B The Complete Idiot's Chord Reference. C Answers to Chapter Exercises. D The Complete Idiot's Guide to Music Theory, Second Edition, Ear. Idiots Guide to Music Composition Michal Miller - Free ebook download as PDF File .pdf) or read book online for free. Download as PDF or read online from Scribd where this book comes in, The Complete Idicr's Guide to Music Composition As you lang as you know some basie music theory—chords, scales, and the. The Complete Idiot's Guide to Music Theory, 2nd Edition [Michael Miller] on nanofusmortsubc.tk *FREE* shipping on qualifying offers. A music theory book that hits the.
|Language:||English, Spanish, French|
|Genre:||Politics & Laws|
|Distribution:||Free* [*Registration needed]|
The best-selling Idiot's Guides: Music Theory. The Complete Idiot's Guide to Music Composition: Methods for Developing Simple . This program will let you both enter musical notes on a score (which you can even print out or save as a PDF). Michael Miller is the author of several books, including The Complete Idiot's Guide to Music Theory, The Complete Idiot's Guide to Playing Drums, The Complete. New edition of the best-selling book about music theory — more than , copies sold! Many people find . Thank you so much for The Complete Idiot's Guide to Music Theory. I have found it They seem to be PDF files. Regards, Dan.
The Bass Clef When you need to write music below the treble clef, you can use a different clef, called the bass clef. The bass clef is positioned just below middle C, and is sometimes called the F clef.
The bass clef. Most lower-pitched instruments and voices use the bass clef. This includes trombones, tubas, bass guitars, and singers singing the bass part. This staff, called the grand staff, links together a treble clef staff and a bass clef staff. Pitches and Clefs The grand staff looks like this: The grand staff.
The A at the top of the bass clef extends above that staff to a B and a C. The C is then linked to the treble clef, goes on up to a D, and then the E on the bottom line of the treble clef.
The neat thing is that the C—which just happens to be middle C—is halfway between each staff. So when you write a middle C on a grand staff, it might extend down from the treble clef staff or extend up from the bass clef staff, depending on where the surrounding notes are placed. One of the most common specialty clefs is the alto clef, shown here: The alto clef.
The alto clef is used primarily by the viola, which is a slightly bigger version of a violin. The pointer on this clef points at middle C, which is the third line, in the exact middle of the staff. The tenor clef looks a lot like the alto clef, except the pointer points at a different line.
It still points to middle C, but middle C is positioned at a different point on the staff. The tenor clef looks like this, and is sometimes used by bassoons, bass violins, and tenor trombones.
The tenor clef. However, you might run into what is called an octave clef, which looks like a normal treble or bass clef with the number 8 either above or below the clef. Octave clefs. The percussion clef—version one and version two. Instead, you assign different instruments to different parts of the staff. You can describe a pitch by its vibration frequency, by where it lies numerically compared to other pitches, or by using the Do Re Mi Solfeggio method.
The letters repeat as you generate higher pitches. The most used clef is the treble clef; the bass clef is used for lower-pitched instruments and voices. Pitches and Clefs Exercises Exercise Write the name of each note below the note. Exercise Write the name of each note below the note. Exercise Write each note on the staff.
Exercise Draw the indicated clefs on the staff. Tones Exercise Write the following notes above the staff. Exercise Write the following notes below the staff. Exercise Identify the following notes on the piano keyboard.
Be Sharp—or Be Flat As you learned in Chapter 1, the lines and spaces on a music staff correspond exactly to the white keys on a piano. But what about those black keys? Where are they on the staff? There actually are 12 possible notes in an octave, with some of them falling between the 7 main pitches. Just count the keys between middle C and next C on the piano—including the black keys, but without counting the second C.
Tones Definition An interval is the space between two pitches. The smallest interval in Western music is a half step; intervals are typically measured in the number of half steps between the two notes. These black keys are called sharps and flats. Sharps and flats are halfway between the pitches represented by the white keys on a piano; a sharp is above a specific key and a flat is below a specific key. Put another way, a sharp raises the natural note; a flat lowers the note.
