Приложения разработчика Mitsuyuki Yamamoto в Android Market

スピードラーニング　聞き流しプレーヤ (v. 1.1)

Mitsuyuki Yamamoto опубликовал приложение 2012-07-26
(обновлено 2012-07-26)

「スピードラーニング　聞き流しプレーヤ」は、
スピードラーニングの英会話教材の内容をすべて
メニューとして一覧表示し、聞き流しに便利な
連続再生が、ワンタッチでご利用いただけます。

また、設定メニューの「英語版に切り替える」機能から、
「英語＋日本語」版と「英語のみ」を使い分けて、
再生することができます。

なお、スピードラーニングＣＤに入っている英会話データを、「Windows Media Player」を使って、音声データ(mp3)に
変換する手順につきましては、「設定」メニューから、
繰り返しご覧になれます。

※「スピードラーニング」は、株式会社エスプリラインの登録商標です。英会話教材スピードラーニング公式サイト(http://www.espritline.jp/)をご参照下さい。

スピードラーニング　聞き流しプレーヤ(ツール) (v. 1.1)

Mitsuyuki Yamamoto опубликовал приложение 2012-07-26
(обновлено 2012-07-26)

「スピードラーニング　聞き流しプレーヤ」は、
スピードラーニングの英会話教材の内容をすべて
メニューとして一覧表示し、聞き流しに便利な
連続再生が、ワンタッチでご利用いただけます。

また、設定メニューの「英語版に切り替える」機能から、
「英語＋日本語」版と「英語のみ」を使い分けて、
再生することができます。

なお、スピードラーニングＣＤに入っている英会話データを、「Windows Media Player」を使って、音声データ(mp3)に
変換する手順につきましては、「設定」メニューから、
繰り返しご覧になれます。

※「スピードラーニング」は、株式会社エスプリラインの登録商標です。英会話教材スピードラーニング公式サイト(http://www.espritline.jp/)をご参照下さい。

スピードラーニング　聞き流しプレーヤ（効率化） (v. 1.1)

Mitsuyuki Yamamoto опубликовал приложение 2012-07-26
(обновлено 2012-07-26)

「スピードラーニング　聞き流しプレーヤ」は、
スピードラーニングの英会話教材の内容をすべて
メニューとして一覧表示し、聞き流しに便利な
連続再生が、ワンタッチでご利用いただけます。

また、設定メニューの「英語版に切り替える」機能から、
「英語＋日本語」版と「英語のみ」を使い分けて、
再生することができます。

なお、スピードラーニングＣＤに入っている英会話データを、「Windows Media Player」を使って、音声データ(mp3)に
変換する手順につきましては、「設定」メニューから、
繰り返しご覧になれます。

※「スピードラーニング」は、株式会社エスプリラインの登録商標です。英会話教材スピードラーニング公式サイト(http://www.espritline.jp/)をご参照下さい。

Fourier series (Trial) (v. 1.2)

Mitsuyuki Yamamoto опубликовал приложение 2012-06-23
(обновлено 2012-06-23)

Welcome to the principle of Fourier. Now, by summing the triangular wave function, can be approximated from the principles and mechanisms of the Fourier series, we can understand intuitively explained. (The calculation does not only uses addition and subtraction and multiplication and fractions. Believe in the power of your own intuition, please end your relationship.) <Years 1768 - 1830 Joseph Fourier> "trigonometric functions with expressed as the sum of. "This idea is the" land of mystery, "Egypt is likely to leave were obtained. Accompanied Napoleon's expedition to Egypt during the years 1801 - 1798, archaeological research carried out various mathematical. Take home to France to discover the Rosetta Stone at this time, Champollion, and then show it to age 12. Speaking of ancient Egypt, the priests bestowed the mysteries of the time, the Pythagorean 思I浮Kabemasu. Egypt is the wisdom of the "Pythagorean theorem" Knowing, "Principles of Fourier series," I can understand. Sure to cite the period of the Fourier series (series) increases the overall resolution. However, the Fourier series itself, the shape of the wave is not close. Only minor variation of the wave, it's just that close to the total. On behalf of the wave position, the amount of change in a limited period if they are watching as a wave. Appearance, rather than some form of determinism, but convergence is an agnostic does not require the recognition of objective truth. (If you explore the Fourier series of determinism, therefore, comes to Achilles and the tortoise in the head.) ※ Fourier series, you have what looks like a wave of interest, I will never know. Datte, with integral, has a total area of ​​overlapping waves and waves. Never, differentiation, using the Temasen. <As if it is as if the uncertainty is the microscopic world. >

