How much does a watch lose or gain per day if its hands coincide every 66 minutes?

How much does a watch lose or gain per day if its hands coincide every 66 minutes?

CAT Question When the hands of clock will meet again, the minute hand will cover 360° more than hour hand. It will happen after minutes. Since hands of the clock are coinciding after 66 minutes so the clock is losing 6/11 minutes in 66 minutes.

How much does a watch lose per day if the hands coincide every 64 minutes?

Solution(By Examveda Team) =65511min. Lossin64min. =65511−64=1611min.

How many times the hands of a clock coincide in an hour?

Explanation: The hands of a clock coincide 11 times in every 12 hours (Since between 11 and 1, they coincide only once, i.e., at 12 o’clock).

How often do the hour hand and minute hand of a clock coincide?

We know that the minute and hour hand coincide every 65 minutes and not 60 minutes. Also, the hour and minute hand coincide only once between 11 and 1 o’clock i.e. at 12 o’clock. So, from both the above statements we can say that the two hands coincide exactly 11 times in a 12 hour span.

How many times do the hands of a clock coincide?

We know that the minute and hour hand coincide every 65 minutes and not 60 minutes. Also, the hour and minute hand coincide only once between 11 and 1 o’clock i.e. at 12 o’clock. So, from both the above statements we can say that the two hands coincide exactly 11 times in a 12 hour span. times.

How many times a day 24 hours do the minute and hour hands coincide How many times do they form a right angle what about a straight angle?

At about 11 minutes to 1 o’clock. So every 24 hours there are 44 right angles between minute hand and second hand.

How many times do the hands of the same clock coincide?

The hands of a clock coincide after every 66 minutes of correct time. How much is the clock fast or slow in 24 hours? The hands of a clock coincide after every 66 minutes of correct time.

What happens when the minute hand of a clock overtakes the hour?

If the minute hand of a clock overtakes the hour hand at intervals of M M minutes of correct time, the clock gains or loses in a day by (720 11 −M)(60 ×24 M) (720 11 − M) (60 × 24 M) minutes 21. Between H H and (H+1) (H + 1) o’ clock, the two hands of a clock are M M minutes apart at

How fast is the clock running on the clock?

If the hands of your hypothetical clock coincide every 65 minutes, then it is running fast by 0.454545 minutes per coincident. Multiply that value times 11 coincidences per 12 hour period. This means the clock is five minutes fast per 12 hour period. This is 5/12ths of a minute per hour or 0.41666666 minutes per hour.

What is the angle between the two hands of the clock?

When the minute hand is behind the hour hand, the angle between the two hands at M M minutes past H H ‘o clock = 30(H − M 5)+ M 2 = 30 (H − M 5) + M 2 degree When the minute hand is ahead of the hour hand, the angle between the two hands at M M minutes past H H ‘o clock = 30(M 5 −H)− M 2 degree = 30 (M 5 − H) − M 2 degree

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