Interval Definition and 712 Threads

In music theory, an interval is a difference in pitch between two sounds.
An interval may be described as horizontal, linear, or melodic if it refers to successively sounding tones, such as two adjacent pitches in a melody, and vertical or harmonic if it pertains to simultaneously sounding tones, such as in a chord.In Western music, intervals are most commonly differences between notes of a diatonic scale. The smallest of these intervals is a semitone. Intervals smaller than a semitone are called microtones. They can be formed using the notes of various kinds of non-diatonic scales. Some of the very smallest ones are called commas, and describe small discrepancies, observed in some tuning systems, between enharmonically equivalent notes such as C♯ and D♭. Intervals can be arbitrarily small, and even imperceptible to the human ear.
In physical terms, an interval is the ratio between two sonic frequencies. For example, any two notes an octave apart have a frequency ratio of 2:1. This means that successive increments of pitch by the same interval result in an exponential increase of frequency, even though the human ear perceives this as a linear increase in pitch. For this reason, intervals are often measured in cents, a unit derived from the logarithm of the frequency ratio.
In Western music theory, the most common naming scheme for intervals describes two properties of the interval: the quality (perfect, major, minor, augmented, diminished) and number (unison, second, third, etc.). Examples include the minor third or perfect fifth. These names identify not only the difference in semitones between the upper and lower notes but also how the interval is spelled. The importance of spelling stems from the historical practice of differentiating the frequency ratios of enharmonic intervals such as G–G♯ and G–A♭.

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  1. 7

    Selection of an interval affects the energy eigenstates - impossible

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  2. R

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  3. E

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    x^n/(2n-1) is the series. It starts at 1 and goes to infinity. I did the ratio test on it and got abs.(x) So the radius of convergence=1, and then I plugged -1 and 1 into the original series and got that they both converged. But the answer is [-1,1). Why aren't they both hard brackets?
  4. Y

    Question on changing interval of integration.

    Attached is a definite integral copy from page 20 of http://ia601507.us.archive.org/5/items/ATreatiseOnTheTheoryOfBesselFunctions/Watson-ATreatiseOnTheTheoryOfBesselFunctions.pdf It said \int_{\alpha}^{2\pi+\alpha}e^{j(n\theta-z\sin\theta)}d\theta I can understand ##\alpha=-\pi## and change...
  5. P

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  6. Y

    Calculate definite integrals with given interval.

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  7. J

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  8. L

    Confidence interval interpretation mistake

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  9. H

    MHB Uniformity of Poisson arrivals in random interval

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  10. P

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  11. ash64449

    Confused on how to calculate invariant interval.

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  12. P

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  13. P

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  14. W

    Constructing an interval by uniting smaller intervals

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  15. J

    Cartesian to Polar: Angle Theta Interval Defined

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  16. U

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  17. P

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  18. Z

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  19. twoski

    What is the Interval of Convergence for (x-10)^n/10^n?

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  20. R

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  21. W

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  22. W

    Can the Integral of 1/(x^5+5) be Evaluated Analytically?

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  23. 1

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  24. S

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  25. skate_nerd

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  26. E

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  27. B

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  28. C

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  29. phosgene

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  30. R

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  31. D

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  32. C

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  33. B

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  34. J

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  35. L

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  36. 7

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  37. H

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  38. L

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  39. C

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  40. D

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  41. A

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  42. H

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  43. B

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  44. Z

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  45. K

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  46. B

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  47. C

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  48. M

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  49. Square1

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  50. S

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