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What angle do hands of a clock form at 10 o'clock?
60 degrees
What is the angle between 10 o clock?
To find the angle between the hour and minute hands at 10 o'clock, we can use the formula: angle = |(30hour - 5.5minutes)|. At 10:00, the hour hand is at 10 and the minute hand is at 0. Plugging in the values, we get: angle = |(3010 - 5.50)| = |300| = 300 degrees. However, since a circle is 360 degrees, the smaller angle is 360 - 300 = 60 degrees. Thus, the angle between the hands at 10 o'clock is 60 degrees.
What is 60 times 3 over 10?
(60 x 3)/10 = 180/10 = 18
Can you simplify 10 over 60?
Yes, 10 over 60 can be simplified by finding the greatest common divisor of the two numbers, which is 10. Dividing both the numerator and the denominator by 10 gives you ( \frac{10 \div 10}{60 \div 10} = \frac{1}{6} ). Therefore, 10 over 60 simplifies to ( \frac{1}{6} ).
What is 9 over 10 minus 4 over 12?
9/10 - 4/12 = 54/60 - 20/60 = 34/60 = 17/30
What angle do the handa of a clock form at 10 o'clock?
The hands at 10 o'clock form an angle of 60 degrees
What angle do the hand form at 10 o'clock?
The minute and hour hands form an angle of 60 degrees at 10 o'clock
What angle do hands of a clock form at 10 o'clock?
60 degrees
What angle do the hands on a clock form at 10 O clock?
60°
What is the angle between 10 o clock?
To find the angle between the hour and minute hands at 10 o'clock, we can use the formula: angle = |(30hour - 5.5minutes)|. At 10:00, the hour hand is at 10 and the minute hand is at 0. Plugging in the values, we get: angle = |(3010 - 5.50)| = |300| = 300 degrees. However, since a circle is 360 degrees, the smaller angle is 360 - 300 = 60 degrees. Thus, the angle between the hands at 10 o'clock is 60 degrees.
What angle do the hands of a clock form at 10 o'clock?
It is pi/3 radians (60 degrees).
What is the magnitude of the angle formed by the hands of the clock when its 10 o'clock?
60 degrees
If an angle measures 60 is it?
An angle of 60 degrees is an acute angle
What is 60 times 3 over 10?
(60 x 3)/10 = 180/10 = 18
Hat angle do the hands of a clock form at 10 o'clock?
60 degrees, I believe.
Can you simplify 10 over 60?
Yes, 10 over 60 can be simplified by finding the greatest common divisor of the two numbers, which is 10. Dividing both the numerator and the denominator by 10 gives you ( \frac{10 \div 10}{60 \div 10} = \frac{1}{6} ). Therefore, 10 over 60 simplifies to ( \frac{1}{6} ).
If one angle of an isosceles triangle is 60 then how many more degrees are in the largest angle than in the smallest Answers A-0 B-5 C-10 D-It cannot be determined from the given information?
If one angle is 60, other 2 also 60. hence answer is 0