Take the black key above the middle C key, for example. You can refer to this key as C-sharp, because it raises the pitch of C. It also can be called D-flat, because it lowers the next white key up, D. And whenever you have two notes that describe the same pitch—like C-sharp and D-flat—the notes are enharmonic. Definition Two notes that sound the same but can be spelled differently are called enharmonic notes. The black keys on a piano keyboard.
Definition Any modification to a natural note is called an accidental. Sharps and flats are accidentals; the natural sign used to return a sharped or flatted note to its natural state is also an accidental. On a music staff, sharps and flats are designated by special characters placed before the affected note. These characters, called accidentals, look like this: A sharp, a flat, and a natural sign.
That third character is called a natural. When you see a natural sign on a piece of music, it means to return the specific note to its natural state, without any sharps or flats. So, for example, if you add a flat to the C note, you lower it to the next note on the keyboard— which happens to be B natural.
This means B natural is the same pitch as C-flat. On the piano keyboard, half steps appear between the white keys B and C and between E and F. In all other cases they appear between a white key and a black key—for example, D to D-sharp, or F-sharp to G.
Chapter 2: Intervals Two half steps equal one whole step.
The interval between F and G is a whole step; the interval between B and C-sharp is also a whole step. When you sharpen a note, you move the pitch up a half step. When you flatten a note, you move the pitch down a half step. Take the note C, for example: When you add a flat to C, you take it down a half step. Because the first key white or black to the left of C is the white key B, this means C-flat equals B. When you add a sharp to C, you take it up a half step. The first key to the right of C is the black key we call C-sharp.
This black key is also the first key to the left of D, which means C-sharp is the same as D-flat. Definition In some musical circles, a half step is called a semitone, and a whole step is called a tone. Note Tip While the half step is the smallest interval in Western music, music from other parts of the world often contains intervals smaller than a half step. Some Indian music, for example, divides an octave into 22 steps, each about half as large as a Western half step.
You can use the step method to describe the intervals between two notes— although once you get more than a few steps away, the counting becomes a tad difficult. A Matter of Degrees A more accepted way of describing intervals is to go back to the seven main notes of a scale—and revisit the relative numbering method.
You can use the numbers of the scale to denote the basic intervals between notes, and thus apply this numbering to any scale. First Things First As you learned in the previous chapter, you can use numbers to describe the seven main notes in any scale.
The first note is numbered one, the second note is numbered two, and so on. This method of numbering actually describes the seven degrees of a musical scale. There also are fancy musical names you can use in place of the numbers, which you might run into in some more formal situations.
The following table presents these formal degree names. A whole step is the distance of two frets. Tones Degrees of the Scale Degree Note All this dominant and subdominant stuff will become more important when you learn about chord progressions in Chapter Two identical notes with the same name, played eight degrees apart, form an octave. Instead of counting half steps and whole steps, you can simply describe an interval by using these relative numbers.
Definition The lowest note of an interval, chord, or scale, is called the root. If you count C as number one the first degree , D is number two and the interval between them is called a second.
The interval between C and E the first and third degrees is a third; the interval between C and F the first and fourth degrees is a fourth … and so on. Pretty easy, once you get used to it! The following figure shows the basic intervals, starting with a unison and ending with an octave, with C as the root. The basic intervals, starting on C. Note Interestingly, when you examine the frequencies of two notes, as discussed in the previous chapter, you find that the second note in an octave is an exact multiple of the first note.
For example, the A above middle C has a frequency of Hz; the A an octave above that has a frequency twice that, Hz. Intervals 21 Major and Minor Intervals When you describe intervals by degree, you still have to deal with those pitches that fall above or below the basic notes—the sharps and flats, or the black keys on a keyboard. When measuring by degrees, you see that the second, third, sixth, and seventh notes can be easily flattened.
