Physics-
General
Easy
Question
A part of circuit in steady state along with the currents flowing in the branches, the value of resistances is shown in figure. Calculate the energy stored in the capacitor
![](data:image/png;base64,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)
The correct answer is: ![8 cross times 10 to the power of negative 2 end exponent J](data:image/png;base64,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)
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physics-
In the steady state, the energy stored in the capacitor is
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)
In the steady state, the energy stored in the capacitor is
![](data:image/png;base64,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)
physics-General
physics-
In Wheat stone’s bridge shown in the adjoining figure galvanometer gives no deflection on pressing the key, the balance condition for the bridge is :
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)
In Wheat stone’s bridge shown in the adjoining figure galvanometer gives no deflection on pressing the key, the balance condition for the bridge is :
![](data:image/png;base64,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)
physics-General
physics-
A current of 0.10 A flows through the 25
resistor represented in the diagram to the right. The current through the 80W resistor is:
![](data:image/png;base64,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)
A current of 0.10 A flows through the 25
resistor represented in the diagram to the right. The current through the 80W resistor is:
![](data:image/png;base64,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)
physics-General
physics-
In the circuit shown in figure, the potentials of B,C and D are :
![](data:image/png;base64,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)
In the circuit shown in figure, the potentials of B,C and D are :
![](data:image/png;base64,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)
physics-General
physics-
The energy stored in the capcitor is
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)
The energy stored in the capcitor is
![](data:image/png;base64,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)
physics-General
chemistry-
The vapour density of a gas is 11.2. The volume occupied by 11.2 g of this gas at N.T.P. is
The vapour density of a gas is 11.2. The volume occupied by 11.2 g of this gas at N.T.P. is
chemistry-General
chemistry-
The r.m.s velocity of hydrogen is
times the r.m.s. velocity of nitrogen. If T is the temperature of the gas,
The r.m.s velocity of hydrogen is
times the r.m.s. velocity of nitrogen. If T is the temperature of the gas,
chemistry-General
Maths-
The difference of
and its reciprocal is
So here the concept of reciprocals and reciprocating the numbers is used. It is basically comparable to flipping the number on its side. Here we were given the numberand the difference between this number and its reciprocal is 105/304.
The difference of
and its reciprocal is
Maths-General
So here the concept of reciprocals and reciprocating the numbers is used. It is basically comparable to flipping the number on its side. Here we were given the numberand the difference between this number and its reciprocal is 105/304.
chemistry-
Which of the following volume (V)- temperature (T) plots represents the behaviour of one mole of an ideal gas at one atmospheric pressure?
Which of the following volume (V)- temperature (T) plots represents the behaviour of one mole of an ideal gas at one atmospheric pressure?
chemistry-General
chemistry-
The van der Waal’s parameters for gases W, X, Y and Z are
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/552207/1/1041369/Picture5.png)
Which one of these gases has the highest critical temperature?
The van der Waal’s parameters for gases W, X, Y and Z are
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/552207/1/1041369/Picture5.png)
Which one of these gases has the highest critical temperature?
