

       r=3a₀  =>D_(r)=0

       r=6a₀  =>D_(r)=\(\frac{416}{9a_0.e^2}\)

       r=12a₀=>D_(r)=\(\frac{425984}{a_0.e^8}\)

b)

a, Ta có:

Hai hàm sóng trực giao nhau khi  \(I=\int\psi_{1s}.\psi_{2s}d\psi=0\) \(\Leftrightarrow I=\iiint\psi_{1s}.\psi_{2s}dxdydz=0\)

Chuyển sang tọa độ cầu ta có:  \(\begin{cases}x=r.\cos\varphi.sin\theta\\y=r.\sin\varphi.sin\theta\\z=r.\cos\theta\end{cases}\)

\(\Rightarrow\)\(I=\frac{a^3_o}{4.\sqrt{2.\pi}}\int\limits^{\infty}_0\left(2-\frac{r}{a_o}\right).e^{-\frac{3.r}{2.a_o}}.r^2.\sin\theta dr\int\limits^{2\pi}_0d\varphi\int\limits^{\pi}_0d\theta\)

       \(=a^3_o.\sqrt{\frac{\pi}{2}}\)(.\(2.\int\limits^{\infty}_0r^2.e^{-\frac{3.r}{2.a_o}}dr-\frac{1}{a_o}.\int\limits^{\infty}_0r^3.e^{-\frac{3.r}{2.a_o}}dr\))

         \(=a_o.\sqrt{\frac{\pi}{2}}.\left(2.I_1-\frac{1}{a_o}.I_2\right)\)  

Tính \(I_1\):

Đặt \(r^2=u\); \(e^{-\frac{3r}{2a_o}}dr=dV\)

\(\Rightarrow\begin{cases}2.r.dr=du\\-\frac{2a_o}{3}.e^{-\frac{3r}{2a_o}}=V\end{cases}\)    \(\Rightarrow I_1=-r^2.\frac{2a_o}{3}.e^{-\frac{3r}{2a_o}}+\frac{4.a_o}{3}.\int\limits^{\infty}_0r.e^{-\frac{3r}{2a_o}}dr\)\(=0+\frac{4a_o}{3}.I_{11}\)

Tính \(I_{11}\):

Đặt r=u; \(e^{-\frac{3r}{2a_o}}dr=dV\)\(\Rightarrow\begin{cases}dr=du\\-\frac{2a_o}{3}.e^{-\frac{3r}{2a_o}}=V\end{cases}\)\(\Rightarrow I_{11}=0+\frac{2a_0}{3}.\int\limits^{\infty}_0e^{-\frac{3r}{2a_o}}dr=\frac{4a^2_o}{9}\)

\(\Rightarrow2.I_1=2.\frac{4a_o}{3}.\frac{4a_o^2}{9}=\frac{32a^3_o}{27}\)

Tính \(I_2\):

Đặt \(r^2=u;e^{-\frac{3r}{2a_o}}dr=dV\) \(\Rightarrow\)\(3r^2dr=du;-\frac{2a_o}{3}.e^{-\frac{3r}{2a_o}}=V\)

\(\Rightarrow I_2=0+2.a_o.\int\limits^{\infty}_0r^2.e^{-\frac{3r}{2a_o}}dr\)\(\Rightarrow\frac{1}{a_o}.I_2=2a_o.\frac{16a^3_o}{27}.\frac{1}{a_o}=\frac{32a^3_o}{27}\)

\(\Rightarrow I=a^3_o.\sqrt{\frac{\pi}{2}}.\left(\frac{32a^3_o}{27}-\frac{32a^3_o}{27}\right)=0\)

Vậy hai hàm sóng này trực giao với nhau.

b,

Xét hàm \(\Psi_{1s}\):

Hàm mật độ sác xuất là: \(D\left(r\right)=\Psi^2_{1s}=\frac{1}{\pi}.a^3_o.e^{-\frac{2r}{a_o}}\)

\(\Rightarrow D'\left(r\right)=-\frac{2.a_o^2}{\pi}.e^{-\frac{2r}{a_o}}=0\)

\(\Rightarrow\)Hàm đạt cực đại khi \(r\rightarrow o\) nên hàm sóng có dạng hình cầu.

