What are the important points to graph $y = sin 2 x$ $y=sin 2x$ ?

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What are the important points to graph $y = sin 2 x$ $y=sin 2x$ ?

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Answer 1 · 2018-04-17T14:33:33

$(0, 0), (\frac{π}{4}, 1), (\frac{π}{2}, 0), (\frac{3 π}{4}, - 1), (π, 0)$ $(0, 0), (pi/4, 1), (pi/2, 0), ((3pi)/4, -1), (pi, 0)$

The graph should look something like this:
graph{sin(2x) [-2.38, 8.72, -2.907, 2.64]}

Explanation:

The equation is $y = sin 2 x$ $y=sin2x$ , so it is in the form $y = sin (b \cdot x)$ $y=sin(b*x)$ The period of this graph is $\frac{2 π}{b}$ $(2pi)/b$ , which equals $\frac{2 π}{2}$ $(2pi)/2$ or $π$ $pi$ .
Therefore, the "important points" (quarter points) when graphing this function will be $\frac{π}{4}$ $pi/4$ apart.

The amplitude of this graph is $1$ $1$ , and there are no phase or vertical shifts, so the midline will be $0$ $0$ , maximum $1$ $1$ , and minimum $- 1$ $-1$ .

Unshifted sine functions follow the pattern (mid, max, mid, min, max), so the $y$ $y$ -coordinates will be $(0, 1, 0, - 1, 0)$ $(0,1,0,-1,0)$ And since the quarter points are $(\frac{π}{4})$ $(pi/4)$ , with no phase shift, the $x$ $x$ -coordinates will be $(0, \frac{π}{4}, \frac{π}{2}, \frac{3 π}{4}, π)$ $(0, pi/4, pi/2, (3pi)/4, pi)$ .

Combining these points, the ordered pairs will be:
$(0, 0), (\frac{π}{4}, 1), (\frac{π}{2}, 0), (\frac{3 π}{4}, - 1), (π, 0)$ $(0, 0), (pi/4, 1), (pi/2, 0), ((3pi)/4, -1), (pi, 0)$

The graph should look something like this:
graph{sin(2x) [-2.38, 8.72, -2.907, 2.64]}

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What are the important points to graph $y = sin 2 x$ $y=sin 2x$ ?

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