What is the angle of a clock at 7 20?
So , the angle formed is 100 degrees .
When the time in the clock is 7 20 pm Then the angle between the hands of the clock is?
so the angle between each hour is 360 / 12 = 30 drg. At 7:20 The minute hand points exactly at the 4 and the hour hand between the 7 & 8. 20 minutes is a third of an hour so the hour hand has travelled 30 / 3 = 10 deg beyond the 7. pls mark as brainliest answer !!!
What is the angle between two hands of a clock at 7 clock?
What Is the Clock Angle Formula?
What is the angle between the two hands of a clock at 8 hours 20 minutes?
Find the angle between the minute and hour hand at 8:20 PM. Explanation: The distance between each notch on the clock is 6 degrees because there are 360 degrees on the clock, and there are 60 notches total. The minute hand is at notch #20, and so it is 120 degrees from the top.
What is the angle between minute hand and hour hand at 7 30?
At 7:30 the hour hand is between 7 and 8 and it makes an angle of 7*30+30*30/60 = 210 +15 = 225 deg from 12. At 7:30 the hour and minute hands make an angle of 225 – 180 = 45 deg between them.
How much angle hour hand rotates in 2 hours 20 minutes?
But at 20 past two, i.e., at 2 : 20, the hour-hand has moved 20 minutes towards 12. ∴ the angle between the two hands of the clock at twenty past two = 60° – 10° = 50°.
What is the angle between minute and hour hand at 7 35?
At 7:35, both the hour hand and the minute hand are near 7 in the clock. Thus there would be no minute difference in between both the hands. Thus the angle between the hands would be 0°.
What will be the angle between the hands of clock at 7 10?
Answer: The angle between the lines joining (7 to centre of the Dial) & (2 to centre of the Dial) = 150° + 60° = 210° along the upper-side, Or, 210° – 60° = 150° on the lower side.
At what time between 1 and 2 o’clock will the hands of a watch makes an angle of 180?
Therefore the two hands are at 180 degree to each other at 32.72 minutes past 12:00.
What is the angle between two hands of a clock at 3/10 am?
What is the measure, in degrees, of the acute angle formed by the hands of a 12-hour clock that reads exactly 3:10? Explanation: The entire clock measures 360°. As the clock is divided into 12 sections, the distance between each number is equivalent to 30° (360/12).