0
What else can I help you with?
In an isolated system two cars each with a mass of 1000 kg collide Car 1 is initially at rest while Car 2 was moving at 10 ms What is the magnitude of their combined momentum after the collision?
10,000 kg-m/s
In an isolated system two cars each with a mass of 1000 kg collide. Car 1 is initially at rest while Car 2 was moving at 10 ms. What is the magnitude of their combined momentum after the collision?
10,000 kg-m/s
Is an isolated system two cars each with a mass of 2000 kg collide car 1 is initially at rest while car 2 was moving at 20 ms what is their combined momentum after the collision?
Their combined momentum was 40,000 kg-m/s: 2000kg X 20 m/s= 40000 kg-m/s.
In an isolated system two cars each with a mass of 1000 kg collide car 1 is initially at rest while car 2was moving at10ms what is the magnitude of their combined momentum after the collision?
The total momentum before the collision is 10,000 kg m/s (1000 kg * 10 m/s) in the direction of Car 2's initial velocity. Since the system is isolated, momentum is conserved. After the collision, the total momentum is still 10,000 kg m/s, but now shared between the two cars.
In an isolated system two cars each with a mass of 1500 kg collide. Car 1 is initially at rest while Car 2 was moving at 5 ms. What is their combined momentum after the collision?
Law of Conservation of Momentum: The total momentum after the collision is equal to the total momentum before the collission.
In an isolated system Bicycle 1 and Bicycle 2 each with a mass of 10 kg collide Bicycle 1 was moving to the right at 5 ms while Bicycle 2 was moving to the left at 3 ms What is the magnitude o their?
Magnitude of momentum before collision = (10 kg x 5 m/s) - (10 kg x 3 m/s) = 20 kg m/s. Magnitude of momentum after collision (assuming completely inelastic collision) = 20 kg m/s. Therefore, the magnitude of their combined momentum after collision will be 20 kg m/s.
In an isolated system, two cars, each with a mass of 1,000 kg, collide Car 1 is initially at rest, while Car 2 was moving at 10 m/s What is the magnitude of their combined momentum after the collisi?
10,000 kg-m/s
In an isolated system two cars each with a mass of 2000 kg collide Car 1 is initially at rest while Car 2 was moving at 20 ms What is their combined momentum after the collision?
Their combined momentum was 40,000 kg-m/s: 2000kg X 20 m/s= 40000 kg-m/s.
In an isolated system two cars each with a mass of 1000 kg collide Car 1 is initially at rest while Car 2 was moving at 10 ms They move off together What is their speed?
Their speed after the collision would be 5 m/s. This can be calculated using the principle of conservation of momentum, which states that the total momentum before the collision is equal to the total momentum after the collision in an isolated system. Since Car 1 was initially at rest (0 m/s) and Car 2 was moving at 10 m/s, their total momentum before the collision would be m * v = 1000 kg * 10 m/s = 10000 kg⋅m/s. After the collision, this total momentum would be divided between the two cars, resulting in a speed of 5 m/s for the combined system.
In an isolated system two cars each with a mass of 2500 kg collide. Car 1 is initially at rest while Car 2 was moving at 20 ms. What is their speed after the collision?
10 m/s
If the mass at the top of the plane is initially at a height of above the horizontal plane what is the velocity of m after the collision?
The velocity of mass m after the collision will depend on the conservation of momentum. If the system is isolated and no external forces act on it, the momentum before the collision will equal the momentum after the collision. So, you will need to calculate the initial momentum of the system and then use it to find the final velocity of m.
In an isolated system two cars each with a mass of 1000 kg collide car 1 is intitially at rest while car 2 was moving at 10 ms they move off together what is their speed?
By conservation of momentum in an isolated system, the total momentum before the collision is equal to the total momentum after the collision. You can calculate this using the formula for conservation of momentum, which states that the initial momentum of car 2 is equal to the combined momentum of both cars after the collision. With this information, you can determine the common final speed of the two cars after the collision.