chemistry-General
chemistry-
The following graph illustrates
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/552206/1/1041368/Picture6.png)
The following graph illustrates
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/552206/1/1041368/Picture6.png)
chemistry-General
chemistry-
At constant volume and temperature conditions, the rate of diffusion DA and DB of gases A and B having densities
and
are related by the expression,
At constant volume and temperature conditions, the rate of diffusion DA and DB of gases A and B having densities
and
are related by the expression,
chemistry-General
Maths-
The graph (y x) against
is as shown. Which one of the following shows the graph of y against ?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAANsAAACcCAYAAAD23t6UAAAQQElEQVR4nO3de0xT5/8H8HdXUMGiRFEnKheZ4ixMUCMqoAyd02m2eYtrvMzhXDJFk5mATLOFGLc5UREGEqczKl6CCsgUi44Jzk0uwzHjEMGCEwIF5A6WSYvn94c/G/ulcimn56Ht55WY2NPT03eTvnmetuci4jiOAyHE6F5jHYAQS0FlI0QgVDZCBEJlI0QgVDZCBEJlI0QgVDZCBEJlI0QgJl2227dv48GDB6xjENIjJl22qKgoXLx4kXUMQnrEZMumVCrR0tKC+vp61NXVsY5DSLesWAcw1Pr163Ht2jUAgEajQUREBONEhHTNZEc2QkwNlY0QgZhk2datW4fc3FzWMQjpFZMs2507d9DY2Ki9nZKSgoMHDzJMREj39JYtNTUVZ86cESTAs2fPEBISgsrKSoO38eDBA9y+fZvHVITwr1PZUlNTkZeXhyFDhggSQCQSYcSIEThy5AgePnwoyHMSwkKnsl25cgUcx2HJkiWCBBCJRAgNDcWFCxdQWlra7fonTpzQ+7tacXExLl26ZIyIhPCiy89sSqUSN27c0Htfbm5ut+VIT09HbW1tp+XV1dXIyMjoRcznOI7D9u3b4e7ujqVLl2LcuHHw8PDA0qVL8ezZM0RHR/d6m4QIRadsRUVFsLW1xbhx4wAAOTk5CAsL0/vAffv2ITU1tcuNHzt2DHK5XKdwNTU1SE1NRXx8vM66Xl5eqKiowOPHj7vc5vTp0/Hjjz8iKSkJAQEBWLduHZKSkrB7925Mnjy5y8eaktLSUpSVlbGOQXikU7YdO3bA1dUVGzZs6PJBlZWVGDx4MIYOHdrlemfOnEFaWhpSUlLQ1NSExsZGXLhwAX/88QeOHTums258fDxOnjyp3StEH5FIhMuXL8PNza3Tfe+++y6ioqK6zGMqqqur8cMPPyAxMZF1FMKjLnfXsrKywsCBA6FSqWBra6tdLpPJEBwcjJUrV3b7BKdPn4ZMJkNraytUKhUUCgV++umnvic3Y8HBwQgICMDmzZtZRyE86rJsCxcuhJ2dHWbMmIF//vlHqEyEmKUuvyB5eWTri4MHD6K8vBytra347rvv+rQtc7dq1SosXrwYa9asYR2F8KzbPUikUimio6MRGBiI1tZWfPTRR9i4cSMCAwMBAMePH4evr6/237Jlyzpt49ChQxg5ciRsbGxw9OhR/l+FGamsrIREIun28zAxPd0eYmNnZwepVIrs7Gx0dHQgPz8fmzZtwvDhwwEAs2bN0nljvPzZ7oXi4mLMnDkTHR0dUCgUPMY3L5s3b8aaNWswe/Zs1lGIEfT5eDZ3d3e4u7u/8v7IyEhMmTIFgYGB0Gg0kMvliI2NpQ//evzyyy+QyWRwdHRkHYUYgTg8PDz85QUvfttxcXHRLhOJRLCyskJ2djY8PT0REBAAe3v7bjceGxuLhoYGfPjhh/D09