Chemistry-
General
Easy
Question
Assertion: The value of Vander Waal constant a is higher for NH3 than for N2.
Reason: Hydrogen bonding is present in ammonia.
- If both Assertion & Reason are true &the Reason is a correct explanation of the Assertion.
- If both Assertion and Reason are true but Reason is not a correct explanation of the Assertion.
- If Assertion is true but the Reason is false.
- If Assertion & Reason both are false.
The correct answer is: If both Assertion & Reason are true &the Reason is a correct explanation of the Assertion.
Related Questions to study
chemistry-
If 10-4 dm-3 of water is introduced into a1.0 dm-3 flask at 300K,how many moles of water are in the vapour phase when equilibrium is established? (Given : Vapour pressure of H2O at300 is3170pa;R=8.314JK 1mol)
If 10-4 dm-3 of water is introduced into a1.0 dm-3 flask at 300K,how many moles of water are in the vapour phase when equilibrium is established? (Given : Vapour pressure of H2O at300 is3170pa;R=8.314JK 1mol)
chemistry-General
chemistry-
Under identical conditions of temperature and pressure the ratio of the rates of effision of O2 and CO2 gases is given by–
Under identical conditions of temperature and pressure the ratio of the rates of effision of O2 and CO2 gases is given by–
chemistry-General
chemistry-
Which of the following has maximum root mean square velocity at the same temperature?
Which of the following has maximum root mean square velocity at the same temperature?
chemistry-General
maths-
The polar equation of the circle with centre at
and passing through pole is
The polar equation of the circle with centre at
and passing through pole is
maths-General
physics-
Figure given below shows a beam of light converging at point P. When a convex lens of focal length 16 cm is introduced in the path of the beam at a place O shown by dotted line such that OP becomes the axis of the lens, the beam converges at a distance x from the lens. The value x will be equal to
![](data:image/png;base64,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)
Figure given below shows a beam of light converging at point P. When a convex lens of focal length 16 cm is introduced in the path of the beam at a place O shown by dotted line such that OP becomes the axis of the lens, the beam converges at a distance x from the lens. The value x will be equal to
![](data:image/png;base64,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)
