Chemistry-
General
Easy
Question
Ethyl alcohol is also known as:
- Spirit of wine
- Methyl carbinol
- Grain alcohol
- All of these
The correct answer is: All of these
Related Questions to study
physics-
A wire is bent in the form of a circular arc with a straight portion AB If the current in the wire is i, then the magnetic induction at O is
![](data:image/png;base64,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)
A wire is bent in the form of a circular arc with a straight portion AB If the current in the wire is i, then the magnetic induction at O is
![](data:image/png;base64,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)
physics-General
physics-
The magnetic induction at O due to a current in conductor shaped as shown in fig is
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448311/1/928527/Picture36.png)
The magnetic induction at O due to a current in conductor shaped as shown in fig is
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448311/1/928527/Picture36.png)
physics-General
physics-
The figure shows a unifrom conducting structure which carries current i with each small square has side a The structure is kept in a uniform magnetic field B Then the magnetic force on the structure will be
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448307/1/928525/Picture35.png)
The figure shows a unifrom conducting structure which carries current i with each small square has side a The structure is kept in a uniform magnetic field B Then the magnetic force on the structure will be
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448307/1/928525/Picture35.png)
physics-General
physics-
Two long parallel conductors carry currents
both are directed into the plane of paper The magnitude of resultant magnetic field at point ‘P; is
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448286/1/928524/Picture34.png)
Two long parallel conductors carry currents
both are directed into the plane of paper The magnitude of resultant magnetic field at point ‘P; is
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448286/1/928524/Picture34.png)
physics-General
chemistry-
What amount of bromine will be required to convert 2 g of phenol into 2, 4, 6-tribromo phenol?
What amount of bromine will be required to convert 2 g of phenol into 2, 4, 6-tribromo phenol?
chemistry-General
physics-
A wire bent in the form a right angled triangle PQR, carries a current 1 A It is placed in a region of a uniform magnetic field B= 0.2T If PR = 1m, the net force on the wire is
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)
A wire bent in the form a right angled triangle PQR, carries a current 1 A It is placed in a region of a uniform magnetic field B= 0.2T If PR = 1m, the net force on the wire is
![](data:image/png;base64,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)
physics-General
physics-
A current i A = 2 be flowing in each part of a wire frame as shown in fig The frame is a combination of two equilateral triangles ACD and CDE of side 1m It is placed in uniform magnetic field B=4T acting perpendicular to the plane of frame The magnitude of magnetic force acting on the frame is
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448272/1/928521/Picture32.png)
