Physics-
General
Easy
Question
Graphs of velocity
time for two cars A and B moving in a straight line are given in the fig. The area covered by PQRS gives.
![](data:image/png;base64,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)
- distance from A to B at time
- distance from A to B at time
- distance from A to B in time interval
- change in distance from A to B in time interval
The correct answer is: distance from A to B in time interval ![t subscript 2 end subscript minus t subscript 1 end subscript](data:image/png;base64,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)
Related Questions to study
physics
An artificial satellite moving in a circular orbit around earth has a total (kinetic + potential energy) E0, its potential energy is
An artificial satellite moving in a circular orbit around earth has a total (kinetic + potential energy) E0, its potential energy is
physicsGeneral
physics-
In the above triangle
and
Find the value of angle
.
![](data:image/png;base64,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)
In the above triangle
and
Find the value of angle
.
![](data:image/png;base64,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)
physics-General
physics
A body of mass m is taken from earth surface to the height h equal to radius of earth, the, increase in potential energy will be
A body of mass m is taken from earth surface to the height h equal to radius of earth, the, increase in potential energy will be
physicsGeneral
physics
If the radius of the earth were to shrink by 1% its mass remaing the same, the accelration due, to gravity on the earth's surface would
If the radius of the earth were to shrink by 1% its mass remaing the same, the accelration due, to gravity on the earth's surface would
physicsGeneral
maths-
Conserve the following statements:
A: Angle between ![2 ı with not stretchy bar on top minus m ȷ with not stretchy bar on top plus 3 m k with not stretchy bar on top text and end text left parenthesis 1 plus m right parenthesis ı with not stretchy bar on top minus 2 m ȷ with not stretchy bar on top plus k with not stretchy bar on top text is acute end text not stretchy rightwards double arrow m not an element of open square brackets negative 2 comma negative 1 half close square brackets](data:image/png;base64,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)
![text R: If end text left parenthesis a with not stretchy bar on top comma b with not stretchy bar on top right parenthesis text is acute then end text a with not stretchy bar on top times b with not stretchy bar on top greater than 0 text If end text left parenthesis a with not stretchy bar on top comma b with not stretchy bar on top right parenthesis text is obtuse then end text a with not stretchy bar on top times b with not stretchy bar on top less than 0](data:image/png;base64,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)
Conserve the following statements:
A: Angle between ![2 ı with not stretchy bar on top minus m ȷ with not stretchy bar on top plus 3 m k with not stretchy bar on top text and end text left parenthesis 1 plus m right parenthesis ı with not stretchy bar on top minus 2 m ȷ with not stretchy bar on top plus k with not stretchy bar on top text is acute end text not stretchy rightwards double arrow m not an element of open square brackets negative 2 comma negative 1 half close square