Xét hàm \(\Psi_{2s}\):

Hàm mật độ sác xuất: \(D\left(r\right)=\Psi_{2s}^2=\frac{a^3_o}{32}.\left(2-\frac{r}{a_o}\right)^2.e^{-\frac{r}{a_0}}\)\(\Rightarrow D'\left(r\right)=\left(2-\frac{r}{a_o}\right).e^{-\frac{r}{a_o}}.\left(-4+\frac{r}{a_o}\right)=0\)

\(\Rightarrow r=2a_o\Rightarrow D\left(r\right)=0\); \(r=4a_o\Rightarrow D\left(r\right)=\frac{a^3_o}{8}.e^{-4}\)

Vậy hàm đạt cực đại khi \(r=4a_o\), tại \(D\left(r\right)=\frac{a^3_o}{8}.e^{-4}\)

hai hàm trực giao: I=\(\int\)\(\Psi\)*\(\Psi\)d\(\tau\)=0

Ta có: I=\(\int\limits^{ }_x\)\(\int\limits^{ }_y\)\(\int\limits^{ }_z\)\(\Psi\)*\(\Psi\)dxdydz=0

           =\(\int\limits^{ }_r\)\(\int\limits^{ }_{\theta}\)\(\int\limits^{ }_{\varphi}\)\(\Psi\)_1s\(\Psi\)_2sr²sin\(\theta\)drd\(\theta\)d\(\varphi\)

          =\(\int\limits^{\infty}_0\)\(\int\limits^{\pi}_0\)\(\int\limits^{2\pi}_0\)(2-\(\frac{r}{a_0}\)).e^-3r/a₀r²sin\(\theta\)drd\(\theta\)d\(\varphi\)

          =C.\(\int\limits^{\infty}_0\)(2-\(\frac{r}{a_0}\)).e^-3r/a₀r2dr.\(\int\limits^{\pi}_0\)sin\(\theta\)\(\int\limits^{2\pi}_0\)d\(\varphi\)

 với C=\(\frac{1}{4\sqrt{2\pi}}\)a₀^-3

 Xét tích phân: J=\(\int\limits^{\infty}_0\)(2-\(\frac{r}{a_0}\)).e^-3r/a₀r²dr

 =\(\int\limits^{\infty}_0\)(2r²- \(\frac{r^3}{a_0}\)).e^-3r/a₀dr

 =\(\int\limits^{\infty}_0\)(2r²- \(\frac{r^3}{a_0}\)).\(\frac{-2a_0}{3}\)de^-3r/a₀

  =\(\frac{-2a_0}{3}\).((2r²-\(\frac{r^3}{a_0}\))e^-3r/a₀\(-\)\(\int\)(4r-\(\frac{3r^2}{a_0}\))e^-3r/adr)

 =\(\frac{-2a_0}{3}\)((2r²-\(\frac{r^3}{a_0}\))e^-3r/a₀ - \(\int\)(4r-\(\frac{3r^2}{a_0}\)).\(\frac{-2a_0}{3}\)de^-3r/a)

 =\(\frac{-2a_0}{3}\)((2r²-\(\frac{r^3}{a_0}\))e^-3r/a₀ +\(\frac{2a_0}{3}\).((4r-\(\frac{3r^2}{a_0}\))e^-3r/a₀ - \(\int\)(4 - \(\frac{6r}{a_0}\))e^-3r/a₀dr))

 =\(\frac{-2a_0}{3}\)((2r²-\(\frac{r^3}{a_0}\))e^-3r/a₀ +\(\frac{2a_0}{3}\).((4r-\(\frac{3r^2}{a_0}\))e^-3r/a₀- \(\int\)(4 - \(\frac{6r}{a_0}\))\(\frac{-2a_0}{3}\).de^-3r/a₀))

 =\(\frac{-2a_0}{3}\)(((2r²-\(\frac{r^3}{a_0}\))e^-3r/a₀ +\(\frac{2a_0}{3}\).((4r-\(\frac{3r^2}{a_0}\))e^-3r/a₀+\(\frac{2a_0}{3}\)((4-\(\frac{6r}{a_0}\)).e^-3r/a₀ + \(\int\)(\(\frac{6}{a_0}\)e^-3r/a₀dr)))

=\(\frac{-2a_0}{3}\)(((2r²-\(\frac{r^3}{a_0}\))e^-3r/a₀ +\(\frac{2a_0}{3}\).((4r-\(\frac{3r^2}{a_0}\))e^-3r/a₀+\(\frac{2a_0}{3}\)((4-\(\frac{6r}{a_0}\)).e^-3r/a₀ + \(\int\)(\(\frac{6}{a_0}\).\(\frac{-2a_0}{3}\)de^-3r/a₀)))

=\(\frac{-2a_0}{3}\)((((2r²-\(\frac{r^3}{a_0}\))e^-3r/a₀ +\(\frac{2a_0}{3}\).((4r-\(\frac{3r^2}{a_0}\))e^-3r/a₀+\(\frac{2a_0}{3}\)((4-\(\frac{6r}{a_0}\)).e^-3r/a₀ - 4.e^-3r/a₀))))