A pendulum clock loses 7.10 s every day. What fractional change ΔL/L must be made to the length L of the pendulum so that the clock keeps perfect time?
A pendulum clock loses 7.10 s every day. What fractional change ΔL/L must be made to...
A pendulum clock loses 13.80 s every day. What fractional change ΔL/L must be made to the length L of the pendulum so that the clock keeps perfect time?
once I find out per day 90/60*24*60, how do you get period. fully explain each step and why please. know answer need to know why PHY 162 NOT Problems 453 r 7. A clock is constructed so that it keeps perfect time when its simple pendulum has a period of 1.000 s at locations where g = 9.800 m/s. The pendulum bob has length L 0.2482 m, and instead of keeping perfect time, the clock runs slow by 1.500 minutes...
Your grandfather clock's pendulum has a length of 0.9930 m. If the clock runs slow and loses 18 s per day, how should you adjust the length of the pendulum? Note: due to the precise nature of this problem you must treat the constant g as unknown (that is, do not assume it is equal to exactly 9.80 m/s2).
P4. A clock keeps time using the periodic motion of a simple pendulum. The pendulum consists of a string of length L and a bob of mass m-5.00 kg attached to the end of the string. The pendulum has a period T-1.00 s. The initial angle (0) at 0 is equal to 0.175 rad. The bob is released from rest (i.e. -0) at -0. The angle between the string and the vertical is given by the equation: e-a cos (or...
The following measurements were made using a simple pendulum. L= 946 ± 1mm (The distance from the point of suspension to the centre of mass of the bob), 10T = 19.51 ± 0.05s (the time for 10 periods). Calculate: (a) The time and uncertainty of 1 period [ T = …… ± …… s] (b) The relative uncertainty of the period [ΔT/T = …….] (c) The relative uncertainty of the length [ΔL/ L = ……… ] (d) The relative uncertainty...
You want to build a pendulum clock in which the time interval during which the "tick" sound is made (pendulum swinging one way) and the time interval during which the "tock" sound is made (pendulum swinging the other way) are each 0.50 s. a) If we assume the pendulum is a simple one, what should its length be?
The length of time (T) in seconds it takes the pendulum of a clock to swing through one complete cycle is givenby the formula T=2pi square root of L divided by 32 where L is the length in feet, of the pendulum, and pi is approximately 22 divided by 7. How long must the pendulum be if one complete cycle takes 2 seconds?
Problem 15.49 You want to build a pendulum clock in which the time interval during which the "tick" sound is made (pendulum swinging one way) and the time interval during which the "tock" sound is made (pendulum swinging the other way) are each 0.50 s. Part A If we assume the pendulum is a simple one, what should its length be?
D/iii C3. (a) A pendulum is to be used for a clock (0) What length of string is required for this pendulum if it is to complete one full oscillation in 2S? (i) If the length of the pendulum was increased by 5 cm, would the clock run fast or slow? Explain your thinking [41 (b) () Explain why the amplitude of a real pendulum decreases with time. (i) To stop the amplitude decreasing the pendulum could be given a...
Please answer the question for part B. (a) Your pendulum clock which advances 1.0 s for every complete oscillation of the pendulum is running perfectly on Earth at a site where the magnitude of the acceleration due to gravity is 9.80 m/s2. You send the clock to a location on the Moon where the magnitude of the acceleration due to gravity is 1.65 m/s2. Does the clock run fast or slow on the Moon? O It runs fast. • It...