Search results
1 dzień temu · Enter Speed (meters per second): Input the speed at which the distance is being covered. Calculate: Click on the calculate button to get the calculated time in seconds. For example, if you want to calculate how long it will take to cover 500 meters at a speed of 10 meters per second, the Fast Time Calculator will provide the answer instantly.
2 dni temu · The formula to calculate the flight duration of a helicopter is simple: \ [ \text {Flight Duration (hours)} = \frac {\text {Distance (km)}} {\text {Average Speed (km/h)}} \] where: Distance is the total flight distance in kilometers, Average Speed is the helicopter's speed in kilometers per hour. Example Calculation.
5 dni temu · 3 Practice: 1. A projectile is launched at 50 m/s at angle of 35° to the horizontal as shown below. It lands at the same height that it was launched. Calculate: a) The maximum height: b) The time of flight: c) The range: 2. A projectile is launched at 100 m/s at angle of 80° to the horizontal.
3 dni temu · The basic formula to calculate displacement is a reworking of the velocity formula: d = vt. Where d is displacement, v is average velocity, and t is the time period, or the time it took to get from point A to B. If the object has constant velocity, solving for displacement is straightforward.
2 dni temu · A projectile is fired vertically upward into the air; its position (in feet) above the ground after t seconds is given by the function s(t) shown below. Use limits to determine the instantaneous velocity of the projectile at t = a seconds for the given value of a. s(t) = 16t^2 + 76t; a = 2. The instantaneous velocity at t = 2 is
4 dni temu · Formulas used: The formula for finding the time of flight of a projectile will be, \[T = \dfrac{{2u\sin \theta }}{g}\] Where \[g\] is the acceleration due to gravity, its value is, \[g = 10m/{s^2}\] (we round off for easier calculation)
4 dni temu · James and John dive from an overhang into the lake below. James simply drops straight down from the edge. John takes a running start and jumps with an initial horizontal velocity of 25 m/s. Compare the time it takes each to reach the lake below if there is no air resistance.
