Question

Sketch the cylinder in space. \(y=\cos z\)

Short answer

The graph is a cylinder with axis along the \(x\)-axis and radius 1 around \(z\).

Step-by-step solution

Understand the Function

The function given is in the form of a trigonometric equation: \(y = \cos z\). In this context, \(y\) and \(z\) are coordinates, meaning as \(z\) varies, \(y\) takes values from -1 to 1 in a periodic manner.

Identify the Shape of the Graph

Since \(y = \cos z\) resembles the cosine wave pattern, it will repeat every \(2\pi\) along the \(z\)-axis. The cylinder is characterized by its circular cross-section, where \(x\) can take any value in the space, but \(y\) is restricted by \(-1 \leq \cos z \leq 1\). The points make a cylindrical surface extending along the \(x\)-axis.

Sketch the Cylinder

To sketch the cylinder, first construct the cosine wave in the \(yz\)-plane. As \(z\) changes, \(y\) oscillates between -1 and 1. Extend this across all values of \(x\), resulting in an infinite cylinder with radius 1 that is parallel to the \(x\)-axis. This implies that any cross-section perpendicular to the \(x\)-axis will reveal a cosine wave in the \(yz\)-plane.

Key concepts

Trigonometric Functions

Trigonometry in mathematics deals with relationships involving lengths and angles of triangles. It is a branch that deeply engages with periodic functions, most commonly, the sine and cosine functions. Let's focus on the cosine function. The cosine function, which is usually written as \(\cos\theta\), represents the ratio of the adjacent side to the hypotenuse in a right-angled triangle. In the context of our exercise, the function \(y = \cos z\) does not involve triangles per se but uses the periodic nature of the cosine function. As \(z\) changes, \(y\) varies cyclically between -1 and 1, capturing a rhythmic oscillation.

• Periodicity: The cosine function repeats its values in an interval of \(2\pi\).
• Amplitude: The maximum value of \(y\) is 1 and the minimum is -1, which are determined by the amplitude of the cosine wave.
• Frequency: Frequency relates to how often the wave pattern repeats over a certain domain.

Understanding these properties is crucial in visualizing the movement and behavior of the function when applied in space.

3D Graphing

3D graphing extends beyond the traditional 2D plane and incorporates depth, allowing a more comprehensive visualization of functions and shapes in space. It involves three axes: typically the \(x\), \(y\), and \(z\) axes.In our exercise, the graph focuses on the variable relation \(y = \cos z\), which is usually plotted on a 2D plane. However, in this instance, it extends into three-dimensional space with the introduction of the \(x\)-axis.

• Axes Configuration: In this exercise, the axes' configuration is adjusted where \(x\) can take any value, \(y\) oscillates according to the cosine function, and \(z\) denotes the independent variable.
• Infinite Extension: The concept of a cylinder implies an extension. Here, since \(x\) extends infinitely, the graph forms a cylindrical surface with its circular component derived from the cosine function in the \(yz\)-plane.
• Intersections and Sections: Any plane perpendicular to the \(x\)-axis results in a cross-section that mirrors a cosine wave pattern.

Visualizing the graph in 3D helps in understanding spatial relationships and how different variables influence these relationships.

Cosine Wave Pattern

The cosine wave pattern is an elegant representation of periodic change, offering a smooth oscillation that is easy to recognize. The beauty of this pattern lies in its regularity and predictability, often applied to model cyclical phenomena like sound waves, light waves, or even seasonal temperatures.In the equation \(y = \cos z\), this wave behavior manifests as \(z\) varies:

• Waveform: The pattern created is a cosine wave, restarting every \(2\pi\). The graph appears as a continuous wave, cycling through peaks and troughs.
• Frequency and Wavelength: The period (frequency) reflects the length for one complete cycle, here set by the values of \(\cos z\). Any repetition beyond one cycle is predictable and regular.
• Graphical Representation: When extended across a plane, each cycle maintains uniform spacing and height, which, in 3D graphing, translates into the cylindrical shape we are visualizing in this exercise.

The understanding of the cosine wave's properties allows us to "see" the cylinder's cross-section and predict how the cylinder forms in space. This foundation is crucial as it channels the visualization into a tangible representation in the mind.