Chemistry-
General
Easy
Question
The atom A,B,C have the configuration A→[Z(90)+n(146)],B→[Z(92)+n(146)] C→[Z(90)+n(148)] so that:
a)A and C-Isotones
b)A and C-Isotopes
c)A and C-Isobars
d)B and C-Isobars
e)B and C–Isobars The wrong statement’s are:
- a,b only
- c,d,e only
- a,c,d only
- a,c,e only
The correct answer is: a,c,e only
Related Questions to study
biology
Bundle of His is a network of
Bundle of His is a network of
biologyGeneral
biology
Association of m-RNA with several ribosomes is called -
Association of m-RNA with several ribosomes is called -
biologyGeneral
chemistry-
The electronic configuration of element when just above the element with atomic number 43 the same periodic group is:
The electronic configuration of element when just above the element with atomic number 43 the same periodic group is:
chemistry-General
biology
Material exchange through nucleopores is faciliate by -
Material exchange through nucleopores is faciliate by -
biologyGeneral
chemistry-
What is the electronic configuration of an element in its first excited state which is isoelectronic withO2
What is the electronic configuration of an element in its first excited state which is isoelectronic withO2
chemistry-General
chemistry-
4s2 is the configuration of the outermost orbital of an element. Its atomic umber would be:
4s2 is the configuration of the outermost orbital of an element. Its atomic umber would be:
chemistry-General
chemistry-
A transition metal ‘X’ has a configuration [Ar] 3d5 its+3oxidationstate.Itsatomic number is-
A transition metal ‘X’ has a configuration [Ar] 3d5 its+3oxidationstate.Itsatomic number is-
chemistry-General
chemistry-
Electronic configuration
has violated:
Electronic configuration
has violated:
chemistry-General
chemistry-
36Kr has the electron configuration (18Ar) 4s2 3d10 4p6.The39thelectronwillgo into which one of the following sub-levels:
36Kr has the electron configuration (18Ar) 4s2 3d10 4p6.The39thelectronwillgo into which one of the following sub-levels:
chemistry-General
biology
The figure below shows the structure of a mitochondrion with its four parts labelled (A), (B),(C). and (D) Select the part correctly matched with its function.
![](data:image/png;base64,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)
The figure below shows the structure of a mitochondrion with its four parts labelled (A), (B),(C). and (D) Select the part correctly matched with its function.
![](data:image/png;base64,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)
biologyGeneral
chemistry-
n, l and m values of an electron in 3pyorbital are:
n, l and m values of an electron in 3pyorbital are:
chemistry-General
chemistry-
If l=3 then type and number of orbital is:
If l=3 then type and number of orbital is:
chemistry-General
chemistry-
An electron is in one of 4dorbital.Which of the following orbital quantum number value is not possible:
An electron is in one of 4dorbital.Which of the following orbital quantum number value is not possible:
chemistry-General
chemistry-
For the azimuthal quantum number(l),the total number of magnetic quantum number is
given by:
For the azimuthal quantum number(l),the total number of magnetic quantum number is
given by:
chemistry-General
biology
Important site for formation of glycoproteins and glycolipids is :
Important site for formation of glycoproteins and glycolipids is :
biologyGeneral