Physics-
General
Easy
Question
The diagram shows the change x in the length of a thin uniform wire caused by the application of stress F at two different temperature
The variation
![](data:image/png;base64,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)
- None of these
The correct answer is: ![T subscript 1 greater than T subscript 2](data:image/png;base64,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)
Related Questions to study
physics-
Which are of the following is the young's modulus (in
for the wire having the stress strain curve in the figure.
![](data:image/png;base64,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)
Which are of the following is the young's modulus (in
for the wire having the stress strain curve in the figure.
![](data:image/png;base64,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)
physics-General
physics
If the surfaces shown in figure are frictionless, the ratio of T1 and T2 is……..
![](data:image/png;base64,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)
If the surfaces shown in figure are frictionless, the ratio of T1 and T2 is……..
![](data:image/png;base64,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)
physicsGeneral
physics
Three blocks of masers m1,m2 and by massless strings as shown in figure, on a frictionless table. They are Pulled with the force T3=40 N. If m1=10 kg,m2=6 kg and m3=4kg the tension T2 will be=...N
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)
Three blocks of masers m1,m2 and by massless strings as shown in figure, on a frictionless table. They are Pulled with the force T3=40 N. If m1=10 kg,m2=6 kg and m3=4kg the tension T2 will be=...N
![](data:image/png;base64,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)
physicsGeneral
Maths-
If
where
is the greatest integer no exeeding ![x comma text then end text open curly brackets x element of R colon f left parenthesis x right parenthesis equals 1 half close curly brackets equals](data:image/png;base64,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)
If
where
is the greatest integer no exeeding ![x comma text then end text open curly brackets x element of R colon f left parenthesis x right parenthesis equals 1 half close curly brackets equals](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMcAAAAkCAYAAAA91S7qAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAABKdJREFUeNrtXV9kHEEYH+dEVJWqiKoIERX3EEdVRUSUqBMVFaJOnypUVFQeSp+qqkrkISL61odTEaEqKipKVEVEhKqoPkSJioroSx6iKk64fp98q5vN7N3827vdu+/H72VvZ3bm++Y3M9/M7J4QDEZ8cBX4FLjFpogHxoHf2QyxwBzwAbCkeD/67SGbLRosAz8CM2yKWEFVHBny3zKbzC3GgBtshkSLw8MGjTgMR1gD3mYz1IU4hsifDEc4AqbZDHUhjjT5k1EjBzDi7Rv2J4uDfcP+ZHGwb9ifLI4qAPcCJjXTTIra7SGwOFgczpECtgaudQvzJet1Ss/iaLAGGTdjHlGZ9oCb4mRjq0UjfQ54QMSd47SvgWcNy3RNVHeJtCRh3YnjoIHF0QWcAX4F/gUWFZ7VKc6eJ3oJnFJ8ZppE5YnA2/HPkjhssEYi4Y434oLWuziGqdceowbVpJjuDnA+cO0usKDx3AXJdRTXuGWdHhnEK3UnjtEQI7yg30yHRlkFBmkejFOJVWCbJJ888Bfdg42kOSSvEeBOhbx0jWliizYaLc4Z2P4Z8HHg2nPghGKZMf0TyXU8d9RnWb8e4CceOU6c6w/o7gNfOR45Rmk+3eV7xmrgvhvAbWpwGGTiuZlpSV4j1Du2l8nL1Ji6tpilEcAEb8XJEQgPF6j+rQplXgx0Rnnfb4dlRi/V+jVRPqoxgmnMELU4rMua8zXCAYseo5w45iUrLEWJw/OBa/uSvG4q5CUDBrq7jm2xR883wQ/gZYodctRwRzTSb4eMmMeO6lcU8cdPSWfiHCvAfgoQL0UgjmaF+/9IKnroKK5J0/x8wLEtioa9Uooasf/ePg1bpyjwF5ri0KlfFOIoGTIMWI93GnGeESbIGN2WFbe5rmIYU3EUNHplHVuYjhw4hfwcmONPWaQXitMq1folZVrlLUwUoiprL6lvWjKtqaY4DhQCW1NxpKiOtxzbYsYw5shLHLrii6NM0vvz6bWsX1IC8gGK3SI5ad0BXKJGeR74xWJaVQzpRVUbdEFhhcxmubhSzGFiiza677ymrWbF2Rd1sEG+sUjvIWwpV6d+45ojWa2wK/Q2TZXRQitIfgPhi0BzknsXqAGW6yW3Qnoj1QaNm2I7vt69XdJYbPdSSg5sEQTuTXj7HFnFXgwXHwYl17G3ziiuVg2G5C3bBNStX0NvAjaRga+ECCFnIA5cRfptGSdcJ8ceU4MbqoI4dG0hQ3CH/LhCmQ5CFil6xNl3o0sa6T1s+GIK3fpV+/hI7MRhgoUyvZVgY1YNOArsV7gnCQcPvfjnkKbkOPO4l0R/ZsXpg20sjtoARyfc31A52jEm9I+ATInqfbRglabhXryWIWHmk+ZPHJJbRfKRdHHglGdY1C8wzvzWYDMBFgdDGUfsTxYHQ74gsc7+ZHEwTgNX3zZF+AYm+5PF0ZC4CHwvKp9gYH+yOBoKHSSMTvZn7YM9/uJhfICbp6+F2ctiKcFfPHQK/lZufIBbAzaHBvsFfyvXKXCDa53NEAt8EP/fDDVNz19Zdww8u7Rk6RiGm/jP5B0L/CeoRcH/zxEZ8GgF/7NTMuGdgI4E/wCPI5k8sjpJ8wAAAUJ0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bWk+eDwvbWk+PG1vPiw8L21vPjxtdGV4dD4mI3hBMDt0aGVuJiN4QTA7PC9tdGV4dD48bWZlbmNlZCBjbG9zZT0ifSIgb3Blbj0ieyIgc2VwYXJhdG9ycz0ifCI+PG1yb3c+PG1pPng8L21pPjxtbz4mI3gyMjA4OzwvbW8+PG1pPlI8L21pPjxtbz46PC9tbz48bWk+ZjwvbWk+PG1vPig8L21vPjxtaT54PC9taT48bW8+KTwvbW8+PG1vPj08L21vPjxtZnJhYz48bW4+MTwvbW4+PG1uPjI8L21uPjwvbWZyYWM+PC9tcm93PjwvbWZlbmNlZD48bW8+PTwvbW8+PC9tYXRoPnn79MIAAAAASUVORK5CYII=)
Maths-General
physics-
The diagram shows stress w/s strain curve for the materials A and B. From the curves we infer that
![](data:image/png;base64,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)
The diagram shows stress w/s strain curve for the materials A and B. From the curves we infer that
![](data:image/png;base64,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)
