Physics-
General
Easy
Question
As shown in figure, two masses of 3.0 kg and 1.0 kg are attached at the two ends of a spring having force constant 300 N
. The natural frequency of oscillation for the system will be .......hz (Ignore friction)
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)
- 1/4
- 1/3
- 4
- 3
The correct answer is: 3
Related Questions to study
physics-
When a body having mass m is suspended from the free end of two springs suspended from a rigid support, as shown in figure, its periodic time of oscillation is T. If only one of the two springs are used, then the periodic time would be…
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)
When a body having mass m is suspended from the free end of two springs suspended from a rigid support, as shown in figure, its periodic time of oscillation is T. If only one of the two springs are used, then the periodic time would be…
![](data:image/png;base64,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)
physics-General
physics-
A current carrying loop is placed in a uniform magnetic field in four different orientations, I, II, III and IV, arrange them in the decreasing order of potential energy
III
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485488/1/897917/Picture4.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485488/1/897917/Picture27.png)
IIIIV
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485488/1/897917/Picture28.png)
A current carrying loop is placed in a uniform magnetic field in four different orientations, I, II, III and IV, arrange them in the decreasing order of potential energy
III
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485488/1/897917/Picture4.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485488/1/897917/Picture27.png)
IIIIV
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485488/1/897917/Picture28.png)
physics-General
chemistry-
Which of the following statements are correct?
A) Like halogens, hydrogen combine with non metals forming covalent compounds.
B) Hydrogen as well as halogens have tendency of accepting electrons.
C) The oxide of hydrogen is natural, as is the case with oxide of halogens
D) Hydrogen and halogen form hydride ions with equal ease.
Which of the following statements are correct?
A) Like halogens, hydrogen combine with non metals forming covalent compounds.
B) Hydrogen as well as halogens have tendency of accepting electrons.
C) The oxide of hydrogen is natural, as is the case with oxide of halogens
D) Hydrogen and halogen form hydride ions with equal ease.
chemistry-General
Maths-
Maths-General
physics
A force of 8 N acts on an object of mass 5 kg in X- direction and another force of 6 N acts on in in Y . direction. Hence, the magnitude of acceleration of object will be
A force of 8 N acts on an object of mass 5 kg in X- direction and another force of 6 N acts on in in Y . direction. Hence, the magnitude of acceleration of object will be
physicsGeneral
Maths-
If ![vertical line a with not stretchy bar on top vertical line equals 3 comma vertical line b with not stretchy bar on top vertical line equals 4 text and end text left parenthesis a with not stretchy bar on top comma b with not stretchy bar on top right parenthesis equals pi over 2 text , then end text vertical line a with not stretchy bar on top plus b with not stretchy bar on top vertical line equals](data:image/png;base64,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)
If ![vertical line a with not stretchy bar on top vertical line equals 3 comma vertical line b with not stretchy bar on top vertical line equals 4 text and end text left parenthesis a with not stretchy bar on top comma b with not stretchy bar on top right parenthesis equals pi over 2 text , then end text vertical line a with not stretchy bar on top plus b with not stretchy bar on top vertical line equals](data:image/png;base64,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)
Maths-General
physics
Which of the following statement is correct?
Which of the following statement is correct?
physicsGeneral
physics
A body of 2kg has an initial speed 5 m/S. A force act it for some time in the directive of motion. The force
-me time (t) graph is shown in figure. The final speed of the body is…….
![](data:image/png;base64,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)
A body of 2kg has an initial speed 5 m/S. A force act it for some time in the directive of motion. The force
-me time (t) graph is shown in figure. The final speed of the body is…….
![](data:image/png;base64,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)
physicsGeneral
physics
A vessel containing walker is given a constant acceleration a towards the right, along a straight horizontal path. which of the following diagram opposants the surface of the liquid
A vessel containing walker is given a constant acceleration a towards the right, along a straight horizontal path. which of the following diagram opposants the surface of the liquid
physicsGeneral
physics
The linear momentum P of a particle varies with the time as follows.
Where a and b are constants. The net force acting on the particle is……
The linear momentum P of a particle varies with the time as follows.
Where a and b are constants. The net force acting on the particle is……
physicsGeneral
physics
A vehicle of 100 kg is moving with u velocity of 5 m/s. To slop it in /10 sec, the required force in opposite direction is N
A vehicle of 100 kg is moving with u velocity of 5 m/s. To slop it in /10 sec, the required force in opposite direction is N
physicsGeneral
physics
A ball fills co surface from 10 m height and rebounds tis .2.5 m If duration of contact with floor is .0.01sec the average aceleration during contact is.ms-2
A ball fills co surface from 10 m height and rebounds tis .2.5 m If duration of contact with floor is .0.01sec the average aceleration during contact is.ms-2
physicsGeneral
chemistry-
In group V-A of the periodic table nitrogen forms only a trihalide but other elements form pentahalides also. The reason is
In group V-A of the periodic table nitrogen forms only a trihalide but other elements form pentahalides also. The reason is
chemistry-General
chemistry-
Which of the following elements forms a strongly acidic oxide
Which of the following elements forms a strongly acidic oxide
chemistry-General
chemistry-
Orthophosphoric acid represents the molaysis condition due to
Orthophosphoric acid represents the molaysis condition due to
chemistry-General