Physics
General
Easy
Question
In the above figure acceleration (a)
time (t) graph is given. Hence ![text V end text alpha horizontal ellipsis horizontal ellipsis](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAADYAAAANCAYAAADi+J2zAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAMyZLetQAAARxJREFUeNpjYMAE54BYgwE7sAbiMwxDFBQAcSMOuSlAnDdUPSYKxHexiDMB8Uuo/JAFO4DYEk3MBYg3EalfGIgXAvEPKM2DJAfihw6Ux6KBeBKa2FwgDidCLxsQHwViLyh7PzQJg4A8NA8PGGAB4ofQ5AdLhs+R+PhALRBXIvENkJL2UiC2HejkCIohNyjbB4inEanvMVrSA4GDULOmDYZ85gjND7CQtiRCjzEQH8YingzEx7F4eMAAKAlxAPENItWDCoXlWMQXQvPdoAGtQLwBmm+IAUFAvA5NbDYQJ0JjUmWweEwLiP8DsRKR6vmA+D4QqwGxIBDPB+KZULltWALoPxTTio8XTCExMOShRfw5tPoqHogvDSaPDUkAAB0lRoWa93a5AAAAjXRFWHRNYXRoTUwAPG1hdGggeG1sbnM9Imh0dHA6Ly93d3cudzMub3JnLzE5OTgvTWF0aC9NYXRoTUwiPjxtdGV4dD4mI3hBMDtWJiN4QTA7PC9tdGV4dD48bWk+JiN4M0IxOzwvbWk+PG1vPiYjeDIwMjY7PC9tbz48bW8+JiN4MjAyNjs8L21vPjwvbWF0aD5v7XGkAAAAAElFTkSuQmCC)
![](data:image/png;base64,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)
- a
![square root of a](data:image/png;base64,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)
![a squared](data:image/png;base64,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)
![a cubed](data:image/png;base64,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)
The correct answer is: ![a squared](data:image/png;base64,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)
Related Questions to study
physics-
A block of mass 2kg is free to move along the x- axis. It is at rest and from t=0 onwards it is subjected to a time-dependent force
in the x- direction. The force
varies with t as shown in the figure. The kinetic energy of the block after 4.5 seconds is
![](data:image/png;base64,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)
A block of mass 2kg is free to move along the x- axis. It is at rest and from t=0 onwards it is subjected to a time-dependent force
in the x- direction. The force
varies with t as shown in the figure. The kinetic energy of the block after 4.5 seconds is
![](data:image/png;base64,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)
physics-General
physics-
The resultant of two forces, one double the other in magnitude, is perpendicular to the smaller of the two forces. The angle between the two forces is -
The resultant of two forces, one double the other in magnitude, is perpendicular to the smaller of the two forces. The angle between the two forces is -
physics-General
physics
Here is a velocity - time graph of a motorbike moving in one direction. Calculate the distance covered by it in last two seconds.
![](data:image/png;base64,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)
Here is a velocity - time graph of a motorbike moving in one direction. Calculate the distance covered by it in last two seconds.
![](data:image/png;base64,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)
physicsGeneral
physics
Here are the graphs of velocity
time of two cars A and B, Find the ratio of the acceleration. after time t.
![](data:image/png;base64,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)
Here are the graphs of velocity
time of two cars A and B, Find the ratio of the acceleration. after time t.
![](data:image/png;base64,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)
physicsGeneral
physics
The intercept of the velocity-time graph on the velocity axis gives.
The intercept of the velocity-time graph on the velocity axis gives.
physicsGeneral
physics
Slope of the velocity-time graph gives …….. of a moving body
Slope of the velocity-time graph gives …….. of a moving body
physicsGeneral
Physics
The graph given in the figure shows that the body is moving with.....
![](data:image/png;base64,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)
The graph given in the figure shows that the body is moving with.....
![](data:image/png;base64,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)
PhysicsGeneral
Physics
A graph of moving body with constant acceleration is given in the figure. What is the velocity aftertime t?
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)
A graph of moving body with constant acceleration is given in the figure. What is the velocity aftertime t?
![](data:image/png;base64,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)
PhysicsGeneral
Physics
A particle is moving in a straight line with initial velocity of 10 ms-1 A graph of acceleration
tine of the particle is given in the figure. Find velocity at t=10s.
![](data:image/png;base64,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)
A particle is moving in a straight line with initial velocity of 10 ms-1 A graph of acceleration
tine of the particle is given in the figure. Find velocity at t=10s.
![](data:image/png;base64,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)
PhysicsGeneral
Maths-
The domain of the function ![f left parenthesis x right parenthesis equals square root of cosec space x minus 1 end root text is end text](data:image/png;base64,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)
The domain of the function ![f left parenthesis x right parenthesis equals square root of cosec space x minus 1 end root text is end text](data:image/png;base64,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)
Maths-General
physics
In the figure Velocity (V)
position graph is given. Find the true equation.
