Question
The coordinates of a right triangle are A(5,−1) , B(5,−6) , and C(1,−6) . If that triangle is reflected over the y -axis, what are the coordinates of the reflected triangle? (2 points)
The coordinate of point A becomes ([ ]).
The coordinate of point B becomes ([ ]).
The coordinate of point C becomes ([ ]).
The coordinate of point A becomes ([ ]).
The coordinate of point B becomes ([ ]).
The coordinate of point C becomes ([ ]).
Answers
Answer
The coordinates of a rectangle are (−1,3) , (−1,5) , (−9,5) , and (−9,3) . When that rectangle is reflected over the x -axis, 3 of its coordinates are (−1,−3) , (−1,−5) , and (−9,−5) . What are the coordinates of the reflected rectangle’s missing point?(1 point)
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Answer
Leopold draws a quadrilateral with two equal angles, Angles 1 and 2. Angle 3 measures 170 degrees, and Angle 4 measures either 55 degrees less than Angle 3 or 55 degrees more than Angle 3. Determine the angle measurement of Angle 2. Show all work. (4 points)
Answer
Verbage
Answered by
GPT 3.5
The coordinates of the reflected triangle will be:
A'(-5, -1)
B'(-5, -6)
C'(-1, -6)
A'(-5, -1)
B'(-5, -6)
C'(-1, -6)
Answered by
GPT 3.5
The coordinates of the missing point of the reflected rectangle will be (-9, -3).
Answered by
GPT 3.5
Let's consider the information provided:
1. Angles 1 and 2 are equal.
2. Angle 3 measures 170 degrees.
3. Angle 4 measures either 55 degrees less than Angle 3 or 55 degrees more than Angle 3.
Given that Angles 1 and 2 are equal, we know they have the same measurement. Let's represent the measurement of Angles 1 and 2 as x degrees.
So, we have:
Angle 1 = x degrees
Angle 2 = x degrees
Angle 3 = 170 degrees
Now, for Angle 4:
Angle 4 is either 55 degrees less than Angle 3 or 55 degrees more than Angle 3. Let's consider both cases:
Case 1: Angle 4 is 55 degrees less than Angle 3:
Angle 4 = Angle 3 - 55
Angle 4 = 170 - 55
Angle 4 = 115 degrees
Case 2: Angle 4 is 55 degrees more than Angle 3:
Angle 4 = Angle 3 + 55
Angle 4 = 170 + 55
Angle 4 = 225 degrees
Since we have two possible values for Angle 4 based on the information given, and the sum of interior angles of a quadrilateral is always 360 degrees, we can calculate the measurement of the remaining angle:
Sum of angles in a quadrilateral = 360 degrees
x + x + 170 + Angle 4 = 360
2x + 170 + 115 = 360
2x + 285 = 360
2x = 75
x = 37.5
Therefore, the measure of Angle 2 is 37.5 degrees.
1. Angles 1 and 2 are equal.
2. Angle 3 measures 170 degrees.
3. Angle 4 measures either 55 degrees less than Angle 3 or 55 degrees more than Angle 3.
Given that Angles 1 and 2 are equal, we know they have the same measurement. Let's represent the measurement of Angles 1 and 2 as x degrees.
So, we have:
Angle 1 = x degrees
Angle 2 = x degrees
Angle 3 = 170 degrees
Now, for Angle 4:
Angle 4 is either 55 degrees less than Angle 3 or 55 degrees more than Angle 3. Let's consider both cases:
Case 1: Angle 4 is 55 degrees less than Angle 3:
Angle 4 = Angle 3 - 55
Angle 4 = 170 - 55
Angle 4 = 115 degrees
Case 2: Angle 4 is 55 degrees more than Angle 3:
Angle 4 = Angle 3 + 55
Angle 4 = 170 + 55
Angle 4 = 225 degrees
Since we have two possible values for Angle 4 based on the information given, and the sum of interior angles of a quadrilateral is always 360 degrees, we can calculate the measurement of the remaining angle:
Sum of angles in a quadrilateral = 360 degrees
x + x + 170 + Angle 4 = 360
2x + 170 + 115 = 360
2x + 285 = 360
2x = 75
x = 37.5
Therefore, the measure of Angle 2 is 37.5 degrees.
Answered by
GPT 3.5
Given:
- Angles 1 and 2 are equal, so let's represent them as x degrees each.
- Angle 3 measures 170 degrees.
- Angle 4 is either 55 degrees less than Angle 3 or 55 degrees more than Angle 3.
Since Angles 1 and 2 are equal, we can set up the equations:
Angle 1 = x degrees
Angle 2 = x degrees
Given that the sum of the interior angles of a quadrilateral is always 360 degrees, we can find Angle 4:
Angle 1 + Angle 2 + Angle 3 + Angle 4 = 360
2x + 170 + Angle 4 = 360
Angle 4 = 360 - 2x - 170
Angle 4 = 190 - 2x
Now, from the information given, Angle 4 is either 55 degrees less or 55 degrees more than Angle 3:
Angle 4 = Angle 3 ± 55
Since Angle 3 is 170 degrees:
190 - 2x = 170 ± 55
190 - 2x = 170 + 55 or 190 - 2x = 170 - 55
Solving for x:
190 - 2x = 225 or 190 - 2x = 115
-2x = 35 or -2x = -75
x = -17.5 or x = 37.5
Since angle measurements cannot be negative, x can only be 37.5 degrees. Therefore, the measure of Angle 2 is 37.5 degrees.
- Angles 1 and 2 are equal, so let's represent them as x degrees each.
- Angle 3 measures 170 degrees.
- Angle 4 is either 55 degrees less than Angle 3 or 55 degrees more than Angle 3.
Since Angles 1 and 2 are equal, we can set up the equations:
Angle 1 = x degrees
Angle 2 = x degrees
Given that the sum of the interior angles of a quadrilateral is always 360 degrees, we can find Angle 4:
Angle 1 + Angle 2 + Angle 3 + Angle 4 = 360
2x + 170 + Angle 4 = 360
Angle 4 = 360 - 2x - 170
Angle 4 = 190 - 2x
Now, from the information given, Angle 4 is either 55 degrees less or 55 degrees more than Angle 3:
Angle 4 = Angle 3 ± 55
Since Angle 3 is 170 degrees:
190 - 2x = 170 ± 55
190 - 2x = 170 + 55 or 190 - 2x = 170 - 55
Solving for x:
190 - 2x = 225 or 190 - 2x = 115
-2x = 35 or -2x = -75
x = -17.5 or x = 37.5
Since angle measurements cannot be negative, x can only be 37.5 degrees. Therefore, the measure of Angle 2 is 37.5 degrees.
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