NamYoung Choi
NamYoung님의 아이디어 더 보기
a3b449d5ef929c5304bed610c1dca82d.jpg 736×937 pixeles

a3b449d5ef929c5304bed610c1dca82d.jpg 736×937 pixeles

mathani: “ (following 1ucasvb) ”

mathani: “ (following 1ucasvb) ”

"I think if you look at this animation and think about it long enough, you'll understand: Why circles and right-angle triangles and angles are all related. Why sine is opposite over hypotenuse and so on. Why cosine is simply sine but offset by pi/2 radians."

"I think if you look at this animation and think about it long enough, you'll understand: Why circles and right-angle triangles and angles are all related. Why sine is opposite over hypotenuse and so on. Why cosine is simply sine but offset by pi/2 radians."

By clicking this, you confirm that you are aware that these GIFs could cause you to lose your job from wasting too much time staring at them. You've been warned.

By clicking this, you confirm that you are aware that these GIFs could cause you to lose your job from wasting too much time staring at them. You've been warned.

Matematiquês » Dicas Quentes » Trigonometria

Matematiquês » Dicas Quentes » Trigonometria

Tangent Circles - 2

Tangent Circles - 2

Trig ID's - exploration & creation

Trig ID's - exploration & creation

(Mathhombre) Miscellanea : Photo

(Mathhombre) Miscellanea : Photo

(Mathhombre) Miscellanea : Photo

(Mathhombre) Miscellanea : Photo

(Mathhombre) Miscellanea : My work always tried to unite the true with the beautiful, but when I had to choose… I usually chose the beautiful. ~ Hermann Weyl

(Mathhombre) Miscellanea : My work always tried to unite the true with the beautiful, but when I had to choose… I usually chose the beautiful. ~ Hermann Weyl