Thank you for saying that this is part of the norm.
As I understand it, the Quine method with four variables gives an abbreviated PDNF, and the Karnaugh diagram gives minimal?
I have a function defined by a vector of values (2 3 4 6 7 12 15), from the truth table I compose the PDNF, I minimize it first by the Quine method, then by the Karnaugh map, the results differ by one term
I can’t understand what the error is
Karnaugh map
Thank you for explaining this in more detail. Sorry that you need to spend so much time explaining
Two more questions
X is the half of the side of the square
Y is the side of the square?
Thank you very much, but now the solution implies the derivation of the formula for the dependence of the area on some value (which should be chosen), the derivative, critical points, and so on. And the proposed answer introduced me into to a grinding halt...
Consider squares inscribed in different isosceles triangles with sides equal to 1. (One side of the square lies on the bottom.) Find the side of the largest square