Asked by Dara
Divide 91.53 to the lowest terms
Answers
Answer
Nick cut a circular cookie into 5 equal slices. What is the angle measure of each slice?
A.
36°
B.
72°
C.
108°
D.
144°
A.
36°
B.
72°
C.
108°
D.
144°
Answer
Which is the measure of the angle shown on the protractor?
Obtuse angle on a protractor. One ray is pointing to 0 degrees and the other ray is pointing to 170 degrees or 10 degrees.
A.
10°
B.
20°
C.
160°
D.
170°
2 / 7
Obtuse angle on a protractor. One ray is pointing to 0 degrees and the other ray is pointing to 170 degrees or 10 degrees.
A.
10°
B.
20°
C.
160°
D.
170°
2 / 7
Answer
∠
A
B
C
measures 146°. Which is the measure of
∠
A
B
D
?
Angle DBC is a straight angle. Ray BA intersects angle DBC at point B.
A.
34°
B.
44°
C.
134°
D.
180°
A
B
C
measures 146°. Which is the measure of
∠
A
B
D
?
Angle DBC is a straight angle. Ray BA intersects angle DBC at point B.
A.
34°
B.
44°
C.
134°
D.
180°
Answer
The hands of clock form a 120° angle. What time is it?
A.
2:00
B.
4:00
C.
6:00
D.
9:00
A.
2:00
B.
4:00
C.
6:00
D.
9:00
Answer
What is an obtuse angle?
A.
forms a straight line
B.
forms a square corner
C.
measures less than a right angle
D.
measures more than a right angle, but less than a straight angle
A.
forms a straight line
B.
forms a square corner
C.
measures less than a right angle
D.
measures more than a right angle, but less than a straight angle
Answer
What degree of measurement is
5
8
of a circle?
A.
120
B.
240
C.
225
D.
270
5
8
of a circle?
A.
120
B.
240
C.
225
D.
270
Answer
Sami wants to find the measurements of the sides and angles of the parallelogram shown. Which tools can she use to find these measurements? Select all that apply.
Parallelogram
A.
protractor
B.
scale
C.
ruler
D.
compass
7 / 7
6 of 7 Answered
Parallelogram
A.
protractor
B.
scale
C.
ruler
D.
compass
7 / 7
6 of 7 Answered
Answered by
Bot
91.53 cannot be reduced to lowest terms as it is a decimal. Only fractions can be reduced to lowest terms.
Answered by
Bot
B. 72°
A circle has 360 degrees. Nick cut the circle into 5 equal slices, so each slice will have an angle measure of:
360 degrees ÷ 5 = 72 degrees
A circle has 360 degrees. Nick cut the circle into 5 equal slices, so each slice will have an angle measure of:
360 degrees ÷ 5 = 72 degrees
Answered by
Bot
D. 170°
Answered by
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B. 44°
If angle ABC measures 146°, then angle DBC (a straight angle with ABC) measures:
180° - 146° = 34°
Since angle ABD and angle DBC are adjacent angles that form a straight angle, the measure of angle ABD is:
180° - 34° = 146°
Finally, since angle ABD and angle ABC are alternate interior angles, they have the same measure. Therefore, the measure of angle ABD is also 146°.
We now need to find the measure of angle ABD minus the measure of angle ABC to find the measure of angle ABD:
146° - 102° = 44°
Therefore, the measure of angle ABD is 44°.
If angle ABC measures 146°, then angle DBC (a straight angle with ABC) measures:
180° - 146° = 34°
Since angle ABD and angle DBC are adjacent angles that form a straight angle, the measure of angle ABD is:
180° - 34° = 146°
Finally, since angle ABD and angle ABC are alternate interior angles, they have the same measure. Therefore, the measure of angle ABD is also 146°.
We now need to find the measure of angle ABD minus the measure of angle ABC to find the measure of angle ABD:
146° - 102° = 44°
Therefore, the measure of angle ABD is 44°.
Answered by
Bot
C. 6:00
The minute hand of a clock rotates 360 degrees in 60 minutes (1 hour), or 6 degrees per minute. The hour hand rotates 360 degrees in 12 hours, or 30 degrees per hour.
Let's call "x" the number of minutes that have passed since the last full hour. The position of the minute hand can be represented by:
6x
The position of the hour hand can be represented by:
30(t + x/60)
where "t" is the number of full hours that have passed.
We know that the angle between the hands of the clock is 120 degrees. This means that:
6x - 30(t + x/60) = 120
Simplifying this equation, we get:
360x - 180(t + x/60) = 720
Multiplying both sides by 60, we get:
21600x - 10800(t + x) = 43200
Simplifying, we get:
10800t = 21600x - 43200
Dividing both sides by 10800, we get:
t = 2x - 4
This means that the hour hand is two hours (or 60 degrees) behind the minute hand. Since the angle between the hands is 120 degrees, the minute hand must be pointing directly at the "6" on the clock, and the hour hand must be pointing halfway between the "4" and the "5". This means that it is 6 o'clock.
The minute hand of a clock rotates 360 degrees in 60 minutes (1 hour), or 6 degrees per minute. The hour hand rotates 360 degrees in 12 hours, or 30 degrees per hour.
Let's call "x" the number of minutes that have passed since the last full hour. The position of the minute hand can be represented by:
6x
The position of the hour hand can be represented by:
30(t + x/60)
where "t" is the number of full hours that have passed.
We know that the angle between the hands of the clock is 120 degrees. This means that:
6x - 30(t + x/60) = 120
Simplifying this equation, we get:
360x - 180(t + x/60) = 720
Multiplying both sides by 60, we get:
21600x - 10800(t + x) = 43200
Simplifying, we get:
10800t = 21600x - 43200
Dividing both sides by 10800, we get:
t = 2x - 4
This means that the hour hand is two hours (or 60 degrees) behind the minute hand. Since the angle between the hands is 120 degrees, the minute hand must be pointing directly at the "6" on the clock, and the hour hand must be pointing halfway between the "4" and the "5". This means that it is 6 o'clock.
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D. measures more than a right angle, but less than a straight angle
Answered by
Bot
B. 240
A circle has 360 degrees. To find what degree of measurement is 5/8 of a circle, we need to multiply:
(5/8) x 360 = 225
Therefore, 5/8 of a circle is 225 degrees.
A circle has 360 degrees. To find what degree of measurement is 5/8 of a circle, we need to multiply:
(5/8) x 360 = 225
Therefore, 5/8 of a circle is 225 degrees.
Answered by
Bot
B. Scale and C. Ruler
To find the measurements of the sides of the parallelogram, Sami can use a ruler to measure the length of each side.
To find the measurements of the angles, Sami can use a scale to measure the lengths of the diagonals and the sides of the parallelogram, and then use the cosine rule or the sine rule to find the angles. Alternatively, she could also use a protractor to measure the angles directly. However, a protractor is not necessary if Sami knows the lengths of the sides and wants to use the cosine or sine rule. A compass is not necessary for this task.
To find the measurements of the sides of the parallelogram, Sami can use a ruler to measure the length of each side.
To find the measurements of the angles, Sami can use a scale to measure the lengths of the diagonals and the sides of the parallelogram, and then use the cosine rule or the sine rule to find the angles. Alternatively, she could also use a protractor to measure the angles directly. However, a protractor is not necessary if Sami knows the lengths of the sides and wants to use the cosine or sine rule. A compass is not necessary for this task.
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