Physics
Grade-9
Easy
Question
Identify the potential energy across the charges shown.
![](data:image/png;base64,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)
- Low potential
- High potential
- Cannot be determined
- Incomplete information
Hint:
Low potential
The correct answer is: Low potential
- The potential energy is inversely proportional to the square of distance between the charges.
- It also depends on whether both the charges are of same or opposite sign.
- If both are of same sign then the potential energy will decrease.
- The electric potential decreases as the charges move farther.
- So, the correct option is a.
Related Questions to study
Physics
Another positive test charge is brought near a positive test charge. Potential energy across any of the test charge will
Another positive test charge is brought near a positive test charge. Potential energy across any of the test charge will
PhysicsGrade-9
Physics
Which is at lower potential?
![](data:image/png;base64,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)
Which is at lower potential?
![](data:image/png;base64,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)
PhysicsGrade-9
Physics
Which is at higher potential?
![](data:image/png;base64,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)
Which is at higher potential?
![](data:image/png;base64,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)
PhysicsGrade-9
Physics
A voltage of 220 V is available in a household. Which of these equipment will work with that voltage as per the reading behind the equipment?
- Reading behind the equipment in option a is 230V.
- Reading behind the equipment in option c is 240V.
- Reading behind the equipment in option d is 230-240V.
A voltage of 220 V is available in a household. Which of these equipment will work with that voltage as per the reading behind the equipment?
PhysicsGrade-9
- Reading behind the equipment in option a is 230V.
- Reading behind the equipment in option c is 240V.
- Reading behind the equipment in option d is 230-240V.
Physics
What does a voltmeter measure?
What does a voltmeter measure?
PhysicsGrade-9
Physics
What is the direction of current in the following circuit?
![](data:image/png;base64,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)