A current i A = 2 be flowing in each part of a wire frame as shown in fig The frame is a combination of two equilateral triangles ACD and CDE of side 1m It is placed in uniform magnetic field B=4T acting perpendicular to the plane of frame The magnitude of magnetic force acting on the frame is
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448272/1/928521/Picture32.png)
physics-General
physics-
Wires 1 and 2 carrying currents i1 and i2 respectively are inclined at an angle q to each other What is the force on a small element dl of wire 2 at a distance of r from wire 1 (as shown in figure) due to the magnetic field of wire 1
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448265/1/928520/Picture31.png)
Wires 1 and 2 carrying currents i1 and i2 respectively are inclined at an angle q to each other What is the force on a small element dl of wire 2 at a distance of r from wire 1 (as shown in figure) due to the magnetic field of wire 1
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448265/1/928520/Picture31.png)
physics-General
physics-
PQ is a uniform rod of length l and mass m carrying current i and is suspended in uniform magnetic field of induction B ur acting inward as shown in figure The tension in each string is
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448252/1/928519/Picture30.png)
PQ is a uniform rod of length l and mass m carrying current i and is suspended in uniform magnetic field of induction B ur acting inward as shown in figure The tension in each string is
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/448252/1/928519/Picture30.png)
physics-General
physics-
Two wires AO and OC carry currents i as shown in figure One end of both the wires extends to infinity
, the magnitude of magnetic field at a point P on the bisector of the two wires at a distance r from O is
![](data:image/png;base64,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)
Two wires AO and OC carry currents i as shown in figure One end of both the wires extends to infinity
, the magnitude of magnetic field at a point P on the bisector of the two wires at a distance r from O is
![](data:image/png;base64,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)
physics-General
Physics-
Two identical discs of same radius
are rotating about their axes in opposite directions with the same constant angular speed
. The discs are in the same horizontal plane. At time
, the points
and
are facing each other as shown in figure. The relative speed between the two points
and
is
as function of times best represented by
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/904018/1/928460/Picture956.png)
Two identical discs of same radius
are rotating about their axes in opposite directions with the same constant angular speed
. The discs are in the same horizontal plane. At time
, the points
and
are facing each other as shown in figure. The relative speed between the two points
and
is
as function of times best represented by
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/904018/1/928460/Picture956.png)
Physics-General
physics-
Consider the given velocity-time graph It represents the motion of
