Physics-
General
Easy
Question
Shown in the figure, the tension in string OA is
![](data:image/png;base64,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)
Strings are masters and inextensible.
- 40 N
- 60 N
- 80 N
- zero
The correct answer is: 80 N
Related Questions to study
physics-
The tension in string ‘B’ is
![](data:image/png;base64,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)
The tension in string ‘B’ is
![](data:image/png;base64,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)
physics-General
physics-
Shown in the figure, the tension in string ‘C’ is
![](data:image/png;base64,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)
Shown in the figure, the tension in string ‘C’ is
![](data:image/png;base64,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)
physics-General
physics-
Shown in the given figure, the net force acting parallel to the inclined plane is
![open parentheses g equals 10 m divided by s to the power of 2 end exponent close parentheses](data:image/png;base64,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)
Shown in the given figure, the net force acting parallel to the inclined plane is
![open parentheses g equals 10 m divided by s to the power of 2 end exponent close parentheses](data:image/png;base64,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)
physics-General
physics-
Shown in the figure , normal force acting on the block is
![](data:image/png;base64,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)
![open parentheses g equals 10 m divided by s to the power of 2 end exponent close parentheses](data:image/png;base64,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)
Shown in the figure , normal force acting on the block is
![](data:image/png;base64,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)
![open parentheses g equals 10 m divided by s to the power of 2 end exponent close parentheses](data:image/png;base64,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)
physics-General
physics-
The force acting along y-axis is
![](data:image/png;base64,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)
The force acting along y-axis is
![](data:image/png;base64,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)
physics-General
physics-
The net force acting along horizontal direction is
![](data:image/png;base64,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)
The net force acting along horizontal direction is
![](data:image/png;base64,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)
physics-General
physics-
Normal force acting on the block is
![](data:image/png;base64,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)
Normal force acting on the block is
![](data:image/png;base64,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)
physics-General
physics-
A 150g ball, traveling at 30m/s, strikes the palm of player’s hand and is stopped in 0.05sec. The force exerted by the ball on the hand is
A 150g ball, traveling at 30m/s, strikes the palm of player’s hand and is stopped in 0.05sec. The force exerted by the ball on the hand is
physics-General
physics-
A ball is projected upwards. Its acceleration at the highest point is
A ball is projected upwards. Its acceleration at the highest point is
physics-General
physics-
An object is thrown along a direction inclined at an angle of 45° with the horizontal direction. The horizontal range of the particle is
An object is thrown along a direction inclined at an angle of 45° with the horizontal direction. The horizontal range of the particle is
physics-General
physics-
A body is dropped from a height of 20 m above the ground. If gravity disappears 1 second after it starts falling, the total time it takes to hit the ground is (g = 10 ms-2).
A body is dropped from a height of 20 m above the ground. If gravity disappears 1 second after it starts falling, the total time it takes to hit the ground is (g = 10 ms-2).
physics-General
physics-
A player kicks up a ball at an angle q with the horizontal. The horizontal range is maximum when q is equal to
A player kicks up a ball at an angle q with the horizontal. The horizontal range is maximum when q is equal to
physics-General
physics-
An object projected with 20m/s and 30° with horizontal direction. The time of flight is ![left parenthesis g equals 10 m divided by s to the power of 2 end exponent right parenthesis](data:image/png;base64,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)
An object projected with 20m/s and 30° with horizontal direction. The time of flight is ![left parenthesis g equals 10 m divided by s to the power of 2 end exponent right parenthesis](data:image/png;base64,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)
physics-General
physics-
The displacement – time graph is shown below
![](data:image/png;base64,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)
From the graph match the following given below
List - A List - B
i) Velocity along AB (A) 1.25 ms–1
ii) Velocity along DE (B) Zero
iii) Average velocity along CE (C) -7.5 ms–1 (D) 2.1ms–1
The displacement – time graph is shown below
![](data:image/png;base64,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)
From the graph match the following given below
List - A List - B
i) Velocity along AB (A) 1.25 ms–1
ii) Velocity along DE (B) Zero
iii) Average velocity along CE (C) -7.5 ms–1 (D) 2.1ms–1
physics-General
physics-
The displacement – time graph shown below.
![](data:image/png;base64,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)
From the graph the velocity between 4s to 6s is _____________
The displacement – time graph shown below.
![](data:image/png;base64,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)
From the graph the velocity between 4s to 6s is _____________
physics-General