MTo0aMhkUiQn5+P4uJiTJs2TbvuoUOH4ODggICAAIwaNapH4ZOTkzFq1Cj4+vr2aP3+Sq1WY+/evZBKpQgICKAppJnS+cy2atUq1NTUIDMzU2cle3t7hIaGIjIyEjKZDM7Ozj3aeF1dHWQyGTw8PLTLvL29sWLFCtTX1+usGxcXBz8/P3h6ehr6WkxSc3Mzjhw5goqKCnz++edwcnJiHYkYiVFPi/D111/rXS6VSiGVSo351CajtrYWISEhqKqqgp2dHes4xIg6lc3V1RWtra0oKSmBm5sbWlpacPfuXajVakybNg02Nja8BuA4Dnl5eZg4caLFTZ9aWlpw7949+Pj4QCwWs45DjI3TIzo6mtu5cyfHcRyXn5/Pubm5cVKplGtubta3ep9oNBpu+vTpXFFRUa8fu3btWm7v3r28ZxLKrVu3uPHjx7OOQQSidxq5ZcsW7f+9vLyM+nW9WCzGn3/+abTt91cajQbt7e16fyoh5slkT2Vn6uRyOfbv34+cnBzWUYhATPIcJOaARjbLQ2Vj4OLFi0hLS8Phw4dZRyECommkwBISEpCfn4+goCCL+03R0tHIJrD79++jqakJPj4+rKMQgVHZBHT58mUAwOLFixknISxQ2QT04pwtQp25jPQvVDaB5OTkYOjQoZg0aRLrKIQRKptAvv/+e7i4uGDVqlWsoxBGqGwCqKiooKOvCZXN2FQqFVavXo2VK1dCJpOxjkMYot/ZjMzHxwcxMTEmf4Ar6Tsa2YxMpVJhwIABsLKiv2uWjspmJCqVCoGBgYiKitI5Up1YLiqbkXR0dCAnJweTJ0+mI7AJACqbUdTU1ODLL79EREQEHBwcWMch/QR9kDCCpqYmnDx5ElVVVXQIDdGikY1nSqUSV65cwYYNG+hLEaKD3g08KykpQWxsLIqLi1lHIf0MjWw8qqurQ1lZGby9vVlHIf0QjWw8aWpqwqVLlyCXy5GQkMA6DumHqGw8OXXqFDIzM3H+/HnWUUg/RdNIQgRCIxsPIiMjUVZWhpiYGNZRSD9GIxsPGhoaoFare3z1HWKZqGx9FBcXBysrK2zcuJF1FNLPUdn66O+//4ZIJMKUKVNYRyH9HJWtD86ePQtHR0fMnTuXdRRiAqhsBkpKSsKdO3cwb948zJkzh3UcYgKobAbau3cvZs+eDT8/P9ZRiImgshng9u3bcHV1xbBhw1hHISaEfmczwPLly5GQkECnECe9QmXrBY7j8OTJE9jY2NBleUmvUdl6obm5GW+88QZu3ryJCRMmsI5DTAx9ZusFjuPQ2tpKIxsxCJWth8rKyrB8+XJcvXoVr7/+Ous4xATRNLIHCgoKEBERgS+++AK+vr40qhGD0MjWA7W1tcjOzsaSJUuoaMRgVLZuFBQUIDMzE8HBwayjEBNH08huFBQUICMjA5mZmayjEBNHI1sXSkpKUFlZCX9/f9ZRiBmgka0LqampyMrKohP4EF7QyPYK9fX10Gg0dPQ14Q2NbHo8ffoU+/fvR3t7O6Kjo1nHIWaCRjY9tm3bhsGDB2P37t2soxAzQmXT4+nTpwCAgQMHMk5CzAlNI/9HSEgIPDw8sGLFCtZRiJmhke1/FBYWws7ODmPHjmUdhZgZKttL9uzZgzlz5tDF5olRUNlekpiYCKlUikmTJrGOQswQle3/xcfHY86cOXB2dmYdhZgpiy9be3s7UlJScPXqVWzatAkeHh6sIxEzZfHfRra0tGDlypUoLS2lL0WIUVn0yNbe3o6ysjK4urrS9a+J0Vn0O0yhUOCdd96BUqmEtbU16zjEzFn0yEaIkCy2bFlZWQgODkZeXh5NIYkgLPZd1tbWhurqari4uLCOQiyERY5sN2/exIULF+jwGSIoixvZrl+/jvT0dCxcuBDz5s1jHYdYEIsb2e7cuYN///0X77//PusoxMJYVNmys7PR2tqK+fPns45CLJBFlS0lJQUNDQ0ICgpiHYVYIIspm0KhgFgspm8fCTMWU7ZvvvkGEokEW7duZR2FWCiLKFtbWxvEYjEGDBjAOgqxYBZRttWrV2PWrFl0vn7ClEWU7b///qORjTBn9mX75JNPsGLFCrz33nusoxALZ9Zl27BhA/z8/LB48WKMHDmSdRxi4cy6bGlpaZg6dSqdr5/0C2a5b6RKpUJERAQ+++wzjB49mnUcQgCYadmePHmCXbt2oby8nC42T/oNs5tGNjc349dff8UHH3yAQYMGsY5DiJbZjWyPHj3C1q1bUVVVhddeM7u/JcSEmdW7sa2tDTU1NbT/I+mXzKZsGo0GmZmZ2LlzJ3Jzc2lUI/2O2UwjExMTceLECVy/fp11FEL0Mps//2q1Gmq1Gra2tqyjEKKXWZTt7NmzyMnJQVRUFOsohCehoaHw9fXF8ePHWUfhjVlMIysqKtDY2IjJkyezjkJ4smzZMuTn5yMiIgI///yzdrmjoyNiYmIYJjOcyZctOTkZ8+fPx/r161lHITyaOXMmXFxckJ6ejnv37mmX29vb49mzZ9rbISEhcHV1ZRGx10y+bFlZWRCJRBCLxfj9999ZxyE8+uuvvzota2xsRFxcnPa2Wq3G2LFjsWTJEkybNk3IeL1m0mULDAyERCIBAFRXVzNOQ/jW1tbW7Tr19fWwtraGSqUSIFHfiDiO41iHIESfjRs34ujRo9rbDg4O8Pf311lnz549mDhxotDRDGLSIxsxX/fv30d1dTWcnJy0F6n08vJCbGws42SGo7KRfunAgQO4d+8eQkNDsXnzZtZxeEHTSEIEYhY/ahNiCqhshAiEykaIQKhspE927dqFjIwMZs8fFhaG3NxcZs/fG1Q2YrBvv/0WNjY2cHR0ZJZhxowZSEpKws2bN5ll6CkqGzHY+fPn8dZbb8Hd3Z1ZhmXLlqGoqEhn/8n+ispGeJGdnY1bt27pve/kyZN4/Phxp+UKhUJnj/6XyeVyFBYWdlre2NiIY8eOQaPR9C0wA1Q2YhC5XK5zAtzk5GQkJibqXXfHjh0oKyvrtDwvLw+RkZF6H5Ofn4/Lly+jqKhIu6y2thYpKSm4fv26zp7/Pj4+aGpqwv379/vykoyOykYMEhQUhC1btsDLy+uV66jVamRlZcHT01O7w3hP7dixAx0dHTh37hwePnyIuro6pKWlQS6X49SpUzoXSQkLC0NpaSkSEhIMfj1CoN21CC+GDRuGuro61NTUaK+r0NTUBH9/fzx69AhjxowBANTU1KClpQXA8yM12traUFJSot2Os7MzrKyevy3DwsLw1VdfITIyEv7+/jhy5Ahu3Lgh8CvjD5WN8GL79u04cOAAtm3bhlOnTr1yvfDwcMTHxwN4fkY0tVqtMzoWFhZqdzwGgAEDBkAkEkGj0cDGxsZ4L0AANI0kgoqMjIRSqYRSqURcXBxmz56tva1UKrUj4Avbt2+Hm5sbLl26hOTkZEap+UFlI7wJCgrC3LlzsXbtWhQXF2PBggUoLCzUuYrQwIEDIZFIIJFIMGjQIIjFYu1tiUQCkUiks82YmBg8evQICxYsQFBQkNAviVc0jSS8sbe3h62tLZRKJdrb21FeXo7x48dDLBYbvM2Ghgao1WoMHjwYlZWVPKYVHpWNMOPn59dp2viyQ4cOwdraGp9++imGDx+O+vp6BAcHm+zZtcTh4eHhrEMQ0zNixAhcu3YN48aNw4gRI7TLbWxsoNFo8Ntvv2Ht2rXw9vbuNDV8YciQIXB2dtZ7X1xcHBobG7Fo0SJ4e3tjyJAhGDNmDKqqqnDu3DkEBgZqR8zDhw/D2toaixYtYrrrWHfoMxsxyMcff4yMjAyUl5frLJ8wYQKmTp2K9PR0rF+//pVF6469vT0WLlyoc8as0aNHY82aNRg5cqTOdtPS0uDg4IDp06cb9mIEQtNI0i/JZDK9y4cPH46wsDCB0/CDykYM9vbbb0OhUODNN9+Ek5MTFAoF7t69i6qqKsybN0+QDDdu3ICTk5NJnKiVppHEYAcOHIBCoUBBQQGA5/s67tu3D4WFhTh48KAgGU6fPo3ly5djwYIFgjxfX9AJfwgRCI1shAiEykaIQKhshAiEykaIQKhshAiEykaIQKhshAiEykaIQKhshAiEykaIQKhshAiEykaIQP4P5P492sfdI1gAAAAASUVORK5CYII=)
The graph (y x) against
is as shown. Which one of the following shows the graph of y against ?
![](data:image/png;base64,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)
Maths-General
chemistry-
A is:
A is:
chemistry-General
chemistry-
Find out A,B,C and D
Find out A,B,C and D
chemistry-General