Son aquellas características que son comunes a toda materia que se encuentra en toda la naturaleza, dependen de la masa y gozan de la propiedad aditiva, Entre estas tenemos:
Inercia
Es la propiedad que no puede cambiar su estado, ya sea de reposo o movimiento. Mientras no intervenga alguna otra una fuerza externa.
![](http://runrun.es/wp-content/uploads/2013/03/NoalaInercia.jpg)
Impenetrabilidad
Con esta propiedad se determina que el espacio que se ocupa por un cuerpo no podría ser ocupado físicamente cor otro cuerpo.
![](http://lh3.ggpht.com/-L399HjHGu1U/UDEw7nOXwrI/AAAAAAAAH-Q/sow-jhdmSBU/impenetrabilidad%25255B5%25255D.jpg?imgmax=800)
Porosidad
Su característica principal es que todos los cuerpos tienen en el interior de su masa, espacios llamados poros o intermoleculares que podrían ser: visibles o invisibles.
![Resultado de imagen para porosidad](data:image/jpeg;base64,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)
Ponderabilidad o Peso
Se refiere a que todo cuerpo se sujeta a las leyes de la gravitación, A esta propiedad se debe el peso de los cuerpos.
![](http://www.nonamesport.net/images/spheratoon3.jpg)
Indestructibilidad
Esta propiedad tiene como punto principal la conservación de la materia que dice: "La materia no se crea ni se destruye, sólo se transforma en el transcurso de los fenómenos".
![](https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjHgcth9HebLRot7gXClOUoz_JnI_oS3XEMNrU0_JSs999IFRsSETIKi-444CRuv78Q5Ou798-oZB7rAUYozv9e5g21fTO5HOKQVbT7d0R0akMRL1-X1SLus_GR511Vn9mQBTUEBno-eA8/s320/cristalcuarzo.jpg)
![](https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjHgcth9HebLRot7gXClOUoz_JnI_oS3XEMNrU0_JSs999IFRsSETIKi-444CRuv78Q5Ou798-oZB7rAUYozv9e5g21fTO5HOKQVbT7d0R0akMRL1-X1SLus_GR511Vn9mQBTUEBno-eA8/s320/cristalcuarzo.jpg)
Longitud
Es un tipo de magnitud que da la distancia entre dos puntos, se considera como la medida de cada una de las dimensiones de un cuerpo. La unidad de medida es el metro.
![](https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjpUXuSfflN-qFCUkrTpsg-7NsgxMx-pw0uzXAb-yWmNsaVzshYAfQWIzzHlnTpmdB7kOJGpMgL_j9PGCFq3i8z1fiqNx8oOf2B6FcyuwDmty77lE1FfPtTKZIaSTe3m4P-vjN6yAmLRSuU/s400/metro.png)
Capacidad calorífica
La capacidad calorífica de una sustancia es una magnitud que indica la mayor o menor dificultad que se presenta en dicha sustancia para que se puedan experimentar cambios de temperatura bajo algun suministro de calor.
![](http://k25.kn3.net/taringa/6/8/9/0/7/5/2/edusocien/57C.jpg?8886)
Masa
Se llama masa a la cantidad de materia que presenta un cuerpo. Las unidades de masa son el kilogramo (Kg), gramo (g), libra (Lb).
![](data:image/jpeg;base64,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)
Divisibilidad
Esta es la propiedad por en la que la materia puede ser dividida en partículas mas pequeñas, sin perder sus propiedades. Esta división se puede efectuar por:
- Procedimientos mecánicos : en partículas
- Procedimientos físicos : en moléculas
- Procedimientos Químicos : en átomos.
![](http://www.colegioglenndoman.edu.co/imagenes%202012%20aula%207a/fisica9.jpg)
¿QUE SON LAS PROPIEDADES INTENSIVAS?
Las propiedades intensivas son opuestas a las extensivas, que están vinculadas de manera directa con la magnitud del sistema o la cantidad de materia.
La densidad, la presión, el punto de fusión, la temperatura, el color, el punto de ebullición y la velosidad, son algunos ejemplos de las propiedades intensivas.
Queda claro que la patente es también una propiedades intensivas. Algunos otros ejemplos como el olor, el sabor, el brillo, la ductilidad, la dureza, la maleabilidad, la tensión superficial, la tenacidad e incluso la comprensibilidad.
Ductilidad
![](http://www.arqhys.com/construccion/fotos/construccion/Ductibilidad-de-los-metales.jpg)
Maleabilidad
![](http://img.rtve.es/i/?w=1180&i=1378485977045.jpg)
![](http://www.arqhys.com/construccion/fotos/construccion/Ductibilidad-de-los-metales.jpg)
Maleabilidad
![](http://img.rtve.es/i/?w=1180&i=1378485977045.jpg)
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