QUESTION 1
Line 1: y= ax2+bx+c a= -0.9 b= 3.2 c=2.2 Line 2: y= ax2+bx+c
A= -0.9
B= -3.2
C= 2.2
Line 3: y=dx2+gx+h d= -2.9 g= 9.6 h= -4
Line 4: y= -dx2+ gx +h a= -2.9 b= -9.6 c= -4
QUESTION 2
Line 1 (Black)
Domain: (4.917
on the y. If my prediction is right I should be able to draw a
This equation shifts from the parent function based on the equation f(x) = k+a(x-h) . In this equation, k shifts the parent function vertically, up or down, depending on the value of k. The h value shifts the parent function to the left or right. If h equals 1, it goes to the right 1 unit, if it is negative 1, it goes to the left 1 unit. If a is negative, the parent function is reflected on the x-axis. If x is negative, the parent function is reflected on the y-axis.
At approximately 2153hrs I arrived on the 1A unit to talk with a resident about an issue of him not be allowed to go into another resident’s room to help that resident with moving his TV. I explained to him he could not enter another resident’s room. This action is not allowed. He complied and walked away. After I completed talking with the resident involved in this situation I was approached by another resident to hear his problem. Afterwards at about 2206hrs as I walked over to speak with staff I watched and listened to resident Wright and SSTT Bowden have a verbal disagreement? Within this exchange I heard the resident say to the staff “bitch shut up”. Then SSTT Bowden responded with “you shut the fuck up”. Once it got to that point I
...does increase, proving the fact that the parabola not only become more definite in shape as the distance increases, but so does the trajectory and height.
I expect my graph to look like it does on the next page because I
Y = sales of firm, X = average height of employees, α = intercept of the regression line,
regression of y on x, the power transformation model has a higher R^2 which is .
The vertex of our Parabola is (4.15, 25). The vertex shows the maximum height of the Mcdonald’s arch.
Above is my original data. In the graph, it can be seen that there are
and going down to 0:Best Fit. While viewing your graph, you must pay close attention to what
Ans 1. To find the co-ordinates using technology graph the parabola and the two lines required, and note the points of intersection.
0.000 7 63 106 55 74.7 1.245 9 70 135 90 98.3 1.638 11 85 135 70 96.8 1.613 [ IMAGE ] [ IMAGE ] Conclusion = = = =
The point of collision is the point where the graph of the ticker tape stop...
with the change in Y. In this case, on the graph above, AB and you