Mercurial > octave-nkf
view test/bug-31371.tst @ 20305:062422f2e399
Show axes coordinates in Qt figures (bug #44959)
* Canvas.h: new private bool member m_updtaCurrentPoint, to decide wether update the figure "currentpoint" property
* Canvas.h (Canvas::enableCurrentPointUpdates): new method to set m_updtaCurrentPoint
* Canvas.cc (Canvas::canvasMousePressEvent): move the code for axes/object selection in a dedicated method and call this method (select_object) instead.
* Canvas.cc (Canvas::select_object): new method for axes/object selection.
* Canvas.cc (Canvas::canvasMouseMoveEvent): update the parent figure status bar with the hovered axes coordinates
* Figure.h: declare new method updateStatusBar
* Figure.h: declare new private QStatusBar member m_statusBar. Include QStatusBar.h
* Figure.cc (Figure::Figure): unconditionally enable mouse traching
* Figure.cc (Figure::Figure): add status below of the canvas
* Figure.cc (Figure::update): take status bar into account when updating the figure position
* Figure.cc (Figure::update): remove some of the leftover debug comments
* Figure.cc: define new method updateStatusBar
| author | Pantxo Diribarne <pantxo.diribarne@gmail.com> |
|---|---|
| date | Sat, 13 Jun 2015 13:27:01 +0200 |
| parents | 6fe6ac8bbfdb |
| children |
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%!test %! % Work around MATLAB bug where f(x)(y) is invalid syntax %! % (This bug does not apply to Octave) %! %! C = @(fcn,x) fcn(x); %! C2 = @(fcn,x,y) fcn(x,y); %! %! % Church Booleans %! T = @(t,f) t; %! F = @(t,f) f; %! %! % Church Numerals %! Zero = @(fcn,x) x; %! One = @(fcn,x) fcn(x); %! Two = @(fcn,x) fcn(fcn(x)); %! Three = @(fcn,x) fcn(fcn(fcn(x))); %! Four = @(fcn,x) fcn(fcn(fcn(fcn(x)))); %! %! % Arithmetic Operations %! Inc = @(a) @(f,x) f(a(f,x)); % Increment %! Add = @(a,b) @(f,x) a(f,b(f,x)); %! Mult = @(a,b) @(f,x) a(@(x) b(f,x),x); %! Dec = @(a) @(f,x) C(a(@(g) @(h) h(g(f)), @(u) x), @(u) u); % Decrement %! Sub = @(a,b) b(Dec, a); %! %! % Renderer - Convert church numeral to "real" number %! Render = @(n) n(@(n) n+1,0); %! %! % Predicates %! Iszero = @(n) n(@(x) F, T); %! %! % Y combinator implements recursion %! Ycomb = @(f) C(@(g) f(@(x) C(g(g), x)), ... %! @(g) f(@(x) C(g(g), x))); %! %! Factorial = Ycomb(@(f) @(n) C(C2(Iszero(n), ... %! @(d) One, @(d) Mult(n, f(Dec(n)))),0)); %! %! assert (Render (Factorial (Two)), 2) %! assert (Render (Factorial (Three)), 6) %! assert (Render (Factorial (Four)), 24)