Welcome to the forum.
I've not tried this puzzle but it looks like you've discovered a bug; maybe the wording should be changed ... perhaps indicating that equal angles are wanted rather than distances. I'll raise it with the page creator, MathsIsFun, himself.
Hope you enjoy your membership. Looking forward to your contributions.
Bob
]]>The question asks for the distance from the bottom of the clock face at 6 o'clock to the tip of the clock hands, what they mean is when do both the hands make an angle to a vertical line on the clock face through 6 o'clock.
The answers for when the hands are at either side of the clock face are ;
12:55 and 23sec, 1:50 46s, 2:46 9s, 3:41 32s, 4:36 55s, 5:32 18s, 6:27 42s, 7:23 5s, 8:18 28s, 9:13 51 s, 10:09 14s & 11:04 37s
There are 11 more solutions when the minute and hour hand are directly on top of each other ;
12:00 00s, 1:05 27s, 2:10 55s, 3:16 22s, 4:21 49s, 5:27 16s, 6:32 44s, 7:38 11s, 8:43 38s, 9:49 5s & 10:54 33s
Also we need to assume the length of the minute and hour hands is the same, or else we cant solve the question at all.
The solution given only cites one of these solutions 8:18 28s, I suppose that is made with reference to the picture.
I can make an explanation of the equations I used if I get a reply to this post, I wasnt going to be bothered if noone reads these.
Have Fun !
]]>Happy New Year!
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I will work on that one as soon as I get done with the easy stuff first.
]]>Q2 (trickier): Let θ be an arbitrary angle greater than 0° and smaller than 180°. How many times in a 12-hour period do the two hands of a clock make an angle of θ between themselves?
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Q1 (easy): How many times in a 12-hour period do the hour and minute hands point in opposite directions?
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