Home
Class 12
PHYSICS
Two particles are thrown horizontally in...

Two particles are thrown horizontally in opposite directions from the same point from a height h with velocities `4 ms^(-1) and 3 ms^(-1)` . What is the separation between them when their velocities are perpendicular to each other?

Text Solution

AI Generated Solution

To solve the problem of finding the separation between two particles thrown horizontally in opposite directions when their velocities are perpendicular to each other, we can follow these steps: ### Step-by-Step Solution: 1. **Understanding the Problem**: Two particles are thrown horizontally from the same height \( h \) with velocities \( v_A = 4 \, \text{m/s} \) to the left and \( v_B = 3 \, \text{m/s} \) to the right. We need to find the separation between them when their velocity vectors are perpendicular. 2. **Velocity Components**: ...
Promotional Banner

Topper's Solved these Questions

  • Motion in Straight Line

    VMC MODULES ENGLISH|Exercise SOLVED EXAMPLES|20 Videos

  • Motion in Straight Line

    VMC MODULES ENGLISH|Exercise PRACTICE EXERCISE|80 Videos

  • MOTION IN A STRAIGHT LINE & PLANE

    VMC MODULES ENGLISH|Exercise IMPECCABLE|52 Videos

  • Motion in Two Dimensions

    VMC MODULES ENGLISH|Exercise MCQ|2 Videos

Similar Questions

Explore conceptually related problems

From a tower of height 40 m , two bodies are simultaneously projected horizontally in opposite direction, with velocities 2 m s^-1 and 8 ms^-1 . respectively. The horizontal distance between two bodies, when their velocity are perpendicular to each other, is.

Two particles are thrown simultaneously from points A and B with velocities u_1 = 2ms^(-1) and u_2 - 14 ms^(-1) , respectively, as shown in figure. Minimum separation between A and B is

From a tower of height 40 m , two bodies are simultaneously projected horizontally in opposite direction, with velocities 2 m s^-1 and 8 ms^-1 . respectively. The time taken for the velocity vectors of two bodies to become perpendicular to each other is :

From a tower of height 40 m , two bodies are simultaneously projected horizontally in opposite direction, with velocities 2 m s^-1 and 8 ms^-1 . respectively. The time taken for the displacement vectors of two bodies to be come perpendicular to each other is.

Two particles are projected from a tower horizontally in opposite directions with velocities 10 m//s and 20 m//s . Find the time when their velocity vectors are mutually perpendicular. Take g=10m//s^2 .

Two particles are simultaneously thrown from the top of two towards as shown. Their velocities are 2ms^(-1) and 14ms^(-1) . Horizontal and vertical separations between these particles are 22 m and 9 m respectively. Then the minimum separation between the particles in the process of their motion in meters is (g=10ms^(-2))

Two particles are thrown horizontally in opposite directions with velocities u and 2u from the top of a high tower. The time after which their radius of curvature will be mutually perpendicular is

Find the velocity of image,when object and mirror both are moving towards each other with velocities 4ms^(-1) and 5ms^(-1) respectively, is

Two particles are thrown simultaneously from points A and B with velocities u_1 = 2ms^(-1) and u_2 - 14 ms^(-1) , respectively, as shown in figure. The relative velocity of B as seen from A in

Two spheres of masses 4 kg and 8 kg are moving with velocities 2 ms^(-1) and 3 ms^(-1) away from each other along the same line. The velocity of centre of mass is