Principles of Fourier (Trial) (v. 1.3)

Mitsuyuki Yamamoto опубликовал приложение 2012-06-23
(обновлено 2012-06-23)

Welcome to the principle of Fourier. Now, by summing the triangular wave function, can be approximated from the principles and mechanisms of the Fourier series, we can understand intuitively explained. (The calculation does not only uses addition and subtraction and multiplication and fractions. Believe in the power of your own intuition, please end your relationship.) <Years 1768 - 1830 Joseph Fourier> "trigonometric functions with expressed as the sum of. "This idea is the" land of mystery, "Egypt is likely to leave were obtained. Accompanied Napoleon's expedition to Egypt during the years 1801 - 1798, archaeological research carried out various mathematical. Take home to France to discover the Rosetta Stone at this time, Champollion, and then show it to age 12. Speaking of ancient Egypt, the priests bestowed the mysteries of the time, the Pythagorean 思I浮Kabemasu. Egypt is the wisdom of the "Pythagorean theorem" Knowing, "Principles of Fourier series," I can understand. Sure to cite the period of the Fourier series (series) increases the overall resolution. However, the Fourier series itself, the shape of the wave is not close. Only minor variation of the wave, it's just that close to the total. On behalf of the wave position, the amount of change in a limited period if they are watching as a wave. Appearance, rather than some form of determinism, but convergence is an agnostic does not require the recognition of objective truth. (If you explore the Fourier series of determinism, therefore, comes to Achilles and the tortoise in the head.) ※ Fourier series, you have what looks like a wave of interest, I will never know. Datte, with integral, has a total area of ​​overlapping waves and waves. Never, differentiation, using the Temasen. <As if it is as if the uncertainty is the microscopic world. >

Principles of Fourier series (v. 1.3)

Mitsuyuki Yamamoto опубликовал приложение 2012-06-13
(обновлено 2012-06-13)

Welcome to the principle of Fourier series.

Now, "wave" to trigonometric (circular functions) can be approximated by summing of the Fourier series from the principles and mechanisms, we can understand intuitively explained.
(The calculation does not only uses addition and subtraction and multiplication and fractions. Please believe in the power of your own intuition.)

<Year 1768 - 1830 Joseph Fourier>
"Trigonometric functions with (circular functions) represented by the sum of."
This idea, "Egypt's mysterious country" is likely to leave were obtained.
Accompanied Napoleon's expedition to Egypt, we made a mathematical study various archaeological years 1801 - 1798.
Take home to France to discover the Rosetta Stone at this time has seen the age of 12 was Champollion.
Speaking of ancient Egypt, Pythagoras endowed 思I浮Kabemasu a priest of the mysteries of time.

Egypt is the wisdom of the "Pythagorean theorem" Knowing, "Principles of Fourier series," I can understand.

Sure to cite the cycle (series) increases the overall resolution.
However, the Fourier series itself, the shape of the wave is not close.
Only minor variation of the wave (total) are close to but just.
On behalf of the wave position, the amount of change in a limited period if they are watching as a wave.
Rather than deterministic, but the convergence is in fact an agnostic.
(If you explore the Fourier series as a deterministic, Achilles and the Tortoise comes into the head.)
※ Fourier series, you have what looks like a wave of interest, I will never know.
Integration with Datte, has a total area of ​​overlap. In the differential never that way.
<It is as if each country is whether the uncertainty of the microscopic world. >

○ rotation on wave
① For Waves
Relationship with the rotational movement of the wave generation and ②
③ about invisible to the eye rotation

○ proof of Pythagorean theorem
Pythagorean Theorem
For a right triangle equal sides ① 2
② If the public right-angled triangle