What is the direction of current in the following circuit?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAANsAAADVCAYAAADeiYUwAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AABdXSURBVHhe7Z0HdFRF28djkJAACaHXhCYg/aMEgRcQhANI+RSPiHQ5iNIEBM2LEARCEUSa8BpBUelFQIUPlKKggBQpUiK99xISAglJIHk+/+PNK+qSbJLdu3Mv/985cwKzl2Vzd387M888M+MlhBBToGyEmARlI8QkKJumpKSkSFxcnFy7dk2io6MlKSnJeIRYFcqmKffu3ZMVK1bIc889J6GhoXLy5EnjEWJVKJumJCcny6RJk8TLy0uqV68uhw4dMh4hVoWyaQpkmzx5spKtRo0aEhkZaTxCrApl05QHZatZsyZlswGUTVMom/2gbJpC2ewHZdMUymY/KJumUDb7Qdk0hbLZD8qmKZTNflA2TXFGNqR0JSQkSGxsrNy8eVMVpHbh561btyQxMdG4kugAZdMUZ2XbtWuXjBo1SoYMGSLDhw9X5Z133pGxY8cy60QzKJumONuNXLJkiZQuXVr8/PwkICBA/P39JXfu3JI3b15ZvXq1cRXRAcqmKc7KtnjxYilatKi67sHi4+Mjq1atMq4iOkDZNCUjLVuJEiX+IVu+fPlkzZo1xlVEByibpmRVNnQjKZteUDZNoWz2g7JpCmWzH5RNUyib/aBsGjNt2rQsyfbdd98ZVxEdcLts+IZGNgMyG6KiolRJzXZgcVyQEYJ7Fh4enmnZAgMD1bTA7du3JSYmxuH/w5J+wecVn11XZOS4XbZLly5JuXLl1AciODiYxYlSsmRJVSAMxKlVq1aGZfP29paCBQv+97kc/T8s6Rfcu6CgIKlfv75s2bLFuOuZw+2ynTlzRmU3NGzYUEaMGKFKWFgYSxoF92jYsGHStGlTJU5mWjZfX1/p0qUL73kWC9Le2rRpoxIHNm3aZNz1zOF22U6fPi2FCxdWO0Xdv3+fxcmCreyyOmb79ttvHT43S8bKvHnzlGw//fSTcdczh2myTZ061aghzoJ7llXZSNaZP3++tWRDGJs4D0P/+jB37lzKZmcomz5QNptD2fSBstkcyqYPlM3mZFU2LrFxHZTN5jgr26JFi9Tk9d9ly5Ytm3zzzTfGVSQrUDab46xsOFYKjxcrVkyKFy+uCv5ctmxZ2bBhg3EVyQqUzeY4K9uJEyfUXiNffvmlrFy5UhUICNGuXr1qXEWyAmWzOc7KRtwPZbM5lE0fKJvNoWz6QNlsDmXTB8pmcyibPlA2m0PZ9IGy2RzKpg+UzeZAtokTJyrZKlWqxEMyPAhlszlYIbx+/Xrp37+/TJgwQd1H4hkom83BcVB3795VuzphhyyeteY5KBshJkHZCDEJykaISVA2QkyCshFiEpSNEJOgbISYBGUjxCQoGyEmQdkIMQnLycaDNYhVsYxs169fV7LhyChkshNiNbSXLT4+Xo4ePaoy13PmzCnNmjWTcePGSUREhDp+Fqc4HjlyRCXaEqIz2sp27tw5tRPvoEGDpGrVqlKqVCnJnTu35MmTR4oUKaK2ysbRqfhZuXJl6dWrl/plIB4hOqKdbDjsG4fGNW7cWJ3njK7j008/LYMHD1bBkS+++EIdzoefU6ZMkaFDh0rLli3VDr6pq5E/+eQTOX/+vPGMhOiBVrKhVerRo4fkypVLypcvL6NGjZLvvvsu3R15Y2Ji5IcfflCLI0NCQuSxxx6TVq1ayfbt240rCPE82si2c+dOdTg9jihCa7Vr165MBUIOHjyoDm3H+K5cuXKyceNGtVqZEE+jhWw4PR/jMpyi8umnn0psbKzxSOaApOhKBgcHqxbyq6++YgSTeByPy7Z7926pXbu2ehE4tsiV4FwxCAzhELUkxJN4VLZr165J+/bt1YF78+bNM2pdC4It6JrWrVuXkUriUTwqGwIagYGBMnLkSCc2okn5vX+YubHXzJkzVWTz7bffloSEBKOWEHPxmGwIZGBMhejhqVOnjNo0SEmQc5unSM+uXaXbqwMlfN1ZSbpnPJYOiFZ26tRJzc8h8EKIJ/CYbAjr+/n5yaxZs5wLXiRelhUDiqq5NC+vAAluN0euZGBXNgRJfH19VesWFxdn1BJiHh6R7cqVK2rSulq1anL8+HGjNm1izqyXzhVzSp3/bS6NWjeQfOVayorTztuGubrWrVurXYGPHTtm1BJiHh6R7euvv1ZdugEDBsidO3eM2rRIkt+W95USearJ6NlL5MuP3pbgXMWl3ZzfjMedY8yYMeLj46OOsiXEbDwi29ixY1We4/Lly42atElJvCLzOwZJwJPPy4c/3pDzP38mL5QvJmWbT5Wz4nzQZO3atVKgQAF566231C7BhJiJ6bJhO+zXX39d5Tw6m04Vf3q5NC7sJyWavyEbY35v52J3yZvPVxTfoKYyMwPnRGBNHLqRHTt2lOjoaKOWEHMwXTYEJ1566SV58skn5cCBA0ZtWiTLqaVvSB4fb8keUFgqh9SRkNpVpVDeHOLlGyTPvb/DuC590Joh+tmiRQs1x0eImZguGwIV+LDXqVNHTpw4YdSmQfIF+fz1JuKfs4S06jlIBv4+zhv45gDp3+cFqRDoIyUatJdNUca1ToAVBPXq1ZOLFy8aNYSYg8dkQ4qWM1HBxOPLpENIoPhX6ibbLsdIXHy8xN+Nk+hzv8q/m5cSrzxl5b2VJzDl7RSNGjWSp556irIR0/FINxIpWs4dzHdbfpr+mhTOn0cKd58ntx80KiVafpjwovj4FpSW/14gzjRuUVFRar1b06ZN1fQDIWbikQBJv379VFRw69atRu3DSJboqxck8vAROXYxSv3bP0mWhNjrcvi3w3Lq4jWnYpKY06tYsaKSHYtUCTET02UD2LQnR44cKsv/rwK5l9WrVyvJQ0NDGfonpuMR2datW6f2DunZs6dpIXhIPWLECDWpjdQtQszGI7Jh7IQgCTbqOXz4sFHrXhD5RHAEYzanoqCEuBiPyAawrAZ7jcyZM8ftXUk8/2effSb+/v4SFhbGZTbEI3hMNiyrqVGjhiqRkZFGrXs4e/astG3bVipUqCB79uwxagkxF4/JBjCGypYtm9ob8vbt20ata7l3757a8g4bAL333nvci4R4DI/KhuBIt27d1Lo27AmZlJRkPOI6FixYoPIwMbeGnZUJ8RQelQ2gO9m8eXPJnz+/TJ8+3WUheWxft2zZMhX1RFeV3UfiaTwuG9i2bZs0aNBAraSeOHGiilZmBWyDMHv2bNWiVa9eXW3gSoin0UI2sG/fPnn++edVhLJz585qc1VIkxGw3+SOHTukd+/eaiMhJB1DZEJ0QBvZwKVLl6RPnz5q6zm8KKx7wwQ4opUP2zcEYXwkNOOUmzfffFPtglyoUCE1Ye7uKCchGUEr2QDGWsjwePHFF9ULw9wYkpYhD8Z02F8Sh2qgmxgeHi59+/aVWrVqqdNt0G3E+G/p0qVuCbYQkhW0ky0VSLdq1Sq1TwlOqUFrhZ21smfPrrZUQDcRm7sWK1ZMmjRpolrEhQsX8pw2oi3ayvYgmCJYsWKFauU6dOigWjYchAgZN2zYwOUyxBJYQjZw48YNtSPXRx99ZNQQYi0sIxvm4zAmw+Q3IVbEMrJhZyzKRqwMZSPEJCgbISZB2QgxCcpGiElQNkJMgrIRYhKUjRCToGyEmARlI8QkKBshJkHZCDEJykaISVA2QkyCshFiEpSNEJOgbISYBGUjxCQoGyEmQdkIMQnKRohJUDZCTIKyEWISlE0TcO43S9rF6lA2D4NTeLZs2SKzZs2Szz//XB20z/LXMmfOHLXl/NatWyUxMdG4c9aDsnkYnGMwZMgQdUwWzjLAYSEsfxacSIufxYsXl7CwsIceHWYFKJuHST1XHEdeDR48WGbMmCEffvghi1FmzpypvoxwfwYNGuSyY6A9AWXzMJANJ61WrFhRzp49a9SSB8Fhl0888YQ67JKyUbZMA9m6dOki5cuXl/379xu15EF++eUXKVOmDGUzoGyZhLKlD2X7K5Qtk1C29KFsf+WRkO3gwYMyfvx4GTZsmDrPGyH7rELZ0seVsp05c0Y++OADGTlypIpu4kRbHCltBpaTberUqUaNuWCep0KFCpIzZ07x8fERX19fqVy5sjpIPyvh6NjYWOnatStlS4NU2RCtTUpKMmozzvr166V+/frqTPYcOXKo9xGn2b7yyity79494yr3sWjRIuvIhjmXESNGqA/3zZs3JSoqyq0FRwtj0hlnd2OuBwfo/71Uq1ZNVq9erVqojLwmPPedO3fkwoUL8sILLyiRDxw4YPy25EF2794tpUqVkl69esnFixcz/N7jvTl8+LC0atXK4XuI0r9/f0lOTlbvi6PnyGrB5wiJC5Bbe9nOnTunvpEKFCigwuT4cJpRKlWqJIUKFXL4BqF4e3urbytH/zatgpYMvwd+YjIb37hs2RyDLyGE/gMDA6VcuXIO72d6BbJmz57d4XuI8vjjj6ueiqN/64qCzxE+J6VLl5bvv//e+M0yh9tlQyswadIkGTNmjIwaNcqUMm7cOBk4cKAEBQU5fINSC27mW2+9JWPHjnX4PA8r+F1CQ0PVv0cLyZbNMXv37lWy1KpVS4YOHarGy47up6MyevRo9bNhw4YO37vUApG7d+/u1s8XxomYqD969Kjxm2UOt8sG0F83s6Aff/nyZTXp7OgNSi3o81+/fl1d7+h5HlZwPboYeJM5Zns4GLOhRRgwYIAa42bkPqdeO2XKFDXOdvT+oaDlQVczo++hsyX1eZHbmdWAjCmyeQokw2bLls3hm4QuZkREhLqZmeH27dsqXYuyPZzUAAnStvCBzQzbt2+XqlWrOnwPUTCeswq2lg0DcnyrInr14BuEv3fo0EGNJzMLQ//p44rQPyRFNy