physics-General
physics-
The value of force constant between the applied elastic. force F and displacement will be
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)
The value of force constant between the applied elastic. force F and displacement will be
![](data:image/png;base64,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)
physics-General
physics-
The potential energy U between two molecules as a function of the distance x between them has been shown in the figure. The two molecules are.
![](data:image/png;base64,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)
The potential energy U between two molecules as a function of the distance x between them has been shown in the figure. The two molecules are.
![](data:image/png;base64,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)
physics-General
physics-
The graph shows the behavior of a length of wire in the region for which the substance obeys Hooke's law. P & Q represent.
![](data:image/png;base64,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)
The graph shows the behavior of a length of wire in the region for which the substance obeys Hooke's law. P & Q represent.
![](data:image/png;base64,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)
physics-General
physics-
The graph is drawn between the applied force F and the strain (x) for a thin uniform wire the wire behaves as a Iiquid in the part.
![](data:image/png;base64,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)
The graph is drawn between the applied force F and the strain (x) for a thin uniform wire the wire behaves as a Iiquid in the part.
![](data:image/png;base64,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)
physics-General
physics-
The adjacent graph shows the extension
of a wire of length I m suspended from the top of a roof at one end with the load W connected to the other end. If the cross sectional area of the wire is
, calculate the young's modulus of the material of the wire.
![](data:image/png;base64,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)
The adjacent graph shows the extension
of a wire of length I m suspended from the top of a roof at one end with the load W connected to the other end. If the cross sectional area of the wire is
, calculate the young's modulus of the material of the wire.
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)
physics-General
physics
A lift of mass 1000 kg is moving with an acceleration of 1 ms-2 in upward direction tension developed in the rope of lift is…..N (g=9.8ms-2)
A lift of mass 1000 kg is moving with an acceleration of 1 ms-2 in upward direction tension developed in the rope of lift is…..N (g=9.8ms-2)
physicsGeneral
physics
A Person standing on the floor of a lift drops a coin. The coin reaches the floor of the lift in time to if the lift is stationary and the time t2 if il is acceleratcd in upward direction. Than
A Person standing on the floor of a lift drops a coin. The coin reaches the floor of the lift in time to if the lift is stationary and the time t2 if il is acceleratcd in upward direction. Than
physicsGeneral
physics
A car turns a comer on a slippery road at a constant speed of 10m/5. If the coefficient of friction is 0.5, the minimum radius of the are at which the car turns is …….. meter.
A car turns a comer on a slippery road at a constant speed of 10m/5. If the coefficient of friction is 0.5, the minimum radius of the are at which the car turns is …….. meter.
physicsGeneral
physics
A man is standing on a spring balance. reading of spring balance is 60kgf It man jumps out side balance, then wading of
A man is standing on a spring balance. reading of spring balance is 60kgf It man jumps out side balance, then wading of
physicsGeneral
Maths-
If ![f space left parenthesis x right parenthesis equals cos space left parenthesis log space x right parenthesis comma text then end text f open parentheses x squared close parentheses times f open parentheses y squared close parentheses minus 1 half open square brackets f open parentheses x squared y squared close parentheses plus f open parentheses x squared over y squared close parentheses close square brackets equals](data:image/png;base64,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)
If ![f space left parenthesis x right parenthesis equals cos space left parenthesis log space x right parenthesis comma text then end text f open parentheses x squared close parentheses times f open parentheses y squared close parentheses minus 1 half open square brackets f open parentheses x squared y squared close parentheses plus f open parentheses x squared over y squared close parentheses close square brackets equals](data:image/png;base64,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)
Maths-General