What Is the Angle Between the Clock Hands at 11:12 AM?

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At 11:12 AM, the angle between the clock hands can be calculated by first determining the movement of each hand. The minute hand moves 72 degrees in 12 minutes, while the hour hand moves 1.2 degrees during that same time. Starting from the initial position at 11:00, where the hour hand is at 11 and the minute hand is at 12, the initial angle is 30 degrees. Adding the hour hand's movement to the initial angle results in a final angle of 57.6 degrees between the two hands at 11:12 AM. This calculation clarifies the confusion regarding the positions of the clock hands.
tatoo5ma
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okay!
so, i had an exercice that say:
it's 11:12am, what s the angle between the two switches?
the problem here that stopped me from solvin that is when its like 11:12, the first switch, is not at 11am but it s slightly after that! :confused: i am confused! :frown:
any help is apprecied
 
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The minute hand moves 60 times as much as the hour hand.
What angle does the hour hand move through when the minute hand moves through 12 minutes ?
 
0.2 :huh:
then what?
is the angle 35.9 degrees
 
The minute hand moves through 12 minutes.

12 min = 1/5 hour = 1/5 circle = 1/5*360 deg = 72 deg

so how far does the hour hand move ?
 
so, is it 14.4 deg, and the angle between the two hands at 11:12 is 57.6deg. am i right
 
The hour hand moves 1/60 of the minute hand's movement, which is 72°.
Therefore movement of the hour hand is 1/60*72=1.2°.

Remember that this movement of the hands starts at 11.00, when the hands already have an angle between them.

The little hand is on 11 and the big hand is on 12 :smile:

So you have to add this initial angle on to get your final answer.
 
Thread 'Variable mass system : water sprayed into a moving container'

Thread 'Variable mass system : water sprayed into a moving container'

Starting with the mass considerations #m(t)# is mass of water #M_{c}# mass of container and #M(t)# mass of total system $$M(t) = M_{C} + m(t)$$ $$\Rightarrow \frac{dM(t)}{dt} = \frac{dm(t)}{dt}$$ $$P_i = Mv + u \, dm$$ $$P_f = (M + dm)(v + dv)$$ $$\Delta P = M \, dv + (v - u) \, dm$$ $$F = \frac{dP}{dt} = M \frac{dv}{dt} + (v - u) \frac{dm}{dt}$$ $$F = u \frac{dm}{dt} = \rho A u^2$$ from conservation of momentum , the cannon recoils with the same force which it applies. $$\quad \frac{dm}{dt}...
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