Chemistry-
General
Easy
Question
complex A
complex B
A & B complexes have the co-ordination number 4.
The IUPAC name of complexes ‘A’ & ‘B’ are respectively :
- Potassium tetracyanonickelate(II) and Potassium tetrachloronickelate(II)
- Potassium tetracyanonickel(II) and Potassium tetrachloronickel(II)
- Potassium cyanonickelate(II) and Potassium chloronickelate(II)
- Potassium cyanonickel(II) and Potassium chloronickel(II)
The correct answer is: Potassium tetracyanonickelate(II) and Potassium tetrachloronickelate(II)
Related Questions to study
chemistry-
On treatment of 100 mL 0.1 M Solution of CoCl3.6H2Owith excess AgNO3,
ions are precipitated The complex is :
On treatment of 100 mL 0.1 M Solution of CoCl3.6H2Owith excess AgNO3,
ions are precipitated The complex is :
chemistry-General
chemistry-
How many EDTA (ethylenediaminetetraacetic acid) molecules are required to make an octahedral complex with a Ca2+ ion ?
How many EDTA (ethylenediaminetetraacetic acid) molecules are required to make an octahedral complex with a Ca2+ ion ?
chemistry-General
chemistry-
In Fe(CO)5, the Fe – C bond possesses :
In Fe(CO)5, the Fe – C bond possesses :
chemistry-General
chemistry-
When degenerate d-orbitals of an iSol. ated atom/ion come under influence of magnetic field of ligands, the degeneracy is lost The two set
and
are either stabilized or destrabilized depending upon the nature of magnetic fieldIt can be expressed
diagrammatically as:
Value of CFSE depends upon nature of ligand and a spectrochemical series has been made experimentally, for
is about 4/9 times to
tetrahedral complexes, (CFSE for octahedral complex)This energy lies in visible region and i.e., why electronic transition are responsible for colour Such transitions are not possible with d0 and d10 configuration.
Crystal field stabilization energy for [
in terms of parameter Dq is – ![left parenthesis capital delta equals 10 D q right parenthesis](data:image/png;base64,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)
When degenerate d-orbitals of an iSol. ated atom/ion come under influence of magnetic field of ligands, the degeneracy is lost The two set
and
are either stabilized or destrabilized depending upon the nature of magnetic fieldIt can be expressed
diagrammatically as:
Value of CFSE depends upon nature of ligand and a spectrochemical series has been made experimentally, for
is about 4/9 times to
tetrahedral complexes, (CFSE for octahedral complex)This energy lies in visible region and i.e., why electronic transition are responsible for colour Such transitions are not possible with d0 and d10 configuration.
Crystal field stabilization energy for [
in terms of parameter Dq is – ![left parenthesis capital delta equals 10 D q right parenthesis](data:image/png;base64,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)
chemistry-General
chemistry-
When degenerate d-orbitals of an iSolated atom/ion come under influence of magnetic field of ligands, the degeneracy is lost The two set
and
are either stabilized or destrabilized depending upon the nature of magnetic fieldIt can be expressed
diagrammatically as:
Value of CFSE depends upon nature of ligand and a spectrochemical series has been made experimentally, for
is about 4/9 times to
tetrahedral complexes, (CFSE for octahedral complex)This energy lies in visible region and i.e., why electronic transition are responsible for colour Such transitions are not possible with d0 and d10 configuration.
is purple while
is colourless because –
When degenerate d-orbitals of an iSolated atom/ion come under influence of magnetic field of ligands, the degeneracy is lost The two set
and
are either stabilized or destrabilized depending upon the nature of magnetic fieldIt can be expressed
diagrammatically as:
Value of CFSE depends upon nature of ligand and a spectrochemical series has been made experimentally, for
is about 4/9 times to
tetrahedral complexes, (CFSE for octahedral complex)This energy lies in visible region and i.e., why electronic transition are responsible for colour Such transitions are not possible with d0 and d10 configuration.
is purple while
is colourless because –
chemistry-General
chemistry-
When degenerate d-orbitals of an iSolated atom/ion come under influence of magnetic field of ligands, the degeneracy is lost The two set
and
are either stabilized or destrabilized depending upon the nature of magnetic fieldIt can be expressed
diagrammatically as:
Value of CFSE depends upon nature of ligand and a spectrochemical series has been made experimentally, for
is about 4/9 times to
tetrahedral complexes, (CFSE for octahedral complex)This energy lies in visible region and i.e., why electronic transition are responsible for colour Such transitions are not possible with d0 and d10 configuration.
For an octahedral complex, which of the following d-electron configuration will give maximum CFSE?
When degenerate d-orbitals of an iSolated atom/ion come under influence of magnetic field of ligands, the degeneracy is lost The two set
and
are either stabilized or destrabilized depending upon the nature of magnetic fieldIt can be expressed
diagrammatically as:
Value of CFSE depends upon nature of ligand and a spectrochemical series has been made experimentally, for
is about 4/9 times to
tetrahedral complexes, (CFSE for octahedral complex)This energy lies in visible region and i.e., why electronic transition are responsible for colour Such transitions are not possible with d0 and d10 configuration.
For an octahedral complex, which of the following d-electron configuration will give maximum CFSE?
chemistry-General
chemistry-
When degenerate d-orbitals of an iSolated atom/ion come under influence of magnetic field of ligands, the degeneracy is lost The two set
and
are either stabilized or destrabilized depending upon the nature of magnetic fieldIt can be expressed diagrammatically as: ![](data:image/png;base64,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)
Value of CFSE depends upon nature of ligand and a spectrochemical series has been made experimentally, for
is about 4/9 times to
tetrahedral complexes, (CFSE for octahedral complex)This energy lies in visible region and i.e., why electronic transition are responsible for colour Such transitions are not possible with d0 and d10 configuration.
