Answer:
0.207 ms
Explanation:
First of all we need to find the length of the pendulum at 20 degrees. We know that the period is 1 s, and the formula for the period is
[tex]T=2\pi \sqrt{\frac{L}{g}}[/tex]
where L is the length of the pendulum and g is the gravitational acceleration. Solving the equation for L and using T = 1 s and g = 9.8 m/s^2, we find
[tex]L=g(\frac{T}{2\pi})^2=(9.8) (\frac{1}{2\pi})^2=0.248237 m[/tex]
Now we can find the new length of the pendulum at 43 degrees; the coefficient of thermal expansion of brass is
[tex]\alpha =18\cdot 10^{-6} 1/^{\circ}C[/tex]
And the new length of the pendulum is given by
[tex]L' = L (1+\alpha \Delta T)[/tex]
where in this case
[tex]\Delta T = 43-20 = 23^{\circ}[/tex] is the change in temperature
Substituting,
[tex]L'=(0.248237)(1+(18\cdot 10^{-6})(23))=0.248340 m[/tex]
So we can now calculate the new period of the pendulum:
[tex]T'=2\pi \sqrt{\frac{L'}{g}}=2\pi \sqrt{\frac{0.248340}{9.8}}=1.000208 s[/tex]
So the change in the period is
[tex]T'-T=1.000208 - 1.000000 = 0.000207 s = 0.207 ms[/tex]
