Graphing Sine and Cosine

The period is the distance along the x-axis (horizontal) required for the function to complete one full cycle. For sine and cosine functions, the standard period is 2π.

The period can be determined using the formula: Period = 2π / |b|, where 'b' is the coefficient of x in the function y = a sin(bx) or y = a cos(bx).

The amplitude is the maximum distance from the midline (equilibrium position) of the wave to its peak (or trough). It is given by the absolute value of 'a' in the function y = a sin(bx) or y = a cos(bx).

Increasing the amplitude stretches the graph vertically, making the peaks and troughs higher and lower, respectively. Decreasing the amplitude compresses the graph.

The midline is the horizontal line that runs through the middle of the wave, representing the average value of the function. It is determined by the vertical shift of the function.

A horizontal shift (phase shift) moves the graph left or right along the x-axis. It is determined by the value of 'c' in the function y = a sin(b(x - c)) or y = a cos(b(x - c)).

The vertical shift moves the graph up or down along the y-axis. It is determined by the value of 'd' in the function y = a sin(bx) + d or y = a cos(bx) + d.

To graph a sine function, identify the amplitude, period, midline, and any shifts. Plot key points (0, π/2, π, 3π/2, 2π) and connect them smoothly.

To graph a cosine function, identify the amplitude, period, midline, and any shifts. Plot key points (0, π/2, π, 3π/2, 2π) starting from the maximum value and connect them smoothly.

Sine and cosine functions are phase-shifted versions of each other. The sine function is a cosine function shifted to the right by π/2.