From the word itself, an angle bisector is a line segment that divides the angle into two equal parts. Take this problem for example. The angle is FGI, which means that the vertex is at point G. Hence, you create a line segment from vertex and extend it towards point H, so it forms a line segment GH. The H must be on the same plane but situated on the same side of point F and I.
Suppose the angle FGI is 80°. Then, if the angle bisector is drawn, two 40° angles are drawn: angle FGH and HGI. These angles are situated side by side together.
Answer:
both functions have the same graph
Step-by-step explanation:
The first function is described in terms of its slope and y-intercept, so can be written in slope-intercept form as ...
y = mx + b . . . . m = slope (-7/9); b = y-intercept (3)
y = -7/9x +3
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The second function is written in point-slope form:
y -k = m(x -h) . . . . m = slope (-7/9), point = (h, k) = (18, -11)
y +11 = -7/9(x -18)
If we rearrange the second equation to the form of the first, we get ...
y = -7/9x +14 -11 . . . . eliminate parentheses, subtract 11
y = -7/9x +3 . . . . . . . matches the equation of the first function
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Both functions describe the same relation.
Answer:
3.1415926535 8979
Step-by-step explanation:
bruh just search it in google
Answer:
270 (-y, x) 90
180 (-x, -y) 180
90 (y, -x) 270
Step-by-step explanation: