1. Balboa Park in San Diego has an outdoor organ. When the air temperature increases, the fundamental frequency of one of the organ pipes _____.
a) goes down
b) stays the same
c) goes up
d) is impossible to determine
2. v=331sqrt(1+t/273)/
3. goes up?)
Fundamental frequency!
1. Ultrasound with a frequency of 4.079 MHz can be used to produce images of the human
body.If the speed of sound in the body is the same (1.97 km/s) as in salt water, what is the
wavelength in the body?
Answer in units of m.
and
2. On a day when the wind is...
Homework Statement
A guitar string has a fundamental frequency of 429 Hz when its tension is 259 N.
The string is being tuned to a fundamental frequency of 388 Hz. What is the required tension?
Homework Equations
v = sqrt(T/u): where v is the speed, T is the tension and u is the...
Homework Statement
The fundamental frequency of an open organ pipe corresponds to the note middle C (f = 261.6 Hz on the chromatic musical scale). The third harmonic (f3) of another organ pipe that is closed at one end has the same frequency. Compare the lengths of these two pipes...
Homework Statement
A particular violin string plays at a fundamental frequency of 294Hz. If the tension is increased 15%, what will be the new fundamental frequency?
Homework Equations
f=v/2L
v=sqrt(T/(m/L))
The Attempt at a Solution
294 = sqrt(T/(m/L))/2L so...
So the question goes like this- The fundamental frequency of a bass violin string is 1045 Hz and occurs when the string is 0.900 m long. How far from the lower fixed end of the bass violin should you place your fingers to allow the string to vibrate at a fundamental frequency 3 times as great...
Alright I've been going crazy with this problem. I'm building an electrostatic loudspeaker. In order to get it right I need to find the Fundamental frequency of the vibrating membrane.
This membrane will be of an elastic substance, Mylar. Approx. 5 microns think with a young's modulus of about...
Homework Statement
A harpsichord string of length 1.60 m and linear mass density 25.0 mg/m vibrates at a (fundamental) frequency of 450.0 Hz.
(a) What is the speed of the transverse string waves?
(b) What is the tension?
(c) What are the wavelength and frequency of the sound wave in air...
Fundamental Frequency! [SOLVED]
A nylon string is stretched between fixed supports 0.75m apart. Experimental plucking of the string shows that several standing waves can exist on the string. Two such standing waves have frequencies of 225Hz and 300Hz with no other frequencies in between.
Q1...
Homework Statement
A stretched wire vibrates in its fundamental mode at a frequency of 384 Hz. What would be the fundamental frequency if the wire were half as long, its diameter were doubled, and its tension were increased five-fold?
Homework Equations
F=...
1.Calculate the fundamental frequency of a steel rod of length 2.00 m. What is the next possible standing wave frequency of this rod? Where should the rod be clamped to excite a standing wave of this frequency?
first, i used the formula velocity of sound in the rod v=sqrt(Y/p)
where...
Homework Statement
A tube closed at one end and open at the other has a fundamental frequency of 242 Hz. What is the fundamental whenboth are open?
Homework Equations
f (open and closed) = v/4L
f (open) = v/2L
v sound = 343 m/s
The Attempt at a Solution
f1 (open and closed) =...
One of the harmonics on a string 1.4 meters long has a frequency of 18.4 Hz. The next higher harmonic frequency is 23.9 Hz.
(a) What is the fundamental frequency of the string?
f1 = Hz *
5.5 OK
(b) What is the speed of the waves on the string?
v = m/sec
the...
Could someone validate if this is correct?
for waves with antinode/antinode or node/node ends
if the fundamental frequency is f1
then f2 = 2f1, second harmonic
and f3 = 3f1, third harmonic
but for waves with antinode'/node or node/antinodes at the ends
then if fundamental frequency is...
1. The problem is: A guitar string is 78 cm long and has a mass of 3.6 g. The distance from the bridge to the support post is L = 60 cm, and the string is under a tension of 505 N. What is the frequency of the fundamental?
I don't get why it gives me two distances. Which one is L?
2. The...
Homework Statement
A vibrating string on a violin is 330 mm long and has a fundamental frequency of 659 Hz. What is its fundamental frequency when the string is pressed against the fingerboard at a point 60 mm from its end?
*The answer is 805 Hz
Homework Equations
f = \overline{}nv/2L...
Homework Statement
The length of a string is 1440 cm. The
string is held fixed at each end. The string
vibrates in eight sections; i.e., the string has
eight antinodes, and the string vibrates at
150 Hz.
What is the fundamental frequency? Answer
in units of Hz.Homework Equations
f = nv / 2L...
Homework Statement
A stretched wire vibrates in its fundamental mode at a frequency of 400Hz. What would be the fundamental frequency if the wire were half as long, with twice the diameter and with four times the tension?
Homework Equations
fn = nV / 2L where n is the harmonics...
Homework Statement
An open organ pipe (i.e., a pipe open at both ends) of length L0 has a fundamental frequency f0.
Part A
If the organ pipe is cut in half, what is the new fundamental frequency?
4f0
2f0
f0
f0
f0
Part B
Part C
This part will be visible after you complete...
