Processing Math: Done
To print higher-resolution math symbols, click the
Hi-Res Fonts for Printing button on the jsMath control panel.
jsMath

Solution 4.2:3c

From Förberedande kurs i matematik 1

(Difference between revisions)
Jump to: navigation, search
Current revision (07:53, 9 October 2008) (edit) (undo)
m
 
Line 1: Line 1:
 +
We can add and subtract multiples of <math>2\pi</math> to or from the argument of the sine function without changing its value. The angle <math>2\pi</math> corresponds to a whole turn in a unit circle and the sine function returns to the same value every time the angle changes by a complete revolution.
-
We can add and subtract multiples of
+
For example, if we can subtract sufficiently many <math>2\pi</math>'s from <math>9\pi</math>, we will obtain a more manageable argument which lies between <math>0</math> and <math>2\pi\,</math>,
-
<math>\text{2}\pi </math>
+
-
to or from the argument of the sine function without changing its value. The angle
+
-
<math>\text{2}\pi </math>
+
-
corresponds to a whole turn in a unit circle and the sine function returns to the same value every time the angle changes by a complete revolution.
+
-
 
+
-
For example, if we can subtract sufficiently many
+
-
<math>\text{2}\pi </math>
+
-
s from
+
-
<math>\text{9}\pi </math>, we will obtain a more manageable argument which lies between
+
-
<math>0</math>
+
-
and
+
-
<math>\text{2}\pi </math>,
+
-
 
+
-
 
+
-
<math>\text{sin 9}\pi =\text{sin}\left( 9\pi -2\pi -2\pi -2\pi -2\pi \right)=\sin \pi </math>
+
-
 
+
-
 
+
-
The line which makes an angle
+
-
<math>\pi </math>
+
-
with the positive part of the
+
-
<math>x</math>
+
-
-axis is the negative part of the
+
-
<math>x</math>
+
-
-axis
+
-
and it cuts the unit circle at the point
+
-
<math>\left( -1 \right.,\left. 0 \right)</math>, which is why we can see from the
+
-
<math>y</math>
+
-
-coordinate that
+
-
<math>\text{sin 9}\pi =\text{sin }\pi =0</math>.
+
 +
{{Displayed math||<math>\sin 9\pi = \sin (9\pi - 2\pi - 2\pi - 2\pi - 2\pi) = \sin \pi\,\textrm{.}</math>}}
 +
The line which makes an angle <math>\pi</math> with the positive part of the ''x''-axis is the negative part of the ''x''-axis and it cuts the unit circle at the point (-1,0), which is why we can see from the ''y''-coordinate that <math>\sin 9\pi = \sin \pi = 0\,</math>.
[[Image:4_2_3_c.gif|center]]
[[Image:4_2_3_c.gif|center]]

Current revision

We can add and subtract multiples of 2 to or from the argument of the sine function without changing its value. The angle 2 corresponds to a whole turn in a unit circle and the sine function returns to the same value every time the angle changes by a complete revolution.

For example, if we can subtract sufficiently many 2's from 9, we will obtain a more manageable argument which lies between 0 and 2,

sin9=sin(92222)=sin.

The line which makes an angle with the positive part of the x-axis is the negative part of the x-axis and it cuts the unit circle at the point (-1,0), which is why we can see from the y-coordinate that sin9=sin=0.

Retrieved from "http://wiki.math.se/wikis/2008/bridgecourse1-ImperialCollege/index.php/Solution_4.2:3c"