269822
Three forces start acting simultaneously on a particle moving with velocity\(\vec{V}\). The forces are represented in magnitude and direction by the three sides of a triangle ABC (as shown). The particle will now move with velocity
1 less than\(\vec{V}\)
2 greater than\(\vec{V}\)
3 \(|\overrightarrow{\mathrm{V}}|\) in the direction of largest force
4 \(\vec{V}\) remaining unchanged
Explanation:
Motion in Plane
269823
The minimum number of forces of equal magnitude in a plane that can keep a particle in equilibrium is
1 4
2 2
3 3
4 5
Explanation:
Motion in Plane
269824
The minimum number of unequal forces in a plane that can keep a particle in equilibrium is
1 4
2 2
3 3
4 6
Explanation:
Motion in Plane
269825
The minimum number ofnon coplanar forces that can keep a particle in equilibrium is
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Motion in Plane
269822
Three forces start acting simultaneously on a particle moving with velocity\(\vec{V}\). The forces are represented in magnitude and direction by the three sides of a triangle ABC (as shown). The particle will now move with velocity
1 less than\(\vec{V}\)
2 greater than\(\vec{V}\)
3 \(|\overrightarrow{\mathrm{V}}|\) in the direction of largest force
4 \(\vec{V}\) remaining unchanged
Explanation:
Motion in Plane
269823
The minimum number of forces of equal magnitude in a plane that can keep a particle in equilibrium is
1 4
2 2
3 3
4 5
Explanation:
Motion in Plane
269824
The minimum number of unequal forces in a plane that can keep a particle in equilibrium is
1 4
2 2
3 3
4 6
Explanation:
Motion in Plane
269825
The minimum number ofnon coplanar forces that can keep a particle in equilibrium is
269822
Three forces start acting simultaneously on a particle moving with velocity\(\vec{V}\). The forces are represented in magnitude and direction by the three sides of a triangle ABC (as shown). The particle will now move with velocity
1 less than\(\vec{V}\)
2 greater than\(\vec{V}\)
3 \(|\overrightarrow{\mathrm{V}}|\) in the direction of largest force
4 \(\vec{V}\) remaining unchanged
Explanation:
Motion in Plane
269823
The minimum number of forces of equal magnitude in a plane that can keep a particle in equilibrium is
1 4
2 2
3 3
4 5
Explanation:
Motion in Plane
269824
The minimum number of unequal forces in a plane that can keep a particle in equilibrium is
1 4
2 2
3 3
4 6
Explanation:
Motion in Plane
269825
The minimum number ofnon coplanar forces that can keep a particle in equilibrium is
269822
Three forces start acting simultaneously on a particle moving with velocity\(\vec{V}\). The forces are represented in magnitude and direction by the three sides of a triangle ABC (as shown). The particle will now move with velocity
1 less than\(\vec{V}\)
2 greater than\(\vec{V}\)
3 \(|\overrightarrow{\mathrm{V}}|\) in the direction of largest force
4 \(\vec{V}\) remaining unchanged
Explanation:
Motion in Plane
269823
The minimum number of forces of equal magnitude in a plane that can keep a particle in equilibrium is
1 4
2 2
3 3
4 5
Explanation:
Motion in Plane
269824
The minimum number of unequal forces in a plane that can keep a particle in equilibrium is
1 4
2 2
3 3
4 6
Explanation:
Motion in Plane
269825
The minimum number ofnon coplanar forces that can keep a particle in equilibrium is
