I want to evaluate f[x,y]=-4 x + x^2 - 4 y - y^2 at points (1,-2); (2,-3); (3,-2); (2,-1).
I tried using Outer but for some reason it does not give me actual values. Help.
Remember that Mathematica has a specific way of defining functions. In your case it would be f[x_,y_]:=-4 x + x^2 - 4 y - y^2
. Then you could simply use f[1,-2]
etc.
Perhaps consider using a 'pure' function. For example:
-4 #1 + #1^2 - 4*#2 - #2^2 & @@@ {{1, -2}, {2, -3}, {3, -2}, {2, -1}}
gives
{1, -1, 1, -1}
-4 x + x^2 - 4 y - y^2 /. Thread[{x, y} -> #] & /@ {{1, -2}, {2, -3}, {3, -2}, {2, -1}}
or, for an individual case, -4 x + x^2 - 4 y - y^2 /. {x -> 1, y -> -2}
.
Here are some variations on the theme:
Clear[f]
f[{x_, y_}] := -4 x + x^2 - 4 y - y^2
points = {{1, -2}, {2, -3}, {3, -2}, {2, -1}};
Map[f, points]
{1, -1, 1, -1}
f[x_, y_] := -4 x + x^2 - 4 y - y^2
f[1, -2]
1
f = Function[{x, y}, -4 x + x^2 - 4 y - y^2];
f[1, -2]
1
You can use functions like Apply
and Map
to evaluate a function in a list of points, for example
f[x_, y_] := -4 x + x^2 - 4 y - y^2
pts = {{1, -2}, {2, -3}, {3, -2}, {2, -1}};
Apply[f, pts, {1}]
(* out: {1, -1, 1, -1} *)
or using @@@
as a short hand for Apply[ ...., {1}]
f @@@ pts