When you flatten one of these notes, you create what is called a minor interval. The natural state of these intervals in a major scale is called a major interval. Major and minor intervals, starting on C. These intervals—fourths, fifths, and octaves— exist in one form only, called a perfect interval. The intervals, because of their acoustical properties, are perfect as-is. Note Why is a perfect interval so perfect? It all has to do with frequencies, and with ratios between frequencies.
In a nutshell, perfect intervals sound so closely related because their frequencies are closely related. For example, a perfect octave has a ratio of 2: If the fundamental is Hz, the octave above is twice that frequency, or Hz. Similarly, a perfect fifth has a ratio of 3: Other intervals have more complex ratios, which makes them less perfect.
For example, a perfect third has a ratio of 5: Put into a series, each increasingly complex interval ratio forms what is called a harmonic series, and the intervals in order are called harmonics.
Tones Here are the three perfect intervals, with C as the root.
Three perfect intervals, starting on C. Augmented and Diminished Intervals Note An augmented fourth and a diminished fifth are enharmonically the same note. You can raise and lower fourths and fifths—however, the result is not called major or minor. For example, if you use C as the root, F is a perfect fourth away from the root. If you sharpen the F, the resulting note F-sharp is an augmented fourth above the root.
Along the same lines, G is a perfect fifth above C. When you flatten the G, the resulting note G-flat is a diminished fifth above the root. Here are the key augmented and diminished intervals, with C as the root. Augmented and diminished intervals, starting on C. Now, just to confuse things, other types of intervals can also be called diminished and augmented—and these intervals have nothing to do with the perfect intervals. To start, you can also create a diminished interval by lowering a minor interval by another half step.
You can also create an augmented interval by raising a major interval by another half step. For example, F to A is a major third; if you sharpen the A to Asharp , the resulting interval is an augmented third. But you still need to know what they are, just in case! Above the octave are even more intervals—ninths, tenths, elevenths, and so on. Intervals that span more than an octave are called compound intervals because they combine an octave with a smaller interval to create the larger interval.
For example, a ninth is nothing more than an octave and a second; an eleventh is an octave and a fourth … and so on. The following table describes the first six intervals above the octave. Compound Intervals Interval Combines Ninth Octave plus second Tenth Eleventh Twelfth Thirteenth Octave plus third Octave plus fourth Octave plus fifth Octave plus sixth Fourteenth Octave plus seventh Compound intervals can have all the qualities of smaller intervals, which means a compound interval can be depending on the interval major, minor, perfect, augmented, or diminished.
Intervals and Half Steps It might be easier for you to think of all these intervals in terms of half steps.
To that end, the following table shows how many half steps are between these major and minor intervals. Some educators today use what is called the Mod system to teach notes and intervals. In this system, the intervals between the 12 half steps in an octave are numbered, from 0 to If you count the zero, that adds up to 12 intervals. Tonic, of course, is note 0. The minor second degree is note 1, and the major second degree is note 2.
Intervals And take special note of those intervals that are enharmonically identical—such as the augmented fourth and the diminished fifth. Two half steps equal one whole step. A flat lowers the value of a note by a half step.
For example, the interval between the first and third notes is called a third. You can create a minor interval by flattening these notes. When you flatten a perfect interval, you create a diminished interval; when you sharpen a perfect interval, you create an augmented interval. Exercises Exercise Add sharps before each of these notes. Exercise Add flats before each of these notes. Exercise Enter a new note an octave above each of the following notes.
Tones Exercise Enter a new note a specified number of half steps from the previous note. Exercise Name each of the following intervals. Exercise Using the first note as the root, enter a second note to create the specified interval.
Exercise Using sharps, flats, and naturals, change the following major intervals to minor. Exercise Using sharps, flats, and naturals, change the following minor intervals to major. In this chapter we further examine the concept of the musical scale, which no surprise is seven notes all in a row, in alphabetical order. What might be surprising is that there are so many different types of scales. You can have a major scale, a minor scale three different types of minor scales, actually , or any number of different modes within a scale.
In fact, you can create a nice-sounding melody just by picking notes from a single major scale. For example, use the C Major scale the white notes on a piano and pick and choose notes that sound good when played together.