![](data:image/png;base64,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)
In the figure Velocity (V)
position graph is given. Find the true equation.
![](data:image/png;base64,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)
physicsGeneral
physics
Ball A is thrown in upward from the top of a tower of height h. At the same time ball B starts to fall from that point. When A comes to the top of the tower, B reaches the ground. Find the time to reach maximum height for A.
Ball A is thrown in upward from the top of a tower of height h. At the same time ball B starts to fall from that point. When A comes to the top of the tower, B reaches the ground. Find the time to reach maximum height for A.
physicsGeneral
Maths-
The domain of ![f left parenthesis x right parenthesis equals fraction numerator 1 over denominator vertical line sin invisible function application x vertical line plus sin invisible function application x end fraction text is end text](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKwAAAAnCAYAAACSRqPDAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAwZJREFUeNrtm09IF0EUxweJHxFdIiIkQvDQoYMIHSIiJOggISGCB48iiIREt+gQHbqIB5Ho1qGDBy/RoUMIISISXiQ8SHjpGN08eBAJYXrDPmFZZmbfzP5h1t/3A1/U3d8OO/u+O76ZNz+lQArcIb0h7eNRgC6wRponaTwK0CVgWADDAgDDAgDDAhgWABgWABi2EZ6TlgKvWeLrAAzbGAOkm4VjI6TdyPZ+8PUAhq2dcdIR64B0KWe60cg275F28Gi9Ri0KL6YAY84/OWPe5Z+jbNgq7LBxAajNsFOkdcvxZdJixbZfROS/AHh5S3plOb5BemQ5Pucw4Ts+l+cBaROPGFhG2GHSFukkJCX6UsihZnLnjkk9x3U/CxO0WdIHy+d63I40h+unnK7fDbtHehbT0CHptuX4WckkbYV/f1Iyiv5DrIDFsGZkvRbayABfqAINa/hOGlPZBuTrLRtWQ8kp1LCTPKmfCQn8fc4jbPhSAsNLNqNvrRUpAfCtElwlfST9Utk3MEox7v7kGUEfOs6Z4585LfC9IZh0AZ9hz3nN86JS3qvsaxo2XMtaZnb3lXSF35A9T0qwyO0AoEtSU1HqaFYJnjrO2QoHN0jfCgadUNn3k2y0VTjQHQ4WDJsth25JGjGl2Mue87u5HLXHBr9l+dw6rxzkabM0C8N2z7Dn85QzHgQHyxowo+Xfks90ZfOLTtxEGi9LNVZVtv4qKZsuqPDy6rInN4ZhYdhgzL/rqT7Jj7p4f0gh+iw/ktSptePvadJv0ilpW9mrgCH7KZo0bGr9BJEBltSpbYGc5nRmiI/NcjBtSPdTNGnY1PoJIgMsqVPbAvm4cMy3Phiyn6Ipw6bWTxAZYEmdWgtN4jOPdD+FFtx/TJk6tX6CCiNSWZ26jkBK9lM0PelKqZ+ghgC76tRVAyndT9HWKkEK/QQ1BNiVn1UJZMh+irYMm0I/QQ0BdtWpYwMZup+iLcOm0E8QGWBJnTomkKH7KaoYUNrvlPoJGhyRcH8AhoBhAQwLLhynuL+Ly38FsZxwZba9HAAAASB0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bWk+ZjwvbWk+PG1vPig8L21vPjxtaT54PC9taT48bW8+KTwvbW8+PG1vPj08L21vPjxtZnJhYz48bW4+MTwvbW4+PG1yb3c+PG1vPnw8L21vPjxtaT5zaW48L21pPjxtbz4mI3gyMDYxOzwvbW8+PG1pPng8L21pPjxtbz58PC9tbz48bW8+KzwvbW8+PG1pPnNpbjwvbWk+PG1vPiYjeDIwNjE7PC9tbz48bWk+eDwvbWk+PC9tcm93PjwvbWZyYWM+PG10ZXh0PiYjeEEwO2lzJiN4QTA7PC9tdGV4dD48L21hdGg+HxHrxQAAAABJRU5ErkJggg==)
The domain of ![f left parenthesis x right parenthesis equals fraction numerator 1 over denominator vertical line sin invisible function application x vertical line plus sin invisible function application x end fraction text is end text](data:image/png;base64,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)
Maths-General
Physics
A particle is thrown in upward direction with initial velocity V0 It crosses point P at height h at time t1 and t2 so t1 t2 ……..
A particle is thrown in upward direction with initial velocity V0 It crosses point P at height h at time t1 and t2 so t1 t2 ……..
PhysicsGeneral
Maths-
Maths-General