4gIOAv7+Fjjz0mISEhEhkZaVypP7aWDSBKhTFZ2bJlVVAE3RqMB7IiGqBs6eOqeTZEBBF+b968uRono7dSp06dLI+hzMb2sgH0t6dPn66We2Cg64oFjZQtfVwlWyqpYXg854QJE4xa6/BIyIaBLZZ8QIx58+YZtVmDsqWPq2UD69atkypVqsj777+f6XGgp3gkZMObghYNXUmsHnYFlC193CHbt99+q+bV0LJZbfU3ZcskqbJhDGGlQbqZYJ4N95yy/QFlyySpsuE58Q2OrirGFCx/FNwPhO0RkKJsf0DZMglkw6Q20oU6deokw4cPVwm3mFNiGaLuBxK1/fz81PQLZaNsmQZpaEgRQs4fvr1LlizJ8reC+4IJ6YkTJ6rWzhVQNs1xh2zIPME8z+bNm+Xnn39mSaMcP35cZea7AsqmOe6QjXgGyqY5lM0+UDbNoWz2gbJpDmWzD5RNcyibfaBsmkPZ7ANl0xzKZh8om+ZQNvtA2TSHstkHyqY5lM0+UDbNSZUNeYw4JZRYF8qmOamyYcNQ7LhFrAtl0xx2I+0DZdMcymYfKJvmUDb7QNk0h7LZB8qmOZTNPlA2zaFs9oGyaQ5lsw+UTXMom32gbJpD2ewDZdMcymYfKJvmpMrGdC3rQ9k0J1U2JiJbH8qmOexG2gfKpjmUzT5QNs2hbPaBsmkOZbMPlE1zKJt9oGyaQ9nsA2XTHMpmHyib5lA2+0DZNCdVNrtOarvqoEErQNk0J1U2u6Rr7d69W51ZjbO8UVq1aiVt2rSRjh07qr+/++678uOPP6rTUe0GZdMcO3Qjr169KpMnT5Znn31WfWnkzZtXnVmN1hrnVteoUUMqVKigzrIODg6WUqVKSdOmTWX8+PFy8eJF41msD2XTHCvLFhsbK4sXL1bi5MmTR4nVuXNniYiIkH379snhw4fl2LFjcuLECTly5IgcOnRIFi1aJK+99prUrVtXAgMDJSQkRLXoN27cMJ7VulA2zbGqbKdPn5YBAwZIgQIFpGbNmjJq1CjVhbx586bcv3/fuMoxt27dUiJOnz5dGjRoIPny5ZMePXrIgQMHjCusCWXTHCvKhlarffv2EhAQIN27d5edO3dKfHy88ajzIHhy9OhRCQ0NFR8fH3nmmWfk+++/Nx61HpRNc6wmG1qk1q1bi7+/vwqEoCXLKhAV96Bo0aKqKwp5rQhl0xwryXbp0iU1JsuVK5eMHDlS4uLijEeyDrqeCxYsUEGUp556SkltNSib5lhFtoSEBBk9erT4+vrKwIEDM9VtTA9MB8yaNUu1mohs3r1713jEGlA2zbGKbBhLlSlTRs2bXblyxah1PXfu3FEy58iRw3LzjpRNc6wgG6KHb7zxhhQpUkTWrFlj1LqPX3/9Vc3XNWvWTC5fvmzU6g9l0xwryLZnzx41Ud27d2+Jjo42av/J/aQEuXP7jsQl3JPkFKPSIDnxrsT93mrFJ9yXvz30D3BPwsLC1Nhw6dKlRq3+UDbN0V22lJQUmT17tppPW758uVHrmCu7Vsnwbu3klXe/kMhLSUYtSJRNHw6Xbl1ek/+sPynxaU/DKTZs2CDe3t4ydOhQlwZi3All0xzdZYuJiZEWLVrIv/71L9m/f79R65jk02ulb6M84l2iiXyy9fSfrVviLnm1XknxL9lM5uy5Is5kRZ47d04aNWoktWrVksjISKNWbyib5ugu29mzZ1WGx+DBg52IDl6Xz0JbiY9XYek+aaNcNwKWURsnSc3C2aTqi5PlzE0nmjUD5Fti7g2Jy1aAsmlOqmwICMydO9eo1YczZ85IoUKFZOrUqUZN2pxd/o7U9fOWup0i5PhNNG2xsnrcy5I/W355JWLn739znoULFyrR0aW0AnidVapUoWy6AtlmzJihZEMCL1oPhL91KBgrbd68Wcn28ccfG684Ha6skT6NgqV47R6y4nScpMTukfB2JcW7aCuZu++qcZFzIDiSP39+tc4Pr8XRa9Sl4PV99dVXanUDZdMUyDZt2jQV7atXr57qrvXt29fjpV+/fqq0bdtWZec7v7A1WlYObi7FC1SXsP87Kmd+XizPlcwhpV6aKr9lMLNr06ZNajkOxm6pr8fRa/V0SX1tGNtifnDMmDGUTUeQNbFy5Upp3LixlC9fXrVwuhSsRwsKCpLcuXM737L9zpWN70hIcAlp82q4REzqJgV9/KVnxA9yy3jcWTAGQsZK4cKF1Wtx9Bp1Knj/6tSpo9LOrLY49pGQDaDriOx3ZNNjQleXcvDgQVm1apUK+2M5jLOkRG2TPi1rSlChUvI/1QMkd+ke8s0vGetCAozZIDq62Vh+g2ioo9epS8H7h8gpupVW45GRTWeQwYGFoRnrGsXL+pEvSJCXl3h5PS4t31sjF50PQv4X5EkWK1ZMduzYYdQQd0HZNAB5kIiwYTxy/PhxozY