Eight Notes Equal One Scale A scale is, quite simply, eight successive pitches within a one-octave range. All scales start on one note and end on that same note one octave higher. Tones For example, every C scale starts on C and ends on C; an F scale starts on F and ends on F; and they all have six more notes in between. The eight notes of a scale; C Major, in this instance. The first note of a scale is called the tonic, or first degree, of the scale. Not surprisingly, the second note is called the second degree, the third note is called the third degree, and so on—until you get to the eighth note, which is the tonic again.
The major exception to the eight-note scale rule is the scale that includes all the notes within an octave, including all the sharps and flats. This type of scale is called a chromatic scale, and when you start with C looks something like this: The C chromatic scale; the top staff shows the scale using sharps, the bottom staff shows the scale using flats. Now, any given scale has specific relationships between the different degrees of the scale.
These different intervals give each type of scale its unique sound. Major chord notation is almost always capitalized, and minor chord notation is almost always lowercase. The most common scale is called the major scale. Major scales are happy scales; they have pleasant and expected intervals at every turn. The mirror image of the major scale is the minor scale. Minor scales are sad scales; the intervals between the notes sound a little depressing.
Both major and minor scales can start on any note—from A-flat to G-sharp. No matter which note you start with, each scale has its own specific combination of intervals between notes. The following sections go into more detail about both major and minor scales. Major Scales What makes a major scale major are the specific intervals between the notes of the scale. Every major scale uses the same intervals, as shown in the following table.
Chapter 3: If you start your major scale on C the C Major scale , you end up playing all white keys on the piano. C Major is the only major scale that uses only the white keys; all the other scales have black keys in them. To make things easier for you, the following table shows all the notes in the 15 major scales: Remember that word from Chapter 1? It means two notes that are identical, but spelled differently. Any notes you play outside the scale are called chromatic notes; notes within the scale are said to be diatonic.
For example, in the C Major scale, the note C is diatonic; the note C-sharp would be chromatic. This is partly because the third note of the minor scale is a minor interval, whereas the third note of the major scale is a major interval. That little half step between a minor third and a major third makes all the difference in the world! Not to confuse you; however, whereas there was a single type of major scale, there actually are three types of minor scales: Natural Minor The easiest minor scale to construct is the natural minor scale.
You can think of the natural minor in terms of its corresponding major scale. When you start and end a major scale on the sixth note, instead of the tonic, you get a natural minor scale. Now move up to the sixth note—or just move down two notes. Now play an eight-note scale, but using the notes in C Major.
As you can see, each natural minor scale shares the same tones as a specific major scale. The following table shows you which minor scales match up with which major scales. The A natural minor scale is the only minor scale that uses only the white keys; all the other scales have black keys in them. To make things easier for you, the following table shows all the notes in the 15 natural minor scales. Tones Harmonic Minor The harmonic minor scale is similar to the natural minor scale, except the seventh note is raised a half step.
Some musicians prefer this type of minor scale because the seventh note better leads up to the tonic of the scale. The following table details the intervals between the notes in the harmonic minor scale. The Intervals of the Harmonic Minor Scale Note The seventh note of any scale is sometimes called the leading note because it leads up to the tonic of the scale. To make things easier for you, the following table shows all the notes in the 15 harmonic minor scales. It means you raise the base note two half steps.
Melodic Minor The only problem with the harmonic minor scale is that the interval between the sixth and seventh notes is three half steps—and you seldom have an interval in a scale wider than two half steps. So the 35 36 Part 1: Tones melodic minor scale raises both the sixth and seventh notes of the natural minor scale by a half step each, resulting in the following intervals: To make things easier for you, the following table shows all the notes in the 15 melodic minor scales.
They call this the ascending melodic minor scale. Going back down the descending melodic minor scale , they use the notes in the natural minor scale. So the sixth and the seventh degrees are raised on the way up, but not on the way down.
