I'm having trouble ordered triple in algebra 2 w/ trigonometry, could someone please hellllllllllllllllllp me!
http://www.wtamu.edu/academic/anns/mps/math/mathlab/int_algebra/int_alg_tut20_systhree.htm
I have no idea what your difficulty is.
Do you understand algebra 2 w/trigonometry very well?
Is there anyone out there who understands ordered triples very well?
I need help with factoring....Please!!
How would you answer y(y-9)+4(y-9)
Of course! I'm here to help you with your trouble in understanding ordered triples in Algebra 2 with Trigonometry. Let's start by understanding what ordered triples are.
In algebra, an ordered triple is a set of three values or coordinates written in a specific order within parentheses, such as (x, y, z). Ordered triples are often used to represent points in three-dimensional space, where each value represents the location of a point along each of the three axes (x-axis, y-axis, and z-axis).
To work with ordered triples, you need to know how to interpret and manipulate the values. Here are a few steps to get you started:
1. Understanding the Coordinate System: In three-dimensional space, the coordinate system consists of three perpendicular axes: the x-axis, y-axis, and z-axis. The x-axis represents horizontal movement, the y-axis represents vertical movement, and the z-axis represents depth or distance along a third dimension.
2. Identifying Coordinates: To locate a point in three-dimensional space, you'll assign values to each of the three axes. For example, the ordered triple (2, 3, -1) represents a point that is 2 units to the right or left of the origin along the x-axis, 3 units in the up or down direction along the y-axis, and 1 unit behind or in front of the origin along the z-axis.
3. Graphing Ordered Triples: To graph ordered triples, you can use a three-dimensional coordinate plane. Each axis represents a range of values, and you plot points accordingly. For example, to graph the point (2, 3, -1), you would go 2 units to the right or left, 3 units up or down, and 1 unit behind or in front of the origin, marking that point in space.
4. Calculating Distance: You can also use ordered triples to calculate distances between two points in three-dimensional space using the distance formula. The distance formula is similar to the familiar Pythagorean theorem but adjusted for three dimensions.
Remember, practice makes perfect! The more you work with ordered triples and visualize their representation in three-dimensional space, the more comfortable you will become. Feel free to ask more specific questions or provide examples, and I'll be happy to guide you through them.