The angle by which turns clockwise about point B to coincide with is degrees. If from point B, a point E is drawn directly opposite point C so that B, E, and C are on the same straight line, the angle by which turns counterclockwise to coincide with is degrees.
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14
heya yor answer is here __________
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AB turn clockwise to coincide with BC
= ABD + DBC
= 33.3° + 30.6°
= 63.9°
b) If E is drawn directly opposite C.
EBC is a straight line, so sum of angles =180°
ABE + ABD + DBC = 180°
ABE + 33.3° + 30.6° = 180°
ABE + 63.9° = 180°
ABE = 180 - 63.1
____________________________
AB turn clockwise to coincide with BC
= ABD + DBC
= 33.3° + 30.6°
= 63.9°
b) If E is drawn directly opposite C.
EBC is a straight line, so sum of angles =180°
ABE + ABD + DBC = 180°
ABE + 33.3° + 30.6° = 180°
ABE + 63.9° = 180°
ABE = 180 - 63.1
Answered by
6
The angle by which LINE AB turns clockwise about point B to coincide with LINE BC is (2.7 30.6 33.3 63.9) degrees.
To find the answer to this question, we need to find the angle from Line AB until Line BC when we move clockwise. Look at the picture with the red line that I have attached. To find the angle, we need to add the information they gave us.
33.3 + 30.6 = 63.9
Your answer for the first part is 63.9 degrees.
If from point B, a point E is drawn directly opposite point C so that B, E, and C are on the same straight line, the angle by which LINE AB turns counterclockwise to coincide LINE BE with is (116.1 180 243.9 296.1) degrees.
To find the answer to this part of the question, we need to find the angle from line AB to line BE, when we move counterclockwise. Look at the picture I attached with the blue line. To find the angle, we need to subtract the information given to us.
360 - 33.3 - 30.6 = 296.1
Your answer for this question is 296.1 degrees.
To find the answer to this question, we need to find the angle from Line AB until Line BC when we move clockwise. Look at the picture with the red line that I have attached. To find the angle, we need to add the information they gave us.
33.3 + 30.6 = 63.9
Your answer for the first part is 63.9 degrees.
If from point B, a point E is drawn directly opposite point C so that B, E, and C are on the same straight line, the angle by which LINE AB turns counterclockwise to coincide LINE BE with is (116.1 180 243.9 296.1) degrees.
To find the answer to this part of the question, we need to find the angle from line AB to line BE, when we move counterclockwise. Look at the picture I attached with the blue line. To find the angle, we need to subtract the information given to us.
360 - 33.3 - 30.6 = 296.1
Your answer for this question is 296.1 degrees.
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