9UuTC1mnSpWUVKVv1Zfl842+SUdeQqdK1a1epWLGi7N2716gl7oKyaQDGHmjVChYsKBs3bjRq0+O+JN65JAf2bJN12yMlKibjKwSw6huRSKzgtsOWCbpD2TQB80cYt2GDHkRP3Q0Ex7we0rV4QKQ5UDZNwO5Z7dq1U7tkYeMed3P+/HmVpoVV2wgcEfdD2TRiyZIlqlvXq1cvt7duM2fOlJw5c6rFqsQcKJtGIFDSrVs38fLyUpku7gJza8WLF5dq1arJhQsXjFribiibZmBdG7qSWES6bt06o9Z1IOrYsGFD1YIuW7bMqCVmQNk0BPl/JUqUkOrVq6tsfFelJe3atUttueDn56cmsbGOjpgHZdMQbPwzf/58lT6FpFssLI2KijIezTh4PixKxXwauo+YZrBiBobVoWyagm3n1q5dq3ZCRpIyJp8x1kpvJ+S/s3XrVpV4jTk8rFvDej6r7ahlFyib5mDvfkQnIRzGcdjzf9KkSXLq1Cnjin+CaQS0hh06dFB7RGIu7eWXX1YpWRmVlbgOymYBsPMWJr2xDTnyGLHYE9nvODADWylghyykejVp0kQdplGpUiV1DUTDGA2BEGaIeB7KZiGQy4gUqylTpqiWqmXLlmrZEJac1K5dW61JQx3OaAsPD1ctGVo5ogeUzYIg1QqbBKG1OnnypJouQKQRf0YdHrPawspHAcpGiElQNkJMgrIRYgoi/w/zf5t9CH3vfAAAAABJRU5ErkJggg==)
PhysicsGrade-9
Physics
Identify the correct circuit diagram.
Identify the correct circuit diagram.
PhysicsGrade-9
Physics
A potential energy of 5 J is used to move charges across the given battery.
How many charges are being moved?
A potential energy of 5 J is used to move charges across the given battery.
How many charges are being moved?
PhysicsGrade-9
Physics
A potential energy of 5 J is required to move 10 C of charge across a battery. Potential difference of one end is given. What is the potential difference at another end?
![](data:image/png;base64,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)
A potential energy of 5 J is required to move 10 C of charge across a battery. Potential difference of one end is given. What is the potential difference at another end?
![](data:image/png;base64,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)
PhysicsGrade-9
Physics
What will be the potential energy required to move a charge of 60 C across the given potential difference?
![](data:image/png;base64,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)
What will be the potential energy required to move a charge of 60 C across the given potential difference?
![](data:image/png;base64,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)
PhysicsGrade-9
Physics
In 10 seconds, a charge of 25 C leaves a battery, and 200 J of energy is delivered to an outside circuit. What is the potential difference across the battery?
In 10 seconds, a charge of 25 C leaves a battery, and 200 J of energy is delivered to an outside circuit. What is the potential difference across the battery?
PhysicsGrade-9
Physics
What component is wrong in this circuit diagram?
