Mathematics, 20.04.2020 07:40 havennn
This is pretty easy I'm just really bad at graphs - side note you don't have to worry about the class mate part, I'll just do that stuff
Graphing equations on a coordinate plane is a simple way to visually represent the relationship between the input values (x) of an equation and the output values (y). This visual representation allows us to make predictions, solve problems, find the point(s) that solve both equations (when there are two), and analyze many other useful business and everyday situations.
Name some real-life situations where graphing could be useful. Discuss your ideas and analyze the ideas written by your classmates
Choose three non-collinear points on the coordinate plane, making sure none of your points is the origin. On a sheet of paper, graph the three points and draw line segments to connect the points and make a triangle. Label the vertices of the triangle A, B, and C. Now describe the new coordinates of points A, B, and C after the following transformations:
Translation of point A around the origin
90° rotation around point B
Reflection of the triangle across the x-axis
Detail your work and tell what the coordinates of all of the relevant points are.
Choose two coordinate points. On a sheet of paper or in a graphing utility, graph the segment that connects the two points. Now choose a ratio. Divide the segment into two parts according to your ratio. Detail your work and tell what the coordinates of all of the relevant points are. Critique the work of at least two other students who have done this. Be respectful in your critique, and talk about the strengths and weaknesses in your classmates’ answers.
Choose two different coordinate points. On a sheet of paper or in a graphing utility, graph the line that connects the two points.
Write the equation of this line in slope intercept form. Label it line A.
Now create a new line in slope intercept form that is parallel to line A and that passes through the origin. Label it line B.
Now create a third line in slope intercept form that is perpendicular to line A and passes through the y-intercept of line A. Label it line C.
Critique the work of at least two other students who have done this. Be respectful in your critique, and talk about the strengths and weaknesses in your classmates’ answers.
Answers: 3
Mathematics, 21.06.2019 14:30, claudiapineda860
Leo is going to use a random number generator 4 0 0 400 times. each time he uses it, he will get a 1 , 2 , 3 , 4 , 1,2,3,4, or 5 5. what is the best prediction for the number of times that leo will get an odd number?
Answers: 1
Mathematics, 21.06.2019 15:30, lyndamahe0
Come up with a new linear function that has a slope that falls in the range 10 m − < < . choose two different initial values. for this new linear function, what happens to the function’s values after many iterations? are the function’s values getting close to a particular number in each case?
Answers: 1
Mathematics, 21.06.2019 16:20, edjiejwi
An equation representing lyle’s hedge-trimming business is a = 12n - 300 where a is the amount of profit or loss in dollars and n is the number of hedges trimmed. how would the graph of lyle’s business change if the equation a = 10n - 300 represented his business? the graph would be flatter. the graph would be steeper. the graph would start closer to the origin. the graph would start lower on the y-axis.
Answers: 2
Mathematics, 21.06.2019 16:40, madisongibson62
What is the distance between the points (2 -3) and (-6 4) on the coordinate plane
Answers: 1
This is pretty easy I'm just really bad at graphs - side note you don't have to worry about the clas...
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