Chemistry-
General
Easy
Question
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/618506/1/4327702/Picture26.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/618506/1/4327703/Picture27.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/618506/1/4327704/Picture28.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/618506/1/4327705/Picture29.png)
The correct answer is: ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/618506/1/4327702/Picture26.png)
Related Questions to study
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The correct statement about the compounds A, (B)and C is
![](data:image/png;base64,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)
The correct statement about the compounds A, (B)and C is
![](data:image/png;base64,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)
chemistry-General
chemistry-
is
is
chemistry-General
chemistry-
2Fe+3(aq) + Sn+2(aq) ¾→ 2Fe+2(aq) + ? The missing term in this reaction is
2Fe+3(aq) + Sn+2(aq) ¾→ 2Fe+2(aq) + ? The missing term in this reaction is
chemistry-General
chemistry-
How many bonds are there in
?
How many bonds are there in
?
chemistry-General
chemistry-
The nodal plane in the π bond of ethene is located in
The nodal plane in the π bond of ethene is located in
chemistry-General
physics-
A modulating signal is a square wave as shown in the figure
![](data:image/png;base64,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)
The carrier wave is given by
The modulation index is
A modulating signal is a square wave as shown in the figure
![](data:image/png;base64,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)
The carrier wave is given by
The modulation index is
physics-General
physics-
An L shaped thin uniform rod of total length 2l is free to rotate in a vertical plane about a horizontal axis at P as shown in the figure The bar is released from rest. Neglect air and contact friction. The angular velocity at the instant it has rotated through 90° and reached the dotted position shown is
![](data:image/png;base64,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)
An L shaped thin uniform rod of total length 2l is free to rotate in a vertical plane about a horizontal axis at P as shown in the figure The bar is released from rest. Neglect air and contact friction. The angular velocity at the instant it has rotated through 90° and reached the dotted position shown is
![](data:image/png;base64,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)
physics-General
physics-
In the circuit shown
![](data:image/png;base64,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)
In the circuit shown
![](data:image/png;base64,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)
physics-General
physics-
The potential of the point A is greater than that of B by 19 volt. What is the potential difference in volts across the 3
capacitor?
![](data:image/png;base64,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)
The potential of the point A is greater than that of B by 19 volt. What is the potential difference in volts across the 3
capacitor?
![](data:image/png;base64,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)
physics-General
physics-
In the figure shown, the potential difference between points A and B is :
![](data:image/png;base64,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)
In the figure shown, the potential difference between points A and B is :
![](data:image/png;base64,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)
physics-General
physics-
Some light bulbs are conected in parallel to a 120 V source as shown in the figure. Each bulb dissipates an average power of 60 W The circuit has a fuse F that burns out when the current in the circuit exceeds 9 A. Determine the largest number of bulbs of the following, that can be used in the circuit without burning out the fuse
![](data:image/png;base64,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)
Some light bulbs are conected in parallel to a 120 V source as shown in the figure. Each bulb dissipates an average power of 60 W The circuit has a fuse F that burns out when the current in the circuit exceeds 9 A. Determine the largest number of bulbs of the following, that can be used in the circuit without burning out the fuse
![](data:image/png;base64,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)
physics-General
Physics-
Which of the following has maximum specific heat ?
Which of the following has maximum specific heat ?
Physics-General
Physics-
Calorimeter usually is made of copper because
Calorimeter usually is made of copper because
Physics-General
Physics-
A metallic sphere of mass M falls through glycerine with a terminal velocity ‘v’. When another sphere of the same metal having mass ‘8M’ is dropped into the same column of glycerine, the terminal velocity of the ball will be
A metallic sphere of mass M falls through glycerine with a terminal velocity ‘v’. When another sphere of the same metal having mass ‘8M’ is dropped into the same column of glycerine, the terminal velocity of the ball will be
Physics-General