Theorists are split on this issue, however; some use the melodic minor scale both ascending and descending, and others use the two different scales. Tones In the Mode If a scale is a combination of eight successive notes in alphabetical order, of course , do any eight notes make a scale? Not necessarily. Note Modes date all the way back to the ancient Greeks, and the findings of Pythagoras and Aristotle. The name of each mode was based on the final note of the mode.
The number and use of modes were expanded in the era of the medieval church, where they were called church modes and used in the form of plainsong called Gregorian chant.
The last discovered mode, Locrian, is actually a theoretical mode; it was never used in the same context as the other church modes. Chronologically, modes were around long before scales. The major and minor scales we use today came after the introduction of the various modes, and were, in fact, based on the Ionian and Aeolian modes, respectively.
In practice, any mode can start on any note. There are seven essential modes, each of which can be thought of as starting on a different degree of the major scale. You stay within the relative major scale; you just start on different notes. For example, the Dorian mode starts on the second degree of the major scale. The same holds true for the Phrygian mode, which starts on the third degree of the related major scale—in C Major: When you create a melody based on a specific mode, you get to create a different sound or feel while staying within the notes of a traditional major scale.
You just start and stop in different places. Melodies based around specific modes are called modal melodies. The following table details the half steps between the notes of the Ionian mode. The C Ionian mode—just like the C Major scale. Dorian The Dorian mode can be thought of as starting on the second note of a major scale.
It sounds a little like a natural minor scale, but with a raised sixth. The intervals between notes in the Dorian mode are as follows. D Dorian mode, relative to the key of C. Tones Phrygian The Phrygian mode can be thought of as starting on the third note of the related major scale.
Like the Dorian mode, it sounds like a natural minor scale—but with a lowered second degree. The intervals between notes in the Phrygian mode are as follows. E Phrygian mode, relative to the key of C. Lydian The Lydian mode can be thought of as starting on the fourth note of a major scale.
The intervals between notes in the Lydian mode are as follows. Scales F Lydian mode is relative to the key of C, and consists of the following notes: F Lydian mode, relative to the key of C. Mixolydian The Mixolydian mode can be thought of as starting on the fifth note of the related major scale. The intervals between notes in the Mixolydian mode are as shown in the following table. The Mixolydian mode in the key of C. Aeolian The Aeolian mode contains the exact same notes as the natural minor scale.
It can be thought of as starting on the sixth note of the related major scale. The intervals between notes in the Aeolian mode are as follows. A Aeolian is relative to the key of C, and consists of the following notes: A Aeolian mode, relative to the key of C. Locrian The Locrian mode can be thought of as starting on the seventh note of the related major scale.
Today, however, the Locrian mode is used in some jazz music, and in some new music compositions. The intervals between notes in the Locrian mode are as follows. Scales B Locrian is relative to the key of C, and consists of the following notes: B Locrian mode, relative to the key of C. And there are three different types of minor scales! Modes are derived from the ancient Greeks and later the medieval church, and can be thought of as starting on different degrees of the related major scale.
Exercises Exercise Name the following major scales. Exercise Name the following minor scales. Tones Exercise Enter the notes for the following major scales. Exercise Enter the notes for the following minor scales. Exercise Name the natural minor scales related to the following major scales, and enter the notes for those scales.
Exercise Enter the notes for the following modes, within the C Major scale. All the notes fall in the lines and spaces of the treble and bass clefs; no sharps or flats are necessary. Now, you could put a flat sign in front of every B-flat in your music. This approach requires the knowledge of musical keys—which just happen to correspond to the musical scales we discussed in the previous chapter.
For example, a song based around the C Major scale is in the key of C Major. A song based around the B-flat Major scale is in the key of B-flat Major. So if a piece is written in A Major, most of the notes in the melody and chords should be within the A Major scale. Tones Using Key Signatures One of the convenient things about assigning a particular key to a piece of music is that it enables you to designate the appropriate sharps and flats up front, without having to repeat them every time they occur in the music.