The d-orbitals, which are stabilised in an octahedral magnetic field, are –
When degenerate d-orbitals of an iSolated atom/ion come under influence of magnetic field of ligands, the degeneracy is lost The two set
and
are either stabilized or destrabilized depending upon the nature of magnetic fieldIt can be expressed diagrammatically as: ![](data:image/png;base64,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)
Value of CFSE depends upon nature of ligand and a spectrochemical series has been made experimentally, for
is about 4/9 times to
tetrahedral complexes, (CFSE for octahedral complex)This energy lies in visible region and i.e., why electronic transition are responsible for colour Such transitions are not possible with d0 and d10 configuration.
The d-orbitals, which are stabilised in an octahedral magnetic field, are –
chemistry-General
chemistry-
hen degenerate d-orbitals of an iSolated atom/ion come under influence of magnetic field of ligands, the degeneracy is lost The two set
and
are either stabilized or destrabilized depending upon the nature of magnetic fieldIt can be expressed diagrammatically as:
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576684/1/1070189/Picture91.png)
Value of CFSE depends upon nature of ligand and a spectrochemical series has been made experimentally, for
is about 4/9 times to
tetrahedral complexes, (CFSE for octahedral complex)This energy lies in visible region and i.e., why electronic transition are responsible for colourSuch transitions are not possible with d0 and d10 configuration.
The CFSE for
complex is 18000 cm–1The
for
will be –
hen degenerate d-orbitals of an iSolated atom/ion come under influence of magnetic field of ligands, the degeneracy is lost The two set
and
are either stabilized or destrabilized depending upon the nature of magnetic fieldIt can be expressed diagrammatically as:
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576684/1/1070189/Picture91.png)
Value of CFSE depends upon nature of ligand and a spectrochemical series has been made experimentally, for
is about 4/9 times to
tetrahedral complexes, (CFSE for octahedral complex)This energy lies in visible region and i.e., why electronic transition are responsible for colourSuch transitions are not possible with d0 and d10 configuration.
The CFSE for
complex is 18000 cm–1The
for
will be –
chemistry-General
chemistry-
Double salts are addition compounds which lose their identity in aqueous Solution whereas complexes which are also addition compounds do not lose their identity in aqueous Solution. The coordination compounds show isomerism and find applications in photography, qualitative analysis, metallurgy, water purification and in the treatment of various diseases.
Which of the following statements is incorrect ?
Double salts are addition compounds which lose their identity in aqueous Solution whereas complexes which are also addition compounds do not lose their identity in aqueous Solution. The coordination compounds show isomerism and find applications in photography, qualitative analysis, metallurgy, water purification and in the treatment of various diseases.
Which of the following statements is incorrect ?
chemistry-General
chemistry-
Statement-I : EAN of Fe in ferrocene is 36
Statement-II : 6
e – are co-ordinated by each cyclo pentadien ring with central metal ion.
Statement-I : EAN of Fe in ferrocene is 36
Statement-II : 6
e – are co-ordinated by each cyclo pentadien ring with central metal ion.
chemistry-General
chemistry-
Which of the following ions are optically active?
I) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576566/1/1070077/Picture43.png)
II) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576566/1/1070077/Picture40.png)
III) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576566/1/1070077/Picture37.png)
IV) ![](data:image/png;base64,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)
Which of the following ions are optically active?
I) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576566/1/1070077/Picture43.png)
II) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576566/1/1070077/Picture40.png)
III) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576566/1/1070077/Picture37.png)
IV) ![](data:image/png;base64,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)
chemistry-General
chemistry-
Of the following configurations, the optical isomers are :
I) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576561/1/1070076/Picture4.png)
II) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576561/1/1070076/Picture16.png)
III) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576561/1/1070076/Picture19.png)
IV) ![](data:image/png;base64,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)
Of the following configurations, the optical isomers are :
I) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576561/1/1070076/Picture4.png)
II) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576561/1/1070076/Picture16.png)
III) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/576561/1/1070076/Picture19.png)
IV) ![](data:image/png;base64,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)
chemistry-General
chemistry-
The complexes given below show :
and ![](data:image/png;base64,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)
The complexes given below show :
and ![](data:image/png;base64,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)
chemistry-General
maths-
Suppose that the number of telephone calls coming into a telephone exchange between 10 A.M. and 11A.M., say, X1 is a random variable with poison distribution with parameter 2. Similarly the number of calls arriving between 11 A.M. and 12 noon, say X2 also follows a poison distribution with parameter 6. If X1 and X2 are independent, the probability that more than 5 calls come in between 10 A.M. and 12 noon is
Suppose that the number of telephone calls coming into a telephone exchange between 10 A.M. and 11A.M., say, X1 is a random variable with poison distribution with parameter 2. Similarly the number of calls arriving between 11 A.M. and 12 noon, say X2 also follows a poison distribution with parameter 6. If X1 and X2 are independent, the probability that more than 5 calls come in between 10 A.M. and 12 noon is
maths-General
chemistry-
The van der Waals constant for gases
and
are as follows:
![](data:image/png;base64,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)
Which gas has the highest critical temperature?
The van der Waals constant for gases
and
are as follows:
![](data:image/png;base64,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)
Which gas has the highest critical temperature?
chemistry-General