24 June 2012 10:50:19.816 AM
MANDELBROT_OPEN_MP
FORTRAN90/OpenMP version
Create an ASCII PPM image of the Mandelbrot set.
For each point C = X + i*Y
with X range [ -2.25000 , 1.25000 ]
and Y range [ -1.75000 , 1.75000 ]
carry out 2000 iterations of the map
Z(n+1) = Z(n)^2 + C.
If the iterates stay bounded (norm less than 2)
then C is taken to be a member of the set.
An ASCII PPM image of the set is created using
M = 500 pixels in the X direction and
N = 500 pixels in the Y direction.
Time = 0.626832
Graphics data written to "mandelbrot.ppm".
MANDELBROT_OPEN_MP
Normal end of execution.
24 June 2012 10:50:20.640 AM
24 June 2012 10:50:20.643 AM
MANDELBROT_OPEN_MP
FORTRAN90/OpenMP version
Create an ASCII PPM image of the Mandelbrot set.
For each point C = X + i*Y
with X range [ -2.25000 , 1.25000 ]
and Y range [ -1.75000 , 1.75000 ]
carry out 2000 iterations of the map
Z(n+1) = Z(n)^2 + C.
If the iterates stay bounded (norm less than 2)
then C is taken to be a member of the set.
An ASCII PPM image of the set is created using
M = 500 pixels in the X direction and
N = 500 pixels in the Y direction.
Time = 0.326107
Graphics data written to "mandelbrot.ppm".
MANDELBROT_OPEN_MP
Normal end of execution.
24 June 2012 10:50:21.166 AM
24 June 2012 10:50:21.169 AM
MANDELBROT_OPEN_MP
FORTRAN90/OpenMP version
Create an ASCII PPM image of the Mandelbrot set.
For each point C = X + i*Y
with X range [ -2.25000 , 1.25000 ]
and Y range [ -1.75000 , 1.75000 ]
carry out 2000 iterations of the map
Z(n+1) = Z(n)^2 + C.
If the iterates stay bounded (norm less than 2)
then C is taken to be a member of the set.
An ASCII PPM image of the set is created using
M = 500 pixels in the X direction and
N = 500 pixels in the Y direction.
Time = 0.323536
Graphics data written to "mandelbrot.ppm".
MANDELBROT_OPEN_MP
Normal end of execution.
24 June 2012 10:50:21.692 AM