You designate a key by inserting a key signature at the very start of the music, next to the first clef on the first staff. This key signature indicates the sharps and flats used in that particular key. Then, when you play through the entire piece, you automatically sharpen and flatten the appropriate notes. The F Major scale, if you recall, has one flatted note: So next to the first clef on the first staff, you put a flat sign on the B line. Now, when you play that song, every time you see a B, you actually play B-flat.
The key signature for the key of F—note the flat sign on the B line, indicating the automatic B-flat. The same would apply if you were playing in the key of G, which has one sharp: You put a sharp sign on the top F line on the first staff; then every time you see an F, you play an F-sharp.
Major Keys Just as there are 15 major scales including three enharmonics , there are 15 major keys; each with its own key signature. The following table shows what each key of these key signatures looks like, along with its corresponding scale. It depends on whether the key signature contains sharps or flats. This note determines the key signature. For example, if a key signature has two flats, you look at the next-to-last flat and determine that the key is B-flat, which it is.
If the key signature has three flats, you look at the next-to-last flat, and determine that the key is E-flat. For the key signature with a single flat, the key is F. If the key signature includes sharps, the method is different. What you want to remember here is that the last sharp in the key signature represents the seventh degree of that particular scale, so that the tonic of the scale is the next note up.
In other words, look at the last sharp and the next note up is the key. Take, for example, the key signature with one sharp. That sharp is on the note Fsharp, so the next note up tells you that the key is G. If the key signature has two sharps, the last one is on the note C-sharp, and the next note up is D—which is your key.
And so on for all the other sharp key signatures. Minor Keys The key signatures used to indicate major keys also can represent natural minor keys.
As you remember from Chapter 3, a natural minor scale is based on the same notes as a major scale, but starts on the sixth note of the scale. This same method applies to keys, so that for example the key of A minor uses the same notes—and the same key signature—as C major.
The following table shows the 15 minor keys, with their corresponding key signatures and scales. This method is called the circle of fifths; it works like this. Starting with the key of C, for every perfect fifth you move up, you add a sharp. So the key of G a perfect fifth up from C has one sharp. The key of D a perfect fifth up from G has two sharps … and so on. The circle of fifths works in the other direction for flats.
For every perfect fifth you move down from C, you add a flat. So the key of F a perfect fifth down from C has one flat. The key of B-flat a perfect fifth down from F has two flats … and so on. The following drawing shows how all the major keys relate in the circle of fifths. All the major keys are a fifth apart in the circle of fifths. The next figure shows the circle of fifths for the 15 minor keys.
It works just the same as the major-key circle; move clockwise for the sharp keys, and counterclockwise for the flat keys. The circle of fifths works for minor keys, too. Chapter 4: How, then, do you indicate notes that fall outside that key?
First, it should be noted that you can play outside a key. No one will arrest you for it—in fact, certain types of music regularly employ nonscale notes. Note Jazz and blues music often add flatted thirds and sevenths within the designated major key, which give these styles their unique sound.
So when you get to that note, you insert a flat sign before the E to indicate an E-flat. Use accidentals to indicate notes outside the current key signature. The same theory would apply if you want to include a B natural in the same piece, instead of the expected B-flat. When you change a note with an accidental, that accidental applies until the end of the current measure.
So if you flat an E in measure one of an F Major melody, the first E you write in measure two will be assumed to be natural; not flatted. The one exception to this rule occurs when you tie a note from the end of one measure to the beginning of the next. The accidental carries over—thanks to the tie—to that first note in the second measure, as you can see in the following example. Ties are explained in Chapter 5. Accidentals apply to all notes tied over a measure. Warning An accidental applies only from that point in the measure to the end of the measure.
This is a sign placed within parentheses.
This reminds the reader that the note has reverted back to its normal state. A courtesy accidental reminds musicians that a changed note has reverted back to normal. The fourth or fifth modulation is more common in classical music of the seventeenth through the nineteenth centuries. In fact, some short pop songs change keys midway through. You can modulate to any key, although the most common modulations are up a half step from E Major to F Major, for example , or up a fourth or fifth from E Major to either A Major or B Major, for example.
When you want to change keys, you indicate this by inserting a new key signature in the first measure of the new key. To change keys, insert a new key signature. I guess? On one hand, the implication seems to be that time signatures — like all notation — are to be slaves to your musical ideas, not the other way around. Notation and its rules are there simply to facilitate an easily readable organization of an array of different musical ideas. I thought different time signatures were merely different ways to represent a piece of music, and I was to pick the one that gave the most efficient and logical visual representation of a particular piece of music, and that it would sound exactly the same no matter what time signature it was in.
And this is indeed the case on computer software, it seems.
On the other hand, I see talk about beat strengths and how some signatures emphasize certain things that have an affect on the sound and the feel of the music. So, yeah. I feel like maybe there are a few crucial pieces missing to your rhythm chapters that are leaving me scratching my head in frustration. So for that, I thank you.
Michael Miller January 5, at 1: Thanks for your considered comments. However, in some situations, a conductor might conduct a different beat as the strong beat, essentially making it a downbeat.
This happens most often with faster tempos. In addition, some untrained musicians might refer to only the first beat of a measure as the downbeat — i. This is simply sloppy or just plain wrong. We definitely were not speaking the same language! I do not have a comparison of the differences between the 2nd and 3rd editions of the book — to be honest, the changes were minor; not much changes in the world of music theory from year to year! Tom September 24, at 4: Michael Miller September 25, at This should download a ZIP files with all the ear training files.
Jamie October 31, at This is absolutely positively false advertising. This link has not work since I downloadd this book and I want to know how I can get a full refund. I will be downloading another book.
Total waste of money spent! Michael Miller December 4, at Jamie, the link has been working for some time now.
With a few short periods of downtime from the publisher, admittedly. Make sure you follow these steps:. Go to https: Click the cover for this book. Once the file is downloaded, unzip it. Double-click to open the extracted file. There should be two folders inside. You now see individual files for each ear-training exercise. Double-click an exercise file to open it. Ron Meyer August 2, at Do you when the problem with the download audio files will be fixed. I tried today and got the following error message: BlobNotFoundThe specified blob does not exist.
Michael Miller August 2, at Ron, I talked to my editor just this morning. Still no ETA for getting this fixed, but she promised to kick some butt and get someone moving on this.
The problem is a lot higher up at the DK level, and it apparently affects a lot more books than just this one. Michael Miller August 4, at Ron and everybody else affected , the publisher just got the download links fixed.
Try it now, it should be working. Francisco Ortiz July 22, at The document tree is shown below. Michael Miller July 24, at Francisco, the publisher tells me they just moved their website to a new host and that broke a ton of links for a ton of books.
I apologize for this mess — I wish the publisher would get their act together! Francisco and everybody else affected , the publisher just got the download links fixed. John Rathnam June 26, at Michael Miller July 14, at Up in fifths, down in fifths too. So from C you go up a fifth to G, then another fifth to D, then another fifth to A, and so forth. Or you can go down in fifths, from C down to F, then down to B-flat, then down to E-flat, and so forth.
Joseph Morris June 18, at When can we expect to be able to download again? Brainslug May 18, at What about the non-audio online material? The book says to find chord references, etc. I was able to download the audio files and see the playlists, but none of the other references.
Could you please post the correct link here? Michael Miller May 23, at Sorry about that, the publisher had some content management issues. The links were there but were being cut off at the end of a long page. Sorry for the issue! I am unable to access the ear training course.
I bought the book because I thought it cme witha cd loke the edition I took out of the library. Could you either send me the cd or fix the glitch everyone seems to be complaining about. If you do know some theory, you can skip those chapters that you already know and go right to the new material you want to learn.
In addition, you get four appendixes and a bonus audio CD. Work through the examples and exercises on the CD to learn how to recognize scales, intervals, chords, and rhythms. And you can check your answers against those supplied in Appendix D.
Look for the Ear Training CD icon, like the one here, at the beginning of a chapter to discover which track of the CD corresponds to the information being presented. However, it will help if you have access to some sort of keyboard instrument.
