Answer:
Explanation:
The period (T) of a simple pendulum depends on the length (l) of the pendulum and acceleration due to gravity (g). The period of a simple pendulum can be calculated as follows:
T= 2[tex]\pi \sqrt{\frac{l}{g}[/tex]
The number of hours in a day is 24 h.
Convert 24 h to second as follows,
24 x 60 x 60 =86400 s
The number of cycle’s clock made per day is,
86400/2 = 43200
If the clock runs, slow of 19 s, then there is 9.5 cycles is reduces per day. So,
( 43200 -9.5) cycles = 43190.5 cycles
The period would be reduces by. 43190.5/43200 = 0.9998
Then the new time period is,
T new = 0.9998 Told
Substitute
[tex]\sqrt{LNEW} =0.9998\sqrt{LODD}[/tex]
LNEW/LODD =[tex] 0.9998^{2}[/tex]
LNEW/LODD =0.9996
Substitute 0.9930 m for LODD
LNEW = 0.9930 X 0.9996 = 0.9926
The difference in the lengths is,
LNEW- LODD
= 0.9926- 0.9930 = -0.0004
This is the same as 0.4mm
Therefore, the new length of the pendulum is 0.9926m, the length of the pendulum should be reduced by. 0.4mm
The pendulum's adjustment is mathematically given as
dL=0.4mm
Question Parameter(s):
Your grandfather clock's pendulum has a length of 0.9930 m
If the clock runs slow and loses 19 s per day
Generally, the equation for the period is mathematically given as
[tex]T= 2\pi \sqrt{\frac{l}{g}[/tex]
Where, total cycles is
Tc=( 43200 -9.5) cycles
Tc = 43190.5 cycles
Therefore
T new = 0.9998 Told
Lnew/Lold =0.9998^{2}
Hence
Lnew = 0.9930 X 0.9996
Lnew= 0.9926
In conclusion, difference in the lengths as
dL = 0.9926- 0.9930
dL = -0.0004
dL=0.4mm
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