physics-General
physics-
The combination of a convex lens (
= 18 cm) and a thin concave lens (
= 9 cm) is
The combination of a convex lens (
= 18 cm) and a thin concave lens (
= 9 cm) is
physics-General
physics-
A convex lens has a focal length f. It is cut into two parts along the dotted line as shown in the figure. The focal length of each part will be
![](data:image/png;base64,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)
A convex lens has a focal length f. It is cut into two parts along the dotted line as shown in the figure. The focal length of each part will be
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAE0AAACPCAYAAAC/KVYPAAASn0lEQVR4nO2de1BU5f/H3+eyyy7IEiAil+WqUJAXHLQ0Y0RJEgzRUfsjM29lM9qU5jRjTllTOZVaMzjTjJZp2DRaZio66XCJyAQdSIVRUREXcOV+EVT2ci7fP/jtBriXc3afXf01vGbOH+wenvM8L57L53nOcw6UKIoiPIwoiqAoytOX8Rq0Ny7yXxIGeEnaf40RaS4wIs0FRqS5wIg0F/C6NKPRiIqKCngh0vEYXpeWl5eH+fPn48iRI96+NDG8Ku306dMoKCgAz/PIz89HdXW1Ny9PDK9Ju3z5MvLy8rB06VIEBQVh+vTp+Pzzz9HS0uKtLBDDK9K6u7uxdetWJCQkYOLEiQCAOXPmwGQy4csvv4TRaPRGNojhcWmCIGD37t2gKAq5ubmgaRpRUVFQKpVYvXo1qqurcezYMU9ngyiUpyfsJ06cwJ49e7B27VpERETAbDZbv1Mqlbhy5Qr279+P7du3W2vh445Ha9rNmzfx6aefYuHChYiNjQXP86BpGiqVCjRNg+M4TJo0CbNmzcKGDRtw//59T2aHGB6VtnPnTqSkpCA1NRVGoxE0TUMQBJw8eRIsy4KmaRiNRsydOxcBAQHIy8vzZHaI4TFpBw4cQGNjI9asWQNBEEBRFCiKAsdx2LdvHxQKhfUzhUKB9evX448//kBJSYmnskQMj0i7du0atm/fjuXLl8PHxwcURYGmaethNpuH/AwAoaGhyMjIwLZt29DR0eGJbBGDuDSz2Yy8vDwsWrQISUlJ1lXbwQcAm59lZGRg/Pjx2LdvH+lsEYW4tN27d6O1tRXZ2dnWfmvw4ePjg1dffRWiKD5U2zQaDbKysnD8+HGUlpaSzhoxiEq7ceMGSkpKkJWVhaCgoIfEWKStWrXK5nccxyExMRHPPfccfv75Z/T29pLMHjGISeM4DocOHYJWq8Xs2bOt4cXwg6IoPHjwwO53FEVh1apVqK+vx+nTp0lljyjEpNXW1qKsrAw5OTnWZZ/h/RZFUTCbzdi+ffuQ0XPwIYoilEolli1bhu+///6xrG1EpJlMJuzYsQPp6elITEwEx3E2hVjitLKyMjAMY/Mci9i0tDSEh4c/lrEbEWlFRUVoaGhAbm4uTCaTzaY3uAkCcHiOpX9bsWIFiouLUVdXRyKbxHBb2t27d/HFF19gw4YN8PPzeygmG34wDAO1Wu1UGkVRiI6ORmZmJj7++GMSZSWG29IOHDiA+Ph4TJw4cUjkb+sAAJVKhW+++cZuEx5+fnp6Ovr6+lBeXu5uVonhlrT29nYcPnwYr7zyCliWdSqBoigwDIOEhAQAtgeK4dLCw8ORmpqK/Px890tLCLek/fDDD5g8eTKio6MHEnPS5CxB7M2bN8EwjKQmyrIsZs+eje7ubvz555/ul5gALktrampCRUUF0tPTodFoADivOZaRccuWLXZDjuGHIAiIj49HfHw8ioqKIAgCscK7isvSjhw5gtDQUEyZMgU8z0sSQNM0RFHE7du3hwSzzpooRVFYsGABLl26hAsXLhArvKu4JK2pqQkXLlzArFmz4O/vP5CQhKY5uInKOZ/neSQkJCA+Ph5lZWXgeZ6cARdwSVplZSU6OzuRlpYGo9EoqcZYag3DMJgwYQIAac3ZcvA8j5deegnFxcXo7OwkZ8AFZEvr6+tDYWEhsrKy4OPjA0Be4dVqNXbv3i0p5BjeF6akpEClUj3yFRDZ0m