That can be a piano or organ, or some sort of inexpensive synthesizer or consumer-grade music keyboard. Most of the examples and exercises can be performed on any instrument— piano, guitar, trumpet, or whatever.
It will also help if you have some blank music paper at your disposal. How to Get the Most out of This Book To get the most out of this book, you should know how it is designed. Each chapter presents a basic concept of music theory, and progresses through that concept using a combination of text and musical examples.
At the end of each chapter are exercises based on the theory presented in that chapter.
Work through these exercises to test your newfound knowledge—and find out what areas you need to work on a little more! These elements enhance your knowledge or point out important pitfalls to avoid. These boxes contain advice about how best to use the theory presented in the main text. These boxes contain additional information about the topic at hand.
I also recommend that you check out my personal website at www. Who knows—you might find another book you want to read! Acknowledgments I had assistance from dozens of individuals in the creation of this book and would like to thank the following for their help: Thanks to the usual suspects at Alpha Books, including but not limited to Marie Butler-Knight, Renee Wilmeth, Kathy Bidwell, and Joan Paterson, for helping to turn my manuscript into a printed book.
Thanks also to Harry Miedema for agreeing to write the original foreword for this book. Special thanks go to Allen Winold, professor emeritus in the Department of Music Theory at Indiana University, for graciously taking time out of his busy schedule and his vacation! Allen jumped into this project with a very welcome enthusiasm, and his comments and suggestions helped to make this a better book than it otherwise would have been.
Even more thanks go to Dr. He helped to ensure the accuracy of the CD and accompanying text, and offered many valuable comments on content and approach—and helped to make the second edition of this book even better than the first. Trademarks All terms mentioned in this book that are known to be or are suspected of being trademarks or service marks have been appropriately capitalized.
Use of a term in this book should not be regarded as affecting the validity of any trademark or service mark. But what exactly is music theory? And, even more basic than that, what is music? This definition is a lot more specific: Music is a succession of tones arranged in a specific rhythm. To do this, we have to go back to our definition of music, which says that music is a succession of tones, arranged in a specific rhythm. To study music, then, we have to learn about notes, and about arranging them.
That lets us focus our attention, for the time being, on tones. The definition is simple: a tone is a sound that is played or sung at a specific pitch. Definition Pitch describes the specific frequency or tuning of a tone. Frequency is a measurement of how fast air molecules are vibrating. You can hum lots of different tones, high or low.
The higher tones are referred to as higher pitched; lower tones are called lower pitched. Now hum a tone higher than the first tone. The second tone was higher pitched than the first tone. These instruments— such as drums and cymbals—are called unpitched or nonpitched instruments. Different voices, and different instruments, produce different ranges of tones.
For example, women tend to have higher voices than men; the tones most women sing are higher-pitched than the tones most men sing. In the world of musical instruments, physically larger instruments tend to produce lower-pitched tones, whereas smaller instruments tend to produce higherpitched tones.
This is because bigger instruments move more air than smaller ones do, and more air means a lower pitch. This is why the small cylinder of a flute produces higher notes than the big brass tubing of a tuba, and why the thin strings on a guitar are higher-pitched than the thick strings.
Chapter 1: Pitches and Clefs Some instruments produce a broader range of tones than other instruments. In particular, the piano has a very broad range. From the lowest tone the key on the far left of the keyboard to the highest the key on the far right , the piano reproduces more tones than just about any other instrument—and certainly a lot more than the human voice!
You just hummed a whole lot of different tones. How, then, do you describe a specific tone so that someone else can hum the same tone? I might even substitute one word for another in this book. Tones Have Value When it comes to describing a tone, it helps to know that every tone you can sing or play has a specific value.
You can measure that value scientifically, and use that value to describe the tone—or, more precisely, its pitch. If you plug a microphone into an oscilloscope, and then hum a tone into the microphone, the oscilloscope will measure the frequency of the tone. This is actually a measurement of how fast the molecules of air are vibrating; the faster the vibrations, the higher the pitch.
These vibrations are measured in cycles per second, and there are a lot of them.