Discrete Mathematics - MGNet
Note that if we can find polynomials of degree n(1 such that for . then is a polynomial of degree n(1 and. There are many solutions to the Lagrange interpolation problem. The first one is. has n(1 factors , so is a polynomial of degree n(1. Further, it satisfies the remaining requirements. Examples: n=2: n=3: n(3: very painful to convert into ... ................
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