Nguyễn Viết Trung Nhân
24/03/2020 at 10:23Let # a symbol of changing an number to a word have meaning. Here's how this symbol works:
| Number | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 |
| Letter that # can change to | a | d | g | j | m | p | s | v | y |
| Letter that # can change to | b | e | h | k | n | q | t | w | z |
| Letter that # can change to | c | f | i | l | o | r | u | x |
Ex: 4582 # Love
What can these equations can change to?
[(-19) x (-20)]^2 x \(\sqrt{9}\) x |5| + 22097157 # ?
y # ?, know that: \(\dfrac{\sqrt{y\sqrt{3}}\times y^2}{\sqrt{2}\times y}=\dfrac{\sqrt[4]{12\times y^2}\times y^2}{311030758}\)
If it is too hard, tell me.
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Nguyễn Viết Trung Nhân 24/03/2020 at 10:58
Sorry, I change the finding-y part to:
y # ?, know that: \(\dfrac{\sqrt{\left(200000000-44424621\right)\sqrt{3}}\times y^2}{\sqrt{2}\times y}=\dfrac{\sqrt[4]{12\times y^2}\times y}{2}\)
# only works with positive numbers
(This is an exercise I thought by myself, so I hope you will understand my mistakes.)