Chemistry-
General
Easy
Question
In P-atom find out the no. of paired electrons for l=1 and m =0-
- 3
- 1
- 2
- 0
The correct answer is: 2
Related Questions to study
chemistry-
For H- atom, the energy required for the removal electron from various sub-shells is given at under:
The order of the energies would be:
For H- atom, the energy required for the removal electron from various sub-shells is given at under:
The order of the energies would be:
chemistry-General
physics-
Immiscible transparent liquids A, B, C, D and E are placed in a rectangular container of glass with the liquids making layers according to their densities. The refractive index of the liquids are shown in the adjoining diagram. The container is illuminated from the side and a small piece of glass having refractive index 1.61 is gently dropped into the liquid layer. The glass piece as it descends downwards will not be visible in
![](data:image/png;base64,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)
Immiscible transparent liquids A, B, C, D and E are placed in a rectangular container of glass with the liquids making layers according to their densities. The refractive index of the liquids are shown in the adjoining diagram. The container is illuminated from the side and a small piece of glass having refractive index 1.61 is gently dropped into the liquid layer. The glass piece as it descends downwards will not be visible in
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)
physics-General
Maths-
Values of
is :
Values of
is :
Maths-General
physics-
A rectangular tank of depth 8 meter is full of water (
), the bottom is seen at the depth
A rectangular tank of depth 8 meter is full of water (
), the bottom is seen at the depth
physics-General
chemistry-
A photon of energe12.75ev is completely absorbed by a hydrogen atom initially in ground sate. The principle quantum number of the excited state is:
A photon of energe12.75ev is completely absorbed by a hydrogen atom initially in ground sate. The principle quantum number of the excited state is:
chemistry-General
chemistry-
A certain electronic transition from an excited statetothegroundstateoftheH2 atom in one or more steps gives rise to four lines in the ultra violet region of the spectrum, how many lines does this transition produce in the infrared region of the spectrum-
A certain electronic transition from an excited statetothegroundstateoftheH2 atom in one or more steps gives rise to four lines in the ultra violet region of the spectrum, how many lines does this transition produce in the infrared region of the spectrum-
chemistry-General
chemistry-
Find out ratio of following for photon (νmax.) Lyman: (νmax) Brackett-
Find out ratio of following for photon (νmax.) Lyman: (νmax) Brackett-
chemistry-General
chemistry-
The potential energies of first, second and third Bohr’s orbits of He+ cation are E1,E2 and E3. The correct sequence of these energies is-
The potential energies of first, second and third Bohr’s orbits of He+ cation are E1,E2 and E3. The correct sequence of these energies is-
chemistry-General
Maths-
In ![straight triangle A B C comma left parenthesis a minus b right parenthesis squared cos squared invisible function application c over 2 plus left parenthesis a plus b right parenthesis squared sin squared invisible function application c over 2 equals](data:image/png;base64,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)
In ![straight triangle A B C comma left parenthesis a minus b right parenthesis squared cos squared invisible function application c over 2 plus left parenthesis a plus b right parenthesis squared sin squared invisible function application c over 2 equals](data:image/png;base64,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)
Maths-General
maths-
Tangents drawn to parabola
= 4ax at the points A and B intersect at C. Ordinate of A, C and B forms
Tangents drawn to parabola
= 4ax at the points A and B intersect at C. Ordinate of A, C and B forms
maths-General
chemistry-
Agasabsorbsaphotonof300nmandthenre-emittstwophotons.Onephotonhasa wavelength600nm.Thewavelengthofsecond photonis-
Agasabsorbsaphotonof300nmandthenre-emittstwophotons.Onephotonhasa wavelength600nm.Thewavelengthofsecond photonis-
chemistry-General
chemistry-
Which orbital is respresented by wave function Ψ310
Which orbital is respresented by wave function Ψ310
chemistry-General
chemistry-
What transition in He+ will have the same λ as the I line in lyman series of H-atom
What transition in He+ will have the same λ as the I line in lyman series of H-atom
chemistry-General
chemistry-
In 7N14 if mass attributed to electron were doubled& the mass attributed to protons were halved, the atomic mass would become approximately:
In 7N14 if mass attributed to electron were doubled& the mass attributed to protons were halved, the atomic mass would become approximately:
chemistry-General
Maths-
olution o
is
olution o
is
Maths-General