Snow White's Bath Riddle
Hint:
The Christmas Alphabet Riddle
Hint:
New Years And Christmas Day Riddle
Everyone knows that both Christmas Day and New Year's Day always fall on the same day of the week. However, in 1939, the year of the outbreak of World War II, Christmas fell on a Monday and New Year's fell on a Sunday. Why?
Hint:
In any given year Christmas Day and New Year's Day fall on different days of the week. Christmas occurs around 51 weeks later in the year than New Years Day. 1939 was no different. Did you answer this riddle correctly?
YES NO
YES NO
Prince Age Riddle
A princess is as old as the prince will be when the princess is twice the age that the prince was when the princess's age was half the sum of their present ages.
What are their ages?
What are their ages?
Hint:
Current Future Past
Princess x 2z (x+y)/2
Prince y x z
I then created three equations, since the difference in their age will always be the same.
d = the difference in ages
x y = d
2z x = d
x/2 + y/2 z = d
I then created a matrix and solved it using row reduction.
x y z
1 -1 0 d
-1 0 2 d
.5 .5 -1 d
It reduced to:
x y z
1 0 0 4d
0 1 0 3d
0 0 1 5d/2
This means that you can pick any difference you want (an even one presumably because you want integer ages).
Princess age: 4d
Prince age: 3d
Ages that work
Princess:
4
8
16
24
32
40
48
56
64
72
80
Prince:
3
6
12
18
24
30
36
42
48
54
60 Did you answer this riddle correctly?
YES NO
Princess x 2z (x+y)/2
Prince y x z
I then created three equations, since the difference in their age will always be the same.
d = the difference in ages
x y = d
2z x = d
x/2 + y/2 z = d
I then created a matrix and solved it using row reduction.
x y z
1 -1 0 d
-1 0 2 d
.5 .5 -1 d
It reduced to:
x y z
1 0 0 4d
0 1 0 3d
0 0 1 5d/2
This means that you can pick any difference you want (an even one presumably because you want integer ages).
Princess age: 4d
Prince age: 3d
Ages that work
Princess:
4
8
16
24
32
40
48
56
64
72
80
Prince:
3
6
12
18
24
30
36
42
48
54
60 Did you answer this riddle correctly?
YES NO
Christmas Cake Riddle
Hint:
The Christmas King Riddle
Hint:
Skunk Christmas Riddle
Hint:
Blue Christmas Riddle
Hint:
Christmas Vehicular Homicide Riddle
Vehicular homicide was committed on Dad's mom by a precipitous darlin, what Christmas Carol is this?
Hint:
Cup-shaped Instruments Riddle
Hint:
Red-coated Unshaven Teamster Riddle
Hint:
Snow White Asks The Dwarfs A Question Riddle
Snow White asks the dwarfs a question. 2 of them are lying and 3 can only say the truth. Bashful: " Dopey lies, if Sleepy is honest." Dopey: "If Happy doesnt lie, then Bashful or Sleepy do." Happy: " Sneezy lies, as does Bashful or Dopey." Sleepy: "If Dopey is honest, then Bashful or Happy do as well." Sneezy: "with Bashful, Happy and Sleepy, there is at least one liar." The compulsive liars are?
Hint:
The compulsive liars are Sneezy and Dopey.
The excerpt has been taken from the story "Snow White and the Seven Dwarfs".
The seven dwarfs are Doc, Grumpy, Happy, Sleepy, Bashful, Sneezy, and Dopey.
The story shows how the dwarfs are living a peaceful life in Dwarf Woodlands and they come across Snow White. They then try to protect her from the attackers and from the poisoned apple from the Queen. Did you answer this riddle correctly?
YES NO
The excerpt has been taken from the story "Snow White and the Seven Dwarfs".
The seven dwarfs are Doc, Grumpy, Happy, Sleepy, Bashful, Sneezy, and Dopey.
The story shows how the dwarfs are living a peaceful life in Dwarf Woodlands and they come across Snow White. They then try to protect her from the attackers and from the poisoned apple from the Queen. Did you answer this riddle correctly?
YES NO
The Alphabet Shorter At Christmas Riddle
Hint:
An Apple And A Christmas Tree Riddle
Hint:
Five Rows Of Four Christmas Trees Riddle
"I planted five rows of four Christmas trees each." The man boasted to his boss. The boss looked at him and said, are you saying you planted 20 Christmas trees in one day? No, the man said, I only planted 10 trees. How did he do it?
Hint:
Just imagine a 5 pointed star, and then plant one tree at each point, and one tree where the sides intersect.
There are actually several distinct solutions. All of them can be constructed as follows:
Draw a nice long straight line.
Draw a second straight line that intersects the first.
Draw three more straight lines making sure each line intersects all the lines youve already drawn and avoiding any of the previous points of intersection. That is, no three lines should intersect at the same point.
With the first four lines, theres only one topologically distinct configuration, but by varying the position of the fifth line, several different distinct configurations can be created. Did you answer this riddle correctly?
YES NO
There are actually several distinct solutions. All of them can be constructed as follows:
Draw a nice long straight line.
Draw a second straight line that intersects the first.
Draw three more straight lines making sure each line intersects all the lines youve already drawn and avoiding any of the previous points of intersection. That is, no three lines should intersect at the same point.
With the first four lines, theres only one topologically distinct configuration, but by varying the position of the fifth line, several different distinct configurations can be created. Did you answer this riddle correctly?
YES NO
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