brackets](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAeIAAAAqCAYAAABvJVjOAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAbSkFbcgAAB65JREFUeNrtnX+EHVcUx69Ya0UskT9WxAorIqoiREVExFJVUbFCRFRVhRVRkT9CVUVVhYioyH9VEVGxRFRURYlYK2otsaJWxVJVFREhf0TFs5bpvd557XRyZ96dO/fOvHn5fDjsm31v5t4z59zv/THvPqUAAADCklgM8AsAANQoOICfAAAAgcFPAACAwAB+AgAABCY4O7Wd1/aoLj+xyNxMMONz7gM+A4R4MPle22yF+pIXAACAEDdYX4QYAAAQYoQ4rCOYCgMgRwAhRogBAAAhpr74CQAAEGKEGAAAEGLqi58AAAAhRojhjeO0tostK/NFKTcAIMQIMbSa3doWW1r2X6T8AJDPXm0PEJhwQnxA221tL7Wtqe52XR8SZ1amtd3V9kpbR9uqtivatkS6nrnOhhYGnRGzPZbjVbeEa7qBicGw5p9P7DJCaA93tL1b030c1Byp+pXA/71/QdsJbZvk9VvSkJ4g1l5jXttRbaOpY0Zwfo5wrR3afm1h72+PxI+NqlvC1cUDEeQ6GMb8843dNgnxizes7dslg45l6WQVCU9CjoSJ9+0DKgKDNrXQ42WEMs1om2uhry5p+zSCv+tspM+oZte3BzH/kiGI3UFqM9qEGXysaDslHdTrfUakyRuaI1FiqJNz/Ettn0UoVO+8E9quanum7am2w/L/zdq+kZ6oEb7PBySpprQ9jlCftJ9HtN1IfbaII9qWVHcKx0ydH8ip6zFtv8t9Nj3OScu5DqnuNNCavPcTB1+Z2YGDDQtxVd/v13a/xth3zb+25Ihv7CaW3Jp3GIGViX8lxxbEx39q+8ihnknm76LpSDNS+0vOb0RrLNA9OKdtvOb2dFJGwRvl9Tbx6yB0UjrDLsT7Vf704i3p8YbmlgTPQwnkEen1/KFtqyTOcTk+KTdhouB8eyUAYwnxhAjTak4jU7U+PT+Pyd/TjuW6KVM3Ssq3YqnrMRm5bk+9b8EyFfWbtrdT00G3HXxlknq0YSGu6vvRnFmOWLHvmn9tyRHf2M1e46EIaxn6xb9ZOnku5TNr2DvlM2WEuOh9+6RjPinnnxXBC8EX0nE4UGN7ejUT87FmvELlyNAI8Zj0KPNu9qr0ikKzKqOQzZnjT7R9l3N8a8FUyiUJ2tCNTLY3fDZSfVZFBH+U5PZhg4wMsuWfdnjfNWVfg+nnq/VIHZ+k5lhaqzH2XfOvLTniG7vZa7yy1Klq/JvO5BmPeroK8Q+WvHlaoX3Jswuq+GG4ULHyJHWdcRHyGB3tUDkyFEJsbo55Gu69gsB+VTGIis67seTxIrZL0oUsZ9ZXMxIQhwLXp/d6MTUiDXWzXRuapzlTanUJcdOxtFZT7LvmX1typErsZs85o6o/lJNYZmzGIwrx35aRZehnSK7J9W/W0J6uecRAEim3XTQq1nUTTyvdDk5JBXcUfND0bucj9Azyzlv2eDaJL0To7WfZJGIcsj691yck6cpwXnrD6znB4Jo8656+anpqOkQs2aamY8W+a/61JUeqxG6Sk19mBGeWSXZGjP9QQuzbCSvb4F8sGBGHjJXeiHhURsPjAWMldI60fkS8S4J9Y58PmuS6HqFAeectezybkEdrEGJDJ3B90q8vq+7Tii58q7rrv2MBRsSdnETv56t7DlNGMYU4RCzZHtaKFfuu+deWHPGN3X7XMA8TLQeI/+eRR8QvHNpRX1zXiEPGyhXpsJ2W+1lHe+qbI60WYjONYhb2Rxw+aBbuT0YokDnvbIXj9ywNypzcvNiBs1u9/hRh1frY6ueyHvKyYk8+zbzlmlvU4H99qarvlZT/Uk2x75p/bckR39jtdw3beq9P/JvGvGiNeN3SAb1qOc9aTkf1eqQ4MZxT/32XNnYO9DAPcj1U5Z6PSBrKkVYL8U8lktE8iHA4QoHyzutyfFR6idkAXYnQyC9Ij3tEknBapms+Dlgf22uzLmKmv7f2Kd/jVCNgkuZr1V3r3eYhxPukEd0mdf1AddfrqmzoUYcQV/W9wbahR6zYd82/tuSIb+z2u8ZJ1X+q3SX+p8QXRyWuzf+uZXK8l887RACOW8r2SNnXrs1nzFf9emuYZh3+Rs0NfIgcSPOV+PGU5PdIhPwOkSNzcu0Z1Q6S7AvXdY0XKtx34lzO63J8g9yoNOZGxNiQ4aBcqyM2LwIVsj557zMPvtzv438zOl+W3vqSiKlJomceQmwwa3J3pK69bStdkmxR2fdrrrolXOxYUip/i8tYse+af23JEd/YzZu9SWSUetdBzF3iv9dZXJLzGkE9khkBLsg5TJn355RtWs5ri+F3JF/WpbNzRNVL1RxQlk6HiZf0zlrrqr6dtVxzpNVCPAwYwTDrJ5dl+uasgibhRx/IERgO3lf5T9YPosDMqTgzV2lC7X3N3uoQnVOqfT+DaNaFZ7l1AP9iZgXK7rvelMDskRmI2GvJofa+RogBACAKTQmMWe+faOjaPntfI8QAADBUQtw0HfwEAAAIcTP47H2NEAMAAEIcAN+9rxFiAABAiCtSde9rAAAAhNiTqntfI8QAAIAQexJi72uEGAAAEGIPQu19jRADAABC7EGZ32dAiAEAACGOUL+qvzuNEAMAAEKMnwAAAIHBTwAAAMEFJvbPnQ6NX/4B/JGenx2OIewAAAO+dEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1uPjI8L21uPjxtb3ZlciBhY2NlbnQ9InRydWUiPjxtaT4mI3gxMzE7PC9taT48bW8gc3RyZXRjaHk9ImZhbHNlIj4mI3hBRjs8L21vPjwvbW92ZXI+PG1vPiYjeDIyMTI7PC9tbz48bWk+bTwvbWk+PG1vdmVyIGFjY2VudD0idHJ1ZSI+PG1pPiYjeDIzNzs8L21pPjxtbyBzdHJldGNoeT0iZmFsc2UiPiYjeEFGOzwvbW8+PC9tb3Zlcj48bW8+KzwvbW8+PG1uPjM8L21uPjxtaT5tPC9taT48bW92ZXIgYWNjZW50PSJ0cnVlIj48bWk+azwvbWk+PG1vIHN0cmV0Y2h5PSJmYWxzZSI+JiN4QUY7PC9tbz48L21vdmVyPjxtdGV4dD4mI3hBMDthbmQmI3hBMDs8L210ZXh0Pjxtbz4oPC9tbz48bW4+MTwvbW4+PG1vPis8L21vPjxtaT5tPC9taT48bW8+KTwvbW8+PG1vdmVyIGFjY2VudD0idHJ1ZSI+PG1pPiYjeDEzMTs8L21pPjxtbyBzdHJldGNoeT0iZmFsc2UiPiYjeEFGOzwvbW8+PC9tb3Zlcj48bW8+JiN4MjIxMjs8L21vPjxtbj4yPC9tbj48bWk+bTwvbWk+PG1vdmVyIGFjY2VudD0idHJ1ZSI+PG1pPiYjeDIzNzs8L21pPjxtbyBzdHJldGNoeT0iZmFsc2UiPiYjeEFGOzwvbW8+PC9tb3Zlcj48bW8+KzwvbW8+PG1vdmVyIGFjY2VudD0idHJ1ZSI+PG1pPms8L21pPjxtbyBzdHJldGNoeT0iZmFsc2UiPiYjeEFGOzwvbW8+PC9tb3Zlcj48bXRleHQ+JiN4QTA7aXMgYWN1dGUmI3hBMDs8L210ZXh0PjxtbyBzdHJldGNoeT0iZmFsc2UiPiYjeDIxRDI7PC9tbz48bWk+bTwvbWk+PG1vPiYjeDIyMDk7PC9tbz48bWZlbmNlZCBjbG9zZT0iXSIgb3Blbj0iWyIgc2VwYXJhdG9ycz0ifCI+PG1yb3c+PG1vPiYjeDIyMTI7PC9tbz48bW4+MjwvbW4+PG1vPiw8L21vPjxtbz4mI3gyMjEyOzwvbW8+PG1mcmFjPjxtbj4xPC9tbj48bW4+MjwvbW4+PC9tZnJhYz48L21yb3c+PC9tZmVuY2VkPjwvbWF0aD6Tx1MAAAAAAElFTkSuQmCC)