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZIAAAChCAMAAADaxcl/AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAMAUExURf///5yclL29vQAAABkQEAgQCBlKWpTOpUpjWu/378XFxYyMlEJCQkIZY0IZEObWEOYQ5uZaEOalnIyczr3v3lrv5lqt5rUpWr3mpRlrWpTvpXspWlrO5lqM5rUIWnsIWrVa77XvY0pr3krvY7XeMUparUreMbUZ77WcMUoZrUqcMbUplEop3kqtY+aUMeYxpeYZMRBrGealY+ZzpeYpY4zv3rXOY0pK3krOY7UIlEoI3kqMY+aEY+ZSpeYIY9be3u/m76WlpebWnOac5r2czkpKWubWc+Zz5uZac+bWMeYx5uZaMealvYyc72tSY+bWUuZS5uZaUmtra+be3iEhGTopMRkpKbWtpebWvea95rWMnBAIWr2c74RrzoTvEBlrjBnvEIQpzoStEBkpjBmtEIRKzoTOEBlKjBnOEIQIzoSMEBkIjBmMEDo6MXtze+b3KSnvpSmtpQjvpQitpSnOpSmMpQjOpQiMpXuEe0JrKeb3e3utc73F5rVrzrXvEEprjErvELUpzrWtEEopjEqtEOalEOYQteYpEBBKKYzO73tSpUJCEHNSSkJrCHutUrVKzrXOEEpKjErOELUIzrWMEEoIjEqMEOaEEOYQlOYIEBBKCIzOzntShEIIOr1rWrVrpbVrKbWtcynv5imt5rUpKVrvtVqttXtrKXspKYRr74TvMRlrrRnvMYQp74StMRkprRmtMYTvcxlr7xnvc4QppRkp7xmtc5xrWrVKpbVKKbWMcwjv5git5rUIKVrOtVqMtXtKKXsIKYTOcxlK7xnOc4QIpRkI7xmMc71KWrVrhLVrCLWtUinO5imM5rUpCFrvlFqtlHtrCHspCIRK74TOMRlKrRnOMYQI74SMMRkIrRmMMYTvUhlrzhnvUoQphBkpzhmtUpxKWrVKhLVKCLWMUgjO5giM5rUICFrOlFqMlHtKCHsICITOUhlKzhnOUoQIhBkIzhmMUhApWtbW1ub3xRAIMXtzpXNzUnuMWoylrb29nISllAgAEOb3///3/wAAAFvXgN4AAAEAdFJOU////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////wBT9wclAAAACXBIWXMAABcRAAAXEQHKJvM/AAANi0lEQVR4Xu2d23LqLBTH5ZCZmvBOwAW3vUAa53sIuM57ZzrO1LrngwQPVXKySYyWn902WreH4Fr/xWIBq9/B/e/IUsiQYf4wsgggRgj448gSoAIhpVN/K7IAitzgPRHU34w8HGhSrtKNjBK/HNgKYLhiUeCXBPiE/iiyEDj+8keRyWDp0Q/RzNiLjadgYSQIeyeAY7w1ORQcXdF/e4104ZoEa9HQJDyJjmtyKDh/7zPkTjiVpMkUDlFLZmDDT+efSW1P+Eag5ig3asm0sDJNKTc8tTg/tck1tT101y43rKsfFwQf6jsiU5AaadFCSvO2tbepel+x91OLrFN47KezjGjiyJEWxB5rEvuL07BeMacl9pe79YX31kZOzWC0PJ74jawaxDYGQolrFCJ4WP8jv+cs7weOM7kr/a1VQdgq1VfGwHH+vWsS/8g4nJuEGaTNKaVIRWGvRbapb3o4hiDH50dFJoCdIq4NQW9nbwR3mb2W8ufZt02yogarOGgyIYy5SMpBSXahD6mwTcJ2VwZR90tSgRq7LpEx+XH2U+kc19vVuK7vva+5wrvoveZGEtsuH1fy7pLzFdQkn9F7zUxqDJfZlSk4LfFQgsjX0elFZoGB4iZ7crISB8i/r9Q/MjuHn5lgZhRqSBlH5uI6E+xir5iIfChAuWTYJTzHIgbED+SHltSwLFHRez2O4KgiFcl1LiwyF02jilxjccpXRmblVktqWGZjrxgQP4LmCpUyeq/H0FahwgmKsdf8tFaoMIDV1fhKZHKatMRTSqRjMnJWDoF+yQ/WnHyTKPNz0l3teAAqiQPBM9Kn2pG+Jzp252ejQ0s8MMZe89GlJUeAwkX0XrPQrSWeUn7HMpY5GFI5b71XLGOZgX5aUnPgGMeB4MkZYCUWKnEcSpmaIVbiSEVChjRiZDAgGSoPNvaK3mtCrDwMnvLDJMb76L0mY5iWeGIJ8ZQAdVeJEFeJjI0yDXdZiWVjsIreaxJA3977DTQW4fWmhANqrcHn/aeVq89YxtIHqntmEiuA+kUvgxUK7eNAcBesQOg0ibeTzlHFDsp3673ixPl2eIIRKnoLb+9McBNcx6GUdiAhRJm8dwHWvRHXGZZhdTknMnJFVlChNrz3YPnQHFcI+oZiEV4zmxUliq1Os3q7+KWWeLjGJMZejWyI6p8VvJqFdTcsU0kswmuispLe/F5LPNUEiCgpQWyTDMidj6ElHqiTGHsFeZCVWBiw3isOpdwySEvGtBJLuYslxAEGWclve+/X/OOxjOWWYVoyUsR15gBUXEvqisdpiYe6CRAx9rqAEvwwLfFAkkTvdcHAIHhcLTkSJ0BcwrZDkoCja4knFuHdy4SrabsS4qme+6WZREs8XGEZk5G9uMwST2clFue93BqffxzGVv/Wzomztb3U9/2AGqLPNVh9reTQqQvBB6QiOS7m3UtYNr0e9XtmepkK/iaIkHy9gvZABobFoZaUZqchp741wTvjDxpgRYOPciXE7i+gzyZoqe5TNtCj3dab1gEjIGYsd2Kp6xO492w7bIFkOSNuyjSTfue+vjXB9X9rgelqX44AroTYxoCF6tH2VPUI4Jk4rxDeRNq+hL5BHd+wDRzTn5u6pJQTWd28Yls7d/i9/1fdBp/9rIQIf9DAgeDG82QlhaSmT2+JKt3DAlTe+VQct2Y/Ddr7owZYQSQfa0hu8/ZZ+YkGXS3qzUZLLOvPzhMJwB5k9qftslfKXV/edXnZA9s3lD//bu9z/+wPAASpHBt7b/0c1XXowFiDsr+u7/55kLmnOt7R8CMTUR01PJWNz/09DdfuLdvHjGMqqXYpLpCHW4T57WVSbGpnyxM0A8ksrzIqWNkrOaButBmYaOe1muw2OzXJ0Uoy2AetuT8KwzVqfyJpG8b440ZAjttfxmG7O8AfNpIh6Y9CpKL1z45UYiR4D1/bA2CVa9sobmuOK/MBiW+zvjvG6Q4tWZGOJ8pwppX3lo300hI2hpZ0dZcMcfu6jYNJAG8Z2TtoF2udN5q5WE27FdPxGf7tO9KMXDJW4KQ9/1aqz+4vJss/OiMuWH/zmtjKjk/NTvsh/R4bcr6JttejREC+O2afxh5V7MCVscCWRimJ6A5zGOjOZ1Iz58dqp+yeswaIONcM97WSsbCa8zaaR3gOvgZu337/lJ87YYVyPcc/RDkslna9d384G1TEEuI25tUSD9ffjd6V8cyEV8Nl6fZ4P8zc1sMvSr9RRbiXpjNI513rCqfAeGFme4XDc2Ag2XFeCN+RvYAZnft2tBEK4KIroG6CwovmtKGCP1oM//qMl9AMbKFRwU1Mz3DVmutlnGgJymOO