For information on how to deal with several waves ①
① For a right triangle and rectangular coordinates
Pythagorean theorem and Cartesian ②
Be expressed in Cartesian coordinates for the wave ③

② How to deal with the number of rotational motion
For a right triangle and circular functions ①
② relationship Pythagorean theorem and circular functions
Represented by a circle rotation function ③

How to bridge the gap between waves and rotational movement ③
Cartesian motion of the waves about ①
② rotation for the circular functions
Combining movement and rotational movement of the waves ③
④ <② Animation>
⑤ <③ Animation>

Synthesis and synthesis of rotational movement of the waves ④
Synthesis of a square wave with wave ①
Synthesis of waves by circular functions ②
③ Preparation of rotation due to circular motion
Bridge directly to the rotational motion of waves ④
⑤ <③ Animation>

⑤ mechanisms and principles of Fourier series
Relationship between the yen and the square wave function ①
② square wave with circular motion relationship
③ The principle of superposition of waves
Synthesis of rotation of the wave components ④
⑤ rotation and wave generation
⑥ orthonormal functions and function spaces
⑦ <⑤ Animation>
⑧ <Excel Data>

Fourier principles (v. 1.3)

Mitsuyuki Yamamoto опубликовал приложение 2012-06-13
(обновлено 2012-06-13)

Welcome to the principle of Fourier series.

Now, "wave" to trigonometric (circular functions) can be approximated by summing of the Fourier series from the principles and mechanisms, we can understand intuitively explained.
(The calculation does not only uses addition and subtraction and multiplication and fractions. Please believe in the power of your own intuition.)

<Year 1768 - 1830 Joseph Fourier>
"Trigonometric functions with (circular functions) represented by the sum of."
This idea, "Egypt's mysterious country" is likely to leave were obtained.
Accompanied Napoleon's expedition to Egypt, we made a mathematical study various archaeological years 1801 - 1798.
Take home to France to discover the Rosetta Stone at this time has seen the age of 12 was Champollion.
Speaking of ancient Egypt, Pythagoras endowed 思I浮Kabemasu a priest of the mysteries of time.

Egypt is the wisdom of the "Pythagorean theorem" Knowing, "Principles of Fourier series," I can understand.

Sure to cite the cycle (series) increases the overall resolution.
However, the Fourier series itself, the shape of the wave is not close.
Only minor variation of the wave (total) are close to but just.
On behalf of the wave position, the amount of change in a limited period if they are watching as a wave.
Rather than deterministic, but the convergence is in fact an agnostic.
(If you explore the Fourier series as a deterministic, Achilles and the Tortoise comes into the head.)
※ Fourier series, you have what looks like a wave of interest, I will never know.
Integration with Datte, has a total area of ​​overlap. In the differential never that way.
<It is as if each country is whether the uncertainty of the microscopic world. >

○ rotation on wave
① For Waves
Relationship with the rotational movement of the wave generation and ②
③ about invisible to the eye rotation

○ proof of Pythagorean theorem
Pythagorean Theorem
For a right triangle equal sides ① 2
② If the public right-angled triangle

For information on how to deal with several waves ①
① For a right triangle and rectangular coordinates
Pythagorean theorem and Cartesian ②
Be expressed in Cartesian coordinates for the wave ③

② How to deal with the number of rotational motion
For a right triangle and circular functions ①
② relationship Pythagorean theorem and circular functions
Represented by a circle rotation function ③

How to bridge the gap between waves and rotational movement ③
Cartesian motion of the waves about ①
② rotation for the circular functions
Combining movement and rotational movement of the waves ③
④ <② Animation>
⑤ <③ Animation>

Synthesis and synthesis of rotational movement of the waves ④
Synthesis of a square wave with wave ①
Synthesis of waves by circular functions ②
③ Preparation of rotation due to circular motion
Bridge directly to the rotational motion of waves ④
⑤ <③ Animation>

⑤ mechanisms and principles of Fourier series
Relationship between the yen and the square wave function ①
② square wave with circular motion relationship
③ The principle of superposition of waves
Synthesis of rotation of the wave components ④
⑤ rotation and wave generation
⑥ orthonormal functions and function spaces
⑦ <⑤ Animation>
⑧ <Excel Data>