![text R: If end text left parenthesis a with not stretchy bar on top comma b with not stretchy bar on top right parenthesis text is acute then end text a with not stretchy bar on top times b with not stretchy bar on top greater than 0 text If end text left parenthesis a with not stretchy bar on top comma b with not stretchy bar on top right parenthesis text is obtuse then end text a with not stretchy bar on top times b with not stretchy bar on top less than 0](data:image/png;base64,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)
maths-General
physics
Suppose the gravitational force varies inversely as the nth power of distance the time period of planet in circular orbit of radius R around the sun will be proportional to
Suppose the gravitational force varies inversely as the nth power of distance the time period of planet in circular orbit of radius R around the sun will be proportional to
physicsGeneral
physics-
and
Find ![vertical line stack A with rightwards arrow on top plus 2 stack B with minus on top vertical line](data:image/png;base64,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)
and
Find ![vertical line stack A with rightwards arrow on top plus 2 stack B with minus on top vertical line](data:image/png;base64,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)
physics-General
physics
A thin uniform annular disc (See figure) of mass M has outer radius 4R and inner radius 3R. The work required to take a unit mass from point on its axix to infinity is....
A thin uniform annular disc (See figure) of mass M has outer radius 4R and inner radius 3R. The work required to take a unit mass from point on its axix to infinity is....
physicsGeneral
chemistry-
Aluminium chloride exists as dimer,
in solid state as well as in solution of non-polar solvents such as benzene. When dissolved in water, it gives
Aluminium chloride exists as dimer,
in solid state as well as in solution of non-polar solvents such as benzene. When dissolved in water, it gives
chemistry-General
chemistry-
Which of the following is a non-metal.</strong
Which of the following is a non-metal.</strong
chemistry-General
physics
What does not change in the field of central force
What does not change in the field of central force
physicsGeneral
physics
If r denotes the distance between the sun and the earth, then the angular momentum of the earth around the sun is proportional to
If r denotes the distance between the sun and the earth, then the angular momentum of the earth around the sun is proportional to
physicsGeneral
physics-
Which from the following is a scalar ?
Which from the following is a scalar ?
physics-General
physics-
In the above figure
and
are two vectors. What from followings is true
![](data:image/png;base64,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)
In the above figure
and
are two vectors. What from followings is true
![](data:image/png;base64,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)
physics-General
physics-
As shown in figure, the block of 2 kg at one end and the other of 3 kg at the other end of a light string are connected. It the system remains stationary find the magnitude and direction of the frictional force, ![open parentheses g equals 10 text end text m s to the power of 2 end exponent close parentheses](data:image/png;base64,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)
![](data:image/png;base64,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)
As shown in figure, the block of 2 kg at one end and the other of 3 kg at the other end of a light string are connected. It the system remains stationary find the magnitude and direction of the frictional force, ![open parentheses g equals 10 text end text m s to the power of 2 end exponent close parentheses](data:image/png;base64,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)
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)
physics-General