![](data:image/png;base64,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)
What component is wrong in this circuit diagram?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAScAAADFCAYAAAAWoTR8AAAKyUlEQVR4nO3dP2ibdx7H8Y96LujooqMdXHKDTB3w0Rt01wxG6uCSpW5u8HCDS3Kch1TSULCXgAouZ2iO5gjlZEiJ7N5g6B2EkEHDVfJSLot9GW7wkNAQqZyWUA0dPLTEEJeng/xH/61H0qPnGz3vF4g4+vuLn8dv/X6PHCnkOI4jADDmJb8HAADtECcAJhEnACYRJwAmEad+lNeVCIUUSiS0Xux+1WIqoVAoVHdKKHFyo6JSibrLEimdcXdAYBAnt8rrSpxf0a4k7Uo63+3KReU3d5vO29Xu3ScqS1L5iR42XwygxoELJScblyPVTvFsyfVtJDnJwumlhaSb+8KoFZLxhm0nxZ149ngDFpxk/baNJ51C13uDG8yc3Cje1Er9TOfun0+WZIlUsTYbajGt5dVkwzmb19ePZk7rur4pSUmtLk97NGh0Vj5ddqfaLaiZ+frK7zq+SI5nOZ1OnWc/7WZPJWZNvio1bs9kpzkPM1+/ECcXGnbmeNYpNe+48azTcRctJNtHrdtt4JmWJ5qOcXJat93xNitlnbjkSCznvMCybiCtS7aO5q8pG289O7m6LBZ0o1VeT+i9h0ll222Qdpq33e6KbhbLKt6svTASz17TvBcDDTq/6/hCaXoGTRYazztzat/pGRgjU8rGT2c69duj28yp+bpsw5EgTq6Uuhx36mVq37gMPOvnAUNWSDpS/PT77iZObY49sQ29RZxcKzmFbPLoWMPRjCnp4tmzcHRb9uoRax+XhpPb2ROzJk+FHIe3TEEQlLWeON/4qyDNkgU5G92OHjXeR7LgqOvVMRAOiCMgprW848hxTk+l+qPc8axKZ5am9gJIXJKSBcLksQm/B4DBPfrmkVY+XNHB4YHCE+Gx+TMWi+nmZzf9/vY2mt/QjrPh9ygCgWXdGPj4Lx/rxvUbmr0QNRGVYfxZqeyr+v2+nv/03O9vL3zCzGmM3P/3Db+HMDTplZy27tz3exjwEXEagW///622t7dVrVYVDoe1sLCgN3/zpt/DCpwfn/2ofD6vx48fS5Lm5uZ08Z2LPo8KnRAnj33298+Uu5VTNBpVJBKRJOVu5bR4ZVE3/2bseMoY2/nvjtJX04pEIpqcnNTB4YHy+bwmX5vU1j+3dO71c34PEU2Ik4c+v/258vfyyqxmFA6HpUNJE9LCHxeUv5fXB6kP9MXGF34Pc+w9+uaRlq4sKf1hWpOvTZ7u9YfS3sM9zb09p9K3JV/HiFb8KoFHnn73VGtra0qn07UwSbUfisPalwsLC3rw4IG+/s/Xvo0xKBYXF7W0tKTJycnGp+MJKfbbmGbfnvVtbOiMOHkkn88rFos1PEtLOv370Q9GPp/3YXTB8fS7p6pUKopOR2tnHG+Huu0xe4E4WdR1WRcKhUY1jrFzNXlV0V9HT5ZyDZE6+npmZkZra2vK3cr5M8gXwMu/eHng+4hGo6d/mWj6U1LktQj7uk+6/SYTMyePzMzMqFqttp85HX1drVa1eGVRz396PtApk8n48C8cjUG/N4/Lj7X/w/7pHTbPnA7rvoYpxMkjc3NzJy9ZS2o51qFDaW9vT+++++7gD8bLGh29MfWGwuGw9r8/ClSbmdPe3t7Ix4WzESePvPW7t2qvyuXzrc/Wqv1AhMNhXX7/8uAPxjN/V1tbW8rlcjo4OGjZFvs/7HPczyiecz20tram9NW0stmsYrGYotGoqtXqSZju3LsznAdiK3Z18Z2LyqxmtLa6plgsppmZGR0cHKhSqWhvb0937t3Rhd9f8HuYaOJ6t+a/4vXulV++oi//9aW+Kn6l/L28tre3FY1GlU6ndflPQ5gxoWeX37+subk55W7ldP/+fUUiEc3Ozir3j5xe/dWr7Ncj4PZFB55zR+DS/CVdmr/k3QOwrOvJudfP6ZO/fuL3MNAj4jQOjrbi3B8yCk+E/R3LEBwookr58dlXxFgjTmNgdnZW4XBYD/5X8XsoQxW7EPN7CPBR1/dzardGZG0OoB9ue8KvEgAwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwiTgBMIk4ATCJOAEwacLvAcC+UCjU9XLHcUY0EgQJcUJbZwWp03UJFYaFOKGBmyh1uz2RwqCIEyQNHqVO90ek0C8OiGPoYRrVfWO8MXMKuF7j0WkG1MvtmUWhH8QpwIbxKlz9dc66v1AoRKDQM+IUUN1C0m9Ajm/HUg7DwDGnAPIiTL3eB+FCr4hTwHgdpl7ui0ChF8QJkrw5WM3xJQyCOAVIpxmLlxEZ5FU+BBtxCrhew1RMJRQKhepOCSXWi8eXKpWouyyRUrHutsyg0A/ihJ7kN3ebztnV7t0nKktS+YkeNl8MDIg4BcSgy6gNp6RsvPG85OqypiVpelmrydp58WxJzs6G5kcwJow34hRg7pZb01o+LtCRzevrRzOndV3flKSkVpenh/BYgBRyuuw17Z7Z2MlGZ1gzC8dxhrQty1pPnNdK3RIuWShpIX9e723WZk07HeIkdd6f+vl3sh++eNzug8TJMHtxklRMKfTeZuv58axKO0fLvA6IU7C53QdZ1sGd+Wstx56kuuNPwJC8tL29rampKU1NTWlra+vMG7i9PsZN67EnxbO61ssRcMCFUDQadSqVSssF0WhU7c6PRCLa39+XJIXDYT179szzQQaVyWWdpOZjT8mCo40e4sSyLthcL+tSqVTbC9qFSdJJmCRpaWnJ5fAwKMdxXJ866T9+tdlTXJKShb7DdKzf8WO8hRzHcW7cuKGPPvrI1Q3T6bRu377t0bAgDf8FCT9f4BjksXlhZjz0dUA8k8k0PFN9+umnXR+EMAHwWts3m8tkMpLUdjbFM9Z4GcW7U/Kb4OgHv+dkmBff/1G/M8EwHo/9cDzwe07oC7MbWEOcAmaU71Dpx/tHYXwQpwDyOlDH7+vk9rGBesQpoM4KVL+RYnmIYeGjodBRrx+GOegHcwLtEKcA6/Vz5oYxGyJMcItlHTz/gAPChH4QJ0jio6FgD8s6nBjWx4kTJQwDcUKL5ricFStiBC8QJ5yJ+MAPHHMCYBJxAmAScQJgEnECYBJxAmAScQJgEnECYBJxAmAScQJgEnECYBJxAmAScQJgEnECYBJxesHwAQIICuL0guHtSxAUxAmAScQJgEnECYBJxAmAScQJgEnECYBJxAmAScQJgEnECYBJxAmAScQJgEnECYBJxAmAScQJgEnECYBJxAmAScQJgEnECYBJxAmAScQJgEkTfg8A7vDpKwgK13HihwMWsB+OP5Z1AEwiTgBMIk4ATCJOAEzqekCcj74G4BdmTgBMIk4ATCJOAEwiTgBM+hlPzi60bK2YggAAAABJRU5ErkJggg==)
PhysicsGrade-9
Physics
Name the physical quantity whose SI unit is J/C.
- The SI unit of current is Ampere.
- The SI unit of charge is Coulomb.
- The SI unit of work done is Joule.
Name the physical quantity whose SI unit is J/C.
PhysicsGrade-9
- The SI unit of current is Ampere.
- The SI unit of charge is Coulomb.
- The SI unit of work done is Joule.
Physics
A charge of 25 C is moved from infinity to points A and B, and the work done to do so is 10 J and 11 J, respectively. Calculate the potential difference between points A and B.
A charge of 25 C is moved from infinity to points A and B, and the work done to do so is 10 J and 11 J, respectively. Calculate the potential difference between points A and B.
PhysicsGrade-9
Physics
To carry how much charge between two points having potential difference equal to 220 V, 1760 J of work is done?
To carry how much charge between two points having potential difference equal to 220 V, 1760 J of work is done?
PhysicsGrade-9