7duoXr169bb8HJKbjlUKlUsn8HGJiuLV68GPv373+kA4JsaYcOHcL06dMRHBxsDWbl9E+CIODQoUNQKBSSf8cijed5PPPMM+jr60NlZSVxGVKRJa21tRWnTp3C0qVLYTAYrJ9LrS2Wpe6vv/5acjBsEQYM7N1lWRaLFi3C3r17yVmQiSxpx44dQ2pqqnWB0YLcpsZxnOSQY7A0YEDczJkzUVNTg66uLjIWZCJbWkZGhs0h35W+zVVpo0aNQlJSEk6dOuVe6V1EsrTq6mpwHIennnrK5t4yqYVXKpV4/fXXJQfEtlCpVJg8eTKKiopcLLZ7SJZ27NgxpKSkWMOM4UitNUqlEm+99ZbTFRFH0miaRmJiIu7evYv6+nrXSu4GkqQZjUZcvHgRKSkpUCqVds+TKs4dYcDAppqQkBCMGTPmkUziJUkrLy+Hr68vtFqtw22fUkQYjUasXr0aSqXSLWmBgYHQarWPZGOgJGnnz59HaGgogoKCnAaVjiRY4rTKykqH9wgcCbMgiiKioqJw79496PV6aaUlhFNpZrMZOp0OWq0Wvr6+j80GY57nodVq8eDBA6/fQ3Aqra6uDgaDAVFRUeA4zuG5UponwzAYM2aMpPMdwfM8wsPDwbKs1wcD1tkJdXV1uH//PqKioqw3gB3hrMBqtRo7duyAIAh20xJF0WmNtswO4uPjUVdXhwcPHsDX19dZcYggqaaNHj0agYGBRJomTdOYNm0akQm3ZRuDTqfz6nKRQ2ldXV3Q6XR48sknIQiCZGnOmtydO3ccTqOkwvM8YmJi0NLSgrt370r+PXdxKK2npwd6vR7R0dFEVkspikJ/fz/mzZvnMN6TiiAICA4OBsuyuH37ttvpScWptI6ODmt/JgdHtcjROpxceJ7HuHHjcP36da+tsTmUptPpEBQUhFGjRsnuz6SMiqSkxcfH4+rVq0N2jnsSu9I4jsPVq1eRkJDgcmZsCWFZFjNnzrT5vTvSamtrYTKZXMqnXOxKM5vNqK2tRVxcHNFqr1Kp8NVXXxGrFYIgIDIyEs3NzU7jSFI4lHbr1i23BgF7zdPf359ILbOgUCgQHByMpqYml9OQg11pBoMBPT09GD16NNGaxnEcjh49CoZhiKUpCALGjh2LhoYGYmk6wq40vV6PoKAgKBQKty4wfMJuMpnw/vvvE6tlwMDsIDQ0FDqdzq10pGJXWn19PcLDwx+LvRPOEEURYWFhXpuD2pWm0+kQFhZGZOpka4lo8OfuIooiQkJCcOfOHbfTkoJdaQ0NDQgJCSG6FGTZhLx582ZiaVrw9/dHd3c38XRtYVdad3e3dXMLSRQKBZYtW0a02VvuUPX09BBL0xF2l4Ys0kjVtOHN0PIzifRFUYS/v7/Xts87rGkajYb4Sq3BYMCbb75JpC8bjFKpBMuy6O/vJ5quLexK6+npId48KWpgy5Qn7iCJoghfX1/09fURT3s4NqVxHAee56FSqYjVtMFPsQz/jBSCIBANmu1hUxrP8x67OEVRiIyM9EjaHMe5HYxLwaY0R+v37mKZsHsCnufBsk5ve7iN3ZrmKWk0TVu3j5LmPytNEASPzREfqTRPvvjSYDBg8eLFxNMVRdGjf+zB2LyCWq0estORJKIoeuT9G54cvIZjU5qPjw84jvt/scIB/Bv/eaNpAg6CW7Vajf7+fuLNlGVZZGdnE00T8F5/BjiQ5ufn55EpiVKpxEcffUQ8XYPBYHfDIWnsSvP19UVjYyOxjpWiKOsMwHJLkFQtpigK7e3tCAsLI5KeM+waceUGsRQ4jsMvv/xCtNlTFIWWlhZERUURS9MRdqVZ9kiQLpzRaMSHH35ILE1Luq2trYiJiSGarj3sSouNjUVzczMxaZbtU57YFPjYSPNETRsOyQXOx0JadHQ0WlpaiEbYoijCx8cHn3zyCbE0gYH5bEtLC7RaLdF07V7P3hcBAQFQKBTo7u4mcl/ScjAMg8WLF4PneSLNlaIotLW1ISAgACqVyq20pGJXGsMwCAsL80htI3kDhKZpdHR0ICws7NFOo4CByD08PNxtaYNrmSiK1tGTYRgigwPLsqipqUFQUNCjnxGwLAutVou2tjaiAS7HcSgsLCSSHjBQ05qbm5GYmOiVVVvAibS4uDjcunXL5Wo/vJYNr1X2PpcDRVHQ6/VISUnxyrIQ4GQnZFJSEpqamohO3CmKQnBwMJG0aJpGa2ur9UEMb+FQWmBgIMaOHWt9Y4tchtckQRCgUqnw008/wWw2O6yFUrA8eBEREYEnnnhCdv5cxaG04OBgREdHuyzNFhRFOX0wTSoMw6C+vh5arRaBgYEEcicNh9I0Gg0iIyNx7do12SOTIAg2D47jUFVVZa15ww+pWFZN6uvrERsbC7VaLSt/7uC054yJicG9e/fQ3d3tdkdLURQMBgM2btzo9khnic/MZjMiIiLcSkv2tZ2dEBMTA7VaDb1eL7mJ2hs1LbWrra3N4XmSMv5/oYavr6/XloSs13Z2QkxMDFQqFZqbm70WcUuBYRjo9XoolUrrq8i8hdOOKiAgABqNBnq9XnKfY6+2WOaemZmZ1rmnK1AUBZPJBJ1OhzFjxnjt6TsLkjqplJQU6PV6dHV1OezX7HXugw+FQoFt27bBaDQ6PM+RUJqm0d7ejvb2duuDHN5EkrS0tDR0dnaivb2dSNTtbhoWaZ2dnZgxY4bb+ZF9fSknhYeHIyQkBFeuXHF638DRICCKIkwmE3788UfrC+hcGQzMZjMuX76MhIQE+Pn5SS8tIST/yTMzM3Hx4kWHzx85Ewb8+yLh4ascUsVZ7jNcvHgRmZmZMotLBsnSMjIyoNPp0NXVZXce6kzCYBlSz7NFR0cHmpubkZaWJrO4ZJAsTaPRIDk5GRUVFZ7Mj1MoikJ5ebn1BXSPAlk98pIlS1BaWmqzI3c2agqCAJ7nJY+e9qZVNE3jr7/+Qm5uruuldhNZ0mbOnImOjg40NDQ8JE5q06RpGvPmzRtyj0BqM2UYBteuXUNvby+ef/55MgZcQJY0pVKJ7Oxs/Pbbb0P2TUgt/OBplJzfGXz9I0eOYMGCBV5bpbWF7IBpwYIFOHfu3JBAV44Ao9GIrVu3gmVZWdJomkZnZyeqqqowf/58shZkIltaXFwcpk6dioKCAqjVatk1huM4lJeXW5d2pB4qlQonT57E9OnTvbpKawvZ0nx9ffHCCy+goqLCGn5I6dCHd+5yzqcoCn19fTh79iwyMjK8PtccjkvzmYkTJ0Kj0eDcuXNQKBSyaowoilbRUs9XKBSoqqqCn58fkpKSSDuQjUvSIiIi8PTTT6O0tNS68U/qIKBWq3Hq1CkYjUbJTdpsNqO4uBhxcXFe26/hCJdnznPmzEFPTw+uX78OhmFkNTeNRiP5XJZlcenSJdTU1GDu3Lkky+4yLkubMGECxo4di/Pnz1vno1JqDsdxOHv2rOSBwGQy4erVq0hOTsa0adOIFdwd3FqjWb58OYqKitDa2ipZgtFoxGeffSZpwk5RFDo6OlBaWorc3FyPbvuSg1vSJk+ejKSkJJw8edK6hd7ZwiLP8+jo6JDcPM+cOYNRo0Zhzpw5pMrsNm6vKK5btw7Hjx+3vopLaucu5bz+/n6cOHECK1ascDebRHFb2rhx45CVlYXvvvvOafhhebovNTXVacjBsiyKi4vh5+eH9PR0EmUlBpEdIytXrkRVVRUaGxudBrsKhQI7d+50uMohiiLu3buHw4cP45133iGRRaIQkRYdHY2cnBzs2rXL+lpWZ0tEjr5XKpUoKChAeHg4pk6dSiKLRCEijaIoLFmyBPfv38fZs2ehVCodhhDffvut3XsEDMOgsbERxcXFePvtt4m80Y80xDZ0xcbGYsmSJTh48CB6enpsSgEGovuDBw/alcayLAoKCjBp0iQkJyeTyh5RiO6Ce/HFFzF69Gjr/0CRO5FnWRbV1dWora3Fyy+/7NVNLXIgKi04OBgLFy5ESUkJmpubH+rfLH2ZrWmXpemWlZUhOTkZU6ZMIZk1ohDfb5mdnY3IyEgUFxfbDHhZlsX69ethMpkeWv6prKzEP//8g9dee410tojikU2qmzZtQmFhIWpqah6aXtm6RwAA/f39+P3335GVlYXx48d7IlvE8Ii02NhYrFmzBvn5+VY5g2tVb2/vQ4uShYWFMJlM2LhxoyeyRBSPbYdeuXIloqOjsW/fviEjpcFgwAcffGCdsFMUhd7eXhw9ehTvvfeep7JDFI/uId+0aRPKy8tx6dIlKJVKCIJgfRUs8O/oumvXLuTk5Dw2Sz/O8Ki0+Ph4vPvuu/j111+tD3FYmqPlXUYlJSXo6urCG2+84cmsEMXjTyvk5OQgISEB+fn51n82GBoaCpqmcfPmTZSUlGDz5s3Eni3wBh6XplKpsHbtWrS1teHMmTNQq9XYunUr+vr6cODAATz77LOYNWuWp7NBFK88FxMXF4cNGzaguLjY+q9H/v77bwiCgFWrVj02K7JS8c5jaxjYqnXjxg3s3bsXM2bMQEVFBbZs2eL17exEEL3MunXrRLVaLe7Zs8fblyYGJYqiV/89T09PDwoLC5Gbm/tIN7G4g9el/RfwzgOS/zFGpLnAiDQXGJHmAiPSXGBEmguMSHOBEWkuMCLNBUakucCINBf4HwL+1XJqGSEyAAAAAElFTkSuQmCC)
physics-General
chemistry-
A compound MpXq has cubic close packing (ccp) arrangement of X, its unit cell structure is shown below. The empericial formula of the compound is
