1 | initial version |

I know there is none. But I want to make one if possible at all. Probably you will like the expression with different "C"

(x-1)^2+C_1 and x^2-2x+C_2

For any value of C_1 there is a value of C_2 that makes the two equations equal. Anyone else have any idea?

2 | No.2 Revision |

I know there is none. But I want to make one if possible at all. Probably you will like the expression with different "C"

~~(x-1)^2+C_1 ~~$(x-1)^2+C_1$ and ~~x^2-2x+C_2~~$x^2-2x+C_2$

For any value of ~~C_1 ~~$C_1$ there is a value of ~~C_2 ~~$C_2$ that makes the two equations equal.
Anyone else have any idea?

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