Difference between revisions of "User talk:Bobthesmartypants/Sandbox"
(→solution reflection) |
(→origami) |
||
Line 377: | Line 377: | ||
draw((-1,-1/8)--(11/16,1)--(1/26,-29/52)--cycle); | draw((-1,-1/8)--(11/16,1)--(1/26,-29/52)--cycle); | ||
draw((-0.5,0.7)..(-0.3,0.3)..(-0.05,0.05),Arrow());</asy> | draw((-0.5,0.7)..(-0.3,0.3)..(-0.05,0.05),Arrow());</asy> | ||
+ | |||
+ | ==combo== |
Revision as of 18:11, 12 May 2014
Contents
Bobthesmartypants's Sandbox
Solution 1
First, continue to hit
at
. Also continue
to hit
at
.
We have that . Because
, we have
.
Similarly, because , we have
.
Therefore, .
We also have that because
is a parallelogram, and
.
Therefore, . This means that
, so
.
Therefore, .
Solution 2
Note that is rational and
is not divisible by
nor
because
.
This means the decimal representation of is a repeating decimal.
Let us set as the block that repeats in the repeating decimal:
.
( written without the overline used to signify one number so won't confuse with notation for repeating decimal)
The fractional representation of this repeating decimal would be .
Taking the reciprocal of both sides you get .
Multiplying both sides by gives
.
Since we divide
on both sides of the equation to get
.
Because is not divisible by
(therefore
) since
and
is prime, it follows that
.
Picture 1
Picture 2
physics problem
Solution
inscribed triangle
moar images
yay
solution reflection
origami