Homework Statement
The organ pipe is 2.0 m long, was open at both ends, and was originally tuned to a fundamental frequency of 128 Hz (C below middle C).
a) what is the wavelength of the fundamental?
b)if the note you now hear is closer to 262 Hz (middle C), where is the blockage with...
A standing wave resonates at 400 Hz with three antinodes on a string tied tightly between two posts 2.0 meters apart.
What is the wavelength of this standing wave?
What is the fundamental frequency of this string?
I tried to draw the picture out, and it looks like the wavelength is just...
My question goes as follows:
An open pipe in air is designed to produced 2 successive harmonics at 235 Hz and 275 Hz at 20 degrees Celsius.
What is the fundamental frequency?
What is the length of the pipe (m)?
I'm not sure how to solve this problem, as I can't find the equation to...
My question goes as follows:
An open pipe in air is designed to produced 2 successive harmonics at 235 Hz and 275 Hz at 20 degrees Celsius.
What is the fundamental frequency?
What is the length of the pipe (m)?
I'm not sure how to solve this problem, as I can't find the equation to...
Homework Statement
In order to decrease the fundamental frequency of a guitar string by 4%, by what percentage should you reduce the tension?
Homework Equations
f = sqrt [T/(m/L)] / 2L
I believe that is the equation that relates frequency to tension...
The Attempt at a Solution...
Homework Statement
A string with a length of 2.5m has two adjacent resonances at frequencies 112 Hz and 140 Hz. Determine the fundamental frequency of the string?
A. 14 Hz
B. 28 Hz
C. 42 Hz
D. 56...
We have a periodic signal of period 10 ms and amplitude 2.The signal is a rectangular pulse from -5/2 to 5/2 and 0 from 5/2 to 19/2.This signals fundamental frequency(f0) is 100Hz.It is passed through a filter whose response is 1/(1+jf/f0.I calculated the average power using the trignometric...
I'm having a bit of a difficulty trying to determine the fundamental frequency in a given function and the harmonics.
In the equation below,would the fundamental frequention be 1 (corresponding to the value cos(1x-pi)) and the harmonics amplitude 3 and -4?Also,the values of the frequency of the...
Hi all,
reading an article I've encountered the concept of power at the fundamental frequency, google didn't help me. Could you please give to me any hint about this problem? It is at least one week I'm dealing to understand what the "fundamental power" is!
there is a kind of wave, express as...
[SOLVED] Change in Tension & Fundamental Frequency of a String
Problem. Show that if the tension in a streched string is change by a small amount \Delta F_T, the frequency of the fundamental is changed by a small amount \Delta f = 1/2 (\Delta F_T / F_T) f.
Let T be the intial tension and h...
Here's one for you. Is there a way of working out what the fundamental frequency of the Earth's crust is? Has anybody done this. And what would happen if we somehow matched this frequency, say by all dancing to a particularly banging dance remix of Electric Light Orchestra's "Mr Blue Sky" all at...
I do not understand what is meant in this question:
An open organ pipe has a fundamental frequency of 430 Hz. A closed organ pipe has a fundamental frequency that is the second harmonic of the open organ pipe. What are the lengths of the two pipes?
Does the bolded part mean that the...
Question:
One of the 63.5-cm-long strings of an ordinary guitar is tuned to produce the note {\rm B_3} (frequency 245 Hz) when vibrating in its fundamental mode.
1.
If the tension in this string is increased by 1.0%, what will be the new fundamental frequency of the string?
The first part of...
A certain pipe produces a fundamental frequency f in air.
If the pipe is filled with helium at the same temperature, what fundamental frequency does it produce? (Take the molar mass of air to be M_air, and the molar mass of helium to be M_He). The ratio γ of heat capacities for air (7/5) and...
Ok, I was given a question in homework and was never told the right answer.
If the Fundamental Frequency = 15Hz, the 3rd Harmonic = ?
I estimated it at 45Hz because of an example
The example was;
Harm 1 = 100 x 1 = 100Hz
Harm 2 = 100 x 2 = 200Hz
Harm 3 = 100 x 3 = 300Hz
If so...
I understand that harmonics are integer multiples of a fundamental frequency. Also, that the relative strengths of the harmonics are what make the same note on different instruments sound different.
Why are these other frequencies made?
How many integer multiples are there?
Why do our...
A horizontal string of length 1.5 m vibrates with a wave velocity of 1320 m/s at its fundamental freq.
a. What is the fund. freq.?
Do I use the formula f_1 = v/4L?
b. What is the freq. of the 4th overtone and how many nodes and antinodes will it have?
To find 4th's freq. use f_n =...
Which of the following could be the fundamental freq. for a vibration that has an overtone freq. of 990 Hz?
a. 330
b. 660
c. 148
d. 1980
e. 1990
(All in Hz.)
The formula that I think you have to use is f_n = n*f_1, where f_1 is fud. freq.
Then, I thought
f_2 = 2*f_1, where f_2...
In order to decrease the fundamental frequency of a guitar string by 2%, by what percentage should you reduce the tension?
I'm so lost can you point me in the right direction?