Range of the projectile The range of the projectile is the total horizontal distance traveled in the flight time. Then, we can write down the equation as: r=Vt=V2hgr=Vt=Vg2h Again, this formula would be more complicated if the angle weren't set to 0°. If you're curious to see it...
To solve the problem of calculating the percentage increase in horizontal range when the maximum height attained by a projectile is increased by 20%, we can follow these steps:Step 1: Understand the formulas for maximum height and range
Range of a Projectile Motion:If an object follows the parabolic path under the force of gravity, then the motion of the object is the projectile motion. If the initial velocity of the object is u, g is the acceleration...
The horizontal range of the ball is R, and the ball reaches a maximum height R/8. In terms of R and g, find the following. (a) the time interval during which the ball is in motion: Sroot(R/g) Correct (b) the ball's speed at the peak of its path: (Sroot 4gR)...
The excitation-contraction dynamics of the contractile element, the tissues around the joints to limit the joint range of motion, as well as the foot-ground interaction were implemented. Simulations were initiated from an identical standing posture for both motions. Optimal pattern of the activation ...
To solve the problem step by step, we will break down the motion of the stone into its horizontal and vertical components.Step 1: Determine the angle of projection The angle of projection θ is given as: \( \theta = \tan^{-1}\l
To solve the problem of finding the angle at which an object should be projected so that the maximum height reached is equal to the horizontal range, we can follow these steps:1. Understand the Formulas: - The formula for ma
The maximum height attained by a projectile when thrown at an angleθwith the horizontal is found to be half the horizontal range. Thenθis equal to View Solution θ θ View Solution Doubtnut is No.1 Study App and Learning App with Instant Video Solutions for NCERT Class 6, Class 7, Clas...
To solve the problem of determining the angle at which a player should throw a ball to achieve maximum distance and maximum height, we can break it down into two parts:Part (i): Maximum Distance1. Understanding P