![](https://lh5.googleusercontent.com/-E1T0NG3KhIQ/U3CW-zcJqiI/AAAAAAAAegY/YosNt0ondrQ/s640/Esc%25C3%25A1ner_20140509_2%2520%25282%2529.png)
jueves, 29 de mayo de 2014
martes, 20 de mayo de 2014
Què expressen els elements de la composició
Les formes orgàniques i sinuoses
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)
Les formes de contorn rectilini i geomètriques
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)
Les línies rectes, verticals o horitzontals
![](data:image/jpeg;base64,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)
Les línies inclinades o corbes
![](data:image/jpeg;base64,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)
L'us de punts i taques de color
![https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjKXYCW60mNZfWOH_wDE_ngYKaoUx63xwJzN9jPxYefzf5L3gJmoLxlZhIwNdJZfd5Zr3DkH4EZf7PUzUhEVAB0D18Hg-ihaExBmFAxlTOQxjVQInZu9yFMDCSNYtiIRQjJm5vAcKjNuXxa/s1600/oko.jpg](file:///C:/Users/javier/AppData/Local/Temp/msohtmlclip1/01/clip_image001.jpg)
Les superficies realitzades de base de colors plans
La combinació de tons
![https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj3QJ-tSz8T6YnKB1RRhclQTdlAnGenzlwwmHAZW6Ml6kLfdyN5uFP3yFxd79m4k1_MMzV55XLikFFU5PtPf4azIUm67lwUZrt99tvBEvYiNRttbe6eUafrjV39h-VHUxh4lMeuMxP42nP-/s1600/poko.jpg](file:///C:\Users\javier\AppData\Local\Temp\msohtmlclip1\01\clip_image001.jpg)
Les formes de contorn rectilini i geomètriques
Les línies rectes, verticals o horitzontals
Les línies inclinades o corbes
L'us de punts i taques de color
![https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjKXYCW60mNZfWOH_wDE_ngYKaoUx63xwJzN9jPxYefzf5L3gJmoLxlZhIwNdJZfd5Zr3DkH4EZf7PUzUhEVAB0D18Hg-ihaExBmFAxlTOQxjVQInZu9yFMDCSNYtiIRQjJm5vAcKjNuXxa/s1600/oko.jpg](file:///C:/Users/javier/AppData/Local/Temp/msohtmlclip1/01/clip_image001.jpg)
Les superficies realitzades de base de colors plans
La combinació de tons
![https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj3QJ-tSz8T6YnKB1RRhclQTdlAnGenzlwwmHAZW6Ml6kLfdyN5uFP3yFxd79m4k1_MMzV55XLikFFU5PtPf4azIUm67lwUZrt99tvBEvYiNRttbe6eUafrjV39h-VHUxh4lMeuMxP42nP-/s1600/poko.jpg](file:///C:\Users\javier\AppData\Local\Temp\msohtmlclip1\01\clip_image001.jpg)
lunes, 19 de mayo de 2014
jueves, 8 de mayo de 2014
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