Chemistry-
General
Easy
Question
Sodium sulphite on heating with dilute
liberates a gas which
- Turns lead acetate paper black
- Turns acidified potassium dichromate paper green
- Burns with a blue flame
- Smells like vinegar
The correct answer is: Turns acidified potassium dichromate paper green
Related Questions to study
chemistry-
A precipitate of calcium oxalate will not dissolve in
A precipitate of calcium oxalate will not dissolve in
chemistry-General
chemistry-
Which one of the following salt give green coloured flame when the salt is tested by Pt wire
Which one of the following salt give green coloured flame when the salt is tested by Pt wire
chemistry-General
chemistry-
When concentrated
is added to dry
, brown fumes evolve. These fumes are
When concentrated
is added to dry
, brown fumes evolve. These fumes are
chemistry-General
chemistry-
The metal that does not give the borax bead test is
The metal that does not give the borax bead test is
chemistry-General
chemistry-
Which one of the following metals will give blue ash when its salt is heated with
solid and
on a charcoal piece
Which one of the following metals will give blue ash when its salt is heated with
solid and
on a charcoal piece
chemistry-General
physics-
An electron in the ground state of hydrogen atom is revolving in anticlockwise direction in the circular orbit of radius R The atom is placed in a uniform magnetic induction B such that the plane normal of electron orbit makes an angle 300 with B, as shown in figure The torque experienced by electron will be
![](data:image/png;base64,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)
An electron in the ground state of hydrogen atom is revolving in anticlockwise direction in the circular orbit of radius R The atom is placed in a uniform magnetic induction B such that the plane normal of electron orbit makes an angle 300 with B, as shown in figure The torque experienced by electron will be
![](data:image/png;base64,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)
physics-General
physics-
In hydrogen atom, the area enclosed by nth orbit is An The graph between
and logn will be
In hydrogen atom, the area enclosed by nth orbit is An The graph between
and logn will be
physics-General
physics-
In hydrogen atom, the radius of nth Bohr orbit is Vn The graph between
and
will be
In hydrogen atom, the radius of nth Bohr orbit is Vn The graph between
and
will be
physics-General
physics-
In a Bohr atom the electron is replaced by a particle of mass 150 times the mass of the electron and the same charge If a0 is the radius of the first Bohr orbit of the orbital atom, then that of the new atom will be
In a Bohr atom the electron is replaced by a particle of mass 150 times the mass of the electron and the same charge If a0 is the radius of the first Bohr orbit of the orbital atom, then that of the new atom will be
