# Physics Notes for Class 9th Chapter 2 Numericals 2024

Students if you are looking for the Physics Notes for Class 9th Chapter 2 Numericals Problems if yes? then you visit the right place where you can easily find Physics Chapter No. 2 most important Numerical Problems without answers.

Students You know that these Chapter 2 Kinematics Numericals Problems of Physics are helpful so don’t ignore them to read and find answers from your Physics key book of the 9th class.

## 9th Class Physics Chapter 2 Problems Numericals

• A train moves with a uniform velocity of 36 kmh for 10 s. Find the distance traveled by it.
• A train starts from rest. It moves through 1 km in 100 s with uniform acceleration. What will be its speed at the end of 100 seconds?
• A car has a velocity of 10 ms. It accelerates at 0.2 ms for half a minute. Find the distance traveled during this time and the final velocity of the car.
• A tennis ball is hit vertically upward with a velocity of 30 ms’. It takes 3 seconds to reach the highest point. Calculate the maximum height reached by the ball. How long it will take to return to the ground?
• A car moves with a uniform velocity of 40 ms” for 5 s. It comes to rest in the next 10 seconds with uniform deceleration. Find (1) deceleration (ii) the total distance traveled by the car.
• A train starts from rest with an acceleration of 0.5 ms. Find its speed in kmh, when it has moved through 100 m.
• A train starting from rest, accelerates uniformly and attains a velocity of 48 kmh ‘ in 2 minutes. It travels at this speed for 5 minutes. Finally, it moves with uniform retardation and is stopped after 3 minutes. Find the total distance traveled by the train.
• A cricket ball is hit vertically upwards and returns to the ground 6 seconds later. Calculate (i) the maximum height reached by the ball, (ii) the initial velocity of the ball.
• When brakes are applied, the speed of a train decreases from 96 kmh to 48 kmh in 800 m. How much further will the train move before coming to rest? (Assuming the retardation to be constant).
• In the above problem, find the time taken by the train to stop after the application of brakes.