Problem 2 A stretched wire has a fundamental frequency v, gw If the wire is cut to 65% of its length and the tension is...
A stretched wire has a fundamental frequency νgw. If the wire is cut to 80% of its length and the tension is increased by 60%, what is the ratio of the new fundamental frequency to that of the old?
A stretched wire has a fundamental frequency νgw. If the wire is cut to 45% of its length and the tension is increased by 20%, what is the ratio of the new fundamental frequency to that of the old?
A stretched wire vibrates in its fundamental mode at a frequency of 450 Hz. What would be the fundamental frequency if the wire were half as long, its diameter were doubled, and its tension were increased by a factor of two?
A tension FT is applied to a wire with mass per unit length μ and length L. When struck, it vibrates at its fundamental frequency f1. The wire is then removed and stretched to twice its original length 2L. If the same tension is applied to the stretched wire, what will be its new fundamental frequency?
d stretched wire vibrates in its fundamental mode at a frequency of 481 vibrations/s. What would be the fundamental frequency if the wire were half as long, with twice the diameter and 5.2 times the tension? Answer in units of Hz.
A 35.1 cm length of wire has a mass of 6.00 g. It is stretched between two fixed supports and is under a tension of 172 N. What is the fundamental frequency of this wire?
A 40.6 cm length of wire has a mass of 5.80 g. It is stretched between two fixed supports and is under a tension of 155 N. What is the fundamental frequency of this wire?
A 41-cm length of wire has a mass of 6.0 g. It is stretched between two fixed supports and is under a tension of 160 N. What is the fundamental frequency of this wire?
A 42-cm length of wire has a mass of 8.6 g. It is stretched between two fixed supports and is under a tension of 190 N. What is the fundamental frequency of this wire
Q. A steel wire with mass 37.0 g and length 7.10 m is stretched tightly between its two endpoints. In its fundamental mode, the wire vibrates at a frequency of 59.0 Hz. When plucked, traveling waves bounce from one end to the other. a) What is the speed of waves propagating along the wire? b) Calculate the tension in the wire. c) A standing wave at the fundamental frequency has an amplitude of 0.340 cm . Calculate the magnitude of...