A nylon string on a tennis racket is underneath a tension of 256 N.
If its diameter is 1.10 mm, by how much is it lengthented from its untensioned length of 32.0 cm?
A nylon string on a tennis racket is underneath a tension of 256 N. If its...
A nylon string on a tennis racket is under a tension of 275 N. If its diameter is 1.00 mmmm , by how much is it lengthened from its untensioned length of 32.0 cm? No modulus was given.
Q1 At depths of 2000 m in the sea, the pressure is about 200 times atmospheric pressure (1atm=1.0×105N/m2). By what percentage does the interior space of an iron bathysphere's volume change at this depth? Express your answer to two significant figures and include the appropriate units. Q2 A nylon string on a tennis racket is under a tension of 265 N . If its diameter is 1.00 mm , by how much is it lengthened from its untensioned length of...
The ultimate tensile strength for nylon is 5.00×108N/m2. Part A What is the maximum tension possible in a 1.05-mm-diameter nylon tennis racket string? Express your answer to three significant figures and include the appropriate units. Fmax Fmax = nothingnothing SubmitRequest Answer Part B If you want tighter strings, what do you do to prevent breakage: use thinner or thicker strings? If you want tighter strings, what do you do to prevent breakage: use thinner or thicker strings? use thicker strings...
A nylon guitar string has a linear density of 4.46 g/m and is under a tension of 126 N. The fixed supports are D = 72.7 cm apart. The string is oscillating in the standing wave pattern shown in the figure. Calculate the (a) speed, (b) wavelength, and (c) frequency of the traveling waves whose superposition gives this standing wave.
The tension in a nylon monofilament fixed at both ends is 17.0 N. The mass per unit length is 5.00 ✕ 10−3 kg/m, and its length is 41.0 cm. (a) What is the fundamental frequency (in Hz)? (b) What are the next three frequencies (in Hz) that could result in standing wave patterns? List them smallest to largest. second harmonic (Hz)= third harmonic (Hz)= fourth harmonic (Hz)=
A nylon guitar string has a linear density of 6.01 g/m and is under a tension of 196 N. The fixed supports are D - 55.6 cm apart. The string is oscillating in the standing wave pattern shown in the figure. Calculate the (a) speed, (b) wavelength, and (c) frequency of the traveling waves whose superposition gives this standing wave (a) Number Units (b) Number Units (c) Number Units Click if you would like to Show Work for this question:...
For a stringed instrument, the tension on each string must be roughly the same to avoid warping. Suppose each string on an acoustic guitar has a tension of 79 N and is 64 cm long. The steel core of the string has a density of 7970 kg/m3. If the wavelength on a string is twice its length, then what is the linear density for the low E string (f = 82.4 Hz)? Answer=7.10e-03 kg/m What is the string's diameter? Traditionally,...
A string vibrates in its fundamental tone at a frequency of 256 Hz. Find the % increase in the tension if the string vibrates at 262 Hz. known equations: Fbeat = F2-F1, v = n((T/u)^1/2)/2L
An 80-cm-long, 1.0-mm-diameter steel guitar string must be tightened to a tension of 2000N by turning the tuning screws. by how much is the string streched?
A nylon guitar string has a linear density of 33.9 g/m and is under a tension of 296.0 N. The fixed supports are distance L 88.5 cm apart. The string is oscillating in the standing wave pattern shown in the figure. Calculate the speed of the traveling waves whose superposition gives this standing wave. Submit Answer Tries o/99 Calculate the wavelength of the traveling waves whose superposition gives this standing wave Submit Answer Tries 0/99 Calculate the frequency of the...