\[\tan(x \pm y) = {{c1:: \frac{\tan x \pm \tan y}{1 \mp \tan x \tan y} }}\]
Note 1: ETH::2. Semester::Analysis
Deck: ETH::2. Semester::Analysis
Note Type: Horvath Cloze
GUID:
added
Note Type: Horvath Cloze
GUID:
gH#snBY2:.
Previous
Note did not exist
New Note
Front
Back
\[\tan(x \pm y) = {{c1:: \frac{\tan x \pm \tan y}{1 \mp \tan x \tan y} }}\]
Field-by-field Comparison
| Field | Before | After |
|---|---|---|
| Text | \[\tan(x \pm y) = {{c1:: \frac{\tan x \pm \tan y}{1 \mp \tan x \tan y} }}\] |
Note 2: ETH::2. Semester::Analysis
Deck: ETH::2. Semester::Analysis
Note Type: Horvath Cloze
GUID:
added
Note Type: Horvath Cloze
GUID:
tu}QYmNAY9
Previous
Note did not exist
New Note
Front
\[\cos(x \pm y) = \cos x \cos y \mp \sin x \sin y \]
Back
\[\cos(x \pm y) = \cos x \cos y \mp \sin x \sin y \]
Field-by-field Comparison
| Field | Before | After |
|---|---|---|
| Text | \[\cos(x \pm y) = {{c1:: \cos x \cos y \mp \sin x \sin y }}\] |
Note 3: ETH::2. Semester::Analysis
Deck: ETH::2. Semester::Analysis
Note Type: Horvath Cloze
GUID:
added
Note Type: Horvath Cloze
GUID:
yp,YVmZY[(
Previous
Note did not exist
New Note
Front
\[sin(x \pm y) = \sin x \cos y \pm \cos x \sin y \]
Back
\[sin(x \pm y) = \sin x \cos y \pm \cos x \sin y \]
Field-by-field Comparison
| Field | Before | After |
|---|---|---|
| Text | \[sin(x \pm y) = {{c1:: \sin x \cos y \pm \cos x \sin y }}\] |