Respuesta :
Answer:
Amplitude of A is 4.975 mm and total force is 94.3 N
Explanation:
given data in question
mass (m) = 2 kg
stiffness (k) = 15 kN/m
viscous damping (c) = 5Ns/m
amplitude (F) = 25 N
angular frequency (ω) = 100 rad/s
to find out
amplitude of the forced and maximum force transmitted
Solution
static force for transmitted is mg i.e 2 × 9.81 = 19.6 N .............. 1
we know the amplitude formula i.e.
Amplitude of A = amplitude / [tex]\sqrt{c^{2}\omega^{2} + (k - m \omega^{2})^{2}[/tex]
now put the value c k m and ω and we find amplitude
Amplitude of A = 25 / [tex]\sqrt{5^{2} * 100^{2} + (15000 - 2 * 100^{2})^{2}[/tex]
Amplitude of A = 4.975 mm
now in next part we know the maximum force value when amplitude is equal displacement i.e.
maximum force = amplitude of A [tex]\sqrt{k^{2}+c^{2}\omega^{2}}[/tex]
now put all these value c , ω k and amplitude and we get
maximum force = 4.975 [tex]\sqrt{15000^{2}+5^{2} * 100^{2}}[/tex]
maximum force = 74.7 N .......................2
total force is combine equation 1 and 2 we get
total force 19.6 + 74.7 = 94.3 N
