There is one clock that shows the right time so we do not have to worry about the one which is always correct.
Talking about the second clock that loses a minutes in every 24 hours (or in a day), so after 60 days (since it has lost 60 minutes because it is losing 1 minute everyday) it will show 11:00 a.m when it is exactly the noon.
So this way, in total it will take
days before it shows the correct noon.
Now, the third clock gains a minute every 24 hours (or in a day) , after 60 days (when it has gained 60 minutes or a complete hour) it will show 1:00 p.m when it is exactly the noon.
This way, it will take
days (since it has gained a minute everyday) when it shows the correct noon.
Therefore, it will take 1440 days before all the three clocks show the correct time again.
Answer:
It would be 3 Over 2
Step-by-step explanation:
If i did it right which I hope I did I got 3 Over 2. Hope this helps if not I'll br back with answers
K=8k+28
subtract 8k from both side
-7k = 28
divide both side by -7
k= -4
Answer:
Y= 3/2x+3
Step-by-step explanation:
Hopefully this helps if so please mark as brainliest
=3/2+ 9/4+ 2/2
=1.5+ 2.25+ 1
=4.75