![](data:image/png;base64,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)
A compound MpXq has cubic close packing (ccp) arrangement of X, its unit cell structure is shown below. The empericial formula of the compound is
![](data:image/png;base64,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)
chemistry-General
chemistry-
If the average velocity of N2 molecules is 0.3 m./sec.at 27°C,then the velocity of 0.6m/sec will take place at-
If the average velocity of N2 molecules is 0.3 m./sec.at 27°C,then the velocity of 0.6m/sec will take place at-
chemistry-General
chemistry-
If the four tubes of a car are filled to the same pressure with N2,O2,H2 and we separately then which one will be filled first -
If the four tubes of a car are filled to the same pressure with N2,O2,H2 and we separately then which one will be filled first -
chemistry-General
chemistry-
The rms velocity of CO2 at a temperature T (in Kelvin) is xcm/sec. At what temperature (in kelvin) the rms velocity of nitrousoxide wouldbe4xcm/sec.
The rms velocity of CO2 at a temperature T (in Kelvin) is xcm/sec. At what temperature (in kelvin) the rms velocity of nitrousoxide wouldbe4xcm/sec.
chemistry-General
chemistry-
The following graph illustrates-
![](data:image/png;base64,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)
The following graph illustrates-
![](data:image/png;base64,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)
chemistry-General
chemistry-
The molecular velocities of two gases at same temperature are u1 and u2,their masses are m1 and m2 respectively, which of the following expression is correct?
The molecular velocities of two gases at same temperature are u1 and u2,their masses are m1 and m2 respectively, which of the following expression is correct?
chemistry-General
chemistry-
The values of vanderwaals' constant 'a' for the gasesO2,N2,NH3 and CH4 are 1.360,1.390,4.170 and 2.253Latmmol–2 respectively. The gas which can most easily be liquefied is–
The values of vanderwaals' constant 'a' for the gasesO2,N2,NH3 and CH4 are 1.360,1.390,4.170 and 2.253Latmmol–2 respectively. The gas which can most easily be liquefied is–
chemistry-General
biology
Which of the following character is not taken into consideration while preparing a karyotype-
Which of the following character is not taken into consideration while preparing a karyotype-
biologyGeneral