062EF/BeTFRSGEiIrSnEddeH7VzTcO32kWol1GYMaHyRIDWoq781PwB3j5fUu8sClLd9L924bkt3gZnrOdkw5L3WthNH7XkLmkBeJ5N53c0tQn1TmnJvzRSCIgsF3JSctywG+RxNwuAg6exhJX6uSqpI9TtMakDekr9nBPPytBF9jfVe7vz/ZGMSJYvge7K9dtcIzNS+FgQ66Kz4QPW7gEW2BQS/Bbo5512kQWZ7cf54QuDnkMq6AWPvvM1xpSalWjdbSYHIVybyqx5+sAjPaJQHB5gOH5WVMPJdvc72G9yO9FCoqnfBqqEiJkNJeHlsEm7oV9L2PRsJ+578UR/6995Lty1jE66zTD+arYRpxSkrCZJX39rtdQkxfQP2tAZHmJhS7mwfSwe9/7qC6vpd1A2dJdt6WOgCJlDd4tB+QTh6r44nJc1bXf41feu4WNHSIiWwT2KbpNFKUlW7bHUzy/6qhHgtPmwLUZGEvK/XEu+4MgxuTrd7Fxe2ygy5PReHXW0lpXOaHC/OSvpWqNCsZYaVlW5TGImxaAqD07w+NzKw8EHlvfzxqkRVKhgGozGV1x4Lu1irofSZqgtbBaHFK/yQEX3XhcmskzwG5tOR9slvn+mnJdB82SelTc1Scgg5UArApqShyKuX0UFDguT7VMYibX+F2T7IbdOtmcJVBHXINLcPCU8kv7SSr3CYIKsgeA239iKtxgUfNCbWSoas1gBw2vnwTYZztzV8exrkx/fzmtL+Z0ozFX4GBtS3916s0ESSwAQ7lgmVk9oMgdupPnwmz++C8eCMsE2pL+I8MEcQPNBKemgJ41p9KJ23nXILE+8tf6dSi/fmUQNrHcf1DBgtgx+AlrQsj6ebNr3UKciw4keZNewrs1xvpc6JOTY518GikXGBigywkl41wYxaX+Lwt8Mcuubat5dW2a7msBx2ELrFqnKvKVGaEKFv0gDMfprN+a10fKhRSPOPIa/Cca8isyG+8F64Rr8tIWaZFETaNnElnRV3aPd6rGKhI4O1ZHJ16w2Vico6TK0D69o2zqlZz2ax14E4uYt07Ezk+FoyI6lAHcnN6UnN2E0yzEomnF9yHw+eALEujVJFa2Q5lM2hdFbSvwB9yvkld+FLiB8Eg27Ik//Oe/6ASWMjLmqK3gq1JC3xXEyAeAC774CNsKaYuwepsF0IMeATLUtLPDxHu98HxHfBSGg6hY3k7q98BMk3CubsGlialtQwgxsGgqdmmwf7jptMk3uH+5lByZAcweK0xFM+aCW8N3x6Vbh7k8L/k1IhpO5cQLzUQ4Lgmasdh8D19/xFeBs/3OKA8t02xRFim6SjxraJAxv0ORapJTWswMrX988GT0zw/JVSi+t02VQsU0s8bjPt7Ry5nBNuEkSgSVh2SlROz1K1xANz3FiENwWMt1WRz8NytaSmWsfzF72C52OsFVAnJA1PTX5dFq0lnj+2hvrCtaTGea87A9AnZOla4nFlLH/Fey1fSzxQ47+xltTixkua+TPe6ym0xMMkzsHYA+PL40m0xLMlfyD2ehot8fD812UsC+eJtMTjYq/XnhH8TFricfO9ZlzhbHb61AQvDcbzV95M+9m0pOaihPj1eDot8UDyyDKWKTn0rAleIC72esmA+Ln6JT9groT4BXuOz6klHldC/Igylml5Vi3xuNjr1XqOT9gv+cHjivCmYsF1XH2BItEvtZn2U2uJB+bo/YViryfXkhpmFC5epjv/7FricWUsbmr+K/D8WuLhBHWtNPscPEEdV19c7GVeoef4ElrioQ+aADEyL6IlHldC/PRfsZfRkpqqjOXJvdfraImHyiQfbTOYaaAlpW6hmLX7dRO7P9/YezdbjcTjpyS0ACUhJCvtOxVa3K4o8lpaUsOyvM8uZw9jAwkG5Xq1yj5kevtGX0xLPOXC8yuimk8K8uAmaS+nJc9Aqt1ijwBf7evE1ozZf+Bze6gX22LrV0qnLpD1am0l3R3BXDjJONmI35I0JcqSK+SuqssIK5RFmmF7N2e7UvMsASuuTgsa8WxfnXq2l6YwhiSisL/tkXnFcewFwXY5zuvdwAyGnPCjUyoIyMTFglO8z6agkRFgNE3LOsB6U/KcZICuBQpytofXjLiWzYYgcep6sGrzYijOybkH7PLz54HqwjWxzBkIP+7jDLnLBK959F2zkoKLohqr+tZKvo5WkgoJ8i/5wiXPTwB3y3+D02o6XOlvkkfX9Ug2uqBUnhbsWmcIob+1pd7ySKV8vxhQoAQtOkP3J2Dpj4JN2rp7bCQSiUQikQewWv0Prwk26Y+3ZNgAAAAASUVORK5CYII=)
Consider the given velocity-time graph It represents the motion of
![](data:image/png;base64,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)
physics-General
chemistry-
2-methoxy butane is obtained by reacting diazomethane with
2-methoxy butane is obtained by reacting diazomethane with
chemistry-General
physics-
The figure shows a circular path of a moving particle. If the velocity of the particle at same instant is
, through which quadrant is the particle moving when clockwise and anti-clockwise respectively
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/486608/1/928400/Picture59.png)
The figure shows a circular path of a moving particle. If the velocity of the particle at same instant is
, through which quadrant is the particle moving when clockwise and anti-clockwise respectively
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/486608/1/928400/Picture59.png)
physics-General
chemistry-
The dehydration of butane-1-ol gives
The dehydration of butane-1-ol gives
chemistry-General