(See attached file for full problem description)
Consider the set of all functions which can be constructed by linear summations of scaled and delayed versions of the three basis functions (top row). Any such function can be represented in the form f(t) = a x(t-τ1) + b y(t- τ2) + c z(t- τ3) + d, where a,b,c,d are constants and τ are the delays. Evaluate these parameters (a,b,c,d, τ1, τ2, τ3, τ4) for each of the three functions graphed on the second row.
Solution provides detailed evaluation of parameters for three graphed functions.