physics-General
physics-
The figure shows energy levels of a certain atom, when the system moves from level 2E is emitted The to E, a photon of wavelength wavelength of photon produced during its transition from level 4/3 E to E level is:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJwAAAC2CAYAAAAsj+QdAAARuUlEQVR4nO3dfXAcZ33A8e/u3vuLTqfTuyWdJEuWJVmS318miW0c8gLEcZKBQCbMhDZQt4EwUNppgVICDdOZtgzQgQTSgWEgLQ0ZaIA4xInrkth5IbYTv9uy/CpZ7+/S6XR3e7fbP2SHxJZpauseS/bv86dPem737utn91a7t5pt2zZCKKJf7QUQ1xcJTiglwQml5mxw46k4qUwaG9kFnUvmbHBPtr7Inr6jxM3k1V4U8f/guNoLcLl+ffIVdE2jNrccv9NztRdHvEdzdobL2BkylgWySZ1T5mxwYm6S4IRSEpxQSoITSklwQikJTiglwQmlJDihlAQnlJLghFISnFBKghNKSXBCKQlOKCXBCaWydgKmlRxnqOsER4/3MGZ5iUTraa4rxGvFGe5u5/TZYUxXAJ/HiUO3SSeS6DmFFJaUkO/VsrVY4irLTnB2gvGBU+x/dQevHz5F90CMRGgpH3v4T1hXNMlY725+9YOtjNRuYFl9CQVem8RABxOheupcReSXGVlZLHH1ZSe4dIyx8XEmAsu59zObMA/9hm8/8gRPNG1izX3FRBfNQ+9qJ7WyniU3rmRRgYY5dITjvU4cMrld07ITnBakqLyJtZVBQh6buONWbml5ip+lUtg2oBnoOmRScSZiY4w6kwyOhQgX5FCYPzW72ZkMdioFtjXtU7hSaYxEEjs+iWU7s7IaALZtk7EsHMb1OutqaIaO5nKDduWzQXaCc7hxOdy4AKwUqckh+qxGbl9XhsvQIA2QZvTsYQ68aTJinOFgT5iGxau5JT+IDmQGB0gePICdmv6qrIajPUSGD2P26MRdvqysRtyy6I4nMJMJFkbysvIcs5+GkZeHu6kZ3Xvlr3N2r9qybczxAfqO/J7ulZ/hSzUGf5iLdHx58yiLVlPpyDBg6nidUx+abStD8sghBr79z9jx+LRD3zUxiN/ZxqRzGyktOx+2Xxwa4XPHTtPo9/HzpgVZeY65wLVgIXmf/iyexqYrHiurwVmJAXpP7OaFzqV85hONeN/1qIE3XEpZdD51BVWUVMfRDScGoOkG/nUb8K/bcMmx/+yZL3BX9U3cW7uefG9uVpa/8Fe/gvs/jruujsptL2flOa43WTsOZ030cObgLrYfL2DTfavJt01G2o7Rk7bI2Bde3OcgGNDpPdHKyQOt2VokMQtkZYbLjJxgz3M/4VuPb+E4IX76IxeGrqE3P8wPv+zjyGuvcKS7l64dv+YZ8zB7gjaxzsN06PWs2HAX87OxUGJWyEpwenAeDbd9in9Yci8pzXh7GtX8JeT7vIRWfYJv/OcmTHcOAZ8bp25jpd5PSvcRyMnO5lHMDlkJTjM8BCJl1ETKpn3cGSqhKlSSjacWs5z8LVUoJcEJpSQ4oZQEJ5SS4IRSEpxQSoITSklwQikJTiglwQmlJDihlAQnlJLghFISnFBKghNKSXBCKQlOKCXBCaUkOKGUBCeUkuCEUhKcUEqCE0pJcEIpCU4oJcEJpSQ4oZQEJ5SS4IRSEpxQSoITSklwQikJTiglwQmlJDihlAQnlJLghFKX/hZzyyQ5McbQOAQLIwTO/6SdpK/1AAOBOioKAwRcGmAx0dfHhKajO20mOs9wdsjECBYRramixA/piWG6hiG/NILX0LATYwz2dtE9nEJzu/G4HOh2BtPUcAXzKJ4XwSd3FrzmTB+cbRIf7uTk0ZP0UExD7vngbBJ9h9j6xD9ycNnX+eTt9dRGNLDGOX1gPz22gSdPo/O1new60sWYUULLPZ/iUzfmkx7t5Ni+Ljpiy2ipycc9OUznrmf48bY+AgsbaawuImAnGemL4yqpYUXJGqqv1xv4XcOm2aTapGNdHN/3Ov/9ZpzosgZKfYBtY0/2ceSll9ix9yhnRyYxrakbGFnjJ+jKuNDxEnFHmH/rZv7yz+9khfsYW7YfIWG48BbXc+PCcV588ln298TI5FTQUOZgrCeJJ9rCjR+6g413buLODatoKQ9O3eZSXHOmCc5ksG0fe1/ZxXDNGmo8ADZ2Okb/vi3syKxmRbmfoOv89s5irK0Ly+UhsGgVCxtbWFodJuAOUTm/lvq66NRN3Qwn7urbuSHxc/795Xb6JzKg62iaRTqZIB6fIDbSS9wfIlzZwPzs3udQXCUXv63pXs6cPs6+YwYt9+eiAXYmQbx3D0+/nMNtD9Wxf6fzD6XaIxzrAXeBj4pCA0gzOXSC3a+/wfZjbtb8RcnUndw0DQ0vzY1Bvrz1NbrWlhMB7PQoXa372B0a52j3MXqdFUTXbORWXwZ7cpILbwN3nnfSxDkRxxofxzKzs7Nnnbt1pp3JYI2Nzvj4pm2jAYamMat3Vw0HmseDNgM3Kb4oODs2yHBXL73JHPLypgJKjHfxP0/tpvz+zxJ1T3LQBsu2sCwba/gAPeRS6C2jQAfMcUb6ujjbcZJT+/fxu0dCVP7wIZa5Ac0gVFqMcaqVUxMJamxA95JbWEpFdRVBY5R03INhZ4i//hqD3/nm1F2hp/G50S5CrjeIuX/EpJ6dnb3BvkEAzJMn6fj4vTM+/s6BQXIcDmoCfnyO2TuluxcsJLz5Idy1dVc81sXBZdJkUiampqM7wE6OMn7kaf7tyWcY/s1zfEuzGT5zgtEdnycWe5QHi7swog34y3OnZj1nLiX167mvagGLl/6aJx47wFudFsuqp+ZEzeXCSCVJWhYWoOlecorKqKheQHlVMVWTkNGduHIWkrf502/PMhfatuc/WF5YR1FRPcEs3RHav2s3HGzFKCgg/ODmGR//X/7qb2jv7ePJv/1rbmhsmPHxZ4qRF8FRPDP3RrsoON3rx5cbJGhNEo9ZaEVhIksf4ofP/ymWBjDBc1/8GC8teoTNmyoY3T1Krs9Peejtewai6QYOT5BAYZSKyjGqCs4/ZpOJxUjllVHgcuLCPre11dB1Hd0IEUx3cOrMGY4ny1ix9n1c6tPD3tTLVFS14Jq/jqA3NCMvxoW8KWvqNckJEbztgzM+fvrvHiFhWbiXrSC4bt2Mjz9jdB3N6fy/f+49uHge9xRTVFZBdeF+urszUOzEcOeQX5Rz7gdihDwOvIEwgdFWOr0lFAaLCeo28RM72bb9VXYPh1lQmYOWTFO26aOs8k/9pm1n6DzVTWTJXcxLdnLgzVY6Ok8w+rvnCcTaKNDi9J88SzynhpUfbURzX3ozYzoNMi4XmseN5vHMyItxIc019SJrupad59C0c8/jyto6zDYXv6N6DuULGliyvJ/XD7SRWNLAu18KL2s//xhNgfmU+KMURz14fT4MNNzFC2he4yI0YOEvKKAwHMSXEyGgA2SwM+3sbC3hjvsXMa88F2PjF/jmqgR6IIeg342TDKnVKWyXn3D+7N2nEZdvmnfVwF9aT8vKNKn9R3j12DzWLwi94/iJQaSmhQgAAfzv/E1/AWULQhRWZsDpxuN2nPs9G8sc59TOVzDXPsAHGwvJDbpx5NQRnv6WquIaNe00orlCFFa3sMbTSX96lKFkiHz3exlOx+Hy4HC9+19tK4M5NkQ8bykbGmspz3HhmNXHAUS2XGK7peHw5lBQ6SMUnyB1hX/i19AwPLmU1laS59Nn9zEnkVV/dEdJMxy4gyHe0+T2x+gGDn/euc2wuJ7J6UlCKQlOKCXBCaUkOKGUBCeUkuCEUhKcUEqCE0pJcEIpCU4oJcEJpSS4CyQSCWKxGKZpXvSYZVn09vZiX+Y1jJZl0d/ff8nHxsfHmZycvKyx5wo5y/EClmXx4rZt7Nixg+GhYQD6+wd4/Ps/oKOjnUgkwmcffhjnZZxynUwm2bp1K2++tZf51dWMjY0B8Itf/hfPbtnC6tWruXnDBrxe74yu02wiwV3A5XKBbbN3716Otx0HoL+/n8cff5xUKsXXv/41NO3yTrAyDIOKigq++sjX8Pl8jI5OXXq4ZcsWCgryWblyJT5fdi4Imi1kk3oBh8NBc3MzLS0tDA1PzXCJRIKO9nZKS0q4ecMGjMu8PtPpdLJ48WKam5vo6Oh4e7Pd19dH06ImGhsa8Fzj1zYomOFsrEyS0e6TtB5uY0CLUBDyYOhgJceJeyqoq55Hcdgza07MLCsrY/Wq1Tz//Fba29sBCASD3HPP3UQil39Wn6Zp+Px+HnjgAd54YxcjIyMA5OXlsW79OqLRyhlZ/tlMzQxnW5jxYQ7/5jG+/9wh+kZjJBIJEvF+2traGRiZuMT19VeH2+2mqWkRa2+6CZiamSqjUTZu3HjFYxu6zvvWr6ehoWFq8w2sXLmS5uZmgsHAFY8/2ymY4TR0h5fwvBqKzNOcskppWbGa8lwPdqKX3LZRIoHZtysZjUZZu24tv/3tb0HTuPnmm4lGo1c8rqZphEIhPvLhD9Pa2srk5CQfuP02ohUVM7DUs5/Sd1o3dOzkGIP9/biTBmMd/QQqKwlFQrNuZ9Lv99O0qImbbrqJ02fOcM89d8/o+Bs33sFPn3wSr8fD8uXLCYfDMzr+bKV4arHJjHZy7Ohhhr1Jjr56hvJNQYJ5Ifzv3IGzbTKjI5jt7WBb045U2T5EKHOadOIACXd2NkVFo6Pc2VDH7xNxaq0MiX1vzdjYYeD986soLykhMtg/o2PPNN3nxzGvDH0GPkEr35YZwSIqKqso8SVInU3i97q48DOfbdskDh1k+Hv/ipVKTjvOR4bPEHa3Efe8QErP3mq0WBZlZpr+R78642PfmkyRO9KP1XqQvss81KKCq3YB4Qc3466pveKxFAenoXvzmFdeQXmuh7JIOROGAyOTJqM5MM695pqu421ejPGVR859ZdfFvvHyd1k7r4UNZUvIzdIMd96V77lNryBL4840PRDEVT4z+5iKgrOxMhnSGQtbS2OaJqZpoPm8JPa+wnFfFWVVVUTfsV3Vg0E89Y2XHPFUe4SW6iqctYvxenNVrISYAUqOw6WTI7S/uZXth0YYyjzLT37cTr7PQXroKG90lHH3A1Ga5RukrwtKDos4XGGqb7iPR5/dxFdsFx63MXWQ187wScvA5Xbhkt6uC2o2qZqG4fTgD3ne9eU34voz2w5/iWucBCeUkuCEUhKcUEqCE0pJcEIpCU4oJcEJpSQ4oZQEJ5SS4IRSEpxQSoITSklwQikJTiglwQmlJDihlAQnlJLghFISnFBKghNKSXBCKQlOKCXBCaUkOKGUBCeUkuCEUhKcUEqCE0pJcEIpCU4oJcEJpSQ4oZQEJ5SS4IRSEpxQSoITSklwQikJTiglwQmlJDihlAQnlJLghFISnFBKghNKSXBCKQlOKCXBCaUU3fP+PBtr7DS7Xj9EX9IinUph5C+gaVEN5RGf6oURV4GyGc7OpIgff47v/NPPOKqVUlW3iJaWWnK7tvPLp55l+4Ee4raqpRFXi5pJxU5jThzj2e9+j5eMT/ClhQuoLfXj1k3CmVPs+v4LbJt0EAh9gDUVXjQg3d9H8sgh7HR62iGbDndTMHSAVJdGzOVTshrXJw0jFMK9sB7dH7ji0dQEl5lksv0VfrHlNHmP3kBNvg+3oQEuwjUrqMv7Bb8/sJt9S5axvCKK07JI9/cRf3Un9mRi2iEbTneT3w3myVHihlvJalyvnGXlOErnzZ3g7IyJ2XOSEyMBbi4KYBjaHx408oiEPaRigwwOjWLa4NI0jHAe3mUrsE1z2jHb9DbCRTU4ixvxygyXVUZuGN07M6+xkuA0TccI5BB0TBKLmdjv3FezTVKmhdMTwOvxYEz9As6SUpwlpZcc883U76ioXoqrdj1Bb262V0HMEDUfGhwePNEVbFikcWJPK0OTJplzD6VHTnC6XyM/WkddVSFu7Y+OJOY4NftwuhtXZBUf2/wh2l7YwZ6DARLFOXg0k7GTu+lyN7Jy1Y0snR9Ceru2KTr0pWG4cqi5+4v8fehpXtj/FnvOBnDbMYbH/Sy54xaWNUQp8Ehu1zqFx1o1NCOHmlsepOYWdc8qZhf505ZQSoITSklwQikJTiglwQmlJDihlAQnlJqzwa0sqmdhuByPQ84UmUs027bn5GmPh4dOU+TLI9cdwNDm7P+b686cDU7MTTI1CKUkOKGUBCeU+l/QvXXbgVz/fQAAAABJRU5ErkJggg==)
The figure shows energy levels of a certain atom, when the system moves from level 2E is emitted The to E, a photon of wavelength wavelength of photon produced during its transition from level 4/3 E to E level is:
![](data:image/png;base64,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)
physics-General
physics-
The ionisation energy of
atom in ground state is :
The ionisation energy of
atom in ground state is :
physics-General
physics-
A cylindrical solid of length L and radius a is having varying resistivity given by r = r0 x where r0 is a positive constant and x is measured from left end of solid. The cell shown in the figure is having emf V and negligible internal resistance. The electric field as a function of x is best described by :
![](data:image/png;base64,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)
A cylindrical solid of length L and radius a is having varying resistivity given by r = r0 x where r0 is a positive constant and x is measured from left end of solid. The cell shown in the figure is having emf V and negligible internal resistance. The electric field as a function of x is best described by :
![](data:image/png;base64,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)
physics-General
physics-
A charged oil drop falls with terminal velocity V0 in the absence of electric field An electric field E keeps it stationary The drop acquires additional charge q and starts moving upwards with velocity V0 The initial charge on the drop was
A charged oil drop falls with terminal velocity V0 in the absence of electric field An electric field E keeps it stationary The drop acquires additional charge q and starts moving upwards with velocity V0 The initial charge on the drop was
physics-General
maths-
if
find the value of x in given figure.
![](data:image/png;base64,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)
if
find the value of x in given figure.
![](data:image/png;base64,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)
maths-General
maths-
The number of positive integral solutions of the inequation
is –
The number of positive integral solutions of the inequation
is –
maths-General